Agronomic performance of wild emmer wheat germplasm (Triticum turgidum ssp. dicoccoides) grown under irrigated and rainfed conditions

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Abstract Background: The genetic variations present in wild emmer wheat ( Triticum turgidum ssp. dicoccoides ), are valuable for improving desirable traits in modern wheat. This research was conducted to evaluate the responses of 105 wild emmer wheat accessions under irrigated and rainfed conditions across two cropping seasons (2021-2022 and 2022-2023) in the field. The following traits were measured: plant height, spike length, number of grains per spike, thousand grain weight, peduncle length, length, days to heading, days to anthesis, days to physiological maturity, soil plant development, protein content, iron content, and zinc content. Results: The combined analysis of variance revealed that the effects of environment and accession type were significant ( p <0.01) for all studied agronomic traits. The genotype × environment interaction was also significant ( p <0.01) for plant height, number of grains per spike, peduncle length, awn length, days to heading, and days to physiological maturity. Cluster analysis divided the studied accessions into three distinct clusters, revealing that those accessions from different geographical origins were intermixed within each group. Correlation analysis revealed a positive and significant relationship between spike length and the number of grains per spike, as well as between grain iron content and zinc content across all four environments. Multiple scoring index analysis indicated that under irrigated conditions in both years, accessions 68 (DIC291) and 70 (DIC316) were the top performers, whereas under rainfed conditions, accession 56 (DIC256) ranked highest across both years. Accessions that yield well under rainfed conditions are considered highly valuable genetic resources, as they present favorable drought stress resilience traits that increase their adaptability to water-deficit environments. Conclusions: The results showed that the significant genetic diversity observed in wild emmer wheat germplasm under varying conditions highlights its potential for enhancing drought tolerance and improving key agronomic traits, thereby providing valuable resources for breeding programs aimed at increasing the resilience and nutritional quality of bread and durum wheat in water-limited environments.
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Agronomic performance of wild emmer wheat germplasm (Triticum turgidum ssp. dicoccoides) grown under irrigated and rainfed conditions | Research Square window.SnipcartSettings = { analytics: { enabled: false } }; (function() { var accessVector = localStorage.getItem('access_vector') || ''; window.dataLayer = window.dataLayer || []; if (accessVector) { window.dataLayer.push({ user: { profile: { profileInfo: { snid: accessVector } } } }); } })(); (function(w,d,s,l,i){w[l]=w[l]||[];w[l].push({'gtm.start':new Date().getTime(),event:'gtm.js'});var f=d.getElementsByTagName(s)[0],j=d.createElement(s),dl=l!='dataLayer'?'&l='+l:'';j.async=true;j.src='https://www.googletagmanager.com/gtm.js?id='+i+dl;f.parentNode.insertBefore(j,f);})(window,document,'script','dataLayer','GTM-K279D39R'); Browse Preprints In Review Journals COVID-19 Preprints AJE Video Bytes Research Tools Research Promotion AJE Professional Editing AJE Rubriq About Preprint Platform In Review Editorial Policies Our Team Advisory Board Help Center Sign In Submit a Preprint Cite Share Download PDF Research Article Agronomic performance of wild emmer wheat germplasm (Triticum turgidum ssp. dicoccoides) grown under irrigated and rainfed conditions Behnaz Aghayani, Leila Zarei, Kianoosh Cheghamirza, Sohbat Bahraminejad, and 3 more This is a preprint; it has not been peer reviewed by a journal. https://doi.org/ 10.21203/rs.3.rs-7053462/v1 This work is licensed under a CC BY 4.0 License Status: Published Journal Publication published 21 Oct, 2025 Read the published version in BMC Plant Biology → Version 1 posted 12 You are reading this latest preprint version Abstract Background: The genetic variations present in wild emmer wheat ( Triticum turgidum ssp. dicoccoides ), are valuable for improving desirable traits in modern wheat. This research was conducted to evaluate the responses of 105 wild emmer wheat accessions under irrigated and rainfed conditions across two cropping seasons (2021-2022 and 2022-2023) in the field. The following traits were measured: plant height, spike length, number of grains per spike, thousand grain weight, peduncle length, length, days to heading, days to anthesis, days to physiological maturity, soil plant development, protein content, iron content, and zinc content. Results: The combined analysis of variance revealed that the effects of environment and accession type were significant ( p <0.01) for all studied agronomic traits. The genotype × environment interaction was also significant ( p <0.01) for plant height, number of grains per spike, peduncle length, awn length, days to heading, and days to physiological maturity. Cluster analysis divided the studied accessions into three distinct clusters, revealing that those accessions from different geographical origins were intermixed within each group. Correlation analysis revealed a positive and significant relationship between spike length and the number of grains per spike, as well as between grain iron content and zinc content across all four environments. Multiple scoring index analysis indicated that under irrigated conditions in both years, accessions 68 (DIC291) and 70 (DIC316) were the top performers, whereas under rainfed conditions, accession 56 (DIC256) ranked highest across both years. Accessions that yield well under rainfed conditions are considered highly valuable genetic resources, as they present favorable drought stress resilience traits that increase their adaptability to water-deficit environments. Conclusions: The results showed that the significant genetic diversity observed in wild emmer wheat germplasm under varying conditions highlights its potential for enhancing drought tolerance and improving key agronomic traits, thereby providing valuable resources for breeding programs aimed at increasing the resilience and nutritional quality of bread and durum wheat in water-limited environments. Drought tolerance genetic diversity grain quality phenological traits water stress Figures Figure 1 Figure 2 Figure 3 Figure 4 Figure 5 Figure 6 Background Wild emmer wheat ( Triticum dicoccoides BBAA) grows naturally in the Fertile Crescent [1]. The B genome is thought to have originated from an unknown species, with Aegilops speltoides (SS) being the closest known relative, whereas its direct ancestor that contributed to the A genome is Triticum urartu (AA) [2]. Wild emmer is recognized as the direct ancestor of domesticated emmer wheat (T . dicoccoum ), durum wheat ( T. durum ), and bread wheat ( T. aestivum ), significantly contributing to the wheat domestication process [3]. The considerable genetic variation present among emmer wheat genotypes in terms of quantitative traits can be leveraged for selection in breeding programs [4]. The high nutritional content and tolerance to various stresses of wild emmer wheat genotypes ( T. dicoccoides ) have made them valuable candidates for use in breeding programs [5, 6]. Wild emmer wheat represents a primary gene pool of cultivated wheat and serves as an invaluable genetic resource for developing new wheat cultivars with improved drought resilience and enhanced nutritional quality [7]. Drought stress triggers several major impairments in plant cells, including dehydration and osmotic stress, loss of cellular turgidity, energy depletion, dysfunction of the plasma and endosomal membranes, metabolic inhibition, chloroplast malfunction, nutritional imbalance, and oxidative stress [8]. Plants employ various strategies to cope with drought, including avoidance, recovery, escape, and tolerance. These mechanisms are more commonly utilized by wild species, making their introgression essential for enhancing crop stress resilience and adaptive plasticity. A shortened duration of phenological stages, such as fewer days to maturity and a shorter grain-filling period, contributes to increased drought tolerance [9]. Therefore, this trait is considered crucial in breeding programs targeting terminal drought stress tolerance. The dietary patterns of a significant portion of the global population are affected by micronutrient deficiencies, especially in essential elements such as iron and zinc. Wheat stands out as a crucial cereal crop, supplying calories to nearly one-third of the global population [5]. Nevertheless, the levels of zinc and iron in wheat are naturally low [10, 11]. Compared with their improved counterparts, wild and ancient wheat tends to contain greater amounts of these micronutrients [5]. The increase in iron and zinc contents in wheat has been achieved through the utilization of wild relatives [11]. Among these, wild emmer wheat ( T. dicoccoides ) serves as a significant genetic resource for improving the quality and micronutrient profile of wheat [10, 12]. Wild emmer wheat is rich in starch, minerals, fiber, carotenoids, and antioxidant compounds, making it a recommended option by healthcare professionals for individuals suffering from allergies, diabetes, and elevated blood cholesterol levels [13, 14]. Furthermore, wild emmer wheat possesses considerable genetic potential to increase the concentrations of zinc, iron, and seed protein, and to improve tolerance to zinc deficiency and drought in cultivated wheat [15]. The protein content of emmer wheat is greater than that of modern wheat, so it has great potential for improving the nutritional value of cultivated wheat [13, 16-18]. This study aimed to assess the genetic diversity of wild emmer wheat in terms of agronomic performance and grain quality traits under both irrigated and rainfed conditions across two growing seasons. Materials and methods Plant materials and field trials In this research, a two-replication alpha lattice design was employed to evaluate 105 wild emmer wheat accessions received from the CREA-GB Genomic and Postgenomic Research Center in Italy (as detailed in Table 1, which is placed at the end of the manuscript) under both irrigated and rainfed conditions during two cropping years. Four distinct environments were designated: E1 for irrigated conditions of the first year (2021-2022), E2 for rainfed conditions of the first year (2021-2022), E3 for irrigated conditions of the second year (2022-2023), and E4 for rainfed conditions of the second year (2022-2023). In both years, each plot contained two rows of 1.5 m in length, with a row spacing of 25 cm and a plant spacing of 6 cm. To ensure appropriate water availability in the irrigated experiments, irrigation was applied at the jointing, booting, heading, and grain filling stages, whereas the rainfed experiments received no supplemental irrigation. To determine the physicochemical characteristics of the soil, composite samples from different parts of the research field were used. The soil characteristics of the experimental site are given in Table 2. The experimental farm is situated at a geographic coordinate of 47 degrees 10 minutes east longitude and 34 degrees 32 minutes north latitude, with an elevation of 1350 meters above sea level. During the cropping years of 2021-2022, the total rainfall recorded was 285.7 mm, whereas during the cropping years 2022-2023, it was 342.8 mm (Fig. 1). Table 1 Characteristics of the wild emmer wheat accessions in the research Country Origin Alternative (donor) code GenBank GenBank ACCENUMB Accessions Number Lebanon G 3081 USDA CItr 17675 DIC001 1 Lebanon Vavilovii USDA PI 352322 DIC002 2 Lebanon T-1503 USDA PI 352324 DIC003 3 Turkey G1395 USDA PI 428017 DIC009 4 Turkey G2050 USDA PI 428023 DIC011 5 Turkey G2059 USDA PI 428028 DIC014 6 Turkey G2060 USDA PI 428029 DIC015 7 Turkey G2090 USDA PI 428046 DIC023 8 Turkey G2103 USDA PI 428051 DIC026 9 Turkey G2108 USDA PI 428054 DIC027 10 Turkey G2116 USDA PI 428058 DIC030 11 Turkey G2125 USDA PI 428063 DIC033 12 Turkey G2146 USDA PI 428075 DIC038 13 Turkey G2166 USDA PI 428083 DIC041 14 Turkey G2186 USDA PI 428089 DIC044 15 Turkey G2186 USDA PI 428089 DIC044_CA 16 Turkey G2188 USDA PI 428091 DIC045 17 Turkey G2844 USDA PI 428092 DIC046 18 Palestine G2995 USDA PI 428094 DIC048 19 Palestine G3028 USDA PI 428105 DIC058 20 Palestine G3036 USDA PI 428112 DIC061 21 Lebanon G3096 USDA PI 428129 DIC068 22 Lebanon G3100 USDA PI 428133 DIC071 23 Lebanon G3105 USDA PI 428137 DIC072 24 Lebanon G3112 USDA PI 428141 DIC075 25 Lebanon G3132 USDA PI 428143 DIC076 26 Syria A+6 USDA PI 466928 DIC077 27 Syria A+22 USDA PI 466931 DIC078 28 Syria A+42 USDA PI 466939 DIC082 29 Syria A+79 USDA PI 466946 DIC088 30 Palestine I+7 USDA PI 466958 DIC098 31 Palestine I-9 USDA PI 466960 DIC100 32 Palestine J-38 USDA PI 467000 DIC130 33 Palestine J-47 USDA PI 467003 DIC133 34 Palestine H+23 USDA PI 467015 DIC144 35 Turkey 79TK020-099 USDA PI 470736 DIC155 36 Syria 96 USDA PI 470956 DIC166 37 Lebanon 51 USDA PI 470982 DIC172 38 Palestine 1 USDA PI 471035 DIC179 39 Palestine 14 USDA PI 471044 DIC182 40 Palestine I-2 USDA PI 479779 DIC188 41 Palestine M-13 USDA PI 479782 DIC191 42 Syria SY 20085 USDA PI 487254 DIC193 43 Syria SY 20101 USDA PI 487258 DIC195 44 Syria SY 20110 USDA PI 487259 DIC196 45 Syria SY 20184 USDA PI 487263 DIC198 46 Syria SY 20198 USDA PI 487264 DIC199 47 Turkey G2040 USDA PI 503310 DIC200 48 Turkey G2095 USDA PI 538646 DIC225 49 Turkey G2097 USDA PI 538648 DIC227 50 Turkey G2112 USDA PI 538652 DIC229 51 Turkey G2114 USDA PI 538653 DIC230 52 Palestine G3003 USDA PI 538676 DIC248 53 Palestine G3004 USDA PI 538677 DIC249 54 Palestine G3007 USDA PI 538679 DIC250 55 Palestine G3027 USDA PI 538685 DIC256 56 Palestine G3037 USDA PI 538687 DIC258 57 Palestine G3038 USDA PI 538688 DIC259 58 Palestine G3050 USDA PI 538690 DIC261 59 Palestine G3052 USDA PI 538692 DIC263 60 Palestine G3053 USDA PI 538693 DIC264 61 Palestine G3064 USDA PI 538696 DIC267 62 Palestine G3065 USDA PI 538697 DIC268 63 Turkey 84TK089-017 USDA PI 554580 DIC283 64 Turkey 84TK109-079 USDA PI 554581 DIC284 65 Turkey 84TK110-087 USDA PI 554582 DIC285 66 Turkey 84TK132-001 USDA PI 554583 DIC286 67 Turkey TUR-05-BJS-HB-090 USDA PI 654317 DIC291 68 Palestine - IPK TRI 16631 DIC311 69 Lebanon PI 427998 IPK TRI 18478 DIC316 70 Palestine PI 466926 IPK TRI 18492 DIC326 71 Lebanon PI 470979 IPK TRI 18499 DIC333 72 Palestine PI 470988 IPK TRI 18500 DIC334 73 Palestine PI 470993 IPK TRI 18501 DIC335 74 Syria PI 487253 IPK TRI 18505 DIC339 75 Syria PI487255 IPK TRI 18506 DIC340 76 Syria PI 487262 IPK TRI 18508 DIC342 77 Palestine PI 538669 IPK TRI 18523 DIC346 78 Lebanon PI 538700 IPK TRI 18528 DIC348 79 Lebanon PI 538706 IPK TRI 18530 DIC350 80 Lebanon PI 538714 IPK TRI 18532 DIC351 81 Lebanon PI 538706 IPK TRI 29352 DIC359 82 - - - Unknown DIC375 83 - - - Unknown DIC376 84 - - - Unknown DIC380 85 - - - Unknown DIC386 86 - - - Unknown DIC391 87 Turkey CREA TD022 TD022 88 Turkey CREA TD076 TD076 89 Turkey CREA TD077 TD077 90 Turkey CREA TD078 TD078 91 Turkey CREA TD080 TD080 92 Turkey CREA TD087 TD087 93 Turkey CREA TD088 TD088 94 Turkey CREA TD089 TD089 95 Turkey CREA TD140 TD140 96 Turkey CREA TD134 TD134 97 Turkey CREA TD135 TD135 98 Turkey CREA TD136 TD136 99 Turkey CREA TD137 TD137 100 Turkey CREA TD216 TD216 101 Turkey CREA TD222 TD222 102 Turkey CREA TD225 TD225 103 Iran CREA 8942 DIC400 104 Palestine Distelfeld Zavitan Zavitan 105 Table 2 Physic-chemical characteristics of the field soil Sample Soil texture pH Phosphorus (mg/kg) Potassium (mg/kg) Nitrogen (%) Fe (ppm) Zn (ppm) Soils of the experimental site clay loam 7.65 24.38 514.57 0.11 9.06 0.35 The following traits were measured: phenological traits, i.e., days to heading, days to anthesis, and days to physiological maturity; and morphological traits, i.e., plant height (cm), awn length (cm), peduncle length (cm), spike length (cm), number of grains per spike and thousand grain weight (g). Ten spikes were randomly selected from each plant for measuring morphological traits. The thousand grain weight was calculated by sampling 250 grains. In addition, soil plant analysis development (SPAD) as a physiological trait measurement was conducted at the anthesis stage to assess plant senescence in each plot. The chemical composition traits of the grains included soluble grain protein content, which was determined via Bradford’s method [19], whereas the concentrations of iron and zinc in the grains were quantified via an atomic absorption spectrometer (Varian 220). The thousand grain weight, grain protein content, and levels of iron and zinc in the grains were measured in one replicate across each environment over a span of two years. Statistical analyses The data were subjected to combined analysis of variance (ANOVA) via the GLM procedure of the SAS statistical package, considering the environment as random and the accession number as fixed effects. Pearson phenotypic correlation coefficients were calculated via SPSS IBM 23 software, genetic correlation analysis and principal component analysis were performed via META-R software [20], and cluster analysis via the complete linkage (CLINK) method, principal coordinate analysis (PCoA) and heatmap were carried out via R software [21]. Cluster analysis was performed via BLUPs (best linear unbiased predictors) for the measured traits across the four environments. BLUPs were calculated across experiments via the META-R software via the alpha lattice model [20]: 𝑌𝑖𝑗𝑘𝑙 = 𝜇 + Loc 𝑖 + Rep 𝑗 (Loc) + Block 𝑘 (Loc 𝑖Rep ) + Gen 𝑙 + Loc 𝑖 × Gen 𝑙 + 𝜀𝑖𝑗𝑘 where μ = Mean effect of the total trait Loc 𝑖 = Effect of the i th environment Rep 𝑗 (Loc)= Effect of j th replication in the i th environment Block 𝑘 (Loc 𝑖Rep) = Effect of incomplete block 𝑘 in the i th environment in the j th replication Gen 𝑙= Accession l th 𝜀𝑖𝑗𝑘= Residual random effect related to replication, incomplete block, accession and environment A multiple scoring index (MSI) based on the measured traits was used to examine the accessions [22]. MSI was calculated via the following equation: MSI = where X1s, X2s, and Xns are the scoring scales of each trait when n traits are measured. Results Combined analysis of variance and mean comparisons The results of the combined analysis of variance conducted for the examined traits indicated that both the accessions and the environmental factors had a significant effect on all the measured traits (P < 0.01). Additionally, the interaction effect between environment and accession was found to be significant, except for SPAD, spike length, and days to anthesis. The coefficient of variation ranged from 1.97 to 28.84, with the highest values associated with spike length (28.84%), peduncle length (22.95%), and awn length (12.50%) (Table 3). Table 3 Combined analysis of variance for the traits studied in 105 wild emmer wheat accessions Mean squares df Sources DTPM DTA DTH AL PL NGPS SL PH SPAD 508.83 ** 1152.96 ** 5574.34 ** 44.72 ** 91.40 ** 200.10 ** 46.49 ** 8260.37 ** 148.69 ** 3 Environment (Env) 100.90 ** 294.65 ** 336.53 ** 40.65 ** 32.81 ** 110.53 ** 30.06 ** 2523.92 ** 221.01 ** 4 Replication × Env 59.23 47.76 66.78 1.98 20.75 8.96 9.59 165.51 14.63 40 Block (Env × Replication) 84.97 ** 51.04 ** 96.92 ** 12.64 ** 43.71 ** 74.62 ** 17.47 ** 1044.45 ** 25.05 ** 104 Accession (A) 27.70 ** 17.20 ns 28.65 ** 3.31 ** 12.28 ** 8.37 ** 8.56 ns 157.39 ** 9.55 ns 312 Env × A 18.24 14.83 19.18 1.56 7.74 3.26 7.48 72.74 12.87 376 Residual 1.97 2.12 2.52 12.50 22.95 10.95 28.84 10.40 6.51 - CV % 2.72 4.65 4.97 1.72 1.55 2.84 1.48 13.61 4.02 - LSD 5% 216.36 181.41 172.98 10.01 12.32 16.51 9.48 82.23 54.78 - Grand mean 0.68 0.62 0.73 0.75 0.74 0.89 0.50 0.86 0.55 - H 2 b The abbreviations used represent: SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity, CV: coefficient of variation, LSD: least significant difference, H 2 b: broad-sense heritability over four environments. Descriptive statistics The interaction effect between environment and accession type was not significant for SPAD, SL, and DTA, allowing for comparisons of these traits across different environments. As shown in Table 4, the greatest means for SPAD were found under irrigation conditions (E3 followed by E1), whereas it decreased under drought stress conditions (E2 and E4). Spike length was greatest in the E1 and E3 environments, whereas it decreased under drought stress in the E2 and E4 environments. The average days to anthesis were greatest under rainfed conditions (E4), followed by those under irrigation conditions (E3 environment), both in the second year of the experiment. According to Table 4, the heritabilities of the SPAD, PH, NGPS, PL and AL traits were greater in the E1 environment than in the other environments. The highest heritabilities of the SL, DTA and DTPM traits were related to the E2, E3 and E4 environments, respectively. In the case of the DTH trait, the highest heritability was related to the E1 and E3 environments. The findings indicated that SPAD, plant height, spike length, number of grains per spike, and days to physiological maturity were more pronounced under irrigated conditions than under drought conditions (Table 4). Table 4 Descriptive statistics for investigated traits under rainfed and irrigated environments in two cropping seasons Rainfed environment 2022-23 (E4) Irrigated environment 2022-23 (E3) Rainfed environment 2021-22 (E2) Irrigated environment 2021-22 (E1) Trait H 2 b Range Mean ± S.D. H 2 b Range Mean ± S.D. H 2 b Range Mean ± S.D. H 2 b Range Mean ± S.D. 0.07 37.47-67.83 54.37 ± 4.48 0.04 45.93-65.41 56.17 ± 3.33 0.10 37.19-62.86 54.04 ± 4.35 0.12 45.42-64.94 55.77 ± 3.29 SPAD 0.80 7.5-122.6 77.40 ± 16.97 0.73 11.5-123.1 89.10 ± 16.88 0.78 18.5-121.4 74.95 ± 17.49 0.97 46.6-121.9 86.44 ± 15.74 PH (cm) 0.56 5-16 9.10 ± 1.67 0.50 5.2-20.8 9.43 ± 2.33 0.77 4.1-16.6 9.07 ± 1.70 0.09 6-14.7 10.31 ± 1.72 SL (cm) 0.82 6.8-31.4 15.62 ± 3.97 0.79 8.1-34.7 16.67 ± 4.40 0.88 6.4-32.4 15.74 ± 3.79 0.99 11-34.4 17.94 ± 3.74 NGPS 0.21 5.1-23.8 12.58 ± 3.52 0.72 5.7-23.2 12.88 ± 4.31 NA 3.4-22.4 11.78 ± 3.52 0.88 4.5-21.8 11.25 ± 4.25 PL (cm) 0.66 4-18 9.91 ± 1.79 0.60 4-18.6 10.72 ± 2.50 0.70 3.4-16.1 9.72 ± 1.58 0.99 3.2-15.7 9.67 ± 1.92 AL (cm) 0.46 173-189 178.58 ± 5.06 0.60 168-187 176.67 ± 3.85 0.35 164-181 166.88 ± 6.03 0.60 164-187 170.45 ± 8.34 DTH 0.62 173-189 184.12 ± 2.92 0.47 175-195 182.60 ± 4.35 NA 170-187 178.53 ± 4.84 0.43 170-196 180.47 ± 6.49 DTA 0.64 207-222 215.54 ± 6.99 0.40 204-229 217.86 ± 6.47 0.59 209-218 213.94 ± 3.90 0.35 206-224 217.52 ± 4.65 DTPM The abbreviations used represent: SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity, S.D.: standard deviation, H 2 b: broad-sense heritability. Phenotypic correlation The Pearson correlation coefficients for the evaluated traits in each environment were calculated (Fig. 2). In the E1 environment, peduncle length was negatively and significantly correlated with days to heading and days to anthesis. Days to heading had a positive and significant correlation with days to anthesis and a negative and significant correlation with thousand grain weight. Days to anthesis was negatively and significantly correlated with the thousand grain weight (Fig. 2A). In E2, the number of grains per spike was positively correlated with peduncle length, days to heading and protein percentage and significantly negatively correlated with awn length and iron content. There was a negative and significant correlation between days to physiological maturity and the thousand grain weight (Fig. 2B). In the E3 environment, there was a negative and significant correlation between the iron and zinc contents and the thousand grain weight. Days to anthesis had a positive and significant correlation with days to physiological maturity, and there was a significant negative correlation with zinc content and thousand grain weight (Fig. 2C). In E4, there was a negative and significant correlation between SPAD values and days to physiological maturity and protein percentage. There was a positive correlation between spike length and the number of grains per spike, peduncle length, days to heading and days to physiological maturity (Fig. 2D). The findings across all four years indicated that SPAD was positively and significantly correlated with plant height, spike length, and peduncle length under rainfed conditions. Additionally, the results revealed a consistent positive relationship between plant height and spike length, number of grains per spike, and peduncle length across all four conditions. Spike length was positively correlated with the number of grains per spike in all four conditions. There was a positive correlation between the number of grains per spike and peduncle length in all four conditions and a negative correlation with awn length. In all four conditions, there was a positive correlation between days to heading and days to anthesis. A positive relationship was observed between the grain iron and zinc contents under all four conditions. Genetic correlation The genetic correlation coefficients for the evaluated traits in each environment were calculated (Tables 5, 6, 7, and 8). The results showed that under all four conditions, there was a positive and significant genetic correlation between plant height, spike length and the number of grains per spike. The results also revealed a positive and significant genetic correlation between spike length and days to physiological maturity under irrigated conditions. The number of grains per spike under all four conditions had a positive and significant genetic correlation with days to heading. The number of grains per spike under irrigated conditions had a positive and significant genetic correlation with days to anthesis. Under all four conditions, there was a negative and significant genetic correlation between awn length and days to physiological maturity. Under irrigated conditions, a positive and significant genetic correlation was observed between days to heading and days to anthesis every two years. The highest amount of positive and significant genetic correlation under irrigated conditions in both years was between days to heading and days to anthesis (0.999 ** ). Under rainfed conditions of the first year (2021-2022), the highest positive and significant genetic correlation was detected between plant height and days to heading (0.708 ** ). Under these conditions, the most negative and significant genetic correlation was observed between the SPAD value and days to physiological maturity (-0.999 ** ). Under rainfed conditions of the second year (2022-2023), the highest positive and significant genetic correlation between plant height and peduncle length (0.935 ** ) was observed. Under these conditions, the greatest negative and significant genetic correlation was observed between SPAD and peduncle length (-0.978 ** ). Table 5 Genetic correlation coefficients of agronomic traits under irrigated conditions in the crop year (2021-2022) (E1) DTPM DTA DTH AL PL NGPS SL PH SPAD 0.204 ** -0.131 ns -0.611 ** -0.160 ns 0.086 ns -0.143 ns -0.714 ** -0.057 ns 1 SPAD -0.054 ns -0.212 ** -0.256 ** 0.019 ns 0.587 ** 0.501 ** 0.639 ** 1 PH 0.313 ** 0.231 ** -0.512 ** -0.543 ** 0.282 ** 0.391 ns 1 SL 0.151 ns 0.300 ** 0.212 ** -0.282 ** 0.181 * 1 NGPS 0.144 ns -0.360 ** -0.361 ** -0.056 ns 1 PL -0.321 ** -0.163 ns -0.179 * 1 AL 0.010 ns 0.999 ** 1 DTH -0.008 ns 1 DTA 1 DTPM ns , *, ** non-significant, significant at 5% and 1% level of probability, respectively. The abbreviations used represent: SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity Table 6 Genetic correlation coefficients of agronomic traits under rainfed conditions in the crop year (2021-2022) (E2) DTPM DTA DTH AL PL NGPS SL PH SPAD -0.999 ** na 0.080 ns -0.042 ns na -0.038 ns 0.068 ns 0.132 ns 1 SPAD -0.086 ns na 0.708 ** -0.043 ns na 0.631 ** 0.475 ** 1 PH 0.091 ns na 0.343 ** 0.043 ns na 0.317 ** 1 SL 0.006 ns na 0.431 ** -0.331 ** na 1 NGPS na na na na 1 PL -0.202 ** na 0.061 ns 1 AL 0.223 ** na 1 DTH na 1 DTA 1 DTPM ns , *, ** non-significant, significant at 5% and 1% level of probability, respectively. The abbreviations used represent: na: non-applicable, SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity Table 7 Genetic correlation coefficients of agronomic traits under irrigated conditions in the crop year (2022-2023) (E3) DTPM DTA DTH AL PL NGPS SL PH SPAD na na na na na na na na 1 SPAD -0.006 ns -0.135 ns -0.156 ns 0.073 ns 0.590 ** 0.577 ** 0.608 ** 1 PH 0.265 ** 0.105 ns 0.235 ** -0.380 ns 0.575 ** 0.629 ** 1 SL 0.456 ** 0.338 ** 0.502 ** -0.435 ** 0.493 ** 1 NGPS 0.293 ** -0.145 ns -0.093 ns -0.007 ns 1 PL -0.539 ** 0.097 ns -0.194 ** 1 AL 0.314 ** 0.999 ** 1 DTH 0.139 ns 1 DTA 1 DTPM ns , *, ** non-significant, significant at 5% and 1% level of probability, respectively. The abbreviations used represent: na: non-applicable, SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity Table 8 Genetic correlation coefficients of agronomic traits under rainfed conditions in the crop year (2022-2023) (E4) DTPM DTA DTH AL PL NGPS SL PH SPAD -0.894 ** na -0.295 ** -0.018 ns -0.978 ** -0.214 * -0.175 ns 0.503 ** 1 SPAD -0.080 ns na 0.411 ns -0.150 ns 0.935 ** 0.678 ** 0.732 ** 1 PH 0.014 ns na 0.488 ** -0.166 ns 0.456 ** 0.523 ** 1 SL 0.045 ns na 0.603 ** -0.396 ns 0.787 ** 1 NGPS 0.117 ns na 0.228 * -0.591 ** 1 PL -0.267 ** na -0.423 ** 1 AL 0.001 ns na 1 DTH na 1 DTA 1 DTPM ns , *, ** non-significant, significant at 5% and 1% level of probability, respectively. The abbreviations used represent: na: non-applicable, SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity Principal component analysis To better understand the relationships between the traits studied in this research, principal component analysis (PCA) was used. Through the PCA method, many variables can be condensed into a few key factors, which effectively summarize the original dataset. According to Fig. 3, the first two components accounted for 69.39% of the variance in E1, 74.39% in E2, 88.54% in E3, and 83.78% in E4. In E1, the first principal component explained 38.61% of the dataset's variability, demonstrating positive correlations with days to heading, days to anthesis, and awn length but negative correlations with days to physiological maturity, plant height, spike length, number of grains per spike, peduncle length, and SPAD. The second principal component in E1 accounted for 30.78% of the variability and was positively associated with peduncle length, awn length, and SPAD but negatively correlated with plant height, spike length, number of grains per spike, days to heading, days to anthesis, and days to physiological maturity (Fig. 3A). In E2, the first principal component explained 45.45% of the dataset's variability and was positively correlated with awn length and SPAD but negatively correlated with plant height, spike length, number of grains per spike, days to heading, and days to physiological maturity. The second principal component in this environment accounted for 28.94% of the variability, showing positive relationships with days to heading and days to physiological maturity but negative correlations with plant height, spike length, number of grains per spike, SPAD, and awn length (Fig. 3B). In E3, the first principal component accounted for 49.68% of the dataset's variability, demonstrating positive correlations with plant height, peduncle length, spike length, the number of grains per spike, and days to physiological maturity but negative correlations with awn length, days to heading, and days to anthesis. The second principal component in this environment explained 38.96% of the dataset's variability, showing positive relationships with spike length, the number of grains per spike, days to heading, days to anthesis, and days to physiological maturity but negative correlations with plant height, peduncle length, and awn length (Fig. 3C). In the fourth environment, the first principal component accounted for 59.73% of the variation in the dataset, was positively influenced by awn length and SPAD, and was negatively influenced by plant height, spike length, the number of grains per spike, days to heading, peduncle length, and days to physiological maturity. The second principal component in this environment explained 24.05% of the variation in the dataset; it was positively associated with peduncle length and days to physiological maturity but negatively associated with plant height, spike length, the number of grains per spike, awn length, SPAD, and days to heading (Fig. 3D). Under rainfed conditions in both years, the first principal component was loaded positively by awn length and SPAD and negatively by plant height, spike length, number of grains per spike, days to heading and days to physiological maturity, whereas the second principal component was loaded positively by the days to physiological maturity and negatively by plant height, spike length, number of grains per spike and SPAD. Cluster analysis The results of the cluster analysis categorized the examined accessions in the four environments into three distinct groups. The first group (G-I) comprised 72 accessions, the second group (G-II) included 26 accessions, and the third group (G-III) contained 7 accessions (Fig. 4). To enhance the understanding of the accession clustering, a biplot derived from principal coordinate analysis (PCoA) (Fig. 5) and a heatmap (Fig. 6) were generated for the 105 emmer wheat accessions. The results of the grouping were in alignment with the findings of the cluster analysis. Each group contained accessions originating from various geographical locations. As shown in Fig. 6, in the third group (G-III) there were accessions with greater plant heights than those in the other groups. For the other traits, no difference in geographical origin was observed between the groups. Multiple scoring index Multiple scoring index was used to identify accessions with the best combination of studied traits. Table 9 presents the best accessions exhibiting the optimal combination of traits under the investigated environments. In the irrigated conditions of the first year (E1), the accessions that demonstrated the most advantageous trait combinations were 28, 68, 70, 78, 100, 93, 13, 64, 3, and 82. Conversely, under rainfed conditions in the first year (E2), the accessions that presented the best trait combinations included 105, 20, 69, 57, 103, 8, 89, 45, 96, and 56. In the second year under irrigated conditions (E3), 55, 73, 32, 29, 68, 53, 94, 70, 92, and 89 accessions presented the most favorable combinations of traits. Under the drought conditions of the second year (E4), accessions 71, 47, 56, 50, 18, 79, 94, 88, 97, and 10 presented the best trait combinations. Thus, under irrigated conditions in both years, accessions 68 (DIC291) and 70 (DIC316), and under rainfed conditions in both years, accession number 56 (DIC256) was the best accession studied in terms of the multiple scoring index. The abbreviations used represent: SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity, MSI: Multiple scoring index As presented in Table 10, for MSI in the E2 environment, a significant negative correlation was observed exclusively with peduncle length (-0.198*). Additionally, a noteworthy negative correlation was established between plant height and MSI in the E4 environment (-0.210*). No correlations were found between the other environments and the remaining traits. Table 10 Correlation coefficients between studied traits and multiple scoring index (MSI) MSI-E4 MSI-E3 MSI-E2 MSI-E1 Traits -0.030 ns 0.071 ns 0.009 ns 0.169 ns SPAD -0.210 * -0.046 ns -0.129 ns -0.078 ns PH -0.063 ns 0.042 ns -0.072 ns -0.076 ns SL -0.044 ns 0.034 ns -0.043 ns 0.005 ns NGPS -0.183 ns -0.042 ns -0.198 * -0.076 ns PL 0.032 ns 0.090 ns 0.135 ns -0.104 ns AL 0.077 ns 0.048 ns 0.019 ns 0.093 ns DTH 0.134 ns 0.098 ns -0.045 ns 0.067 ns DTA 0.072 ns 0.100 ns -0.111 ns 0.089 ns DTPM 0.184 ns -0.051 ns 1 0.208 * MSI-E2 0.073 ns 1 -0.051 ns 0.104 ns MSI-E3 1 0.073 ns 0.184 ns -0.023 ns MSI-E4 ns , * non-significant, significant at 5% level of probability, respectively. The abbreviations used represent: SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity Discussion Plant breeding has resulted in genetic erosion as a consequence of the demand for uniformity and the need to increase productivity. To maintain the process of crop improvement and achieve further advancements in resilience to environmental stresses, gradually introducing new genetic variation is essential [23]. Research has been carried out to assess the genetic diversity of wild emmer wheat germplasms originating from various geographical locations, with a focus on agronomic characteristics and certain qualitative traits of the grain. The results of analysis of variance showed significant differences between the accessions studied in the research for all investigated traits. These results are consistent with the research of [24] (wheat), [4] (emmer wheat), [25] (durum wheat) and [14] (emmer wheat). Significant diversity was observed among the wild emmer wheat accessions concerning the traits examined. The high level of genetic variation present in the analyzed germplasm could be effectively utilized in breeding programs for both bread wheat and durum wheat. The interaction effect of environment × accession was significant for plant height, number of grains per spike, peduncle length, awn length, days to heading and days to physiological maturity. Correlation analysis revealed that plant height, spike length, number of grains per spike, peduncle length, days to heading, days to anthesis, and grain iron and zinc contents were positively and significantly correlated, and since there was a positive relationship between these parameters in all four environments, these traits were not affected by irrigated or rainfed conditions. Additionally, these traits can be modified and improved simultaneously. One study reported a positive and significant correlation between the iron and zinc contents of bread wheat grains under irrigated and rainfed conditions [26]. A thorough investigation is needed to understand the biological or genetic mechanisms that underpin these significant correlations. In terms of the mean performance across the environments, there was a positive and significant correlation between plant height, spike length and peduncle length. Another study reported a positive and significant correlation between plant height and both spike length and peduncle length [27]. A positive and significant correlation was observed between peduncle length and the number of grains per spike. Another study reported a significant and positive correlation between peduncle length and the number of seeds per spike [28]. Previous studies have suggested a highly significant positive correlation between the grain iron and zinc contents in emmer wheat, which is consistent with the results obtained in the present study [10, 29-31]. There was also a positive and significant correlation between spike length and the number of grains per spike, which was also confirmed by the study of [14]. There was a positive and significant correlation between days to heading and days to anthesis. Another study reported positive and significant correlations between days to heading, days to anthesis and days to physiological maturity [3]. Spike length was negatively correlated with awn length under irrigated conditions, meaning that as spike length increased, awn length decreased. Moreover, no relationship was detected between the traits under rainfed conditions and the traits that were affected by both irrigated and rainfed conditions. The results in all four environments revealed that SPAD values were not correlated with plant height, spike length, or peduncle length under irrigated conditions. However, under rainfed conditions, there was a positive correlation between them, indicating that an increase in SPAD corresponds to an increase in plant height, spike length, and peduncle length under rainfed conditions. These results indicate that the relationships among these traits are affected by the irrigated or rainfed conditions of the field. Plant height was positively and significantly correlated with spike length, number of grains per spike, and peduncle length. As plant height increased, spike length, the number of grains per spike, and peduncle length tended to increase, whereas a decrease in plant height led to a decrease in these traits. In addition, there were weak and negative correlations between the grain protein content and the contents of iron (Fe) and zinc (Zn). To address the relationships between Fe and Zn and grain protein, it is essential to conduct selection experiments within segregating populations. The use of genomic tools will offer additional insights into these associations. The results from the present study also revealed no correlation between the iron content and grain protein content under rainfed conditions, which is consistent with the results of [26]. The results of the principal component analysis under rainfed conditions in both years revealed that the first principal component was negatively loaded with days to heading and days to physiological maturity. In one study, the first principal component was loaded positively with the traits of plant height and spike length [3], which was contrary to the results obtained in the present study, which loaded these traits negatively with the first principal component. The results of cluster analysis revealed high genetic diversity in the germplasms used in this study, with different groups containing accessions of different geographical origins. The accessions were mixed with those from various regions and showed no relationship with their geographical origins. These results were also confirmed by [4, 32]. The results of one study revealed a clustering pattern of genotypes with an imbalance between geographical and genetic diversity [4]. They identified genotypes with different geographical origins in different clusters, thus obtaining high genetic diversity in the genotypes studied [4]. A cluster analysis revealed that native and foreign accessions were sporadically present in different groups. They also reported high diversity in accessions [32]. The findings of the multiple scoring index indicate that the ranking of the best accessions varies across different environments, highlighting the significant potential of the wild emmer wheat diversity panel to adapt to varying degrees of drought stress. The accessions that performed well under rainfed conditions are regarded as the most valuable genetic resources, as they possess desirable agronomic traits for adaptation to drought-stressed environments. Conclusion Significant variation was observed in the traits of the germplasm of wild emmer wheat under both irrigated and rainfed conditions. Accordingly, genetic variation was observed for both drought escape—indicated by phenological traits such as days to maturity—and drought tolerance, as reflected by agronomic traits such as plant height, number of grains, and grain weight. Across all four environments, significant positive phenotypic and genetic correlations were observed among plant height, spike length, and the number of grains per spike. These findings suggest that under both irrigated and rainfed conditions, increased plant height is associated with increased spike length and number of grains per spike. Furthermore, a positive correlation was observed between the grain iron and zinc contents, suggesting that simultaneous improvement of both traits is achievable. The wide genetic diversity present in the studied wild emmer wheat germplasm offers valuable resources for enhancing drought tolerance. These accessions can play a vital role in breeding programs aimed at enhancing the resilience of bread wheat and durum wheat under water-limited conditions by contributing adaptive traits such as early maturity, improved grain nutritional quality, and increased yield under drought stress. Declarations A: Accession AL: Awn length ANOVA: Analysis of variance BLUPs: Best linear unbiased predictors CLINK: Complete linkage CREA: Canadian real estate association CV: Coefficient of variation DTA: Days to anthesis DTH: Days to heading DTPM: Days to physiological maturity E1: Environment 1 (irrigated regime 2021-2022) E2: Environment 2 (rainfed from 2021-2022) E3: Environment 3 (irrigated regime 2022-2023) E4: Environment 4 (rainfed from 2022-2023) Env: Environment Fe: Iron H 2 b: Broad-sense heritability IPK: The Leibniz Institute of Plant Genetics and Crop Plant Research LSD: Least significant difference MSI: Multiple scoring index na: non-applicable NGPS: Number of grains per spike ns: non-significant P%: Protein percentage PCA: Principal component analysis PCoA: Principal coordinat analysis PH: Plant height PL: Peduncle length S.D.: Standard deviation SL: Spike length SPAD: Soil plant analysis development TGW: Thousand grain weight USDA: United States Department of Agriculture Zn: Zinc Declarations Ethics approval and consent to participate Not applicable. Consent for publication Not applicable. Data availability The datasets used and/or analyzed during the current study are available from the corresponding author on reasonable request. Competing interests The authors declare that they have no competing interests. Funding Not applicable. Authors’ contributions LZ, KCH and SB conceived of the presented idea. BA performed the experiments. LZ, KCH and SB verified the analytical methods. BA , LZ, KCH and SB drafted the manuscript and EM , AA and HO revised the manuscript. All authors read and approved the final manuscript. Acknowledgements Not applicable. References Xie W, Nevo E. Wild emmer: genetic resources, gene mapping and potential for wheat improvement. Euphytica. 2008;164:603-14. https://doi.org/10.1007/s10681-008-9703-8. Brouns F, Geisslitz S, Guzman C, Ikeda TM, Arzani A, Latella G, Simsek S, Colomba M, Gregorini A, Zevallos V, Lullien‐Pellerin V. 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Cite Share Download PDF Status: Published Journal Publication published 21 Oct, 2025 Read the published version in BMC Plant Biology → Version 1 posted Editorial decision: Revision requested 05 Sep, 2025 Reviews received at journal 05 Sep, 2025 Reviewers agreed at journal 04 Sep, 2025 Reviewers agreed at journal 15 Jul, 2025 Reviewers agreed at journal 15 Jul, 2025 Reviews received at journal 14 Jul, 2025 Reviewers agreed at journal 14 Jul, 2025 Reviewers invited by journal 13 Jul, 2025 Editor invited by journal 11 Jul, 2025 Editor assigned by journal 11 Jul, 2025 Submission checks completed at journal 11 Jul, 2025 First submitted to journal 05 Jul, 2025 You are reading this latest preprint version Research Square lets you share your work early, gain feedback from the community, and start making changes to your manuscript prior to peer review in a journal. As a division of Research Square Company, we’re committed to making research communication faster, fairer, and more useful. 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Also discoverable on Platform About Our Team In Review Editorial Policies Advisory Board Help Center Resources Author Services Accessibility API Access RSS feed Manage Cookie Preferences © Research Square 2026 | ISSN 2693-5015 (online) Privacy Policy Terms of Service Do Not Sell My Personal Information {"props":{"pageProps":{"initialData":{"identity":"rs-7053462","acceptedTermsAndConditions":true,"allowDirectSubmit":false,"archivedVersions":[],"articleType":"Research Article","associatedPublications":[],"authors":[{"id":485096374,"identity":"045db888-802b-43a7-ba4c-b5a5bb6ff465","order_by":0,"name":"Behnaz Aghayani","email":"","orcid":"","institution":"Razi University","correspondingAuthor":false,"prefix":"","firstName":"Behnaz","middleName":"","lastName":"Aghayani","suffix":""},{"id":485096376,"identity":"0143a76f-c1de-4a81-b3f3-4b94f1cbe361","order_by":1,"name":"Leila Zarei","email":"data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZAAAAAyAQMAAABI0h/eAAAABlBMVEX///8AAABVwtN+AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAA3UlEQVRIiWNgGAWjYBACPjBpIGHHz8x8gIGxgQgtbBAtFsmS7W0JpGhhqGDc0HPGgEgt/IefffhQIMFsIJHzTeLnDhs5BvbDRzfgt+WY8cwZBhJ85hK52yR7z6QZM/Ckpd3Aq4WxwZiZx0CC2XJG7jYJ3rbDiQ0SPGb4tTCzf2b+YyDBuOFGzjPJv0RpYeMxZmYAaTlzhk2aOFt4eIoZewwkQIFsbC3blmbMRsgv/PzHNzP8+FMHisqHN9+22cjxsx8+hlcLMmCRANtLrHIQYP5AiupRMApGwSgYOQAAO6xCKxbtZFgAAAAASUVORK5CYII=","orcid":"","institution":"Razi University","correspondingAuthor":true,"prefix":"","firstName":"Leila","middleName":"","lastName":"Zarei","suffix":""},{"id":485096377,"identity":"d8a9b597-fa33-43ae-bc95-ea581d189198","order_by":2,"name":"Kianoosh Cheghamirza","email":"","orcid":"","institution":"Razi University","correspondingAuthor":false,"prefix":"","firstName":"Kianoosh","middleName":"","lastName":"Cheghamirza","suffix":""},{"id":485096378,"identity":"dc8f041e-7731-4934-b0e6-710afcaab8f3","order_by":3,"name":"Sohbat Bahraminejad","email":"","orcid":"","institution":"Razi University","correspondingAuthor":false,"prefix":"","firstName":"Sohbat","middleName":"","lastName":"Bahraminejad","suffix":""},{"id":485096379,"identity":"55fbcc51-bb5d-4e5c-9bb6-ede7c3217e90","order_by":4,"name":"Elisabetta Mazzucotelli","email":"","orcid":"","institution":"Council for Agricultural Research and Economics, Research Centre for Genomics and Bioinformatics","correspondingAuthor":false,"prefix":"","firstName":"Elisabetta","middleName":"","lastName":"Mazzucotelli","suffix":""},{"id":485096380,"identity":"45c6b8d5-95ec-44f3-8827-960d628905e3","order_by":5,"name":"Ahmad Arzani","email":"","orcid":"","institution":"Isfahan University of Technology","correspondingAuthor":false,"prefix":"","firstName":"Ahmad","middleName":"","lastName":"Arzani","suffix":""},{"id":485096381,"identity":"db23cc6e-407a-43af-8451-1b04f172307f","order_by":6,"name":"Hakan Ozkan","email":"","orcid":"","institution":"Cukurova University","correspondingAuthor":false,"prefix":"","firstName":"Hakan","middleName":"","lastName":"Ozkan","suffix":""}],"badges":[],"createdAt":"2025-07-05 13:53:04","currentVersionCode":1,"declarations":"","doi":"10.21203/rs.3.rs-7053462/v1","doiUrl":"https://doi.org/10.21203/rs.3.rs-7053462/v1","draftVersion":[],"editorialEvents":[{"content":"https://doi.org/10.1186/s12870-025-07465-y","type":"published","date":"2025-10-21T16:16:06+00:00"}],"editorialNote":"","failedWorkflow":false,"files":[{"id":86800257,"identity":"3e6bd918-ace2-401c-83b0-d1e1436aa4db","added_by":"auto","created_at":"2025-07-15 16:47:26","extension":"png","order_by":1,"title":"Figure 1","display":"","copyAsset":false,"role":"figure","size":58465,"visible":true,"origin":"","legend":"\u003cp\u003eTemperature and rainfall during two cropping years 2021-22 and 2022-23\u003c/p\u003e","description":"","filename":"1.png","url":"https://assets-eu.researchsquare.com/files/rs-7053462/v1/79816a9fa7949f9285f32679.png"},{"id":86800052,"identity":"59e846a4-fad4-4c3b-8a0a-99a4a333307c","added_by":"auto","created_at":"2025-07-15 16:39:26","extension":"png","order_by":2,"title":"Figure 2","display":"","copyAsset":false,"role":"figure","size":211011,"visible":true,"origin":"","legend":"\u003cp\u003ePhenotypic correlation analysis of the traits studied in the research in two cropping seasons. The abbreviations used represent: A) E1 (irrigated regime 2021-2022), B) E2 (rainfed in 2021-2022), C) E3 (irrigated regime 2022-2023), D) E4 (rainfed in 2022-2023), SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity, P%: Protein percentage, Fe: Iron content, Zn: Zinc content, TGW: thousand grain weight\u003c/p\u003e","description":"","filename":"2.png","url":"https://assets-eu.researchsquare.com/files/rs-7053462/v1/54fc8509554e452ace48e8c8.png"},{"id":86799241,"identity":"12546401-b285-462e-9bcd-45a2948e0af0","added_by":"auto","created_at":"2025-07-15 16:31:26","extension":"png","order_by":3,"title":"Figure 3","display":"","copyAsset":false,"role":"figure","size":70501,"visible":true,"origin":"","legend":"\u003cp\u003ePrincipal components analysis of agronomic traits in 105 accessions of wild emmer wheat. The abbreviations used represent: A) irrigated conditions of the first year (2021-2022) (E1), B) rainfed conditions of thefirst year (2021-2022) (E2), C) irrigated conditions second year (2022-2023) (E3) and D) rainfed conditions of the second year (2022-2023) (E4), SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity\u003c/p\u003e","description":"","filename":"3.png","url":"https://assets-eu.researchsquare.com/files/rs-7053462/v1/601a6ad0dd15fd527aa4a755.png"},{"id":86799245,"identity":"b071a736-b8d2-41ff-849e-b1b0325ed92d","added_by":"auto","created_at":"2025-07-15 16:31:27","extension":"png","order_by":4,"title":"Figure 4","display":"","copyAsset":false,"role":"figure","size":289583,"visible":true,"origin":"","legend":"\u003cp\u003eCluster analysis of 105 wild emmer wheat accessions using the complete method. Based on the phenotypic data of studied traits shows 3 main clusters (I-III)\u003c/p\u003e","description":"","filename":"4.png","url":"https://assets-eu.researchsquare.com/files/rs-7053462/v1/973abd83d29c43d84b32d216.png"},{"id":86799246,"identity":"b1fdd6fc-554b-4ac0-bbef-1079f8ae81d6","added_by":"auto","created_at":"2025-07-15 16:31:27","extension":"png","order_by":5,"title":"Figure 5","display":"","copyAsset":false,"role":"figure","size":159973,"visible":true,"origin":"","legend":"\u003cp\u003eBiplot of principal coordinates analysis (PCoA) for 105 wild emmer wheat accessions. The clustering pattern is shown with red for the first cluster, green for the second cluster, and blue for the third cluster\u003c/p\u003e","description":"","filename":"5.png","url":"https://assets-eu.researchsquare.com/files/rs-7053462/v1/16498ae0122e5cc3d7956e4a.png"},{"id":86800053,"identity":"1f8d3bf9-259f-4cf3-b191-ed106ba4bcf4","added_by":"auto","created_at":"2025-07-15 16:39:27","extension":"png","order_by":6,"title":"Figure 6","display":"","copyAsset":false,"role":"figure","size":176089,"visible":true,"origin":"","legend":"\u003cp\u003eThe heat map based on the phenotypic traits measured for 105 wild emmer wheat accessions. Hierarchical cluster analysis was developed using the complete method was prepared based on the phenotypic traits measured for 105 wild emmer wheat accessions. Cutoff line for cluster (3 groups) according to discriminant analysis. The abbreviations used represent: SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity\u003c/p\u003e","description":"","filename":"6.png","url":"https://assets-eu.researchsquare.com/files/rs-7053462/v1/64a3dfe0ed5ffc1fbfe21c8c.png"},{"id":94490666,"identity":"2d698f0d-fd3e-4421-818b-1dcb8de16e06","added_by":"auto","created_at":"2025-10-27 17:13:34","extension":"pdf","order_by":0,"title":"","display":"","copyAsset":false,"role":"manuscript-pdf","size":2560393,"visible":true,"origin":"","legend":"","description":"","filename":"manuscript.pdf","url":"https://assets-eu.researchsquare.com/files/rs-7053462/v1/6da9b6bb-cbe1-4919-90a9-945bb5b473da.pdf"}],"financialInterests":"No competing interests reported.","formattedTitle":"Agronomic performance of wild emmer wheat germplasm (Triticum turgidum ssp. dicoccoides) grown under irrigated and rainfed conditions","fulltext":[{"header":"Background","content":"\u003cp\u003eWild emmer wheat (\u003cem\u003eTriticum dicoccoides\u003c/em\u003e BBAA) grows naturally in the Fertile Crescent [1]. The B genome is thought to have originated from an unknown species, with \u003cem\u003eAegilops speltoides\u003c/em\u003e (SS) being the closest known relative, whereas its direct ancestor that contributed to the A genome is \u003cem\u003eTriticum urartu\u003c/em\u003e (AA) [2]. Wild emmer is recognized as the direct ancestor of domesticated emmer wheat (T\u003cem\u003e. dicoccoum\u003c/em\u003e), durum wheat (\u003cem\u003eT. durum\u003c/em\u003e), and bread wheat (\u003cem\u003eT. aestivum\u003c/em\u003e), significantly contributing to the wheat domestication process [3]. The considerable genetic variation present among emmer wheat genotypes in terms of quantitative traits can be leveraged for selection in breeding programs [4]. The high nutritional content and tolerance to various stresses of wild emmer wheat genotypes (\u003cem\u003eT.\u003c/em\u003e \u003cem\u003edicoccoides\u003c/em\u003e) have made them valuable candidates for use in breeding programs [5, 6].\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eWild emmer wheat represents a primary gene pool of cultivated wheat and serves as an invaluable genetic resource for developing new wheat cultivars with improved drought resilience and enhanced nutritional quality [7]. Drought stress triggers several major impairments in plant cells, including dehydration and osmotic stress, loss of cellular turgidity, energy depletion, dysfunction of the plasma and endosomal membranes, metabolic inhibition, chloroplast malfunction, nutritional imbalance, and oxidative stress [8]. Plants employ various strategies to cope with drought, including avoidance, recovery, escape, and tolerance. These mechanisms are more commonly utilized by wild species, making their introgression essential for enhancing crop stress resilience and adaptive plasticity. A shortened duration of phenological stages, such as fewer days to maturity and a shorter grain-filling period, contributes to increased drought tolerance [9]. Therefore, this trait is considered crucial in breeding programs targeting terminal drought stress tolerance. The dietary patterns of a significant portion of the global population are affected by micronutrient deficiencies, especially in essential elements such as iron and zinc. Wheat stands out as a crucial cereal crop, supplying calories to nearly one-third of the global population [5]. Nevertheless, the levels of zinc and iron in wheat are naturally low [10, 11]. Compared with their improved counterparts, wild and ancient wheat tends to contain greater amounts of these micronutrients [5]. The increase in iron and zinc contents in wheat has been achieved through the utilization of wild relatives [11]. Among these, wild emmer wheat (\u003cem\u003eT. dicoccoides\u003c/em\u003e) serves as a significant genetic resource for improving the quality and micronutrient profile of wheat [10, 12]. Wild emmer wheat is rich in starch, minerals, fiber, carotenoids, and antioxidant compounds, making it a recommended option by healthcare professionals for individuals suffering from allergies, diabetes, and elevated blood cholesterol levels [13, 14]. Furthermore, wild emmer wheat possesses considerable genetic potential to increase the concentrations of zinc, iron, and seed protein, and to improve tolerance to zinc deficiency and drought in cultivated wheat [15]. The protein content of emmer wheat is greater than that of modern wheat, so it has great potential for improving the nutritional value of cultivated wheat [13, 16-18]. This study aimed to assess the genetic diversity of wild emmer wheat in terms of agronomic performance and grain quality traits under both irrigated and rainfed conditions across two growing seasons.\u003c/p\u003e"},{"header":"Materials and methods","content":"\u003cp\u003e\u003cstrong\u003ePlant materials and field trials\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eIn this research, a two-replication alpha lattice design was employed to evaluate 105 wild emmer wheat accessions received from the CREA-GB Genomic and Postgenomic Research Center in Italy (as detailed in Table 1, which is placed at the end of the manuscript) under both irrigated and rainfed conditions during two cropping years. Four distinct environments were designated: E1 for irrigated conditions of the first year (2021-2022), E2 for rainfed conditions of the first year (2021-2022), E3 for irrigated conditions of the second year (2022-2023), and E4 for rainfed conditions of the second year (2022-2023). In both years, each plot contained two rows of 1.5 m in length, with a row spacing of 25 cm and a plant spacing of 6 cm. To ensure appropriate water availability in the irrigated experiments, irrigation was applied at the jointing, booting, heading, and grain filling stages, whereas the rainfed experiments received no supplemental irrigation. To determine the physicochemical characteristics of the soil, composite samples from different parts of the research field were used. The soil characteristics\u0026nbsp;of the experimental site are given in Table 2. The experimental farm is situated at a geographic coordinate of 47 degrees 10 minutes east longitude and 34 degrees 32 minutes north latitude, with an elevation of 1350 meters above sea level. During the cropping years of 2021-2022, the total rainfall recorded was 285.7 mm, whereas during the cropping years 2022-2023, it was 342.8 mm (Fig. 1).\u003c/p\u003e\n\u003ctable dir=\"rtl\" border=\"0\" cellspacing=\"0\" cellpadding=\"0\" width=\"564\"\u003e\n \u003ctbody\u003e\n \u003ctr\u003e\n \u003ctd colspan=\"6\" valign=\"top\" style=\"width: 564px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cstrong\u003eTable 1\u003c/strong\u003e Characteristics of the wild emmer wheat accessions in the research\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCountry Origin\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eAlternative (donor) code\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eGenBank\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" 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style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC011\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e5\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2059\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428028\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC014\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e6\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2060\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428029\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC015\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e7\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2090\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428046\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC023\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e8\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2103\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428051\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC026\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e9\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2108\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428054\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC027\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e10\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2116\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428058\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC030\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e11\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2125\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428063\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC033\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e12\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2146\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428075\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC038\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e13\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2166\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428083\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC041\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e14\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2186\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428089\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC044\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e15\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2186\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428089\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC044_CA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e16\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2188\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428091\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC045\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e17\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2844\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428092\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC046\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e18\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2995\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428094\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC048\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e19\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3028\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428105\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC058\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e20\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3036\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428112\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC061\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e21\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eLebanon\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3096\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428129\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC068\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e22\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eLebanon\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3100\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428133\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC071\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e23\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eLebanon\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3105\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428137\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC072\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e24\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eLebanon\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3112\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428141\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC075\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e25\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eLebanon\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3132\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 428143\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC076\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e26\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eA+6\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 466928\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC077\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e27\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eA+22\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 466931\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC078\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e28\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eA+42\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 466939\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC082\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e29\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eA+79\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 466946\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC088\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e30\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eI+7\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 466958\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC098\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e31\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eI-9\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 466960\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC100\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e32\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eJ-38\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 467000\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC130\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e33\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eJ-47\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 467003\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC133\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e34\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eH+23\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 467015\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC144\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e35\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e79TK020-099\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 470736\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC155\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e36\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e96\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 470956\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC166\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e37\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eLebanon\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e51\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 470982\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC172\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e38\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e1\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 471035\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC179\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e39\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e14\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 471044\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC182\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e40\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eI-2\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 479779\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC188\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e41\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eM-13\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 479782\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC191\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e42\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSY 20085\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 487254\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC193\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e43\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSY 20101\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 487258\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC195\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e44\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSY 20110\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 487259\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC196\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e45\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSY 20184\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 487263\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC198\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e46\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSY 20198\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 487264\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC199\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e47\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2040\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 503310\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC200\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e48\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2095\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538646\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC225\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e49\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2097\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538648\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC227\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e50\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2112\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538652\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC229\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e51\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG2114\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538653\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC230\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e52\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3003\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538676\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC248\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e53\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3004\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538677\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC249\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e54\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3007\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538679\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC250\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e55\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3027\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538685\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC256\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e56\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3037\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538687\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC258\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e57\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3038\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538688\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC259\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e58\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3050\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538690\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC261\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e59\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3052\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538692\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC263\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e60\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3053\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538693\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC264\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e61\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3064\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538696\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC267\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e62\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eG3065\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538697\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC268\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e63\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e84TK089-017\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 554580\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC283\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e64\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e84TK109-079\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 554581\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC284\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e65\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e84TK110-087\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 554582\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC285\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e66\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e84TK132-001\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 554583\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC286\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e67\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTUR-05-BJS-HB-090\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUSDA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 654317\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC291\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e68\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 16631\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC311\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e69\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eLebanon\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 427998\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 18478\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC316\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e70\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 466926\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 18492\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC326\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e71\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eLebanon\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 470979\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 18499\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC333\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e72\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 470988\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 18500\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC334\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e73\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 470993\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 18501\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC335\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e74\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 487253\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 18505\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC339\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e75\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI487255\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 18506\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC340\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e76\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eSyria\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 487262\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 18508\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC342\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e77\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538669\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 18523\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC346\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e78\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eLebanon\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538700\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 18528\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC348\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e79\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eLebanon\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538706\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 18530\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC350\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e80\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eLebanon\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538714\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 18532\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC351\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e81\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eLebanon\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePI 538706\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIPK\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTRI 29352\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC359\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e82\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUnknown\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC375\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e83\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUnknown\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC376\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e84\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUnknown\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC380\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e85\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUnknown\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC386\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e86\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"bottom\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003e-\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eUnknown\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC391\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e87\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD022\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD022\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e88\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD076\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD076\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e89\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD077\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD077\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e90\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD078\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD078\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e91\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD080\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD080\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e92\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD087\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD087\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e93\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD088\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD088\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e94\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD089\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD089\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e95\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD140\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD140\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e96\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD134\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD134\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e97\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD135\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD135\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e98\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD136\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD136\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e99\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD137\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD137\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e100\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD216\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD216\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e101\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD222\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD222\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e102\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTurkey\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD225\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eTD225\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e103\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003eIran\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003cp dir=\"LTR\"\u003eCREA\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003e8942\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eDIC400\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e104\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 63px;\"\u003e\n \u003cp dir=\"LTR\"\u003ePalestine\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 133px;\"\u003e\n \u003cp dir=\"LTR\"\u003e\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 116px;\"\u003e\n \u003col\u003e\n \u003cli\u003eDistelfeld\u0026nbsp;\u003c/li\u003e\n \u003c/ol\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp dir=\"LTR\"\u003eZavitan\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 86px;\"\u003e\n \u003cp dir=\"LTR\"\u003eZavitan\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 58px;\"\u003e\n \u003cp dir=\"LTR\"\u003e105\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003c/tbody\u003e\n\u003c/table\u003e\n\u003cp\u003e\u003cstrong\u003eTable 2\u003c/strong\u003e Physic-chemical characteristics of the field soil\u003c/p\u003e\n\u003ctable border=\"0\" cellspacing=\"0\" cellpadding=\"0\" width=\"600\" class=\"fr-table-selection-hover\"\u003e\n \u003ctbody\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp\u003eSample\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px;\"\u003e\n \u003cp\u003eSoil texture\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 42px;\"\u003e\n \u003cp\u003e\u0026nbsp;pH\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px;\"\u003e\n \u003cp\u003ePhosphorus (mg/kg)\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 72px;\"\u003e\n \u003cp\u003ePotassium (mg/kg)\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 90px;\"\u003e\n \u003cp\u003eNitrogen (%)\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px;\"\u003e\n \u003cp\u003eFe (ppm)\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px;\"\u003e\n \u003cp\u003eZn (ppm)\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 108px;\"\u003e\n \u003cp\u003eSoils of the experimental site\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px;\"\u003e\n \u003cp\u003eclay loam\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 42px;\"\u003e\n \u003cp\u003e7.65\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px;\"\u003e\n \u003cp\u003e24.38\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 72px;\"\u003e\n \u003cp\u003e514.57\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 90px;\"\u003e\n \u003cp\u003e0.11\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px;\"\u003e\n \u003cp\u003e9.06\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px;\"\u003e\n \u003cp\u003e0.35\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003c/tbody\u003e\n\u003c/table\u003e\n\u003cp\u003eThe following traits were measured: phenological traits, i.e., days to heading, days to anthesis, and days to physiological maturity; and morphological traits, i.e., plant height (cm), awn length (cm), peduncle length (cm), spike length (cm), number of grains per spike and thousand grain weight (g). Ten spikes were randomly selected from each plant for measuring morphological traits. The thousand grain weight was calculated by sampling 250 grains. In addition, soil plant analysis development (SPAD) as a physiological trait measurement was conducted at the anthesis stage to assess plant senescence in each plot. The chemical composition traits of the grains included soluble grain protein content, which was determined via Bradford\u0026rsquo;s method [19], whereas the concentrations of iron and zinc in the grains were quantified via an atomic absorption spectrometer (Varian 220). The thousand grain weight, grain protein content, and levels of iron and zinc in the grains were measured in one replicate across each environment over a span of two years.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eStatistical analyses\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eThe data were subjected to combined analysis of variance (ANOVA) via the GLM procedure of the SAS statistical package, considering the environment as random and the accession number as fixed effects. Pearson phenotypic correlation coefficients were calculated via SPSS IBM 23 software, genetic correlation analysis and principal component analysis were performed via META-R software [20], and cluster analysis via the complete linkage (CLINK) method, principal coordinate analysis (PCoA) and heatmap were carried out via R software [21]. Cluster analysis was performed via BLUPs (best linear unbiased predictors) for the measured traits across the four environments. BLUPs were calculated across experiments via the META-R software via the alpha lattice model [20]:\u003c/p\u003e\n\u003cp\u003e𝑌𝑖𝑗𝑘𝑙 = 𝜇 + Loc 𝑖 + Rep 𝑗 (Loc) + Block 𝑘 (Loc 𝑖Rep ) + Gen 𝑙 + Loc 𝑖 \u0026times; Gen 𝑙 + 𝜀𝑖𝑗𝑘\u003c/p\u003e\n\u003cp\u003ewhere\u003c/p\u003e\n\u003cp\u003e\u0026mu; = Mean effect of the total trait\u003c/p\u003e\n\u003cp\u003eLoc 𝑖 = Effect of the i\u003csup\u003eth\u003c/sup\u003e environment\u003c/p\u003e\n\u003cp\u003eRep 𝑗 (Loc)= Effect of j\u003csup\u003eth\u003c/sup\u003e replication in the i\u003csup\u003eth\u003c/sup\u003e environment\u003c/p\u003e\n\u003cp\u003eBlock 𝑘 (Loc 𝑖Rep) = Effect of incomplete block 𝑘 in the i\u003csup\u003eth\u003c/sup\u003e environment in the j\u003csup\u003eth\u003c/sup\u003e replication\u003c/p\u003e\n\u003cp\u003eGen 𝑙= Accession l\u003csup\u003eth\u003c/sup\u003e\u003c/p\u003e\n\u003cp\u003e𝜀𝑖𝑗𝑘= Residual random effect related to replication, incomplete block, accession and environment\u003c/p\u003e\n\u003cp\u003eA multiple scoring index (MSI) based on the measured traits was used to examine the accessions [22]. MSI was calculated via the following equation:\u003c/p\u003e\n\u003cp\u003eMSI =\u0026nbsp;\u003cimg width=\"119\" height=\"31\" src=\"data:image/png;base64,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\" alt=\"image\"\u003e\u003c/p\u003e\n\u003cp\u003ewhere X1s, X2s, and Xns are the scoring scales of each trait when n traits are measured.\u003c/p\u003e"},{"header":"Results","content":"\u003cp\u003e\u003cstrong\u003eCombined analysis of variance\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003eand mean comparisons\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eThe results of the combined analysis of variance conducted for the examined traits indicated that both the accessions and the environmental factors had a significant effect on all the measured traits (P \u0026lt; 0.01). Additionally, the interaction effect between environment and accession was found to be significant, except for SPAD, spike length, and days to anthesis. The coefficient of variation ranged from 1.97 to 28.84, with the highest values associated with spike length (28.84%), peduncle length (22.95%), and awn length (12.50%) (Table 3).\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eTable 3\u003c/strong\u003e Combined analysis of variance for the traits studied in 105 wild emmer wheat accessions\u003c/p\u003e\n\u003ctable dir=\"rtl\" border=\"0\" cellspacing=\"0\" cellpadding=\"0\" width=\"738\"\u003e\n \u003ctbody\u003e\n \u003ctr\u003e\n \u003ctd colspan=\"9\" valign=\"top\" style=\"width: 546px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eMean squares\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 36px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003edf\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 156px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSources\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTPM\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 67px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eAL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eNGPS\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 68px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 63px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSPAD\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 36px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 156px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e508.83\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 67px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1152.96\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e5574.34\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e44.72\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e91.40\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e200.10\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e46.49\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 68px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e8260.37\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 63px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e148.69\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 36px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e3\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 156px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eEnvironment (Env)\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e100.90\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 67px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e294.65\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e336.53\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e40.65\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e32.81\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e110.53\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e30.06\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 68px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e2523.92\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 63px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e221.01\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 36px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e4\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 156px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eReplication \u0026times; Env\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e59.23\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 67px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e47.76\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e66.78\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1.98\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e20.75\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e8.96\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e9.59\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 68px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e165.51\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 63px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e14.63\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 36px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e40\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 156px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eBlock (Env \u0026times; Replication)\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e84.97\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 67px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e51.04\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e96.92\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e12.64\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e43.71\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e74.62\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e17.47\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 68px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1044.45\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 63px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e25.05\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 36px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e104\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 156px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eAccession (A)\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e27.70\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 67px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e17.20\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e28.65\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e3.31\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e12.28\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e8.37\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e8.56\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 68px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e157.39\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 63px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e9.55\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 36px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e312\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 156px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eEnv \u0026times; A\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e18.24\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 67px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e14.83\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e19.18\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1.56\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e7.74\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e3.26\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e7.48\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 68px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e72.74\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 63px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e12.87\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 36px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e376\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 156px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eResidual\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1.97\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 67px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e2.12\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e2.52\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e12.50\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e22.95\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e10.95\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e28.84\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 68px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e10.40\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 63px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e6.51\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 36px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 156px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eCV %\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e2.72\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 67px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e4.65\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e4.97\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1.72\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1.55\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e2.84\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1.48\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 68px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e13.61\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 63px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e4.02\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 36px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 156px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eLSD 5%\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e216.36\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 67px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e181.41\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e172.98\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e10.01\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e12.32\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e16.51\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e9.48\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 68px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e82.23\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 63px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e54.78\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 36px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 156px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eGrand mean\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.68\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 67px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.62\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.73\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.75\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.74\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.89\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.50\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 68px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.86\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 63px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.55\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 36px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 156px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eH\u003csup\u003e2\u003c/sup\u003eb\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003c/tbody\u003e\n\u003c/table\u003e\n\u003cp\u003eThe abbreviations used represent:\u0026nbsp;SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity, CV: coefficient of variation, LSD: least significant difference, H\u003csup\u003e2\u003c/sup\u003eb: broad-sense heritability over four environments.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eDescriptive statistics\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eThe interaction effect between environment and accession type was not significant for SPAD, SL, and DTA, allowing for comparisons of these traits across different environments. As shown in Table 4, the greatest means for SPAD were found under irrigation conditions (E3 followed by E1), whereas it decreased under drought stress conditions (E2 and E4). Spike length was greatest in the E1 and E3 environments, whereas it decreased under drought stress in the E2 and E4 environments. The average days to anthesis were greatest under rainfed conditions (E4), followed by those under irrigation conditions (E3 environment), both in the second year of the experiment. According to Table 4, the heritabilities of the SPAD, PH, NGPS, PL and AL traits were greater in the E1 environment than in the other environments. The highest heritabilities of the SL, DTA and DTPM traits were related to the E2, E3 and E4 environments, respectively. In the case of the DTH trait, the highest heritability was related to the E1 and E3 environments. The findings indicated that SPAD, plant height, spike length, number of grains per spike, and days to physiological maturity were more pronounced under irrigated conditions than under drought conditions\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003e(Table 4).\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eTable 4\u003c/strong\u003e Descriptive statistics for investigated traits under rainfed and irrigated environments in two cropping seasons\u003c/p\u003e\n\u003ctable dir=\"rtl\" border=\"0\" cellspacing=\"0\" cellpadding=\"0\" align=\"right\" width=\"100%\"\u003e\n \u003ctbody\u003e\n \u003ctr\u003e\n \u003ctd colspan=\"3\" valign=\"top\" style=\"width: 22px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eRainfed\u003c/span\u003e\u003cspan dir=\"LTR\"\u003e\u0026nbsp;environment 2022-23 (E4)\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd colspan=\"3\" valign=\"top\" style=\"width: 21px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eIrrigated environment 2022-23 (E3)\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd colspan=\"3\" valign=\"top\" style=\"width: 24px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eRainfed\u003c/span\u003e\u003cspan dir=\"LTR\"\u003e\u0026nbsp;environment 2021-22 (E2)\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd colspan=\"3\" valign=\"top\" style=\"width: 21px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eIrrigated environment 2021-22 (E1)\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eTrait\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eH\u003csup\u003e2\u003c/sup\u003eb\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eRange\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eMean \u0026plusmn; S.D.\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eH\u003csup\u003e2\u003c/sup\u003eb\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eRange\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eMean \u0026plusmn; S.D.\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eH\u003csup\u003e2\u003c/sup\u003eb\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 11px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eRange\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eMean \u0026plusmn; S.D.\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eH\u003csup\u003e2\u003c/sup\u003eb\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 8px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eRange\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eMean \u0026plusmn; S.D.\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e\u0026nbsp;\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.07\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e37.47-67.83\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e54.37 \u0026plusmn; 4.48\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.04\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e45.93-65.41\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e56.17 \u0026plusmn; 3.33\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.10\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 11px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e37.19-62.86\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e54.04 \u0026plusmn; 4.35\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.12\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 8px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e45.42-64.94\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e55.77 \u0026plusmn; 3.29\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSPAD\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.80\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e7.5-122.6\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e77.40 \u0026plusmn; 16.97\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.73\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e11.5-123.1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e89.10 \u0026plusmn; 16.88\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.78\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 11px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e18.5-121.4\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e74.95 \u0026plusmn; 17.49\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.97\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 8px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e46.6-121.9\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e86.44 \u0026plusmn; 15.74\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePH (cm)\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.56\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e5-16\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e9.10 \u0026plusmn; 1.67\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.50\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e5.2-20.8\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e9.43 \u0026plusmn; 2.33\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.77\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 11px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e4.1-16.6\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e9.07 \u0026plusmn; 1.70\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.09\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 8px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e6-14.7\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e10.31 \u0026plusmn; 1.72\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSL (cm)\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.82\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e6.8-31.4\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e15.62 \u0026plusmn; 3.97\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.79\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e8.1-34.7\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e16.67 \u0026plusmn; 4.40\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.88\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 11px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e6.4-32.4\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e15.74 \u0026plusmn; 3.79\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.99\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 8px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e11-34.4\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e17.94 \u0026plusmn; 3.74\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eNGPS\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.21\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e5.1-23.8\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e12.58 \u0026plusmn; 3.52\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.72\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e5.7-23.2\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e12.88 \u0026plusmn; 4.31\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e\u0026nbsp;NA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 11px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e3.4-22.4\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e11.78 \u0026plusmn; 3.52\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.88\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 8px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e4.5-21.8\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e11.25 \u0026plusmn; 4.25\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePL (cm)\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.66\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e4-18\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e9.91 \u0026plusmn; 1.79\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.60\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e4-18.6\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e10.72 \u0026plusmn; 2.50\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.70\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 11px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e3.4-16.1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e9.72 \u0026plusmn; 1.58\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.99\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 8px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e3.2-15.7\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e9.67 \u0026plusmn; 1.92\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eAL (cm)\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.46\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e173-189\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e178.58 \u0026plusmn; 5.06\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.60\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e168-187\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e176.67 \u0026plusmn; 3.85\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.35\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 11px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e164-181\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e166.88 \u0026plusmn; 6.03\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.60\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 8px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e164-187\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e170.45 \u0026plusmn; 8.34\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.62\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e173-189\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e184.12 \u0026plusmn; 2.92\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.47\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e175-195\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e182.60 \u0026plusmn; 4.35\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eNA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 11px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e170-187\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e178.53 \u0026plusmn; 4.84\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.43\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 8px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e170-196\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e180.47 \u0026plusmn; 6.49\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.64\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e207-222\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e215.54 \u0026plusmn; 6.99\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.40\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e204-229\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e217.86 \u0026plusmn; 6.47\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 6px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.59\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 11px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e209-218\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e213.94 \u0026plusmn; 3.90\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 5px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.35\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 8px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e206-224\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 7px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e217.52 \u0026plusmn; 4.65\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 9px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTPM\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003c/tbody\u003e\n\u003c/table\u003e\n\u003cp\u003eThe abbreviations used represent: SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity,\u0026nbsp;S.D.: standard deviation, H\u003csup\u003e2\u003c/sup\u003eb: broad-sense heritability.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003ePhenotypic correlation\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eThe Pearson correlation coefficients for the evaluated traits in each environment were calculated (Fig. 2). In the E1 environment, peduncle length was negatively and significantly correlated with days to heading and days to anthesis. Days to heading had a positive and significant correlation with days to anthesis and a negative and significant correlation with thousand grain weight. Days to anthesis was negatively and significantly correlated with the thousand grain weight (Fig. 2A). In E2, the number of grains per spike was positively correlated with peduncle length, days to heading and protein percentage and significantly negatively correlated with awn length and iron content. There was a negative and significant correlation between days to physiological maturity and the thousand grain weight (Fig. 2B). In the E3 environment, there was a negative and significant correlation between the iron and zinc contents and the thousand grain weight. Days to anthesis had a positive and significant correlation with days to physiological maturity, and there was a significant negative correlation with zinc content and thousand grain weight (Fig. 2C). In E4, there was a negative and significant correlation between SPAD values and days to physiological maturity and protein percentage. There was a positive correlation between spike length and the number of grains per spike, peduncle length, days to heading and days to physiological maturity (Fig. 2D).\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eThe findings across all four years indicated that SPAD was positively and significantly correlated with plant height, spike length, and peduncle length under rainfed conditions. Additionally, the results revealed a consistent positive relationship between plant height and spike length, number of grains per spike, and peduncle length across all four conditions. Spike length was positively correlated with the number of grains per spike in all four conditions. There was a positive correlation between the number of grains per spike and peduncle length in all four conditions and a negative correlation with awn length. In all four conditions, there was a positive correlation between days to heading and days to anthesis. A positive relationship was observed between the grain iron and zinc contents under all four conditions.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eGenetic correlation\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eThe genetic correlation coefficients for the evaluated traits in each environment were calculated (Tables 5, 6, 7, and 8). The results showed that under all four conditions, there was a positive and significant genetic correlation between plant height, spike length and the number of grains per spike. The results also revealed a positive and significant genetic correlation between spike length and days to physiological maturity under irrigated conditions. The number of grains per spike under all four conditions had a positive and significant genetic correlation with days to heading. The number of grains per spike under irrigated conditions had a positive and significant genetic correlation with days to anthesis. Under all four conditions, there was a negative and significant genetic correlation between awn length and days to physiological maturity. Under irrigated conditions, a positive and significant genetic correlation was observed between days to heading and days to anthesis every two years. The highest amount of positive and significant genetic correlation under irrigated conditions in both years was between days to heading and days to anthesis (0.999\u003csup\u003e**\u003c/sup\u003e). Under rainfed conditions of the first year (2021-2022), the highest positive and significant genetic correlation was detected between plant height and days to heading (0.708\u003csup\u003e**\u003c/sup\u003e). Under these conditions, the most negative and significant genetic correlation was observed between the SPAD value and days to physiological maturity (-0.999\u003csup\u003e**\u003c/sup\u003e). Under rainfed conditions of the second year (2022-2023), the highest positive and significant genetic correlation between plant height and peduncle length (0.935\u003csup\u003e**\u003c/sup\u003e) was observed. Under these conditions, the greatest negative and significant genetic correlation was observed between SPAD and peduncle length (-0.978\u003csup\u003e**\u003c/sup\u003e).\u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eTable 5\u003c/strong\u003e Genetic correlation coefficients of agronomic traits under irrigated conditions in the crop year (2021-2022) (E1)\u003c/p\u003e\n\u003ctable dir=\"rtl\" border=\"0\" cellspacing=\"0\" cellpadding=\"0\" width=\"588\"\u003e\n \u003ctbody\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTPM\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eAL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eNGPS\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSPAD\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.204\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.131\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.611\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.160\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.086\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.143\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.714\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.057\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSPAD\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.054\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.212\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.256\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.019\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.587\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.501\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.639\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.313\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.231\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.512\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.543\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.282\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.391\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.151\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.300\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.212\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.282\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.181\u003csup\u003e*\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eNGPS\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.144\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.360\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.361\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.056\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.321\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.163\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.179\u003csup\u003e*\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eAL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.010\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.999\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.008\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTPM\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003c/tbody\u003e\n\u003c/table\u003e\n\u003cp\u003e\u003csup\u003ens\u003c/sup\u003e, *, ** non-significant, significant at 5% and 1% level of probability, respectively. The abbreviations used represent: SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eTable 6\u003c/strong\u003e Genetic correlation coefficients of agronomic traits under rainfed conditions in the crop year (2021-2022) (E2)\u003c/p\u003e\n\u003ctable dir=\"rtl\" border=\"0\" cellspacing=\"0\" cellpadding=\"0\" width=\"582\"\u003e\n \u003ctbody\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTPM\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eAL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eNGPS\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSPAD\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.999\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.080\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.042\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.038\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.068\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.132\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSPAD\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.086\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.708\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.043\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.631\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.475\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.091\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.343\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.043\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.317\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.006\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.431\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.331\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eNGPS\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.202\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.061\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eAL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.223\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTPM\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003c/tbody\u003e\n\u003c/table\u003e\n\u003cp\u003e\u003csup\u003ens\u003c/sup\u003e, *, ** non-significant, significant at 5% and 1% level of probability, respectively. The abbreviations used represent: na: non-applicable, SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eTable 7\u003c/strong\u003e Genetic correlation coefficients of agronomic traits under irrigated conditions in the crop year (2022-2023) (E3)\u003c/p\u003e\n\u003ctable dir=\"rtl\" border=\"0\" cellspacing=\"0\" cellpadding=\"0\" width=\"576\"\u003e\n \u003ctbody\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTPM\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eAL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eNGPS\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSPAD\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSPAD\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.006\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.135\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.156\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.073\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.590\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.577\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.608\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.265\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.105\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.235\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.380\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.575\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.629\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.456\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.338\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.502\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.435\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.493\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eNGPS\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.293\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.145\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.093\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.007\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.539\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.097\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.194\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eAL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.314\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.999\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.139\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTPM\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003c/tbody\u003e\n\u003c/table\u003e\n\u003cp\u003e\u003csup\u003ens\u003c/sup\u003e, *, ** non-significant, significant at 5% and 1% level of probability, respectively. The abbreviations used represent: na: non-applicable, SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eTable 8\u003c/strong\u003e Genetic correlation coefficients of agronomic traits under rainfed conditions in the crop year (2022-2023) (E4)\u003c/p\u003e\n\u003ctable dir=\"rtl\" border=\"0\" cellspacing=\"0\" cellpadding=\"0\" width=\"600\"\u003e\n \u003ctbody\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 72px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTPM\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eAL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eNGPS\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSPAD\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 72px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.894\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.295\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.018\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.978\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.214\u003csup\u003e*\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.175\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.503\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSPAD\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 72px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.080\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.411\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.150\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.935\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.678\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.732\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 72px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.014\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.488\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.166\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.456\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.523\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 72px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.045\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.603\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.396\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.787\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eNGPS\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 72px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.117\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.228\u003csup\u003e*\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.591\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 72px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.267\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.423\u003csup\u003e**\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eAL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 72px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.001\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 72px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ena\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 72px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 60px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 54px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 66px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 48px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u0026nbsp;\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 78px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTPM\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003c/tbody\u003e\n\u003c/table\u003e\n\u003cp\u003e\u003csup\u003ens\u003c/sup\u003e, *, ** non-significant, significant at 5% and 1% level of probability, respectively. The abbreviations used represent: na: non-applicable, SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003ePrincipal component analysis\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eTo better understand the relationships between the traits studied in this research, principal component analysis (PCA) was used. Through the PCA method, many variables can be condensed into a few key factors, which effectively summarize the original dataset. According to Fig. 3, the first two components accounted for 69.39% of the variance in E1, 74.39% in E2, 88.54% in E3, and 83.78% in E4. In E1, the first principal component explained 38.61% of the dataset\u0026apos;s variability, demonstrating positive correlations with days to heading, days to anthesis, and awn length but negative correlations with days to physiological maturity, plant height, spike length, number of grains per spike, peduncle length, and SPAD. The second principal component in E1 accounted for 30.78% of the variability and was positively associated with peduncle length, awn length, and SPAD but negatively correlated with plant height, spike length, number of grains per spike, days to heading, days to anthesis, and days to physiological maturity (Fig. 3A). In E2, the first principal component explained 45.45% of the dataset\u0026apos;s variability and was positively correlated with awn length and SPAD but negatively correlated with plant height, spike length, number of grains per spike, days to heading, and days to physiological maturity. The second principal component in this environment accounted for 28.94% of the variability, showing positive relationships with days to heading and days to physiological maturity but negative correlations with plant height, spike length, number of grains per spike, SPAD, and awn length (Fig. 3B). In E3, the first principal component accounted for 49.68% of the dataset\u0026apos;s variability, demonstrating positive correlations with plant height, peduncle length, spike length, the number of grains per spike, and days to physiological maturity but negative correlations with awn length, days to heading, and days to anthesis. The second principal component in this environment explained 38.96% of the dataset\u0026apos;s variability, showing positive relationships with spike length, the number of grains per spike, days to heading, days to anthesis, and days to physiological maturity but negative correlations with plant height, peduncle length, and awn length (Fig. 3C). In the fourth environment, the first principal component accounted for 59.73% of the variation in the dataset, was positively influenced by awn length and SPAD, and was negatively influenced by plant height, spike length, the number of grains per spike, days to heading, peduncle length, and days to physiological maturity. The second principal component in this environment explained 24.05% of the variation in the dataset; it was positively associated with peduncle length and days to physiological maturity but negatively associated with plant height, spike length, the number of grains per spike, awn length, SPAD, and days to heading (Fig. 3D).\u003c/p\u003e\n\u003cp\u003eUnder rainfed conditions in both years, the first principal component was loaded positively by awn length and SPAD and negatively by plant height, spike length, number of grains per spike, days to heading and days to physiological maturity, whereas the second principal component was loaded positively by the days to physiological maturity and negatively by plant height, spike length, number of grains per spike and SPAD.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eCluster analysis\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eThe results of the cluster analysis categorized the examined accessions in the four environments into three distinct groups. The first group (G-I) comprised 72 accessions, the second group (G-II) included 26 accessions, and the third group (G-III) contained 7 accessions (Fig. 4). To enhance the understanding of the accession clustering, a biplot derived from principal coordinate analysis (PCoA) (Fig. 5) and a heatmap (Fig. 6) were generated for the 105 emmer wheat accessions. The results of the grouping were in alignment with the findings of the cluster analysis. Each group contained accessions originating from various geographical locations. As shown in Fig. 6, in the third group (G-III) there were accessions with greater plant heights than those in the other groups. For the other traits, no difference in geographical origin was observed between the groups.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eMultiple scoring index\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eMultiple scoring index was used to identify accessions with the best combination of studied traits. Table 9 presents the best accessions exhibiting the optimal combination of traits under the investigated environments. In the irrigated conditions of the first year (E1), the accessions that demonstrated the most advantageous trait combinations were 28, 68, 70, 78, 100, 93, 13, 64, 3, and 82. Conversely, under rainfed conditions in the first year (E2), the accessions that presented the best trait combinations included 105, 20, 69, 57, 103, 8, 89, 45, 96, and 56. In the second year under irrigated conditions (E3), 55, 73, 32, 29, 68, 53, 94, 70, 92, and 89 accessions presented the most favorable combinations of traits. Under the drought conditions of the second year (E4), accessions 71, 47, 56, 50, 18, 79, 94, 88, 97, and 10 presented the best trait combinations. Thus, under irrigated conditions in both years, accessions 68 (DIC291) and 70 (DIC316), and under rainfed conditions in both years, accession number 56 (DIC256) was the best accession studied in terms of the multiple scoring index.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003e\u003cimg 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\" width=\"463\" height=\"576\"\u003e\u003c/p\u003e\n\u003cp\u003eThe abbreviations used represent: SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity, MSI: Multiple scoring index\u003c/p\u003e\n\u003cp\u003eAs presented in Table 10, for MSI in the E2 environment, a significant negative correlation was observed exclusively with peduncle length (-0.198*). Additionally, a noteworthy negative correlation was established between plant height and MSI in the E4 environment (-0.210*). No correlations were found between the other environments and the remaining traits.\u003c/p\u003e\n\u003cp\u003e\u0026nbsp;\u003cstrong\u003eTable 10\u003c/strong\u003e Correlation coefficients between studied traits and multiple scoring index (MSI)\u0026nbsp;\u003c/p\u003e\n\u003ctable dir=\"rtl\" border=\"0\" cellspacing=\"0\" cellpadding=\"0\"\u003e\n \u003ctbody\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eMSI-E4\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eMSI-E3\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eMSI-E2\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eMSI-E1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\" class=\"fr-cell-fixed \"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eTraits\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.030\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.071\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.009\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.169\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSPAD\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.210\u003csup\u003e*\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.046\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.129\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.078\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.063\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.042\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.072\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.076\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eSL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.044\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.034\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.043\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.005\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eNGPS\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.183\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.042\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.198\u003csup\u003e*\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.076\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003ePL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.032\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.090\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.135\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.104\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eAL\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.077\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.048\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.019\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.093\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTH\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.134\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.098\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.045\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.067\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTA\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.072\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.100\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.111\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.089\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eDTPM\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.184\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.051\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.208\u003csup\u003e*\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eMSI-E2\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.073\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.051\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.104\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eMSI-E3\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003ctr\u003e\n \u003ctd valign=\"top\" style=\"width: 95px; text-align: left;\" class=\"fr-cell-handler \"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e1\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.073\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e0.184\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 120px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003e-0.023\u003csup\u003ens\u003c/sup\u003e\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003ctd valign=\"top\" style=\"width: 138px; text-align: left;\"\u003e\n \u003cp dir=\"RTL\"\u003e\u003cspan dir=\"LTR\"\u003eMSI-E4\u003c/span\u003e\u003c/p\u003e\n \u003c/td\u003e\n \u003c/tr\u003e\n \u003c/tbody\u003e\n\u003c/table\u003e\n\u003cp\u003e\u003csup\u003ens\u003c/sup\u003e, * non-significant, significant at 5% level of probability, respectively. The abbreviations used represent: SPAD: soil plant analysis development, PH: plant height, SL: spike length, NGPS: number of grains per spike, PL: peduncle length, AL: awn length, DTH: days to heading, DTA: days to anthesis, DTPM: days to physiological maturity\u003c/p\u003e"},{"header":"Discussion","content":"\u003cp\u003ePlant breeding has resulted in genetic erosion as a consequence of the demand for uniformity and the need to increase productivity. To maintain the process of crop improvement and achieve further advancements in resilience to environmental stresses, gradually introducing new genetic variation is essential [23]. Research has been carried out to assess the genetic diversity of wild emmer wheat germplasms originating from various geographical locations, with a focus on agronomic characteristics and certain qualitative traits of the grain. The results of analysis of variance showed significant differences between the accessions studied in the research for all investigated traits. These results are consistent with the research of [24] (wheat), [4] (emmer wheat), [25] (durum wheat) and [14] (emmer wheat). Significant diversity was observed among the wild emmer wheat accessions concerning the traits examined. The high level of genetic variation present in the analyzed germplasm could be effectively utilized in breeding programs for both bread wheat and durum wheat. The interaction effect of environment × accession was significant for plant height, number of grains per spike, peduncle length, awn length, days to heading and days to physiological maturity.\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eCorrelation analysis revealed that plant height, spike length, number of grains per spike, peduncle length, days to heading, days to anthesis, and grain iron and zinc contents were positively and significantly correlated, and since there was a positive relationship between these parameters in all four environments, these traits were not affected by irrigated or rainfed conditions. Additionally, these traits can be modified and improved simultaneously. One study reported a positive and significant correlation between the iron and zinc contents of bread wheat grains under irrigated and rainfed conditions [26]. A thorough investigation is needed to understand the biological or genetic mechanisms that underpin these significant correlations. In terms of the mean performance across the environments, there was a positive and significant correlation between plant height, spike length and peduncle length. Another study reported a positive and significant correlation between plant height and both spike length and peduncle length [27]. A positive and significant correlation was observed between peduncle length and the number of grains per spike. Another study reported a significant and positive correlation between peduncle length and the number of seeds per spike [28]. Previous studies have suggested a highly significant positive correlation between the grain iron and zinc contents in emmer wheat, which is consistent with the results obtained in the present study [10, 29-31]. There was also a positive and significant correlation between spike length and the number of grains per spike, which was also confirmed by the study of [14]. There was a positive and significant correlation between days to heading and days to anthesis. Another study reported positive and significant correlations between days to heading, days to anthesis and days to physiological maturity [3]. Spike length was negatively correlated with awn length under irrigated conditions, meaning that as spike length increased, awn length decreased. Moreover, no relationship was detected between the traits under rainfed conditions and the traits that were affected by both irrigated and rainfed conditions. The results in all four environments revealed that SPAD values were not correlated with plant height, spike length, or peduncle length under irrigated conditions. However, under rainfed conditions, there was a positive correlation between them, indicating that an increase in SPAD corresponds to an increase in plant height, spike length, and peduncle length under rainfed conditions. These results indicate that the relationships among these traits are affected by the irrigated or rainfed conditions of the field. Plant height was positively and significantly correlated with spike length, number of grains per spike, and peduncle length. As plant height increased, spike length, the number of grains per spike, and peduncle length tended to increase, whereas a decrease in plant height led to a decrease in these traits. In addition, there were weak and negative correlations between the grain protein content and the contents of iron (Fe) and zinc (Zn). To address the relationships between Fe and Zn and grain protein, it is essential to conduct selection experiments within segregating populations. The use of genomic tools will offer additional insights into these associations. The results from the present study also revealed no correlation between the iron content and grain protein content under rainfed conditions, which is consistent with the results of [26].\u003c/p\u003e\n\u003cp\u003eThe results of the principal component analysis under rainfed conditions in both years revealed that the first principal component was negatively loaded with days to heading and days to physiological maturity. In one study, the first principal component was loaded positively with the traits of plant height and spike length [3], which was contrary to the results obtained in the present study, which loaded these traits negatively with the first principal component. The results of cluster analysis revealed high genetic diversity in the germplasms used in this study, with different groups containing accessions of different geographical origins. The accessions were mixed with those from various regions and showed no relationship with their geographical origins. These results were also confirmed by [4, 32]. The results of one study revealed a clustering pattern of genotypes with an imbalance between geographical and genetic diversity [4]. They identified genotypes with different geographical origins in different clusters, thus obtaining high genetic diversity in the genotypes studied [4]. A cluster analysis revealed that native and foreign accessions were sporadically present in different groups. They also reported high diversity in accessions [32]. The findings of the multiple scoring index indicate that the ranking of the best accessions varies across different environments, highlighting the significant potential of the wild emmer wheat diversity panel to adapt to varying degrees of drought stress.\u003cspan dir=\"RTL\"\u003e\u0026nbsp;\u003c/span\u003eThe accessions that performed well under rainfed conditions are regarded as the most valuable genetic resources, as they possess desirable agronomic traits for adaptation to drought-stressed environments.\u0026nbsp;\u003c/p\u003e\n\n"},{"header":"Conclusion","content":"\u003cp\u003eSignificant variation was observed in the traits of the germplasm of wild emmer wheat under both irrigated and rainfed conditions. Accordingly, genetic variation was observed for both drought escape—indicated by phenological traits such as days to maturity—and drought tolerance, as reflected by agronomic traits such as plant height, number of grains, and grain weight. Across all four environments, significant positive phenotypic and genetic correlations were observed among plant height, spike length, and the number of grains per spike. These findings suggest that under both irrigated and rainfed conditions, increased plant height is associated with increased spike length and number of grains per spike. Furthermore, a positive correlation was observed between the grain iron and zinc contents, suggesting that simultaneous improvement of both traits is achievable. The wide genetic diversity present in the studied wild emmer wheat germplasm offers valuable resources for enhancing drought tolerance. These accessions can play a vital role in breeding programs aimed at enhancing the resilience of bread wheat and durum wheat under water-limited conditions by contributing adaptive traits such as early maturity, improved grain nutritional quality, and increased yield under drought stress.\u003c/p\u003e"},{"header":"Declarations","content":"\u003cp\u003eA: Accession\u003c/p\u003e\n\u003cp\u003eAL: Awn length\u003c/p\u003e\n\u003cp\u003eANOVA: Analysis of variance\u003c/p\u003e\n\u003cp\u003eBLUPs: Best linear unbiased predictors\u003c/p\u003e\n\u003cp\u003eCLINK: Complete linkage\u003c/p\u003e\n\u003cp\u003eCREA: Canadian real estate association\u003c/p\u003e\n\u003cp\u003eCV: Coefficient of variation\u003c/p\u003e\n\u003cp\u003eDTA: Days to anthesis\u003c/p\u003e\n\u003cp\u003eDTH: Days to heading\u003c/p\u003e\n\u003cp\u003eDTPM: Days to physiological maturity\u003c/p\u003e\n\u003cp\u003eE1: Environment 1 (irrigated regime 2021-2022)\u003c/p\u003e\n\u003cp\u003eE2: Environment 2 (rainfed from 2021-2022)\u003c/p\u003e\n\u003cp\u003eE3: Environment 3 (irrigated regime 2022-2023)\u003c/p\u003e\n\u003cp\u003eE4: Environment 4 (rainfed from 2022-2023)\u003c/p\u003e\n\u003cp\u003eEnv: Environment\u003c/p\u003e\n\u003cp\u003eFe: Iron\u0026nbsp;\u003c/p\u003e\n\u003cp\u003eH\u003csup\u003e2\u003c/sup\u003eb: Broad-sense heritability\u003c/p\u003e\n\u003cp\u003eIPK: The Leibniz Institute of Plant Genetics and Crop Plant Research\u003c/p\u003e\n\u003cp\u003eLSD: Least significant difference\u003c/p\u003e\n\u003cp\u003eMSI: Multiple scoring index\u003c/p\u003e\n\u003cp\u003ena: non-applicable\u003c/p\u003e\n\u003cp\u003eNGPS: Number of grains per spike\u003c/p\u003e\n\u003cp\u003ens: non-significant\u003c/p\u003e\n\u003cp\u003eP%: Protein percentage\u003c/p\u003e\n\u003cp\u003ePCA: Principal component analysis\u003c/p\u003e\n\u003cp\u003ePCoA: Principal coordinat analysis\u003c/p\u003e\n\u003cp\u003ePH: Plant height\u003c/p\u003e\n\u003cp\u003ePL: Peduncle length\u003c/p\u003e\n\u003cp\u003eS.D.: Standard deviation\u003c/p\u003e\n\u003cp\u003eSL: Spike length\u003c/p\u003e\n\u003cp\u003eSPAD: Soil plant analysis development\u003c/p\u003e\n\u003cp\u003eTGW: Thousand grain weight\u003c/p\u003e\n\u003cp\u003eUSDA: United States Department of Agriculture\u003c/p\u003e\n\u003cp\u003eZn: Zinc\u0026nbsp;\u003c/p\u003e"},{"header":"Declarations","content":"\u003cp\u003e\u003cstrong\u003eEthics approval and consent to participate\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eNot applicable.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eConsent for publication\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eNot applicable.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eData availability\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eThe datasets used and/or analyzed during the current study are available from the corresponding author on reasonable request.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eCompeting interests\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eThe authors declare that they have no competing interests.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eFunding\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eNot applicable.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eAuthors’ contributions\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003e\u0026nbsp;LZ, KCH\u003c/strong\u003e and \u003cstrong\u003eSB\u003c/strong\u003e conceived of the presented idea. \u003cstrong\u003eBA\u003c/strong\u003e performed the experiments. \u003cstrong\u003eLZ, KCH\u003c/strong\u003e and \u003cstrong\u003eSB\u003c/strong\u003e verified the analytical methods. \u003cstrong\u003eBA\u003c/strong\u003e,\u003cstrong\u003eLZ, KCH\u003c/strong\u003e and \u003cstrong\u003eSB\u003c/strong\u003e drafted the manuscript and \u003cstrong\u003eEM\u003c/strong\u003e, \u003cstrong\u003eAA\u003c/strong\u003e and \u003cstrong\u003eHO\u003c/strong\u003e revised the manuscript. All authors read and approved the final manuscript.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eAcknowledgements\u003c/strong\u003e\u003c/p\u003e\n\u003cp\u003eNot applicable.\u003c/p\u003e"},{"header":"References","content":"\u003col\u003e\n\u003cli\u003eXie W, Nevo E. Wild emmer: genetic resources, gene mapping and potential for wheat improvement. Euphytica. 2008;164:603-14. https://doi.org/10.1007/s10681-008-9703-8.\u003c/li\u003e\n\u003cli\u003eBrouns F, Geisslitz S, Guzman C, Ikeda TM, Arzani A, Latella G, Simsek S, Colomba M, Gregorini A, Zevallos V, Lullien‐Pellerin V. Do ancient wheats contain less gluten than modern bread wheat, in favour of better health? Nutr Bull. 2022;47(2):157-67. https://doi.org/10.1111/nbu.12551.\u003c/li\u003e\n\u003cli\u003eRahman S, Islam S, Nevo E, Saieed MA, Liu Q, Varshney RK, Ma W. Characterizing agronomic and shoot morphological diversity across 263 wild emmer wheat accessions. 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Field Crops Res. 2014;156:151-60. https://doi.org/10.1016/j.fcr.2013.11.011.\u003c/li\u003e\n\u003cli\u003eZencirci N, Karakaş FP, Ordu B. Macro-micro element variation in traditionally grown einkorn (\u003cem\u003eTriticum monococcum\u003c/em\u003e L. subsp. monococcum) and emmer wheat (\u003cem\u003eTriticum dicoccon\u003c/em\u003e Schrank). Int J Second Metab. 2021;8(3):227-45. https://doi.org/10.21448/ijsm.778596.\u003c/li\u003e\n\u003cli\u003eBulut S. Mineral composition of emmer wheat (\u003cem\u003eTriticum turgidum\u003c/em\u003e L. var. dicoccum) landraces. Fresenius Environ Bull. 2022;31(1A). \u003c/li\u003e\n\u003cli\u003eKumari J. Cluster analysis in emmer wheat germplasm using quantitative traits. InBiol. Forum\u0026ndash;An Int. J. 2023 (Vol. 15, No. 2023, pp. 556-560).\u003c/li\u003e\n\u003c/ol\u003e"}],"fulltextSource":"","fullText":"","funders":[],"hasAdminPriorityOnWorkflow":false,"hasManuscriptDocX":true,"hasOptedInToPreprint":true,"hasPassedJournalQc":"","hasAnyPriority":false,"hideJournal":false,"highlight":"","institution":"","isAcceptedByJournal":true,"isAuthorSuppliedPdf":false,"isDeskRejected":"","isHiddenFromSearch":false,"isInQc":false,"isInWorkflow":false,"isPdf":false,"isPdfUpToDate":true,"isWithdrawnOrRetracted":false,"journal":{"display":true,"email":"[email protected]","identity":"bmc-plant-biology","isNatureJournal":false,"hasQc":true,"allowDirectSubmit":false,"externalIdentity":"pbio","sideBox":"Learn more about [BMC Plant Biology](http://bmcplantbiol.biomedcentral.com/)","snPcode":"","submissionUrl":"https://www.editorialmanager.com/pbio/default.aspx","title":"BMC Plant Biology","twitterHandle":"BMC_series","acdcEnabled":true,"dfaEnabled":false,"editorialSystem":"em","reportingPortfolio":"BMC Series","inReviewEnabled":true,"inReviewRevisionsEnabled":true},"keywords":"Drought tolerance, genetic diversity, grain quality, phenological traits, water stress","lastPublishedDoi":"10.21203/rs.3.rs-7053462/v1","lastPublishedDoiUrl":"https://doi.org/10.21203/rs.3.rs-7053462/v1","license":{"name":"CC BY 4.0","url":"https://creativecommons.org/licenses/by/4.0/"},"manuscriptAbstract":"\u003cp\u003e\u003cstrong\u003eBackground:\u003c/strong\u003e The genetic variations present in wild emmer wheat (\u003cem\u003eTriticum turgidum\u003c/em\u003e ssp. \u003cem\u003edicoccoides\u003c/em\u003e), are valuable for improving desirable traits in modern wheat. This research was conducted to evaluate the responses of 105 wild emmer wheat accessions under irrigated and rainfed conditions across two cropping seasons (2021-2022 and 2022-2023) in the field. The following traits were measured: plant height, spike length, number of grains per spike, thousand grain weight, peduncle length, length, days to heading, days to anthesis, days to physiological maturity, soil plant development, protein content, iron content, and zinc content.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eResults: \u003c/strong\u003eThe combined analysis of variance revealed that the effects of environment and accession type were significant (\u003cem\u003ep \u003c/em\u003e\u0026lt;0.01) for all studied agronomic traits. The genotype × environment interaction was also significant (\u003cem\u003ep\u003c/em\u003e \u0026lt;0.01) for plant height, number of grains per spike, peduncle length, awn length, days to heading, and days to physiological maturity. Cluster analysis divided the studied accessions into three distinct clusters, revealing that those accessions from different geographical origins were intermixed within each group. Correlation analysis revealed a positive and significant relationship between spike length and the number of grains per spike, as well as between grain iron content and zinc content across all four environments. Multiple scoring index analysis indicated that under irrigated conditions in both years, accessions 68 (DIC291) and 70 (DIC316) were the top performers, whereas under rainfed conditions, accession 56 (DIC256) ranked highest across both years. Accessions that yield well under rainfed conditions are considered highly valuable genetic resources, as they present favorable drought stress resilience traits that increase their adaptability to water-deficit environments.\u003c/p\u003e\n\u003cp\u003e\u003cstrong\u003eConclusions: \u003c/strong\u003eThe results showed that the significant genetic diversity observed in wild emmer wheat germplasm under varying conditions highlights its potential for enhancing drought tolerance and improving key agronomic traits, thereby providing valuable resources for breeding programs aimed at increasing the resilience and nutritional quality of bread and durum wheat in water-limited environments.\u003c/p\u003e","manuscriptTitle":"Agronomic performance of wild emmer wheat germplasm (Triticum turgidum ssp. dicoccoides) grown under irrigated and rainfed conditions","msid":"","msnumber":"","nonDraftVersions":[{"code":1,"date":"2025-07-15 16:31:22","doi":"10.21203/rs.3.rs-7053462/v1","editorialEvents":[{"type":"communityComments","content":0},{"type":"decision","content":"Revision requested","date":"2025-09-05T11:15:53+00:00","index":"","fulltext":""},{"type":"editorInvitedReview","content":"","date":"2025-09-05T10:59:14+00:00","index":"hide","fulltext":""},{"type":"reviewerAgreed","content":"34140980309431295570294470545142970078","date":"2025-09-04T10:35:51+00:00","index":"hide","fulltext":""},{"type":"reviewerAgreed","content":"13197114763949564127160521184914402731","date":"2025-07-15T21:47:30+00:00","index":"hide","fulltext":""},{"type":"reviewerAgreed","content":"109206078255824288592739318482922388796","date":"2025-07-15T19:11:40+00:00","index":"hide","fulltext":""},{"type":"editorInvitedReview","content":"","date":"2025-07-14T10:56:36+00:00","index":"hide","fulltext":""},{"type":"reviewerAgreed","content":"155376843713329727679853229114194358131","date":"2025-07-14T08:30:31+00:00","index":"hide","fulltext":""},{"type":"reviewersInvited","content":"","date":"2025-07-13T18:26:04+00:00","index":"","fulltext":""},{"type":"editorInvited","content":"","date":"2025-07-11T11:46:57+00:00","index":"","fulltext":""},{"type":"editorAssigned","content":"","date":"2025-07-11T08:40:29+00:00","index":"","fulltext":""},{"type":"checksComplete","content":"","date":"2025-07-11T08:38:33+00:00","index":"","fulltext":""},{"type":"submitted","content":"BMC Plant Biology","date":"2025-07-05T13:38:16+00:00","index":"","fulltext":""}],"status":"published","journal":{"display":true,"email":"[email protected]","identity":"bmc-plant-biology","isNatureJournal":false,"hasQc":true,"allowDirectSubmit":false,"externalIdentity":"pbio","sideBox":"Learn more about [BMC Plant Biology](http://bmcplantbiol.biomedcentral.com/)","snPcode":"","submissionUrl":"https://www.editorialmanager.com/pbio/default.aspx","title":"BMC Plant Biology","twitterHandle":"BMC_series","acdcEnabled":true,"dfaEnabled":false,"editorialSystem":"em","reportingPortfolio":"BMC Series","inReviewEnabled":true,"inReviewRevisionsEnabled":true}}],"origin":"","ownerIdentity":"4ed60e8e-e2f4-4547-9f6a-4d0e96f6b8a6","owner":[],"postedDate":"July 15th, 2025","published":true,"recentEditorialEvents":[],"rejectedJournal":[],"revision":"","amendment":"","status":"published-in-journal","subjectAreas":[],"tags":[],"updatedAt":"2025-10-27T16:38:12+00:00","versionOfRecord":{"articleIdentity":"rs-7053462","link":"https://doi.org/10.1186/s12870-025-07465-y","journal":{"identity":"bmc-plant-biology","isVorOnly":false,"title":"BMC Plant Biology"},"publishedOn":"2025-10-21 16:16:06","publishedOnDateReadable":"October 21st, 2025"},"versionCreatedAt":"2025-07-15 16:31:22","video":"","vorDoi":"10.1186/s12870-025-07465-y","vorDoiUrl":"https://doi.org/10.1186/s12870-025-07465-y","workflowStages":[]},"version":"v1","identity":"rs-7053462","journalConfig":"researchsquare"},"__N_SSP":true},"page":"/article/[identity]/[[...version]]","query":{"redirect":"/article/rs-7053462","identity":"rs-7053462","version":["v1"]},"buildId":"8U1c8b4HqxoKbykW_rLl7","isFallback":false,"isExperimentalCompile":false,"dynamicIds":[84888],"gssp":true,"scriptLoader":[]}

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