{"id":45170,"date":"2022-09-02T17:25:40","date_gmt":"2022-09-02T14:25:40","guid":{"rendered":"https:\/\/ihcoedu.uobaghdad.edu.iq\/?page_id=45170"},"modified":"2026-06-05T23:40:07","modified_gmt":"2026-06-05T20:40:07","slug":"%d8%a8%d8%ad%d9%88%d8%ab-%d8%aa%d8%ae%d8%b1%d8%ac-%d9%82%d8%b3%d9%85-%d8%a7%d9%84%d8%b1%d9%8a%d8%a7%d8%b6%d9%8a%d8%a7%d8%aa-2021-2022","status":"publish","type":"page","link":"https:\/\/ihcoedu.uobaghdad.edu.iq\/?page_id=45170","title":{"rendered":"\u0628\u062d\u0648\u062b \u062a\u062e\u0631\u062c \u0642\u0633\u0645 \u0627\u0644\u0631\u064a\u0627\u0636\u064a\u0627\u062a 2021-2022"},"content":{"rendered":"<div class=\"wpb-content-wrapper\"><p>[vc_row full_width=&#8221;stretch_row_content&#8221;][vc_column][vc_column_text]\n<table id=\"tablepress-84\" class=\"tablepress tablepress-id-84\">\n<thead>\n<tr class=\"row-1\">\n\t<th class=\"column-1\">\u062a<\/th><th class=\"column-2\">\u0627\u0633\u0645 \u0627\u0644\u0637\u0627\u0644\u0628<\/th><th class=\"column-3\">\u0627\u0633\u0645 \u0627\u0644\u0645\u0634\u0631\u0641<\/th><th class=\"column-4\">\u0639\u0646\u0648\u0627\u0646 \u0627\u0644\u0628\u062d\u062b<\/th>\n<\/tr>\n<\/thead>\n<tbody class=\"row-striping row-hover\">\n<tr class=\"row-2\">\n\t<td class=\"column-1\">1<\/td><td class=\"column-2\">\u0627\u062d\u0645\u062f \u0628\u0627\u0633\u0645 \u0639\u0628\u062f \u0627\u0644\u062c\u0628\u0627\u0631 \u0639\u0628\u0627\u0633<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0628\u064a\u062f\u0627\u0621 \u0639\u0637\u064a\u0629 \u062e\u0644\u0641<\/td><td class=\"column-4\">\u062a\u0642\u062f\u064a\u0631 \u062f\u0627\u0644\u0629 \u0627\u0644\u0628\u0642\u0627\u0621 \u0644\u0644\u062a\u0648\u0632\u064a\u0639 \u0627\u0644\u0644\u0648\u062c\u0633\u062a\u064a \u0628\u0627\u0633\u062a\u062e\u062f\u0627\u0645 \u062e\u0648\u0627\u0631\u0632\u0645\u064a\u0629 \u0627\u0644\u062a\u062d\u0633\u064a\u0646<\/td>\n<\/tr>\n<tr class=\"row-3\">\n\t<td class=\"column-1\">2<\/td><td class=\"column-2\">\u0627\u062d\u0645\u062f \u0645\u0627\u0647\u0631 \u0639\u0628\u062f \u0627\u0644\u0631\u0632\u0627\u0642 \u0645\u0643\u064a  <\/td><td class=\"column-3\">\u0645.\u0645. \u0631\u064a\u0645 \u0648\u0644\u064a\u062f \u062d\u0633\u064a\u0646<\/td><td class=\"column-4\">\u0623\u0647\u0645\u064a\u0629 \u0627\u0644\u0631\u064a\u0627\u0636\u064a\u0627\u062a \u0641\u064a \u062d\u064a\u0627\u062a\u0646\u0627 \u0627\u0644\u064a\u0648\u0645\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-4\">\n\t<td class=\"column-1\">3<\/td><td class=\"column-2\">\u0627\u062d\u0645\u062f \u0645\u0647\u0646\u0627 \u0639\u0628\u0627\u0633 \u0645\u062d\u064a\u0645\u064a\u062f<\/td><td class=\"column-3\">\u0645. \u0646\u0627\u062f\u064a\u0629 \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0643\u0627\u0645\u0644 \u0627\u0644\u0645\u0643\u0631\u0631 \u0648\u062a\u0637\u0628\u064a\u0642\u0627\u062a\u0647 \u0627\u0644\u0639\u0644\u0645\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-5\">\n\t<td class=\"column-1\">4<\/td><td class=\"column-2\">\u0627\u0645\u062c\u062f \u062e\u0644\u0648\u0647\u0646 \u062d\u0633\u0648\u0646 \u0641\u062f\u0639\u0645<\/td><td class=\"column-3\">\u0645.\u062f. \u0634\u064a\u0645\u0627\u0621 \u0645\u062e\u0644\u0641 \u0634\u0631\u064a\u062f\u0629<\/td><td class=\"column-4\">\u0627\u0633\u062a\u062e\u062f\u0627\u0645 \u0627\u0644\u0637\u0631\u0642 \u0627\u0644\u0639\u062f\u062f\u064a\u0629 \u0644\u062d\u0644 \u0645\u0639\u0627\u062f\u0644\u0627\u062a \u0641\u0631\u064a\u062f\u0647\u0648\u0644\u0645 \u0627\u0644\u062a\u0643\u0627\u0645\u0644\u064a\u0629 \u0627\u0644\u062e\u0637\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-6\">\n\t<td class=\"column-1\">5<\/td><td class=\"column-2\">\u0627\u0648\u0633 \u062d\u0628\u064a\u0628 \u0645\u0632\u0628\u0627\u0646 \u062d\u0628\u064a\u0628 <\/td><td class=\"column-3\">\u0645.\u0645. \u0631\u064a\u0645 \u0645\u0646\u0630\u0631 \u064a\u0648\u0646\u0633<\/td><td class=\"column-4\">The Homotopy Perturbation Method For Solving Fredholm Integral Equations of The first Kind<\/td>\n<\/tr>\n<tr class=\"row-7\">\n\t<td class=\"column-1\">6<\/td><td class=\"column-2\">\u0627\u064a\u0645\u0646 \u062e\u0644\u062f\u0648\u0646 \u0639\u0644\u064a \u062e\u064a\u0631 \u0627\u0644\u0644\u0647<\/td><td class=\"column-3\">\u0623.\u0639\u0628\u0627\u0633 \u0646\u062c\u0645 \u0633\u0644\u0645\u0627\u0646<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u0627\u0644\u0637\u0631\u0642 \u0627\u0644\u0643\u0644\u0627\u0633\u064a\u0643\u064a\u0629 \u0644\u062a\u0642\u062f\u064a\u0631 \u0645\u0639\u0627\u0644\u0645 \u062f\u0627\u0644\u0629 \u0627\u0644\u0645\u062e\u0627\u0637\u0631\u0629 \u0644\u062a\u0648\u0632\u064a\u0639 \u0641\u0634\u0644 \u0645\u062d\u062f\u062f<\/td>\n<\/tr>\n<tr class=\"row-8\">\n\t<td class=\"column-1\">7<\/td><td class=\"column-2\">\u0627\u064a\u0645\u0646 \u0639\u0645\u0627\u062f \u0627\u0633\u0645\u0627\u0639\u064a\u0644 \u062f\u0639\u064a\u0628\u0644<\/td><td class=\"column-3\">\u0645. \u0646\u0627\u062f\u064a\u0629 \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0641\u0627\u0636\u0644 \u0627\u0644\u062c\u0632\u0626\u064a \u0648\u062a\u0637\u0628\u064a\u0642\u0627\u062a\u0647 \u0627\u0644\u0639\u0644\u0645\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-9\">\n\t<td class=\"column-1\">8<\/td><td class=\"column-2\">\u0628\u0627\u0631\u0642 \u064a\u0627\u0633\u064a\u0646 \u062d\u0628\u062a\u0648\u0631 \u0634\u0646\u064a\u062a\u0631<\/td><td class=\"column-3\">\u0645. \u0646\u0627\u062f\u064a\u0629 \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0643\u0627\u0645\u0644 \u0627\u0644\u0631\u064a\u0627\u0636\u064a \u0648\u062a\u0637\u0628\u064a\u0642\u0627\u062a\u0647 \u0627\u0644\u0639\u0645\u0644\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-10\">\n\t<td class=\"column-1\">9<\/td><td class=\"column-2\">\u062a\u0645\u0627\u0631 \u0645\u064a\u062b\u0645 \u062c\u0648\u0627\u062f \u0635\u0641\u0631<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0646\u0627\u062f\u064a\u0629 \u0641\u0627\u0626\u0642 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">Bc- continuous function<\/td>\n<\/tr>\n<tr class=\"row-11\">\n\t<td class=\"column-1\">10<\/td><td class=\"column-2\">\u062c\u0646\u0627\u0646 \u062c\u0644\u0627\u0644 \u064a\u0648\u0633\u0641 \u064a\u0639\u0642\u0648\u0628<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0632\u064a\u0646\u0629 \u062d\u0633\u064a\u0646 \u0645\u0639\u064a\u0628\u062f<\/td><td class=\"column-4\">Some properties about G- metric space <\/td>\n<\/tr>\n<tr class=\"row-12\">\n\t<td class=\"column-1\">11<\/td><td class=\"column-2\">\u062d\u0633\u064a\u0646 \u0639\u0627\u062f\u0644 \u0639\u0628\u062f \u0627\u0644\u062c\u0627\u0633\u0645 <\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0639\u0644\u064a \u0637\u0627\u0644\u0628 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0635\u0645\u064a\u0645 \u0627\u0644\u0639\u0634\u0648\u0627\u0626\u064a \u0627\u0644\u0645\u062a\u0643\u0627\u0645\u0644: \u062a\u062d\u0644\u064a\u0644 \u0627\u0644\u062a\u0628\u0627\u064a\u0646<\/td>\n<\/tr>\n<tr class=\"row-13\">\n\t<td class=\"column-1\">12<\/td><td class=\"column-2\">\u062d\u0633\u064a\u0646 \u0639\u0644\u0648\u0627\u0646 \u0639\u0637\u0634\u0627\u0646 \u062e\u0641\u064a<\/td><td class=\"column-3\">\u0645.\u062f. \u0645\u062d\u0645\u062f \u0639\u0644\u064a \u0627\u062d\u0645\u062f<\/td><td class=\"column-4\">Some methods for solving systems of linear equations<\/td>\n<\/tr>\n<tr class=\"row-14\">\n\t<td class=\"column-1\">13<\/td><td class=\"column-2\">\u062d\u0648\u0631\u0627\u0621 \u062e\u0636\u064a\u0631 \u062c\u0627\u0633\u0645 \u0634\u0627\u064a\u0639<\/td><td class=\"column-3\">\u0623. \u0639\u0628\u0627\u0633 \u0646\u062c\u0645 \u0633\u0644\u0645\u0627\u0646<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0648\u0642\u0639 \u0648\u0627\u0644\u062a\u0628\u0627\u064a\u0646 \u0644\u0644\u0645\u062a\u063a\u064a\u0631 \u0627\u0644\u0639\u0634\u0648\u0627\u0626\u064a \u0627\u0644\u0646\u064a\u062a\u0631\u0648\u0633\u0648\u0641\u064a\u0643\u064a \u0627\u0644\u0645\u0633\u062a\u0645\u0631<\/td>\n<\/tr>\n<tr class=\"row-15\">\n\t<td class=\"column-1\">14<\/td><td class=\"column-2\">\u062d\u064a\u062f\u0631 \u062d\u0633\u064a\u0646 \u0639\u0644\u0648\u0627\u0646 \u0639\u064a\u062f\u0627\u0646 <\/td><td class=\"column-3\">\u0623.\u062f. \u0644\u0645\u0649 \u0646\u0627\u062c\u064a \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u062a\u0637\u0628\u064a\u0642\u0627\u062a \u0627\u0644\u0639\u0644\u0627\u0642\u0627\u062a \u0627\u0644\u0636\u0628\u0627\u0628\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-16\">\n\t<td class=\"column-1\">15<\/td><td class=\"column-2\">\u062d\u064a\u062f\u0631 \u0639\u0644\u064a \u0639\u0628\u062f \u0627\u0644\u0633\u0627\u062f\u0629 \u0644\u0641\u062a\u0647<\/td><td class=\"column-3\">\u0645.\u062f.\u063a\u062f\u064a\u0631 \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0627\u0644\u0627\u0646\u062d\u062f\u0627\u0631 \u0628\u0627\u0633\u062a\u062e\u062f\u0627\u0645 \u0637\u0631\u064a\u0642\u0629 \u0627\u0644\u0645\u0631\u0628\u0639\u0627\u062a \u0627\u0644\u0635\u063a\u0631\u0649<\/td>\n<\/tr>\n<tr class=\"row-17\">\n\t<td class=\"column-1\">16<\/td><td class=\"column-2\">\u0631\u0627\u0645\u064a \u0627\u0633\u0645\u0627\u0639\u064a\u0644 \u0639\u0644\u064a \u064a\u0627\u0633<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0645\u064a\u0633\u0627\u0621 \u062c\u0644\u064a\u0644 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u062a\u0623\u062b\u064a\u0631 \u0642\u0627\u0646\u0648\u0646 \u0645\u0639\u0644\u0648\u0645\u0627\u062a\u064a\u0629 \u0634\u0627\u0646\u0648\u0646 \u0628\u0646\u0627\u0621 \u0639\u0644\u0649 \u0623\u0633\u0627\u0633 \u0645\u0627\u0631\u0643\u0648\u0641 \u0644\u0644\u0646\u0645\u0648\u0630\u062c \u0627\u0644\u0645\u0633\u0642\u0644<\/td>\n<\/tr>\n<tr class=\"row-18\">\n\t<td class=\"column-1\">17<\/td><td class=\"column-2\">\u0632\u0647\u0631\u0627\u0621 \u062b\u0627\u0626\u0631 \u0639\u0628\u0627\u0633 \u0635\u062f\u0627\u0645<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0646\u0627\u062f\u064a\u0629 \u0641\u0627\u0626\u0642 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">BC- open sets in topological spaces<\/td>\n<\/tr>\n<tr class=\"row-19\">\n\t<td class=\"column-1\">18<\/td><td class=\"column-2\">\u0632\u0647\u0631\u0627\u0621 \u0637\u0627\u0631\u0642 \u0643\u0627\u0638\u0645 <\/td><td class=\"column-3\">\u0645. \u0627\u062d\u0645\u062f \u0639\u064a\u0633\u0649 \u0639\u0628\u062f \u0627\u0644\u0646\u0628\u064a<\/td><td class=\"column-4\">\u0627\u0644\u0640\u0640\u0645\u0640\u0640\u0642\u0640\u0640\u062f\u0631 \u0627\u0644\u0640\u0640\u062c\u0640\u0640\u064a\u0640\u0640\u062f<\/td>\n<\/tr>\n<tr class=\"row-20\">\n\t<td class=\"column-1\">19<\/td><td class=\"column-2\">\u0632\u064a\u0646\u0628 \u0639\u0644\u064a \u0627\u062d\u0645\u062f \u0639\u0644\u064a<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0635\u0628\u0627 \u0646\u0627\u0635\u0631 \u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">Linear Programming and its Applications<\/td>\n<\/tr>\n<tr class=\"row-21\">\n\t<td class=\"column-1\">20<\/td><td class=\"column-2\">\u0633\u0627\u0631\u0647 \u0639\u0645\u0631 \u0627\u0628\u0631\u0627\u0647\u064a\u0645 \u062d\u0633\u0646<\/td><td class=\"column-3\">\u0645. \u0627\u0631\u064a\u062c \u0635\u0644\u0627\u062d \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">Adomian Decomposition Method for Solving Duffing Equation<\/td>\n<\/tr>\n<tr class=\"row-22\">\n\t<td class=\"column-1\">21<\/td><td class=\"column-2\">\u0633\u0627\u0631\u0647 \u0641\u0627\u0644\u062d \u062d\u0633\u0646 \u0639\u0628\u062f \u0627\u0644\u0644\u0647<\/td><td class=\"column-3\">\u0645. \u0631\u0646\u0627 \u0646\u0648\u0631\u064a \u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">\u062d\u0648\u0644 \u0623\u0635\u063a\u0631 \u0627\u0644\u0645\u0642\u0627\u0633\u0627\u062a \u0627\u0644\u062c\u0632\u0626\u064a\u0629 \u0627\u0644\u062c\u0648\u0647\u0631\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-23\">\n\t<td class=\"column-1\">22<\/td><td class=\"column-2\">\u0633\u062c\u0627\u062f \u0631\u0632\u0627\u0642 \u062c\u0644\u0648\u062f \u0635\u0648\u064a\u0646<\/td><td class=\"column-3\">\u0645.\u062f. \u0645\u064a \u0645\u062d\u0645\u062f \u0647\u0644\u0627\u0644<\/td><td class=\"column-4\">The series solution method to solve Volterra integral equation<\/td>\n<\/tr>\n<tr class=\"row-24\">\n\t<td class=\"column-1\">23<\/td><td class=\"column-2\">\u0633\u0646\u062f\u0633 \u0645\u062d\u0645\u062f \u0639\u0628\u0627\u0633 \u063a\u0632\u0627\u0644<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0632\u064a\u0646\u0629 \u062d\u0633\u064a\u0646 \u0645\u0639\u064a\u0628\u062f<\/td><td class=\"column-4\">Some fixed point theorems in G metric space<\/td>\n<\/tr>\n<tr class=\"row-25\">\n\t<td class=\"column-1\">24<\/td><td class=\"column-2\">\u0633\u064a\u0641 \u062d\u064a\u062f\u0631 \u0646\u062c\u0645 \u0639\u0648\u0627\u062f<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0645\u064a\u0633\u0627\u0621 \u062c\u0644\u064a\u0644 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u062f\u0631\u0627\u0633\u0629 \u062a\u0648\u0632\u064a\u0639 \u0631\u0627\u064a\u0644\u064a - \u0627\u0644\u0627\u0633\u064a<\/td>\n<\/tr>\n<tr class=\"row-26\">\n\t<td class=\"column-1\">25<\/td><td class=\"column-2\">\u0635\u0641\u0627\u0621 \u0641\u064a\u0635\u0644 \u0645\u062d\u0645\u062f \u0645\u0646\u0627\u062d\u064a<\/td><td class=\"column-3\">\u0645.\u0645. \u0627\u064a\u0645\u0627\u0646 \u062d\u0633\u0646 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0643\u0627\u0645\u0644\u0627\u062a<\/td>\n<\/tr>\n<tr class=\"row-27\">\n\t<td class=\"column-1\">26<\/td><td class=\"column-2\">\u0637\u0647 \u0635\u0644\u0627\u062d \u062d\u0645\u0632\u0647 \u0639\u0628\u062f<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u064a\u0648\u0633\u0641 \u064a\u0639\u0643\u0648\u0628 \u064a\u0648\u0633\u0641<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u0627\u0646\u0648\u0627\u0639 \u0627\u0644\u062f\u0648\u0627\u0644 \u0627\u0644\u0645\u062a\u0639\u062f\u062f\u0629 \u0627\u0644\u0645\u0633\u062a\u0645\u0631\u0629 \u0645\u0646 \u0646\u0645\u0637 -\u0623\u0644\u0641\u0627 \u0641\u064a \u0627\u0644\u0641\u0636\u0627\u0621\u0627\u062a \u0627\u0644\u062a\u0628\u0648\u0644\u0648\u062c\u064a\u0647<\/td>\n<\/tr>\n<tr class=\"row-28\">\n\t<td class=\"column-1\">27<\/td><td class=\"column-2\">\u0639\u0628\u062f \u0627\u0644\u0631\u062d\u064a\u0645 \u0648\u0633\u0627\u0645 \u0635\u0628\u062d\u064a <\/td><td class=\"column-3\">\u0623.\u062f. \u0628\u062b\u064a\u0646\u0629 \u0646\u062c\u0627\u062f \u0634\u0647\u0627\u0628<\/td><td class=\"column-4\">\u062f\u0648\u0627\u0644 \u0627\u0633\u0627\u0633\u064a\u0629 \u0648\u0645\u0647\u0645\u0629 \u0641\u064a \u0627\u0644\u0645\u0633\u062a\u0648\u0649 \u0627\u0644\u0639\u0642\u062f\u064a<\/td>\n<\/tr>\n<tr class=\"row-29\">\n\t<td class=\"column-1\">28<\/td><td class=\"column-2\">\u0639\u0628\u062f \u0627\u0644\u0644\u0647 \u062c\u0627\u0633\u0645 \u0639\u0644\u064a \u0633\u0628\u0639<\/td><td class=\"column-3\">\u0645.\u0645. \u0647\u062f\u0649 \u0639\u0645\u0627\u062f \u0627\u0644\u062f\u064a\u0646 \u062c\u0645\u064a\u0644<\/td><td class=\"column-4\">Applications of The Riemann-Liouville Fractional Integral<\/td>\n<\/tr>\n<tr class=\"row-30\">\n\t<td class=\"column-1\">29<\/td><td class=\"column-2\">\u0639\u0644\u064a \u0633\u0644\u064a\u0645\u0627\u0646 \u0639\u0644\u064a \u062d\u0645\u062f<\/td><td class=\"column-3\">\u0645.\u062f. \u0634\u064a\u0645\u0627\u0621 \u0633\u0644\u0645\u0627\u0646 \u0639\u0628\u062f<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0634\u0641\u064a\u0631 \u0628\u0627\u0633\u062a\u062e\u062f\u0627\u0645 \u0627\u0644\u062c\u0628\u0631 \u0627\u0644\u062e\u0637\u064a \u0648\u0646\u0638\u0631\u064a\u0629 \u0627\u0644\u0643\u0633\u0648\u0631\u064a\u0627\u062a<\/td>\n<\/tr>\n<tr class=\"row-31\">\n\t<td class=\"column-1\">30<\/td><td class=\"column-2\">\u0639\u0644\u064a \u0635\u0627\u062d\u0628 \u062d\u0628\u064a\u0628 \u0646\u062c\u0645 <\/td><td class=\"column-3\">\u0645. \u0646\u0627\u062f\u064a\u0629 \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0641\u0627\u0636\u0644 \u0627\u0644\u0631\u064a\u0627\u0636\u064a \u0648\u062a\u0637\u0628\u064a\u0642\u0627\u062a\u0647 \u0627\u0644\u0639\u0645\u0644\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-32\">\n\t<td class=\"column-1\">31<\/td><td class=\"column-2\">\u0639\u0645\u0627\u0631 \u064a\u0627\u0633\u0631 \u0645\u0632\u0647\u0631 \u0639\u064a\u0633\u0649<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u064a\u0648\u0633\u0641 \u064a\u0639\u0643\u0648\u0628 \u064a\u0648\u0633\u0641<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u0623\u0646\u0648\u0627\u0639 \u0627\u0644\u062f\u0648\u0627\u0644 \u0627\u0644\u0645\u062a\u0639\u062f\u062f\u0629 \u0627\u0644\u0645\u0633\u062a\u0645\u0631\u0629 \u0645\u0646 \u0627\u0644\u0646\u0645\u0637 -\u0645 \u0641\u064a \u0627\u0644\u0641\u0636\u0627\u0621\u0627\u062a \u0627\u0644\u062a\u0628\u0648\u0644\u0648\u062c\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-33\">\n\t<td class=\"column-1\">32<\/td><td class=\"column-2\">\u0639\u0645\u0631 \u0646\u0632\u0627\u0631 \u0639\u0628\u0627\u0633 \u062d\u0645\u064a\u062f<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0645\u064a\u0633\u0627\u0621 \u062c\u0644\u064a\u0644 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u062a\u0623\u062b\u064a\u0631 \u0627\u0644\u062a\u0648\u0631\u0643 \u0627\u0644\u0645\u062b\u0627\u0644\u064a \u0628\u0646\u0627\u0621 \u0639\u0644\u0649 \u0627\u0633\u0627\u0633 \u0645\u0627\u0631\u0643\u0648\u0641 \u0644\u0644\u0646\u0645\u0648\u0630\u062c \u0627\u0644\u0645\u0633\u062a\u0642\u0644<\/td>\n<\/tr>\n<tr class=\"row-34\">\n\t<td class=\"column-1\">33<\/td><td class=\"column-2\">\u0641\u0627\u062a\u0646 \u0646\u0639\u064a\u0645 \u0639\u0627\u062c\u0644 \u0628\u0631\u0647\u0627\u0646<\/td><td class=\"column-3\">\u0645. \u0631\u0646\u0627 \u0646\u0648\u0631\u064a \u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">\u062d\u0648\u0644 \u0623\u0635\u063a\u0631 \u0627\u0644\u0645\u0642\u0627\u0633\u0627\u062a \u0627\u0644\u062c\u0632\u0626\u064a\u0629 \u0627\u0644\u0645\u063a\u0644\u0642\u0629<\/td>\n<\/tr>\n<tr class=\"row-35\">\n\t<td class=\"column-1\">34<\/td><td class=\"column-2\">\u0641\u0627\u0631\u0648\u0642 \u0642\u0627\u0633\u0645 \u0639\u0628\u062f \u062d\u0645\u062f<\/td><td class=\"column-3\">\u0623.\u0645. \u0627\u0644\u0627\u0621 \u0645\u0627\u062c\u062f \u062d\u0645\u062f<\/td><td class=\"column-4\">\u062a\u0648\u0632\u064a\u0639 \u0644\u0648\u0645\u0643\u0633 \u0627\u0644\u0642\u0648\u0649 \u062e\u0648\u0627\u0635\u0647 \u0648\u0637\u0631\u0642 \u0627\u0644\u062a\u0642\u062f\u064a\u0631<\/td>\n<\/tr>\n<tr class=\"row-36\">\n\t<td class=\"column-1\">35<\/td><td class=\"column-2\">\u0641\u0631\u0642\u0627\u0646 \u062d\u0633\u0646 \u062f\u0627\u062e\u0644 \u062c\u062d\u064a\u0644<\/td><td class=\"column-3\">\u0645.\u062f. \u0633\u0639\u0627\u062f \u062c\u062f\u0639\u0627\u0646 \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">Normal generalized topological space<\/td>\n<\/tr>\n<tr class=\"row-37\">\n\t<td class=\"column-1\">36<\/td><td class=\"column-2\">\u0641\u0647\u062f \u0633\u0639\u064a\u062f \u062e\u0636\u064a\u0631 \u0635\u0627\u0644\u062d<\/td><td class=\"column-3\">\u0645.\u0645. \u0639\u0628\u064a\u0631 \u062d\u0633\u064a\u0646 \u0639\u0628\u062f \u0627\u0644\u0627\u0645\u064a\u0631<\/td><td class=\"column-4\">Graph theory set and matrix notation<\/td>\n<\/tr>\n<tr class=\"row-38\">\n\t<td class=\"column-1\">37<\/td><td class=\"column-2\">\u0644\u064a\u062b \u0631\u062d\u064a\u0645 \u0633\u0639\u062f \u062f\u064a\u0648\u0627\u0646 <\/td><td class=\"column-3\">\u0623.\u062f. \u0628\u062b\u064a\u0646\u0629 \u0646\u062c\u0627\u062f \u0627\u0634\u0647\u0627\u0628<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u0627\u0644\u0646\u062a\u0627\u0626\u062c \u062d\u0648\u0644 \u0627\u0644\u0645\u062a\u0628\u0642\u064a \u0645\u0646 \u0627\u0644\u0645\u062b\u0627\u0644\u064a<\/td>\n<\/tr>\n<tr class=\"row-39\">\n\t<td class=\"column-1\">38<\/td><td class=\"column-2\">\u0645\u062d\u0633\u0646  \u0627\u062d\u0645\u062f \u062d\u0633\u0646 \u0645\u062d\u0645\u062f<\/td><td class=\"column-3\">\u0645.\u0645. \u0627\u064a\u0645\u0627\u0646 \u062d\u0633\u0646 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0627\u0644\u062f\u0648\u0627\u0644 \u0627\u0644\u062e\u0627\u0635\u0629<\/td>\n<\/tr>\n<tr class=\"row-40\">\n\t<td class=\"column-1\">39<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u062d\u0645\u064a\u062f \u062d\u0633\u0646 \u0639\u0648\u062f\u0647<\/td><td class=\"column-3\">\u0623. \u0639\u0628\u0627\u0633 \u0646\u062c\u0645 \u0633\u0644\u0645\u0627\u0646<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0648\u0642\u0639 \u0648\u0627\u0644\u062a\u0628\u0627\u064a\u0646 \u0644\u0644\u0645\u062a\u063a\u064a\u0631 \u0627\u0644\u0639\u0634\u0648\u0627\u0626\u064a \u0627\u0644\u0646\u064a\u0648\u062a\u0631\u0648\u0633\u0648\u0641\u064a\u0643\u064a \u0627\u0644\u0645\u062a\u0642\u0637\u0639<\/td>\n<\/tr>\n<tr class=\"row-41\">\n\t<td class=\"column-1\">40<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u062d\u064a\u062f\u0631 \u0639\u0628\u0627\u0633 \u0639\u0648\u064a\u062f<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0645\u064a\u0633\u0627\u0621 \u062c\u0644\u064a\u0644 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u062f\u0631\u0627\u0633\u0629 \u062a\u0648\u0632\u064a\u0639 \u0631\u0627\u064a\u0644\u064a<\/td>\n<\/tr>\n<tr class=\"row-42\">\n\t<td class=\"column-1\">41<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u0634\u0627\u0645\u0644 \u0639\u0628\u062f \u0627\u0644\u062c\u0628\u0627\u0631 <\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0631\u0646\u0627 \u0628\u0647\u062c\u062a \u0627\u0633\u0645\u0627\u0639\u064a\u0644<\/td><td class=\"column-4\">Grills in topological space<\/td>\n<\/tr>\n<tr class=\"row-43\">\n\t<td class=\"column-1\">42<\/td><td class=\"column-2\">\u0645\u0644\u0627\u0643 \u062d\u064a\u062f\u0631 \u0645\u062d\u0645\u062f \u0645\u0647\u062f\u064a<\/td><td class=\"column-3\">\u0645.\u0645. \u0631\u064a\u0645 \u0645\u0646\u0630\u0631 \u064a\u0648\u0646\u0633<\/td><td class=\"column-4\">The Direct computation method for solving fredholm Integral equations of the second kind<\/td>\n<\/tr>\n<tr class=\"row-44\">\n\t<td class=\"column-1\">43<\/td><td class=\"column-2\">\u0646\u062c\u0644\u0627\u0621 \u0645\u062d\u0645\u062f \u0639\u0628\u062f \u0627\u0644\u0631\u0636\u0627 \u0642\u0646\u0628\u0631<\/td><td class=\"column-3\">\u062f. \u0634\u064a\u0645\u0627\u0621 \u0633\u0644\u0645\u0627\u0646 \u0639\u0628\u062f<\/td><td class=\"column-4\">\u0627\u062e\u062a\u0628\u0627\u0631\u0627\u062a \u0627\u0644\u062a\u0642\u0627\u0631\u0628 \u0644\u0644\u062a\u0643\u0627\u0645\u0644\u0627\u062a \u0627\u0644\u0645\u0639\u062a\u0644\u0629 \u0645\u0646 \u0627\u0644\u0635\u0646\u0641\u064a\u0646 \u0627\u0644\u0627\u0648\u0644 \u0648\u0627\u0644\u062b\u0627\u0646\u064a<\/td>\n<\/tr>\n<tr class=\"row-45\">\n\t<td class=\"column-1\">44<\/td><td class=\"column-2\">\u0647\u0627\u062c\u0631 \u0627\u062d\u0645\u062f \u0633\u0639\u064a\u062f \u062e\u0634\u0627\u0646<\/td><td class=\"column-3\">\u0623.\u0645. \u0627\u0644\u0627\u0621 \u0645\u0627\u062c\u062f \u062d\u0645\u062f<\/td><td class=\"column-4\">\u062a\u0642\u062f\u064a\u0631 \u0645\u0639\u0644\u0645\u0629 \u0627\u0644\u0634\u0643\u0644 \u0644\u062a\u0648\u0632\u064a\u0639 \u0644\u0648\u0645\u0643\u0633 \u0627\u0644\u0642\u0648\u0649<\/td>\n<\/tr>\n<tr class=\"row-46\">\n\t<td class=\"column-1\">45<\/td><td class=\"column-2\">\u0627\u062d\u0645\u062f \u062d\u0627\u0632\u0645 \u0631\u0633\u0648\u0644 \u0637\u0627\u0644\u0628<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0627\u064a\u0645\u0627\u0646 \u0645\u062d\u0645\u062f \u0646\u0639\u0645\u0629<\/td><td class=\"column-4\">Considering  Volterra Integro \u2013 Differential Equation with Series Solution Method<\/td>\n<\/tr>\n<tr class=\"row-47\">\n\t<td class=\"column-1\">46<\/td><td class=\"column-2\">\u0627\u062d\u0645\u062f \u0645\u062d\u0645\u062f \u062d\u0633\u0646 \u062c\u064a\u0627\u062f<\/td><td class=\"column-3\">\u0623.\u062f. \u0628\u062b\u064a\u0646\u0629 \u0646\u062c\u0627\u062f \u0634\u0647\u0627\u0628<\/td><td class=\"column-4\">Artinian and Noetherian Rings<\/td>\n<\/tr>\n<tr class=\"row-48\">\n\t<td class=\"column-1\">47<\/td><td class=\"column-2\">\u0627\u0645\u0648\u0627\u062c \u0628\u062d\u0631 \u062e\u0627\u0644\u062f \u0645\u062d\u0645\u062f <\/td><td class=\"column-3\">\u0645.\u062f. \u0634\u064a\u0645\u0627\u0621 \u0645\u062e\u0644\u0641 \u0634\u0631\u064a\u062f\u0647<\/td><td class=\"column-4\">Physical Applications of Conformal Mapping<\/td>\n<\/tr>\n<tr class=\"row-49\">\n\t<td class=\"column-1\">48<\/td><td class=\"column-2\">\u062a\u0628\u0627\u0631\u0643 \u0631\u0634\u064a\u062f \u0639\u0644\u064a \u0641\u0631\u062d\u0627\u0646 <\/td><td class=\"column-3\">\u0645. \u0633\u0645\u0627\u0647\u0631 \u0645\u0631\u0632 \u064a\u0627\u0633\u064a\u0646<\/td><td class=\"column-4\">Variation Iteration method for solving the Nonlinear Schrodinger Equation<\/td>\n<\/tr>\n<tr class=\"row-50\">\n\t<td class=\"column-1\">49<\/td><td class=\"column-2\">\u062d\u0633\u0646 \u0635\u0644\u0627\u062d \u0646\u0639\u064a\u0645\u0647 \u062c\u062d\u064a\u0644<\/td><td class=\"column-3\">\u0645.\u062f. \u063a\u0627\u0644\u0628 \u0623\u062d\u0645\u062f \u062d\u0645\u0648\u062f<\/td><td class=\"column-4\">Results about Prime Submodules<\/td>\n<\/tr>\n<tr class=\"row-51\">\n\t<td class=\"column-1\">50<\/td><td class=\"column-2\">\u062d\u0645\u0632\u0647 \u064a\u0627\u0633\u0631 \u0633\u0644\u0645\u0627\u0646 \u0639\u0628\u0627\u0633<\/td><td class=\"column-3\">\u0645.\u062f.\u0639\u0642\u064a\u0644 \u0641\u0627\u0644\u062d \u062c\u062f\u0648\u0639<\/td><td class=\"column-4\">Fredholm Integro-Differential Equation with Variational Iteration Method<\/td>\n<\/tr>\n<tr class=\"row-52\">\n\t<td class=\"column-1\">51<\/td><td class=\"column-2\">\u062f\u0639\u0627\u0621 \u0633\u0647\u064a\u0644 \u0646\u062c\u0645 \u0639\u0628\u062f \u0627\u0644\u0644\u0647 <\/td><td class=\"column-3\">\u0645.\u062f. \u0647\u064a\u0627\u0645 \u0645\u0647\u062f\u064a \u062c\u0648\u0627\u062f<\/td><td class=\"column-4\">Mathematical coherence included in the mathematics book for the second grade intermediate<\/td>\n<\/tr>\n<tr class=\"row-53\">\n\t<td class=\"column-1\">52<\/td><td class=\"column-2\">\u0632\u064a\u0646\u0628 \u0645\u062d\u0645\u062f \u0645\u0647\u062f\u064a \u0645\u062d\u064a\u0645\u064a\u062f <\/td><td class=\"column-3\">\u0645. \u0633\u0645\u0627\u0647\u0631 \u0645\u0631\u0632 \u064a\u0627\u0633\u064a\u0646<\/td><td class=\"column-4\">Variational Iteration Method for solving Two Dimensional Heat Flow Equation<\/td>\n<\/tr>\n<tr class=\"row-54\">\n\t<td class=\"column-1\">53<\/td><td class=\"column-2\">\u0633\u062c\u0627\u062f \u0641\u0644\u0627\u062d \u062e\u0644\u0641 \u0643\u0627\u0637\u0639<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0641\u0627\u0637\u0645\u0629 \u0641\u064a\u0635\u0644 \u0643\u0631\u064a\u0645<\/td><td class=\"column-4\">The Sylow Theorem and its applications<\/td>\n<\/tr>\n<tr class=\"row-55\">\n\t<td class=\"column-1\">54<\/td><td class=\"column-2\">\u0633\u062c\u0627\u062f \u064a\u0648\u0633\u0641 \u0634\u0645\u062e\u064a \u062c\u0628\u0631 <\/td><td class=\"column-3\">\u0645. \u0641\u0640\u0631\u062d \u0641\u064a\u0635\u0644 \u063a\u0627\u0632\u064a<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u0645\u0646 \u062a\u0637\u0628\u064a\u0642\u0627\u062a \u0645\u0639\u0627\u062f\u0644\u0629 \u0627\u0644\u0645\u0648\u062c\u0629 \u0627\u0644\u062e\u0637\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-56\">\n\t<td class=\"column-1\">55<\/td><td class=\"column-2\">\u0633\u0644\u0627\u0645 \u062e\u0636\u064a\u0631 \u062e\u0645\u0627\u0633 \u0637\u0627\u0631\u0634<\/td><td class=\"column-3\">\u0645.\u0645. \u0627\u064a\u0645\u0627\u0646 \u0627\u062d\u0645\u062f \u0639\u0628\u062f\u0627\u0644\u0644\u0637\u064a\u0641<\/td><td class=\"column-4\">\u0627\u0644\u0631\u064a\u0627\u0636\u064a\u0627\u062a \u0648\u0627\u0644\u0642\u0631\u0622\u0646 \u0627\u0644\u0643\u0631\u064a\u0645<\/td>\n<\/tr>\n<tr class=\"row-57\">\n\t<td class=\"column-1\">56<\/td><td class=\"column-2\">\u0633\u0644\u0627\u0645 \u0635\u0627\u0644\u062d \u0646\u0627\u062c\u064a \u0633\u0644\u0645\u0627\u0646 <\/td><td class=\"column-3\">\u0645.\u062f. \u0639\u0627\u062f\u0644 \u0631\u0627\u0634\u062f \u0639\u0628\u062f \u0639\u0644\u064a<\/td><td class=\"column-4\">NUMERICAL SOLUTION OF ORDINARY DIFFERENTIAL EQUATIONS<\/td>\n<\/tr>\n<tr class=\"row-58\">\n\t<td class=\"column-1\">57<\/td><td class=\"column-2\">\u0633\u0644\u0637\u0627\u0646 \u0639\u0644\u0627\u0648\u064a \u0643\u0627\u0638\u0645 \u0639\u0628\u062f<\/td><td class=\"column-3\">\u0645.\u0645. \u0639\u0628\u064a\u0631 \u062d\u0633\u064a\u0646 \u0639\u0628\u062f \u0627\u0644\u0627\u0645\u064a\u0631<\/td><td class=\"column-4\">Introduction of graph theory<\/td>\n<\/tr>\n<tr class=\"row-59\">\n\t<td class=\"column-1\">58<\/td><td class=\"column-2\">\u0633\u0645\u0627\u0621 \u0647\u0627\u062f\u064a \u062e\u0644\u064a\u0641 \u0643\u0631\u064a\u0645<\/td><td class=\"column-3\">\u0645.\u062f. \u0639\u0627\u062f\u0644 \u0631\u0627\u0634\u062f \u0639\u0628\u062f \u0639\u0644\u064a<\/td><td class=\"column-4\">Numerical Solution of the Equation of One Variable<\/td>\n<\/tr>\n<tr class=\"row-60\">\n\t<td class=\"column-1\">59<\/td><td class=\"column-2\">\u0634\u0647\u062f \u0641\u064a\u0635\u0644 \u063a\u0627\u0632\u064a \u0647\u0627\u062f\u064a <\/td><td class=\"column-3\">\u0645. \u0627\u0631\u064a\u062c \u0635\u0644\u0627\u062d \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">Application of Decomposition Method for Heat Equation<\/td>\n<\/tr>\n<tr class=\"row-61\">\n\t<td class=\"column-1\">60<\/td><td class=\"column-2\">\u0639\u0630\u0631\u0627\u0621 \u0643\u0645\u0627\u0644 \u0646\u062c\u0645 \u0639\u0628\u062f \u0627\u0644\u0644\u0647 <\/td><td class=\"column-3\">\u0645.\u062f. \u0645\u0647\u0646\u062f \u0646\u0627\u0641\u0639 \u062c\u0639\u0641\u0631<\/td><td class=\"column-4\">SEIR modeling Salmonella typhi<\/td>\n<\/tr>\n<tr class=\"row-62\">\n\t<td class=\"column-1\">61<\/td><td class=\"column-2\">\u0639\u0630\u0631\u0627\u0621 \u0646\u0630\u064a\u0631 \u0639\u0628\u062f \u0627\u0644\u0644\u0647 \u0627\u062d\u0645\u062f<\/td><td class=\"column-3\">\u0645.\u062f. \u0647\u064a\u0627\u0645 \u0645\u0647\u062f\u064a \u062c\u0648\u0627\u062f<\/td><td class=\"column-4\">Mathematical logical thinking included in the mathematics book for the first intermediate grade<\/td>\n<\/tr>\n<tr class=\"row-63\">\n\t<td class=\"column-1\">62<\/td><td class=\"column-2\">\u0639\u0642\u064a\u0644 \u0635\u0628\u064a\u062d \u063a\u0636\u064a\u0628 \u0639\u0644\u064a<\/td><td class=\"column-3\">\u0645.\u062f. \u0645\u0647\u0646\u062f \u0646\u0627\u0641\u0639 \u062c\u0639\u0641\u0631<\/td><td class=\"column-4\">SCIR modeling Salmonella typhi<\/td>\n<\/tr>\n<tr class=\"row-64\">\n\t<td class=\"column-1\">63<\/td><td class=\"column-2\">\u0639\u0644\u0627\u0621 \u0643\u0631\u064a\u0645 \u0645\u0646\u062d\u0648\u0634 \u062e\u0645\u0627\u0637 <\/td><td class=\"column-3\">\u0645.\u0645. \u0627\u064a\u0645\u0627\u0646 \u062d\u0633\u0646 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">The Real Functions<\/td>\n<\/tr>\n<tr class=\"row-65\">\n\t<td class=\"column-1\">64<\/td><td class=\"column-2\">\u0639\u0644\u064a \u062d\u064a\u062f\u0631 \u062c\u0628\u0631 \u0643\u0627\u0638\u0645<\/td><td class=\"column-3\">\u0645.\u062f. \u0648\u0641\u0627\u0621 \u0631\u062d\u064a\u0645 \u062d\u0633\u064a\u0646<\/td><td class=\"column-4\">Applications of Linear Programming in Industry<\/td>\n<\/tr>\n<tr class=\"row-66\">\n\t<td class=\"column-1\">65<\/td><td class=\"column-2\">\u0639\u0644\u064a \u0639\u0628\u062f \u0627\u0644\u0644\u0647 \u0639\u0628\u0627\u0633 \u062d\u0633\u064a\u0646<\/td><td class=\"column-3\">\u0645.\u062f. \u062a\u0645\u0627\u0631\u0627 \u0634\u0647\u0627\u0628 \u0627\u062d\u0645\u062f<\/td><td class=\"column-4\">The Solving of Linear Klein-Gordon Equation by Using Iteration Method<\/td>\n<\/tr>\n<tr class=\"row-67\">\n\t<td class=\"column-1\">66<\/td><td class=\"column-2\">\u0639\u0644\u064a \u0647\u0627\u062f\u064a \u0643\u0627\u0638\u0645 \u0628\u0627\u0637\u0644 <\/td><td class=\"column-3\">\u0645.\u062f. \u0648\u0641\u0627\u0621 \u0631\u062d\u064a\u0645 \u062d\u0633\u064a\u0646<\/td><td class=\"column-4\">Applications of Hyperbola<\/td>\n<\/tr>\n<tr class=\"row-68\">\n\t<td class=\"column-1\">67<\/td><td class=\"column-2\">\u063a\u0635\u0648\u0646 \u062d\u064a\u062f\u0631 \u062d\u0645\u064a\u062f \u062a\u0648\u0641\u064a\u0642<\/td><td class=\"column-3\">\u0645. \u0633\u0645\u0627\u0647\u0631 \u0645\u0631\u0632 \u064a\u0627\u0633\u064a\u0646<\/td><td class=\"column-4\">Variational Iteration Method for solving The Linear Schrodinger Equations<\/td>\n<\/tr>\n<tr class=\"row-69\">\n\t<td class=\"column-1\">68<\/td><td class=\"column-2\">\u0641\u0627\u0636\u0644 \u062d\u0633\u0627\u0646 \u0635\u0627\u0644\u062d \u0645\u0647\u062f\u064a  <\/td><td class=\"column-3\">\u0645.\u0645. \u0645\u0635\u0637\u0641\u0649 \u0645\u062d\u0645\u062f \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">Measure and Integration<\/td>\n<\/tr>\n<tr class=\"row-70\">\n\t<td class=\"column-1\">69<\/td><td class=\"column-2\">\u0641\u0627\u0637\u0645\u0629 \u0647\u0627\u062f\u064a \u062e\u0648\u064a\u0646 \u062d\u0645\u064a\u062f\u064a<\/td><td class=\"column-3\">\u0645.\u0645. \u0631\u064a\u0645 \u0648\u0644\u064a\u062f \u062d\u0633\u064a\u0646<\/td><td class=\"column-4\">\u0627\u0644\u0639\u0627\u0644\u0645 \u0641\u064a\u062b\u0627\u063a\u0648\u0631\u0633 \u0648\u062a\u0637\u0628\u064a\u0642\u0627\u062a \u0641\u064a \u0639\u0644\u0645 \u0627\u0644\u0631\u064a\u0627\u0636\u064a\u0627\u062a<\/td>\n<\/tr>\n<tr class=\"row-71\">\n\t<td class=\"column-1\">70<\/td><td class=\"column-2\">\u0642\u0627\u0633\u0645 \u062d\u0633\u0646 \u0631\u0627\u0636\u064a \u062d\u0633\u0646<\/td><td class=\"column-3\">\u0623.\u062f. \u0633\u0644\u0648\u0649 \u0633\u0644\u0645\u0627\u0646 \u0639\u0628\u062f<\/td><td class=\"column-4\">STUDY ON MEASURABLE FUNCTIONS<\/td>\n<\/tr>\n<tr class=\"row-72\">\n\t<td class=\"column-1\">71<\/td><td class=\"column-2\">\u0645\u0627\u062c\u062f \u0645\u0634\u0639\u0627\u0646 \u062d\u0645\u064a\u062f \u0636\u0627\u0631\u064a <\/td><td class=\"column-3\">\u0645.\u0645. \u0645\u0635\u0637\u0641\u0649 \u0645\u062d\u0645\u062f \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">Another Concept of Convergence in Topological Space<\/td>\n<\/tr>\n<tr class=\"row-73\">\n\t<td class=\"column-1\">72<\/td><td class=\"column-2\">\u0645\u062d\u0633\u0646 \u0643\u0627\u0645\u0644 \u0639\u0628\u062f \u0627\u0644\u0639\u0632\u064a\u0632<\/td><td class=\"column-3\">\u0645.\u0645. \u0645\u0635\u0637\u0641\u0649 \u0645\u062d\u0645\u062f \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">Study of Measure and integration<\/td>\n<\/tr>\n<tr class=\"row-74\">\n\t<td class=\"column-1\">73<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u062c\u0645\u0627\u0644 \u0645\u062d\u0645\u0648\u062f \u0635\u0627\u0644\u062d <\/td><td class=\"column-3\">\u0645.\u062f. \u0639\u0644\u064a \u0637\u0627\u0644\u0628 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">Simple and Multiple Linear Regression<\/td>\n<\/tr>\n<tr class=\"row-75\">\n\t<td class=\"column-1\">74<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u062d\u0633\u0648\u0646 \u0628\u0644\u0627\u0633\u0645 \u0645\u0638\u0644\u0648\u0645<\/td><td class=\"column-3\">\u0645. \u0647\u062f\u064a\u0644 \u062d\u0633\u064a\u0646 \u0644\u0639\u064a\u0628\u064a<\/td><td class=\"column-4\">Common fixed points for weakly compatible maps<\/td>\n<\/tr>\n<tr class=\"row-76\">\n\t<td class=\"column-1\">75<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u0645\u0635\u0637\u0641\u0649 \u0633\u062a\u0627\u0631 \u0645\u0637\u0631<\/td><td class=\"column-3\">\u0645.\u062f. \u0639\u0642\u064a\u0644 \u0641\u0627\u0644\u062d \u062c\u062f\u0648\u0639<\/td><td class=\"column-4\">Fredholm Integro-Differential Equation with Variational Iteration Method<\/td>\n<\/tr>\n<tr class=\"row-77\">\n\t<td class=\"column-1\">76<\/td><td class=\"column-2\">\u0645\u062d\u0645\u0648\u062f \u062c\u0648\u0627\u062f \u0643\u0627\u0638\u0645 \u0644\u0641\u062a\u0647 <\/td><td class=\"column-3\">\u0623.\u0645. \u0633\u0646\u0627\u0646 \u0647\u0627\u062a\u0641 \u0639\u0628\u062f \u0627\u0644\u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">Semi-Analytical Method for Solving Second Order Ordinary Differential Equation<\/td>\n<\/tr>\n<tr class=\"row-78\">\n\t<td class=\"column-1\">77<\/td><td class=\"column-2\">\u0645\u0631\u064a\u0645 \u0639\u0644\u064a \u0628\u0627\u0642\u0631 \u0645\u0647\u062f\u064a <\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0646\u0627\u062f\u064a\u0629 \u0641\u0627\u0626\u0642 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">B- Compact Set in Topological Space<\/td>\n<\/tr>\n<tr class=\"row-79\">\n\t<td class=\"column-1\">78<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u062d\u0645\u064a\u062f \u0643\u0627\u0638\u0645 \u0639\u0628\u064a\u062f<\/td><td class=\"column-3\">\u0645.\u062f. \u063a\u062f\u064a\u0631 \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0627\u0644\u0627\u0646\u062d\u062f\u0627\u0631 \u0627\u0644\u062e\u0637\u064a \u0627\u0644\u0645\u062a\u0639\u062f\u062f<\/td>\n<\/tr>\n<tr class=\"row-80\">\n\t<td class=\"column-1\">79<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u0633\u0639\u062f \u0647\u0627\u062f\u064a \u0634\u064a\u062a\u064a <\/td><td class=\"column-3\">\u0645. \u0645\u0646\u0649 \u062f\u0627\u0648\u062f \u0633\u0644\u0645\u0627\u0646<\/td><td class=\"column-4\">\u0627\u0646\u0648\u0627\u0639 \u062a\u062d\u0644\u064a\u0644 \u0627\u0644\u0627\u0646\u062d\u062f\u0627\u0631<\/td>\n<\/tr>\n<tr class=\"row-81\">\n\t<td class=\"column-1\">80<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u0633\u0644\u0645\u0627\u0646 \u064a\u0627\u0633\u0631 \u062c\u0627\u0628\u0631<\/td><td class=\"column-3\">\u0645.\u0645. \u0627\u064a\u0645\u0627\u0646 \u0627\u062d\u0645\u062f \u0639\u0628\u062f\u0627\u0644\u0644\u0637\u064a\u0641<\/td><td class=\"column-4\">\u062a\u062d\u0644\u064a\u0644 \u0627\u0644\u0627\u0646\u062d\u062f\u0627\u0631 \u0627\u0644\u062e\u0637\u064a \u0627\u0644\u0628\u0633\u064a\u0637<\/td>\n<\/tr>\n<tr class=\"row-82\">\n\t<td class=\"column-1\">81<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u0639\u0645\u0627\u062f \u0643\u0627\u0638\u0645 \u0639\u0644\u064a <\/td><td class=\"column-3\">\u0645.\u062f. \u0633\u0639\u0627\u062f \u062c\u062f\u0639\u0627\u0646 \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">Generalized Topological Space<\/td>\n<\/tr>\n<tr class=\"row-83\">\n\t<td class=\"column-1\">82<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u0643\u0627\u0638\u0645 \u062e\u0636\u0631 \u062d\u062c\u064a\u0644<\/td><td class=\"column-3\">\u0645.\u062f. \u0634\u064a\u0645\u0627\u0621 \u0645\u062e\u0644\u0641 \u0634\u0631\u064a\u062f\u0647<\/td><td class=\"column-4\">Using Numerical Method for Solving Volterra Linear Integral Equations<\/td>\n<\/tr>\n<tr class=\"row-84\">\n\t<td class=\"column-1\">83<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u0646\u0648\u0631\u064a \u0645\u062d\u0645\u062f \u0639\u0632\u064a\u0632 <\/td><td class=\"column-3\">\u0623.\u062f. \u0633\u0644\u0648\u0649 \u0633\u0644\u0645\u0627\u0646 \u0639\u0628\u062f<\/td><td class=\"column-4\">ON MEASURE THEORY<\/td>\n<\/tr>\n<tr class=\"row-85\">\n\t<td class=\"column-1\">84<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u0647\u0627\u062f\u064a \u0639\u0644\u064a \u0645\u062d\u0645\u062f<\/td><td class=\"column-3\">\u0645. \u0641\u0640\u0631\u062d \u0641\u064a\u0635\u0644 \u063a\u0627\u0632\u064a<\/td><td class=\"column-4\">\u062d\u0644 \u0645\u0639\u0627\u062f\u0644\u0629 \u0627\u0644\u0640\u0645\u0648\u062c\u0629 \u0628\u0627\u0633\u062a\u062e\u062f\u0627\u0645 \u0637\u0631\u064a\u0642\u0629 \u0627\u062f\u0648\u0645\u064a\u0627\u0646 \u0627\u0644\u062a\u062d\u0644\u064a\u0644\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-86\">\n\t<td class=\"column-1\">85<\/td><td class=\"column-2\">\u0646\u0648\u0631 \u0645\u062d\u0645\u062f \u0646\u062c\u0645 \u0639\u0628\u062f \u0627\u0644\u0644\u0647 <\/td><td class=\"column-3\">\u0645. \u0647\u062f\u064a\u0644 \u062d\u0633\u064a\u0646 \u0644\u0639\u064a\u0628\u064a<\/td><td class=\"column-4\">Common fixed points theorems for compatible mapping<\/td>\n<\/tr>\n<tr class=\"row-87\">\n\t<td class=\"column-1\">86<\/td><td class=\"column-2\">\u0646\u0648\u0631 \u0645\u0647\u062f\u064a \u0646\u0648\u0631\u064a \u0639\u0628\u062f <\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0632\u064a\u0646\u0629 \u062d\u0633\u064a\u0646 \u0645\u0639\u064a\u0628\u062f<\/td><td class=\"column-4\">Common fixed points of expansive mappings in generalized metric spaces<\/td>\n<\/tr>\n<tr class=\"row-88\">\n\t<td class=\"column-1\">87<\/td><td class=\"column-2\">\u0647\u0628\u0647 \u0645\u0646\u0635\u0648\u0631 \u062c\u0639\u0641\u0631 \u0635\u0627\u062f\u0642 <\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0646\u0627\u062f\u064a\u0629 \u0641\u0627\u0626\u0642 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">B-Open Sets in Topological Spaces<\/td>\n<\/tr>\n<tr class=\"row-89\">\n\t<td class=\"column-1\">88<\/td><td class=\"column-2\">\u0647\u062f\u0649 \u0633\u0627\u0644\u0645 \u062d\u0645\u064a\u062f \u062c\u0627\u0633\u0645 <\/td><td class=\"column-3\">\u0645. \u0623\u0633\u0645\u0627\u0621 \u0639\u0628\u062f \u0639\u0635\u0648\u0627\u062f<\/td><td class=\"column-4\">Solving a System of Ordinary Differential Equations Using Elzaki Transform<\/td>\n<\/tr>\n<tr class=\"row-90\">\n\t<td class=\"column-1\">89<\/td><td class=\"column-2\">\u0647\u062f\u0649 \u064a\u062d\u064a\u0649 \u062c\u0648\u0627\u062f \u0639\u0644\u064a <\/td><td class=\"column-3\">\u0645. \u0627\u062d\u0645\u062f \u0639\u064a\u0633\u0649 \u0639\u0628\u062f\u0627\u0644\u0646\u0628\u064a<\/td><td class=\"column-4\">\u062e\u0648\u0627\u0635 \u0627\u0644\u0645\u0642\u062f\u0631 \u0627\u0644\u062c\u064a\u062f<\/td>\n<\/tr>\n<tr class=\"row-91\">\n\t<td class=\"column-1\">90<\/td><td class=\"column-2\">\u0627\u0628\u0631\u0627\u0647\u064a\u0645 \u0639\u0632 \u0627\u0644\u062f\u064a\u0646 \u0639\u0628\u062f \u0627\u0644\u0628\u0627\u0642\u064a <\/td><td class=\"column-3\">\u0645.\u062f. \u0634\u064a\u0645\u0627\u0621 \u0633\u0644\u0645\u0627\u0646 \u0639\u0628\u062f<\/td><td class=\"column-4\">\u062a\u0637\u0628\u064a\u0642 \u0627\u0644\u0645\u0639\u0627\u062f\u0644\u0627\u062a \u0627\u0644\u062a\u0641\u0627\u0636\u0644\u064a\u0629 \u0641\u064a \u0627\u0644\u0641\u064a\u0632\u064a\u0627\u0621 \u0648\u0627\u0644\u0647\u0646\u062f\u0633\u0629<\/td>\n<\/tr>\n<tr class=\"row-92\">\n\t<td class=\"column-1\">91<\/td><td class=\"column-2\">\u0627\u062d\u0645\u062f \u0639\u0628\u062f \u0627\u0644\u0646\u0628\u064a \u0643\u0631\u064a\u0645 \u062e\u0644\u0641<\/td><td class=\"column-3\">\u0627.\u0645.\u062f \u064a\u0648\u0633\u0641 \u064a\u0639\u0643\u0648\u0628 \u064a\u0648\u0633\u0641<\/td><td class=\"column-4\">On contra-Precontinuous Function in topological spaces<\/td>\n<\/tr>\n<tr class=\"row-93\">\n\t<td class=\"column-1\">92<\/td><td class=\"column-2\">\u0627\u064a\u0647 \u0628\u0627\u0633\u0645 \u0642\u0627\u0633\u0645 \u062e\u0644\u064a\u0644<\/td><td class=\"column-3\">\u0645.\u062f. \u0645\u064a \u0645\u062d\u0645\u062f \u0647\u0644\u0627\u0644<\/td><td class=\"column-4\">Direct computation method to solve fredholm integral equation<\/td>\n<\/tr>\n<tr class=\"row-94\">\n\t<td class=\"column-1\">93<\/td><td class=\"column-2\">\u0628\u0644\u0642\u064a\u0633 \u0627\u062d\u0645\u062f \u0639\u0644\u064a \u0636\u064a\u063a\u0645<\/td><td class=\"column-3\">\u0645.\u062f. \u0639\u0644\u064a \u0637\u0627\u0644\u0628 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">Study of the convex set<\/td>\n<\/tr>\n<tr class=\"row-95\">\n\t<td class=\"column-1\">94<\/td><td class=\"column-2\">\u062d\u0633\u0646 \u062e\u0627\u0644\u062f \u0646\u0627\u0638\u0645 \u062c\u0627\u0628\u0631<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u064a\u0648\u0633\u0641 \u064a\u0639\u0643\u0648\u0628 \u064a\u0648\u0633\u0641<\/td><td class=\"column-4\">On contra-Semicontinuous Functions in topological Spaces<\/td>\n<\/tr>\n<tr class=\"row-96\">\n\t<td class=\"column-1\">95<\/td><td class=\"column-2\">\u062d\u0633\u0646 \u0631\u064a\u0627\u0636 \u062f\u062d\u0627\u0645 \u0643\u0627\u0638\u0645<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0631\u0646\u0627 \u0628\u0647\u062c\u062a \u0627\u0633\u0645\u0627\u0639\u064a\u0644<\/td><td class=\"column-4\">Some concepts in the ideal space<\/td>\n<\/tr>\n<tr class=\"row-97\">\n\t<td class=\"column-1\">96<\/td><td class=\"column-2\">\u062d\u0633\u064a\u0646 \u0645\u0627\u0631\u062f \u062d\u0637\u064a\u062d\u0637 \u0631\u0647\u064a\u0641<\/td><td class=\"column-3\">\u0645.\u062f. \u0628\u064a\u062f\u0627\u0621 \u0639\u0637\u064a\u0629 \u062e\u0644\u0641<\/td><td class=\"column-4\">Logistic Distribution<\/td>\n<\/tr>\n<tr class=\"row-98\">\n\t<td class=\"column-1\">97<\/td><td class=\"column-2\">\u062d\u0645\u064a\u062f \u062e\u0627\u0644\u062f \u0646\u0639\u0645\u0627\u0646 \u062d\u0646\u062a\u0648\u0634<\/td><td class=\"column-3\">\u0627.\u062f. \u0645\u062c\u064a\u062f \u0627\u062d\u0645\u062f \u0648\u0644\u064a<\/td><td class=\"column-4\">The Variational Iteration Method for solving the one-dimensional Rayleigh Plesset equation<\/td>\n<\/tr>\n<tr class=\"row-99\">\n\t<td class=\"column-1\">98<\/td><td class=\"column-2\">\u062d\u064a\u062f\u0631 \u063a\u0627\u0632\u064a \u0645\u062d\u0645\u062f \u0641\u0646\u062c\u0627\u0646<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0627\u062d\u0645\u062f \u0627\u0628\u0631\u0627\u0647\u064a\u0645 \u0646\u0627\u0635\u0631<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u062a\u0637\u0628\u064a\u0642\u0627\u062a \u0627\u0644\u062a\u0641\u0627\u0636\u0644 \u0627\u0644\u0631\u064a\u0627\u0636\u064a<\/td>\n<\/tr>\n<tr class=\"row-100\">\n\t<td class=\"column-1\">99<\/td><td class=\"column-2\">\u062e\u0627\u0644\u062f \u0639\u0648\u0627\u062f \u062d\u0628\u062a\u0631 \u0645\u0633\u064a\u0631<\/td><td class=\"column-3\">\u0645.\u0645. \u0639\u0628\u064a\u0631 \u062d\u0633\u064a\u0646 \u0639\u0628\u062f \u0627\u0644\u0627\u0645\u064a\u0631<\/td><td class=\"column-4\">Introduction of graph theory and application<\/td>\n<\/tr>\n<tr class=\"row-101\">\n\t<td class=\"column-1\">100<\/td><td class=\"column-2\">\u062f\u0627\u0644\u064a\u0627 \u0627\u062d\u0645\u062f \u0639\u0644\u064a \u0643\u0627\u0638\u0645<\/td><td class=\"column-3\">\u0645.\u0634\u064a\u0645\u0627\u0621 \u0645\u062e\u0644\u0641 \u0634\u0631\u064a\u062f\u0647<\/td><td class=\"column-4\">\u0627\u0633\u062a\u062e\u062f\u0627\u0645 \u062a\u062d\u0648\u064a\u0644 \u0634\u0648\u0627\u0631\u0632- \u0643\u0631\u0633\u062a\u0648\u0641\u0644 \u0648\u062a\u0637\u0628\u064a\u0642\u0627\u062a\u0647<\/td>\n<\/tr>\n<tr class=\"row-102\">\n\t<td class=\"column-1\">101<\/td><td class=\"column-2\">\u062f\u0639\u0627\u0621 \u0643\u0631\u064a\u0645 \u0627\u062d\u0645\u062f \u0643\u0646\u0647\u0631<\/td><td class=\"column-3\">\u0627.\u062f. \u0645\u062c\u064a\u062f \u0627\u062d\u0645\u062f \u0648\u0644\u064a<\/td><td class=\"column-4\">The Variational Iteration Method for solving the painlev\u00e9 equations<\/td>\n<\/tr>\n<tr class=\"row-103\">\n\t<td class=\"column-1\">102<\/td><td class=\"column-2\">\u0631\u063a\u062f \u0627\u062d\u0645\u062f \u0639\u0644\u064a \u062f\u0627\u0648\u062f<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0641\u0627\u0643\u0645\u0629 \u0641\u064a\u0635\u0644 \u0643\u0631\u064a\u0645<\/td><td class=\"column-4\">The Cayley's Theorem and its applications<\/td>\n<\/tr>\n<tr class=\"row-104\">\n\t<td class=\"column-1\">103<\/td><td class=\"column-2\">\u0631\u0646\u0627 \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f \u0633\u0643\u0631\u0627\u0646<\/td><td class=\"column-3\">\u0645. \u0647\u062f\u064a\u0644 \u062d\u0633\u064a\u0646 \u0644\u0639\u064a\u0628\u064a<\/td><td class=\"column-4\">On common fixed points in G-metric spaces using ( E . A ) Property<\/td>\n<\/tr>\n<tr class=\"row-105\">\n\t<td class=\"column-1\">104<\/td><td class=\"column-2\">\u0632\u064a\u0646\u0628 \u0635\u0628\u064a\u062d \u0627\u0644\u0639\u064a\u0628\u064a \u064a\u0648\u0633\u0641<\/td><td class=\"column-3\">\u0645. \u0645\u0646\u0649 \u062f\u0627\u0648\u062f \u0633\u0644\u0645\u0627\u0646<\/td><td class=\"column-4\">\u0623\u0639\u062f\u0627\u062f \u0641\u064a\u0631\u0645\u0627<\/td>\n<\/tr>\n<tr class=\"row-106\">\n\t<td class=\"column-1\">105<\/td><td class=\"column-2\">\u0632\u064a\u0646\u0628 \u0645\u062d\u0645\u062f \u0646\u0627\u064a\u0641 \u062d\u0633\u0646<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0628\u0627\u0633\u0645 \u0645\u062d\u0645\u062f \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0646\u0648\u0631 \u0627\u0644\u0631\u064a\u0627\u0636\u064a \u0648\u0639\u0644\u0627\u0642\u062a\u0647 \u0628\u0627\u0644\u0630\u0643\u0627\u0621 \u0627\u0644\u0645\u0643\u0627\u0646\u064a \u0627\u0644\u0628\u0635\u0631\u064a \u0644\u062f\u0649 \u0637\u0644\u0628\u0629 \u0642\u0633\u0645 \u0627\u0644\u0631\u064a\u0627\u0636\u064a\u0627\u062a \u0644\u0643\u0644\u064a\u0627\u062a \u0627\u0644\u062a\u0631\u0628\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-107\">\n\t<td class=\"column-1\">106<\/td><td class=\"column-2\">\u0633\u0627\u0631\u0647 \u0642\u0627\u0633\u0645 \u0648\u0634\u0644 \u0647\u0628\u0639<\/td><td class=\"column-3\">\u0645. \u0641\u0631\u062d \u0641\u064a\u0635\u0644 \u063a\u0627\u0632\u064a<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u062a\u0637\u0628\u064a\u0642\u0627\u062a \u0645\u0639\u0627\u062f\u0644\u0629 \u0627\u0644\u062d\u0631\u0627\u0631\u0629 \u0627\u0644\u062e\u0637\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-108\">\n\t<td class=\"column-1\">107<\/td><td class=\"column-2\">\u0633\u062c\u0649 \u0637\u0647 \u0639\u0628\u062f \u0639\u0628\u062f\u0627\u0644\u0644\u0647<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0646\u064a\u0631\u0627\u0646 \u0635\u0628\u0627\u062d \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">\u0627\u0644\u0627\u0645\u062a\u062f\u0627\u062f \u0627\u0644\u0646\u0627\u0638\u0645\u064a<\/td>\n<\/tr>\n<tr class=\"row-109\">\n\t<td class=\"column-1\">108<\/td><td class=\"column-2\">\u0633\u0645\u064a\u0629 \u064a\u0627\u0633\u064a\u0646 \u0627\u062d\u0645\u062f \u062c\u0631\u0628\u0648\u0639<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0628\u0627\u0633\u0645 \u0645\u062d\u0645\u062f \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0646\u0648\u0631 \u0627\u0644\u0631\u064a\u0627\u0636\u064a \u0648\u0639\u0644\u0627\u0642\u062a\u0647 \u0628\u0627\u0644\u0630\u0643\u0627\u0621 \u0627\u0644\u0645\u0643\u0627\u0646\u064a \u0627\u0644\u0628\u0635\u0631\u064a \u0644\u062f\u0649 \u0637\u0644\u0628\u0629 \u0642\u0633\u0645 \u0627\u0644\u0631\u064a\u0627\u0636\u064a\u0627\u062a \u0644\u0643\u0644\u064a\u0627\u062a \u0627\u0644\u062a\u0631\u0628\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-110\">\n\t<td class=\"column-1\">109<\/td><td class=\"column-2\">\u0636\u062d\u0649 \u0627\u062d\u0645\u062f \u0645\u0648\u0633\u0649 <\/td><td class=\"column-3\">\u0645.\u0645. \u0647\u062f\u0649 \u0639\u0645\u0627\u062f \u0627\u0644\u062f\u064a\u0646 \u062c\u0645\u064a\u0644<\/td><td class=\"column-4\">sing the Series Solution Method and the Successive Approximations Method to Solve Linear Volterra Integral Equation<\/td>\n<\/tr>\n<tr class=\"row-111\">\n\t<td class=\"column-1\">110<\/td><td class=\"column-2\">\u0636\u062d\u0649 \u0641\u0631\u062d\u0627\u0646 \u062c\u062f\u0648\u0639 \u0639\u0644\u064a<\/td><td class=\"column-3\">\u0627.\u0645. \u0627\u0644\u0627\u0621 \u0645\u0627\u062c\u062f \u062d\u0645\u062f<\/td><td class=\"column-4\">\u062a\u0637\u0628\u064a\u0642 \u062a\u0648\u0632\u064a\u0639 \u0644\u0648\u0645\u0643\u0633 \u0627\u0627\u0644\u0633\u064a \u0627\u0644\u0645\u0642\u064a\u062f: \u0645\u0639 COVED-19<\/td>\n<\/tr>\n<tr class=\"row-112\">\n\t<td class=\"column-1\">111<\/td><td class=\"column-2\">\u0637\u0627\u0644\u0628 \u0633\u0645\u0627\u0639\u064a\u0644 \u064a\u0627\u0633\u064a\u0646 \u0627\u062d\u0645\u062f<\/td><td class=\"column-3\">\u0627.\u0645. \u0627\u064a\u0645\u0627\u0646 \u0639\u0628\u062f\u0627\u0644\u0644\u0637\u064a\u0641 \u0639\u0628\u062f\u0627\u0644\u0631\u0632\u0627\u0642<\/td><td class=\"column-4\">Convergence, accuracy, and stability<\/td>\n<\/tr>\n<tr class=\"row-113\">\n\t<td class=\"column-1\">112<\/td><td class=\"column-2\">\u0637\u064a\u0628\u0647 \u0645\u0645\u062a\u0627\u0632 \u0641\u0631\u062d\u0627\u0646 \u0632\u0627\u0647\u064a<\/td><td class=\"column-3\">\u0645. \u0641\u0631\u062d \u0641\u064a\u0635\u0644 \u063a\u0627\u0632\u064a<\/td><td class=\"column-4\">\u062d\u0644 \u0645\u0639\u0627\u062f\u0644\u0629 \u0627\u0644\u062d\u0631\u0627\u0631\u0629 \u0628\u0627\u0633\u062a\u062e\u062f\u0627\u0645 \u0637\u0631\u064a\u0642\u0629 \u0627\u062f\u0648\u0645\u064a\u0627\u0646 \u0627\u0644\u062a\u0643\u0631\u0627\u0631\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-114\">\n\t<td class=\"column-1\">113<\/td><td class=\"column-2\">\u0639\u0628\u0627\u0633 \u0639\u0630\u0627\u0628 \u062c\u0648\u0627\u062f <\/td><td class=\"column-3\">\u0645. \u0645\u0646\u0649 \u062f\u0627\u0648\u062f \u0633\u0644\u0645\u0627\u0646<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u0645\u0646 \u062a\u0637\u0628\u064a\u0642\u0627\u062a \u062a\u062d\u0644\u064a\u0644 \u0627\u0644\u0627\u0646\u062d\u062f\u0627\u0631<\/td>\n<\/tr>\n<tr class=\"row-115\">\n\t<td class=\"column-1\">114<\/td><td class=\"column-2\">\u0639\u0628\u0627\u0633 \u0641\u0627\u0636\u0644 \u0648\u064a\u0633 \u0645\u062d\u0645\u062f<\/td><td class=\"column-3\">\u0645.\u0645. \u0636\u062d\u0649 \u0635\u0628\u0627\u062d \u0627\u062d\u0645\u062f<\/td><td class=\"column-4\">Solving Non-linear Equations using Fixed-Point Iteration Method in MATLAB<\/td>\n<\/tr>\n<tr class=\"row-116\">\n\t<td class=\"column-1\">115<\/td><td class=\"column-2\">\u0639\u0628\u062f \u0627\u0644\u0631\u062d\u0645\u0646 \u0645\u0624\u064a\u062f \u0645\u062d\u0645\u062f <\/td><td class=\"column-3\">\u0645.\u0645. \u0645\u0635\u0637\u0641\u0649 \u0645\u062d\u0645\u062f \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">Alternative Concept of Convergence in Topological Space<\/td>\n<\/tr>\n<tr class=\"row-117\">\n\t<td class=\"column-1\">116<\/td><td class=\"column-2\">\u0639\u0628\u062f \u0627\u0644\u0633\u062a\u0627\u0631 \u0643\u0627\u0645\u0644 \u062d\u0646\u0634\u0644 <\/td><td class=\"column-3\">\u0645.\u062f. \u063a\u062f\u064a\u0631 \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0627\u0644\u0627\u0646\u062d\u062f\u0627\u0631 \u0627\u0644\u062e\u0637\u064a \u0627\u0644\u0645\u062a\u0639\u062f\u062f<\/td>\n<\/tr>\n<tr class=\"row-118\">\n\t<td class=\"column-1\">117<\/td><td class=\"column-2\">\u0639\u0628\u062f \u0627\u0644\u0647\u0627\u062f\u064a \u0634\u0627\u0643\u0631 \u0645\u062d\u0645\u0648\u062f <\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0627\u062d\u0645\u062f \u0627\u0628\u0631\u0627\u0647\u064a\u0645 \u0646\u0627\u0635\u0631<\/td><td class=\"column-4\">\u062d\u0644 \u0627\u0644\u0645\u0639\u0627\u062f\u0644\u0627\u062a \u0627\u0644\u062a\u0641\u0627\u0636\u0644\u064a\u0629 \u0627\u0644\u062e\u0637\u064a\u0629 \u0627\u0644\u0645\u062a\u062c\u0627\u0646\u0633\u0629 \u0648\u063a\u064a\u0631 \u0627\u0644\u0645\u062a\u062c\u0627\u0646\u0633\u0629 \u0645\u0646 \u0627\u0644\u0631\u062a\u0628\u0629 n \u0630\u0627\u062a \u0627\u0644\u0645\u0639\u0627\u0645\u0644\u0627\u062a \u0627\u0644\u062b\u0627\u0628\u062a\u0629<\/td>\n<\/tr>\n<tr class=\"row-119\">\n\t<td class=\"column-1\">118<\/td><td class=\"column-2\">\u0639\u0644\u064a \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f \u0645\u0637\u0631<\/td><td class=\"column-3\">\u0645.\u0645. \u0636\u062d\u0649 \u0635\u0628\u0627\u062d \u0627\u062d\u0645\u062f<\/td><td class=\"column-4\">Solving Ordinary Differential Equations using Euler and Runge-Kutta Methods<\/td>\n<\/tr>\n<tr class=\"row-120\">\n\t<td class=\"column-1\">119<\/td><td class=\"column-2\">\u0639\u0644\u064a \u0643\u0631\u064a\u0645 \u0639\u0628\u062f \u0627\u0644\u0644\u0647 \u0639\u0644\u0648\u0643\u064a<\/td><td class=\"column-3\">\u0645. \u062d\u0646\u0627\u0646 \u0641\u0627\u0631\u0648\u0642 \u0642\u0627\u0633\u0645<\/td><td class=\"column-4\">The Homogeneous Fredholm Integral Equations<\/td>\n<\/tr>\n<tr class=\"row-121\">\n\t<td class=\"column-1\">120<\/td><td class=\"column-2\">\u0639\u0644\u064a\u0627\u0621 \u0645\u062d\u0633\u0646 \u062a\u0627\u064a\u0647 \u0639\u0648\u064a\u062f<\/td><td class=\"column-3\">\u0645.\u062f. \u0628\u064a\u062f\u0627\u0621 \u0639\u0637\u064a\u0629 \u062e\u0644\u0641<\/td><td class=\"column-4\">Laplace distribution<\/td>\n<\/tr>\n<tr class=\"row-122\">\n\t<td class=\"column-1\">121<\/td><td class=\"column-2\">\u0641\u0627\u0637\u0645\u0647 \u0633\u0639\u062f \u0645\u062d\u0645\u062f \u062d\u0631\u062f\u0627\u0646<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0646\u064a\u0631\u0627\u0646 \u0635\u0628\u0627\u062d \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">\u0645\u0642\u0627\u0633\u0627\u062a \u0627\u0644\u0641\u062a\u0644<\/td>\n<\/tr>\n<tr class=\"row-123\">\n\t<td class=\"column-1\">122<\/td><td class=\"column-2\">\u0641\u0631\u062d \u0639\u0645\u0631 \u0645\u062d\u0645\u062f \u0639\u0628\u0648\u062f<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0635\u0628\u0627 \u0646\u0627\u0635\u0631 \u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">Solving Linear Problems in Two and Three Variables<\/td>\n<\/tr>\n<tr class=\"row-124\">\n\t<td class=\"column-1\">123<\/td><td class=\"column-2\">\u0642\u062a\u064a\u0628\u0647 \u0634\u0647\u0627\u0628 \u0627\u062d\u0645\u062f \u0639\u0628\u062f \u0627\u0644\u0644\u0647<\/td><td class=\"column-3\">\u0645.\u0645. \u0631\u064a\u0645 \u0648\u0644\u064a\u062f \u062d\u0633\u064a\u0646<\/td><td class=\"column-4\">\u0627\u0633\u0644\u0648\u0628 \u0645\u0627\u0631\u0643\u0648\u0641 \u0643\u0623\u062f\u0627\u0629 \u0644\u0644\u062a\u0646\u0628\u0624<\/td>\n<\/tr>\n<tr class=\"row-125\">\n\t<td class=\"column-1\">124<\/td><td class=\"column-2\">\u0643\u0627\u0638\u0645 \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f \u0639\u0630\u0627\u0628<\/td><td class=\"column-3\">\u0645.\u062f. \u0634\u064a\u0645\u0627\u0621 \u0633\u0644\u0645\u0627\u0646 \u0639\u0628\u062f<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u062a\u0637\u0628\u064a\u0642\u0627\u062a \u0627\u0644\u062a\u0643\u0627\u0645\u0644 \u0627\u0644\u0645\u064f\u0639\u062a\u0644<\/td>\n<\/tr>\n<tr class=\"row-126\">\n\t<td class=\"column-1\">125<\/td><td class=\"column-2\">\u0643\u0631\u0627\u0631 \u0634\u0627\u0643\u0631 \u0645\u062d\u0645\u0648\u062f \u0627\u0633\u0645\u0627\u0639\u064a\u0644<\/td><td class=\"column-3\">\u0645.\u0645. \u0636\u062d\u0649 \u0635\u0628\u0627\u062d \u0627\u062d\u0645\u062f<\/td><td class=\"column-4\">Solving Non-linear Equations using Bisection Method in MATLAB<\/td>\n<\/tr>\n<tr class=\"row-127\">\n\t<td class=\"column-1\">126<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u0627\u0644\u0628\u0627\u0642\u0631 \u062c\u0639\u0641\u0631 \u0639\u0628\u062f \u0627\u0644\u0644\u0637\u064a\u0641 <\/td><td class=\"column-3\">\u0645.\u062f. \u0645\u062d\u0645\u062f \u0639\u0644\u064a \u0627\u062d\u0645\u062f<\/td><td class=\"column-4\">Some types of system of  Linear equations<\/td>\n<\/tr>\n<tr class=\"row-128\">\n\t<td class=\"column-1\">127<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u0627\u0644\u0635\u0627\u062f\u0642 \u0639\u0644\u0627\u0621 \u062d\u0633\u064a\u0646 <\/td><td class=\"column-3\">\u0645.\u0645. \u0631\u064a\u0645 \u0645\u0646\u0630\u0631 \u064a\u0648\u0646\u0633<\/td><td class=\"column-4\">The Direct Computation Method for Solving Fredholm Integro Differential Eguations<\/td>\n<\/tr>\n<tr class=\"row-129\">\n\t<td class=\"column-1\">128<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u062d\u0633\u064a\u0646 \u0639\u0644\u064a \u0639\u0646\u0627\u062f<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0635\u0628\u0627\u062d \u062d\u0633\u0646 \u0645\u0627\u0644\u062d<\/td><td class=\"column-4\">Common fixed point in b-metric space<\/td>\n<\/tr>\n<tr class=\"row-130\">\n\t<td class=\"column-1\">129<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u0639\u062f\u064a \u062d\u0627\u062a\u0645 \u0641\u064a\u0627\u0636<\/td><td class=\"column-3\">\u0645.\u062f. \u063a\u062f\u064a\u0631 \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">\u0627\u0644\u0627\u0646\u062d\u062f\u0627\u0631 \u0627\u0644\u062e\u0637\u064a \u0648\u062a\u0637\u0628\u064a\u0642\u0627\u062a\u0647<\/td>\n<\/tr>\n<tr class=\"row-131\">\n\t<td class=\"column-1\">130<\/td><td class=\"column-2\">\u0645\u0631\u062a\u0636\u0649 \u0642\u0627\u0633\u0645 \u0628\u062f\u0631 \u0633\u062f\u062e\u0627\u0646<\/td><td class=\"column-3\">\u0645.\u0645. \u0636\u062d\u0649 \u0635\u0628\u0627\u062d \u0627\u062d\u0645\u062f<\/td><td class=\"column-4\">Solving Ordinary Differential Equations using Taylor Series Method in MATLAB<\/td>\n<\/tr>\n<tr class=\"row-132\">\n\t<td class=\"column-1\">131<\/td><td class=\"column-2\">\u0645\u0631\u064a\u0645 \u0627\u062d\u0645\u062f \u062d\u0645\u062f\u064a \u0627\u062d\u0645\u062f<\/td><td class=\"column-3\">\u0627.\u0645. \u0633\u0646\u0627\u0646 \u0647\u0627\u062a\u0641 \u0639\u0628\u062f\u0627\u0644\u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">Application of semi-analytical method in solving Heat equation<\/td>\n<\/tr>\n<tr class=\"row-133\">\n\t<td class=\"column-1\">132<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u0641\u0631\u062d\u0627\u0646 \u0635\u0643\u0628 \u0639\u0644\u064a<\/td><td class=\"column-3\">\u0627.\u062f. \u062d\u0627\u062a\u0645 \u064a\u062d\u064a\u0649 \u062e\u0644\u0641<\/td><td class=\"column-4\">Polynomial Rings with some results<\/td>\n<\/tr>\n<tr class=\"row-134\">\n\t<td class=\"column-1\">133<\/td><td class=\"column-2\">\u0645\u0647\u062f\u064a \u0635\u0627\u0644\u062d \u0639\u064a\u062f\u0627\u0646 \u0625\u0633\u0645\u0627\u0639\u064a\u0644<\/td><td class=\"column-3\">\u0645.\u062f. \u0648\u0641\u0627\u0621 \u0631\u062d\u064a\u0645 \u062d\u0633\u064a\u0646<\/td><td class=\"column-4\">Applications of conic sections in real life<\/td>\n<\/tr>\n<tr class=\"row-135\">\n\t<td class=\"column-1\">134<\/td><td class=\"column-2\">\u0645\u0647\u0646\u062f \u0646\u0639\u064a\u0645 \u0643\u0627\u0638\u0645 \u0644\u0627\u064a\u0630<\/td><td class=\"column-3\">\u0627.\u062f. \u0628\u064a\u062f\u0627\u0621 \u0639\u0637\u064a\u0629 \u062e\u0644\u0641<\/td><td class=\"column-4\">Power Function Distribution<\/td>\n<\/tr>\n<tr class=\"row-136\">\n\t<td class=\"column-1\">135<\/td><td class=\"column-2\">\u0646\u0648\u0631 \u062c\u0648\u0627\u062f \u0639\u0628\u0627\u0633 \u0643\u0627\u0638\u0645<\/td><td class=\"column-3\">\u0645.\u0645\u0646\u0649 \u062f\u0627\u0648\u062f \u0633\u0644\u0645\u0627\u0646<\/td><td class=\"column-4\">\u0627\u0639\u062f\u0627\u062f \u0645\u0631\u0633\u064a\u0646<\/td>\n<\/tr>\n<tr class=\"row-137\">\n\t<td class=\"column-1\">136<\/td><td class=\"column-2\">\u0646\u0648\u0631 \u0641\u0648\u0632\u064a \u062e\u0644\u0641 \u0625\u0628\u0631\u0627\u0647\u064a\u0645<\/td><td class=\"column-3\">\u0627.\u0645. \u0627\u064a\u0645\u0627\u0646 \u0639\u0628\u062f\u0627\u0644\u0644\u0637\u064a\u0641 \u0639\u0628\u062f \u0627\u0644\u0631\u0632\u0627\u0642<\/td><td class=\"column-4\">The CLAWPACK software<\/td>\n<\/tr>\n<tr class=\"row-138\">\n\t<td class=\"column-1\">137<\/td><td class=\"column-2\">\u0647\u0628\u0629 \u0627\u0644\u0644\u0647 \u0645\u0627\u062c\u062f \u0639\u0628\u0648\u062f \u0645\u062d\u0645\u0648\u062f<\/td><td class=\"column-3\">\u0645. \u0631\u0646\u0627 \u0646\u0648\u0631\u064a \u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">On e-small submodules<\/td>\n<\/tr>\n<tr class=\"row-139\">\n\t<td class=\"column-1\">138<\/td><td class=\"column-2\">\u0647\u0646\u062f \u0645\u0642\u062f\u0627\u062f \u0633\u0644\u0645\u0627\u0646 \u064a\u0627\u0633\u064a\u0646<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0645\u0647\u0627 \u0639\u0628\u062f \u0627\u0644\u062c\u0628\u0627\u0631<\/td><td class=\"column-4\">Mathematical Modeling of the Spread of Social Epidemics and Some of its Analytical Solutions<\/td>\n<\/tr>\n<tr class=\"row-140\">\n\t<td class=\"column-1\">139<\/td><td class=\"column-2\">\u064a\u0648\u0633\u0641 \u0643\u0644\u0641 \u0639\u0644\u064a \u0639\u062c\u064a\u062f<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0645\u064a\u0633\u0648\u0646 \u0639\u0628\u062f \u0647\u0627\u0645\u0644<\/td><td class=\"column-4\">Primary ideals<\/td>\n<\/tr>\n<tr class=\"row-141\">\n\t<td class=\"column-1\">140<\/td><td class=\"column-2\">\u0627\u0644\u0627\u0621 \u0639\u0637\u0627 \u0645\u0647\u062f\u064a \u0641\u0644\u064a\u062d<\/td><td class=\"column-3\">\u0623.\u062f. \u0644\u0645\u0649 \u0646\u0627\u062c\u064a \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u062a\u062e\u0645\u064a\u0646 \u0627\u0646\u062a\u0627\u062c \u0627\u0644\u062d\u0646\u0637\u0629 \u0648\u0627\u0644\u0634\u0639\u064a\u0631 \u0641\u064a \u0627\u0644\u0639\u0631\u0627\u0642 \u0628\u0627\u0633\u062a\u062e\u062f\u0627\u0645 \u0637\u0631\u0642 \u0627\u0644\u062a\u0642\u0631\u064a\u0628<\/td>\n<\/tr>\n<tr class=\"row-142\">\n\t<td class=\"column-1\">141<\/td><td class=\"column-2\">\u0627\u0628\u0631\u0627\u0631 \u0639\u0642\u064a\u0644 \u0645\u062d\u0645\u062f \u0643\u0627\u0638\u0645<\/td><td class=\"column-3\">\u0623.\u062f. \u0633\u0644\u0648\u0649 \u0633\u0644\u0645\u0627\u0646 \u0639\u0628\u062f<\/td><td class=\"column-4\">SEQUENCES AND SERIES OF FUNCTIONS<\/td>\n<\/tr>\n<tr class=\"row-143\">\n\t<td class=\"column-1\">142<\/td><td class=\"column-2\">\u0627\u062d\u0645\u062f \u0633\u0627\u0645\u064a \u0627\u062d\u0645\u062f \u063a\u0627\u0641\u0644<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0635\u0628\u0627\u062d \u062d\u0633\u0646 \u0645\u0627\u0644\u062d<\/td><td class=\"column-4\">Fixed point in b- metric space<\/td>\n<\/tr>\n<tr class=\"row-144\">\n\t<td class=\"column-1\">143<\/td><td class=\"column-2\">\u0627\u062d\u0645\u062f \u0646\u062c\u0645 \u0639\u0644\u064a \u0630\u0646\u0648\u0646<\/td><td class=\"column-3\">\u0645.\u062f. \u0647\u064a\u0627\u0645 \u0645\u0647\u062f\u064a \u062c\u0648\u0627\u062f<\/td><td class=\"column-4\">\u0645\u0647\u0627\u0631\u0627\u062a \u0627\u0644\u062a\u0641\u0643\u064a\u0631 \u0627\u0644\u0645\u0646\u0638\u0648\u0645\u064a \u0627\u0644\u0645\u062a\u0636\u0645\u0646\u0629 \u0641\u064a \u0643\u062a\u0627\u0628 \u0627\u0644\u0631\u064a\u0627\u0636\u064a\u0627\u062a \u0644\u0644\u0635\u0641 \u0627\u0644\u062b\u0627\u0646\u064a \u0627\u0644\u0645\u062a\u0648\u0633\u0637<\/td>\n<\/tr>\n<tr class=\"row-145\">\n\t<td class=\"column-1\">144<\/td><td class=\"column-2\">\u0627\u0637\u064a\u0627\u0641 \u0645\u0647\u062f\u064a \u062e\u0644\u064a\u0641 \u0647\u0631\u0627\u0637<\/td><td class=\"column-3\">\u0645. \u0627\u0631\u064a\u062c \u0635\u0644\u0627\u062d \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">A domain decomposition method for solving duffing equation<\/td>\n<\/tr>\n<tr class=\"row-146\">\n\t<td class=\"column-1\">145<\/td><td class=\"column-2\">\u0627\u0645\u064a\u0631 \u0639\u0628\u0627\u0633 \u063a\u0627\u0632\u064a \u0639\u0628\u0627\u0633<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0645\u064a\u0633\u0648\u0646 \u0639\u0628\u062f \u0647\u0627\u0645\u0644<\/td><td class=\"column-4\">\u0627\u0644\u0645\u0642\u0627\u0633\u0627\u062a \u0627\u0644\u0636\u0628\u0627\u0628\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-147\">\n\t<td class=\"column-1\">146<\/td><td class=\"column-2\">\u0627\u064a\u0627\u062a \u0631\u0627\u0636\u064a \u0639\u0643\u0644\u0647 \u062d\u0627\u0641\u0638<\/td><td class=\"column-3\">\u0645. \u062d\u0646\u0627\u0646 \u0641\u0627\u0631\u0648\u0642 \u0642\u0627\u0633\u0645<\/td><td class=\"column-4\">\u0645\u0639\u0627\u062f\u0644\u0629 \u0628\u0631\u0646\u0648\u0644\u064a \u0648\u062a\u0637\u0628\u064a\u0642\u0627\u062a\u0647\u0627 \u0641\u064a \u0627\u0644\u062d\u064a\u0627\u0629<\/td>\n<\/tr>\n<tr class=\"row-148\">\n\t<td class=\"column-1\">147<\/td><td class=\"column-2\">\u0627\u064a\u0627\u062a \u0645\u062d\u0645\u0648\u062f \u062e\u0644\u064a\u0644 \u0643\u0627\u0638\u0645<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0627\u064a\u0645\u0627\u0646 \u0645\u062d\u0645\u062f \u0646\u0639\u0645\u0629<\/td><td class=\"column-4\">Studying Volterra Integro \u2013 Differential Equation with Adomian Decomposition Method<\/td>\n<\/tr>\n<tr class=\"row-149\">\n\t<td class=\"column-1\">148<\/td><td class=\"column-2\">\u0627\u064a\u0644\u0627\u0641 \u062d\u0627\u0632\u0645 \u0647\u0627\u0634\u0645 \u0642\u0646\u0628\u0631<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0635\u0628\u0627 \u0646\u0627\u0635\u0631 \u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">Principles of cryptography<\/td>\n<\/tr>\n<tr class=\"row-150\">\n\t<td class=\"column-1\">149<\/td><td class=\"column-2\">\u062a\u0628\u0627\u0631\u0643 \u064a\u0627\u0633\u064a\u0646 \u0643\u0627\u0637\u0639 \u0645\u062d\u0645\u062f<\/td><td class=\"column-3\">\u0645. \u0627\u0633\u0645\u0627\u0621 \u0639\u0628\u062f \u0639\u0635\u0648\u0627\u062f<\/td><td class=\"column-4\">Solving the Ordinary Differential Equations with Variable Coefficients Using Elzaki Transform<\/td>\n<\/tr>\n<tr class=\"row-151\">\n\t<td class=\"column-1\">150<\/td><td class=\"column-2\">\u062d\u0646\u0627\u0646 \u0639\u0644\u064a \u062d\u0633\u064a\u0646 \u0639\u0628\u062f \u0627\u0644\u0631\u0636\u0627<\/td><td class=\"column-3\">\u0645.\u062f. \u062a\u0645\u0627\u0631\u0629 \u0634\u0647\u0627\u0628 \u0627\u062d\u0645\u062f<\/td><td class=\"column-4\">The solving of Non-linear Kline-Gordon equation by using iteration method<\/td>\n<\/tr>\n<tr class=\"row-152\">\n\t<td class=\"column-1\">151<\/td><td class=\"column-2\">\u062d\u0648\u0631\u0627\u0621 \u0636\u064a\u0627\u0621 \u0639\u0644\u064a \u062d\u0633\u064a\u0646<\/td><td class=\"column-3\">\u0645. \u062d\u0646\u0627\u0646 \u0641\u0627\u0631\u0648\u0642 \u0642\u0627\u0633\u0645<\/td><td class=\"column-4\">\u0637\u0631\u064a\u0642\u0629 \u0627\u0644\u062d\u0633\u0627\u0628 \u0627\u0644\u0645\u0628\u0627\u0634\u0631 \u0644\u0645\u0639\u0627\u062f\u0644\u0627\u062a \u0641\u0631\u064a\u062f\u0647\u0648\u0644\u0645 \u0627\u0644\u062a\u0643\u0627\u0645\u0644\u064a\u0629 \u0627\u0644\u062a\u0641\u0627\u0636\u0644\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-153\">\n\t<td class=\"column-1\">152<\/td><td class=\"column-2\">\u062f\u0639\u0627\u0621 \u0645\u062d\u0645\u062f \u062c\u0628\u0627\u0631 \u0639\u0628\u0627\u0633<\/td><td class=\"column-3\">\u0645. \u0627\u0633\u0645\u0627\u0621 \u0639\u0628\u062f \u0639\u0635\u0648\u0627\u062f<\/td><td class=\"column-4\">Taylor Series Method to Solve the Ordinary Differential Equations with Applications &amp; quot<\/td>\n<\/tr>\n<tr class=\"row-154\">\n\t<td class=\"column-1\">153<\/td><td class=\"column-2\">\u0631\u0633\u0644 \u062d\u0633\u064a\u0646 \u0628\u0634\u064a\u0631 \u0631\u0627\u0647\u064a<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0645\u064a\u0633\u0648\u0646 \u0639\u0628\u062f \u0647\u0627\u0645\u0644<\/td><td class=\"column-4\">\u0627\u0644\u0645\u062b\u0627\u0644\u064a\u0629 \u0627\u0644\u0627\u0648\u0644\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-155\">\n\t<td class=\"column-1\">154<\/td><td class=\"column-2\">\u0632\u064a\u0646\u0628 \u0647\u064a\u062b\u0645 \u0645\u062d\u0645\u062f \u0643\u0627\u0638\u0645<\/td><td class=\"column-3\">\u0623.\u0645. \u0633\u0646\u0627\u0646 \u0647\u0627\u062a\u0641 \u0639\u0628\u062f\u0627\u0644\u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">Application of iterative method in solving diffusion equation<\/td>\n<\/tr>\n<tr class=\"row-156\">\n\t<td class=\"column-1\">155<\/td><td class=\"column-2\">\u0633\u062c\u0627\u062f \u0639\u062f\u0646\u0627\u0646 \u062c\u0648\u0627\u0645\u064a\u0631 \u0643\u0627\u0638\u0645<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0639\u0644\u064a \u0637\u0627\u0644\u0628 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">Introduction to Probability Theory<\/td>\n<\/tr>\n<tr class=\"row-157\">\n\t<td class=\"column-1\">156<\/td><td class=\"column-2\">\u0633\u0644\u0645\u0627\u0646 \u0635\u062f\u0627\u0645 \u0633\u0639\u064a\u062f \u0633\u0644\u0645\u0627\u0646<\/td><td class=\"column-3\">\u0645. \u0639\u062b\u0645\u0627\u0646 \u0645\u0647\u062f\u064a \u0635\u0627\u0644\u062d<\/td><td class=\"column-4\">Solving Volterra Integral Equations By using the Adomian Decomposition Method<\/td>\n<\/tr>\n<tr class=\"row-158\">\n\t<td class=\"column-1\">157<\/td><td class=\"column-2\">\u0634\u0647\u0627\u0628 \u0627\u062d\u0645\u062f \u0639\u064a\u0633\u0649 \u062d\u0645\u0648\u062f<\/td><td class=\"column-3\">\u0645.\u062f. \u0645\u064a \u0645\u062d\u0645\u062f \u0647\u0644\u0627\u0644<\/td><td class=\"column-4\">Solve Fredholm Integral Equations By Using Direct Computation Method<\/td>\n<\/tr>\n<tr class=\"row-159\">\n\t<td class=\"column-1\">158<\/td><td class=\"column-2\">\u0634\u0647\u062f \u0633\u0645\u064a\u0631 \u0633\u0639\u062f\u0648\u0646 \u0634\u0645\u0631\u0627\u0646<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0645\u0647\u0627 \u0627\u062d\u0645\u062f \u0639\u0628\u062f\u0627\u0644\u062c\u0628\u0627\u0631<\/td><td class=\"column-4\">Mathematical Modeling and Simulation of Tumors<\/td>\n<\/tr>\n<tr class=\"row-160\">\n\t<td class=\"column-1\">159<\/td><td class=\"column-2\">\u0635\u0627\u0628\u0631\u064a\u0646 \u062c\u0645\u0627\u0644 \u062e\u0636\u064a\u0631 \u0639\u0628\u0627\u0633<\/td><td class=\"column-3\">\u0645.\u062f. \u0645\u064a \u0645\u062d\u0645\u062f \u0647\u0644\u0627\u0644<\/td><td class=\"column-4\">Dynamics of a three species food chain model in the contaminated environment<\/td>\n<\/tr>\n<tr class=\"row-161\">\n\t<td class=\"column-1\">160<\/td><td class=\"column-2\">\u0639\u0628\u062f \u0627\u0644\u0642\u0627\u062f\u0631 \u064a\u0627\u0633\u064a\u0646 \u0639\u0628\u0648\u062f <\/td><td class=\"column-3\">\u0623.\u062f. \u0645\u062c\u064a\u062f \u0627\u062d\u0645\u062f \u0648\u0644\u064a<\/td><td class=\"column-4\">Novel Approximates Solutions for Diffusion Equations Arising In Oil Pollution<\/td>\n<\/tr>\n<tr class=\"row-162\">\n\t<td class=\"column-1\">161<\/td><td class=\"column-2\">\u0639\u0644\u064a \u0627\u062d\u0645\u062f \u0639\u0628\u062f \u0627\u0644\u0644\u0647 \u0633\u0628\u0639<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0645\u0647\u0627 \u0627\u062d\u0645\u062f \u0639\u0628\u062f\u0627\u0644\u062c\u0628\u0627\u0631<\/td><td class=\"column-4\">Mathematical Modeling and the Role of Simulation in it<\/td>\n<\/tr>\n<tr class=\"row-163\">\n\t<td class=\"column-1\">162<\/td><td class=\"column-2\">\u0639\u0644\u064a \u062d\u0627\u0645\u062f \u062d\u0645\u064a\u062f \u0639\u0628\u062f \u0627\u0644\u0644\u0647<\/td><td class=\"column-3\">\u0645.\u062f. \u063a\u0627\u0644\u0628 \u0623\u062d\u0645\u062f \u062d\u0645\u0648\u062f<\/td><td class=\"column-4\">Semiprime Submodules<\/td>\n<\/tr>\n<tr class=\"row-164\">\n\t<td class=\"column-1\">163<\/td><td class=\"column-2\">\u0639\u0644\u064a \u062d\u0633\u064a\u0646 \u064a\u0627\u0633\u064a\u0646 \u0639\u0628\u064a\u062f<\/td><td class=\"column-3\">\u0623.\u0645. \u0627\u0644\u0627\u0621 \u0645\u0627\u062c\u062f \u062d\u0645\u062f<\/td><td class=\"column-4\">Estimation the shape Parameter of Alpha power distribution<\/td>\n<\/tr>\n<tr class=\"row-165\">\n\t<td class=\"column-1\">164<\/td><td class=\"column-2\">\u0639\u0644\u064a \u0645\u062d\u0645\u062f \u062f\u0644\u0641 \u062d\u0633\u064a\u0646<\/td><td class=\"column-3\">\u0623.\u062f. \u062d\u0627\u062a\u0645 \u064a\u062d\u064a\u0649 \u062e\u0644\u0641<\/td><td class=\"column-4\">Survey Study on Polynomial Ring<\/td>\n<\/tr>\n<tr class=\"row-166\">\n\t<td class=\"column-1\">165<\/td><td class=\"column-2\">\u0639\u0644\u064a\u0627\u0621 \u062a\u0631\u0643\u064a \u0641\u0631\u062d\u0627\u0646 \u062d\u0631\u0627\u0645\u064a<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0645\u0647\u0627 \u0627\u062d\u0645\u062f \u0639\u0628\u062f\u0627\u0644\u062c\u0628\u0627\u0631<\/td><td class=\"column-4\">Mathematical Modeling of the Spread of Disease Epidemics and Some of  its Numerical Solutions<\/td>\n<\/tr>\n<tr class=\"row-167\">\n\t<td class=\"column-1\">166<\/td><td class=\"column-2\">\u0639\u0645\u0627\u0631 \u0627\u062d\u0645\u062f \u0639\u0627\u064a\u062f \u0641\u064a\u0627\u0636<\/td><td class=\"column-3\">\u0645.\u062f. \u0645\u0647\u0646\u062f \u0646\u0627\u0641\u0639 \u062c\u0639\u0641\u0631<\/td><td class=\"column-4\">SEIT Modeling of Influenza Virus<\/td>\n<\/tr>\n<tr class=\"row-168\">\n\t<td class=\"column-1\">167<\/td><td class=\"column-2\">\u0641\u0627\u0636\u0644 \u062d\u0637\u0627\u0628 \u0643\u0627\u0645\u0644 \u062c\u0628\u0631<\/td><td class=\"column-3\">\u0645. \u0639\u062b\u0645\u0627\u0646 \u0645\u0647\u062f\u064a \u0635\u0627\u0644\u062d<\/td><td class=\"column-4\">Solving Fredholm Integral Equations By using the Adomian Decomposition Method<\/td>\n<\/tr>\n<tr class=\"row-169\">\n\t<td class=\"column-1\">168<\/td><td class=\"column-2\">\u0645\u0631\u0648\u0627\u0646 \u0639\u0628\u0627\u0633 \u0641\u0627\u0636\u0644 \u0645\u062d\u0645\u062f<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0639\u0644\u064a \u0637\u0627\u0644\u0628 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">Pearson and SPerrmans Correlation Coefficients<\/td>\n<\/tr>\n<tr class=\"row-170\">\n\t<td class=\"column-1\">169<\/td><td class=\"column-2\">\u0645\u0631\u064a\u0645 \u0633\u0639\u064a\u062f \u0635\u0627\u0644\u062d \u0645\u062d\u0645\u062f<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0635\u0628\u0627 \u0646\u0627\u0635\u0631 \u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">Mathematical Cryptography and its Applications<\/td>\n<\/tr>\n<tr class=\"row-171\">\n\t<td class=\"column-1\">170<\/td><td class=\"column-2\">\u0645\u0634\u062a\u0627\u0642 \u0635\u0627\u0644\u062d \u0645\u0631\u0627\u062d \u0641\u0631\u062d\u0627\u0646<\/td><td class=\"column-3\">\u0623.\u0645. \u0633\u0646\u0627\u0646 \u0647\u0627\u062a\u0641 \u0639\u0628\u062f\u0627\u0644\u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">An iterative method for solving second order ordinary differential equations<\/td>\n<\/tr>\n<tr class=\"row-172\">\n\t<td class=\"column-1\">171<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u062c\u0627\u0628\u0631 \u0641\u0627\u0636\u0644 \u062f\u0644\u064a\u0641\u064a<\/td><td class=\"column-3\">\u0645. \u0639\u062b\u0645\u0627\u0646 \u0645\u0647\u062f\u064a \u0635\u0627\u0644\u062d<\/td><td class=\"column-4\">The Adomian Decomposition Method to Solve the Nonlinear Integral Equations<\/td>\n<\/tr>\n<tr class=\"row-173\">\n\t<td class=\"column-1\">172<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u062d\u0627\u0645\u062f \u062d\u0633\u064a\u0646 \u062d\u0645\u0648\u062f<\/td><td class=\"column-3\">\u0645.\u0645. \u0631\u064a\u0645 \u0648\u0644\u064a\u062f \u062d\u0633\u064a\u0646<\/td><td class=\"column-4\">\u0627\u0644\u0639\u0627\u0644\u0645 \u0627\u0642\u0644\u064a\u062f\u0633 \u0648\u0646\u0638\u0631\u064a\u0627\u062a\u0647 \u0641\u064a \u0639\u0644\u0645 \u0627\u0644\u0631\u064a\u0627\u0636\u064a\u0627\u062a<\/td>\n<\/tr>\n<tr class=\"row-174\">\n\t<td class=\"column-1\">173<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u0645\u062d\u0645\u062f \u0646\u0639\u064a\u0645 \u0645\u0630\u0628\u0648\u0628<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0639\u0644\u064a \u0637\u0627\u0644\u0628 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">Testing of Hypothesis<\/td>\n<\/tr>\n<tr class=\"row-175\">\n\t<td class=\"column-1\">174<\/td><td class=\"column-2\">\u0645\u0646\u062a\u0638\u0631 \u0645\u0647\u062f\u064a \u0645\u0647\u0627\u0648\u064a \u0643\u0631\u064a\u0645<\/td><td class=\"column-3\">\u0645.\u0645. \u0645\u0635\u0637\u0641\u0649 \u0645\u062d\u0645\u062f \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">Survey Generalization of Homotopic Theory<\/td>\n<\/tr>\n<tr class=\"row-176\">\n\t<td class=\"column-1\">175<\/td><td class=\"column-2\">\u0645\u0646\u064a\u0631 \u0646\u0648\u0627\u0641 \u0645\u062d\u0644 \u062e\u0644\u0641<\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0631\u0646\u0627 \u0628\u0647\u062c\u062a \u0627\u0633\u0645\u0627\u0639\u064a\u0644<\/td><td class=\"column-4\">On GSP-Open sets<\/td>\n<\/tr>\n<tr class=\"row-177\">\n\t<td class=\"column-1\">176<\/td><td class=\"column-2\">\u0645\u0647\u0646\u062f \u0631\u064a\u0627\u0636 \u0643\u0627\u0637\u0639 \u062e\u064a\u0631 \u0627\u0644\u0644\u0647<\/td><td class=\"column-3\">\u0645. \u0647\u062f\u064a\u0644 \u062d\u0633\u064a\u0646 \u0644\u0639\u064a\u0628\u064a<\/td><td class=\"column-4\">Some fixed points theorems in G-metric spaces<\/td>\n<\/tr>\n<tr class=\"row-178\">\n\t<td class=\"column-1\">177<\/td><td class=\"column-2\">\u0646\u0627\u0635\u0631 \u0645\u0647\u0627\u0648\u0634 \u0645\u0637\u064a\u0631 \u0633\u0645\u062d<\/td><td class=\"column-3\">\u0645.\u062f. \u063a\u0627\u0644\u0628 \u0627\u062d\u0645\u062f \u062d\u0645\u0648\u062f<\/td><td class=\"column-4\">Prime and semiprime Submodules<\/td>\n<\/tr>\n<tr class=\"row-179\">\n\t<td class=\"column-1\">178<\/td><td class=\"column-2\">\u0647\u0627\u062c\u0631 \u0639\u0627\u0645\u0631 \u0639\u0628\u062f \u0627\u0644\u0643\u0631\u064a\u0645 \u0645\u062d\u0645\u062f<\/td><td class=\"column-3\">\u0623.\u062f. \u0644\u0645\u0649 \u0646\u0627\u062c\u064a \u0645\u062d\u0645\u062f \u062a\u0648\u0641\u064a\u0642<\/td><td class=\"column-4\">Rational Function Approximation<\/td>\n<\/tr>\n<tr class=\"row-180\">\n\t<td class=\"column-1\">179<\/td><td class=\"column-2\">\u0647\u0628\u0647 \u0639\u0627\u0634\u0648\u0631 \u0634\u0627\u0643\u0631 \u062c\u0627\u0633\u0645<\/td><td class=\"column-3\">\u0623.\u062f. \u0644\u0645\u0649 \u0646\u0627\u062c\u064a \u0645\u062d\u0645\u062f \u062a\u0648\u0641\u064a\u0642<\/td><td class=\"column-4\">Using Interpolation Methods for Estimate the Rate of Contamination in Baghdad Soil by Cadmium<\/td>\n<\/tr>\n<tr class=\"row-181\">\n\t<td class=\"column-1\">180<\/td><td class=\"column-2\">\u0647\u062f\u064a\u0644 \u0645\u062d\u0645\u062f \u0645\u062d\u0645\u0648\u062f \u062c\u0627\u0633\u0645<\/td><td class=\"column-3\">\u0645. \u0623\u0633\u0645\u0627\u0621 \u0639\u0628\u062f \u0639\u0635\u0648\u0627\u062f<\/td><td class=\"column-4\">Taylor Series Method to Solve a System of Ordinary Differential Equations<\/td>\n<\/tr>\n<tr class=\"row-182\">\n\t<td class=\"column-1\">181<\/td><td class=\"column-2\">\u0627\u0628\u0631\u0627\u0647\u064a\u0645 \u0635\u0627\u0626\u0628 \u0646\u0627\u0635\u0631 \u062e\u0644\u064a\u0641\u0647<\/td><td class=\"column-3\">\u0645.\u062f.\u0648\u0641\u0627\u0621 \u0631\u062d\u064a\u0645 \u062d\u0633\u064a\u0646<\/td><td class=\"column-4\">Applications of Linear Programming<\/td>\n<\/tr>\n<tr class=\"row-183\">\n\t<td class=\"column-1\">182<\/td><td class=\"column-2\">\u0627\u0628\u0648 \u0628\u0643\u0631 \u0639\u0628\u062f \u0627\u0644\u0633\u0644\u0627\u0645 \u062d\u0627\u0645\u062f <\/td><td class=\"column-3\">\u0627.\u062f. \u0645\u062c\u064a\u062f \u0627\u062d\u0645\u062f \u0648\u0644\u064a<\/td><td class=\"column-4\">\u0637\u0631\u064a\u0642\u0629 \u0627\u0644\u062a\u0643\u0631\u0627\u0631 \u0627\u0644\u0645\u062a\u063a\u064a\u0631 \u0644\u062d\u0644 \u0627\u0644\u0645\u0639\u0627\u062f\u0644\u0627\u062a \u0627\u0644\u062a\u0641\u0627\u0636\u0644\u064a\u0629 \u063a\u064a\u0631 \u0627\u0644\u062e\u0637\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-184\">\n\t<td class=\"column-1\">183<\/td><td class=\"column-2\">\u0627\u062d\u0645\u062f \u062d\u0633\u0646 \u0641\u0644\u064a\u062d \u062d\u0645\u0632\u0629<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0627\u064a\u0645\u0627\u0646 \u0645\u062d\u0645\u062f \u0646\u0639\u0645\u0629<\/td><td class=\"column-4\">Applying Laplace Transform Method to Solve Volterra Integro-Differential Equation<\/td>\n<\/tr>\n<tr class=\"row-185\">\n\t<td class=\"column-1\">184<\/td><td class=\"column-2\">\u0627\u0633\u0631\u0627\u0621 \u0627\u0633\u0645\u0627\u0639\u064a\u0644 \u0639\u0628\u0648\u062f \u0639\u0644\u0648\u0627\u0646 <\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0628\u0627\u0633\u0645 \u0645\u062d\u0645\u062f \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0645\u064a\u064a\u0632 \u0627\u0644\u0631\u064a\u0627\u0636\u064a \u0644\u062f\u0649 \u0637\u0644\u0628\u0629 \u0642\u0633\u0645 \u0627\u0644\u0631\u064a\u0627\u0636\u064a\u0627\u062a \u0641\u064a \u0643\u0644\u064a\u0629 \u0627\u0644\u062a\u0631\u0628\u064a\u0629 \u0644\u0644\u0639\u0644\u0648\u0645 \u0627\u0644\u0635\u0631\u0641\u0629 \u0627\u0628\u0646 \u0627\u0644\u0647\u064a\u062b\u0645<\/td>\n<\/tr>\n<tr class=\"row-186\">\n\t<td class=\"column-1\">185<\/td><td class=\"column-2\">\u0627\u0635\u064a\u0644 \u0641\u0627\u0626\u0632 \u0633\u0644\u064a\u0645\u0627\u0646 \u0636\u0627\u0631\u064a<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0631\u0634\u0627 \u0646\u0627\u0635\u0631 \u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">Nano Topological spaces<\/td>\n<\/tr>\n<tr class=\"row-187\">\n\t<td class=\"column-1\">186<\/td><td class=\"column-2\">\u0627\u0645\u064a\u0646 \u0635\u0627\u0644\u062d \u0639\u0644\u064a \u0639\u0628\u064a\u062f<\/td><td class=\"column-3\">\u0645.\u062f. \u0639\u0627\u062f\u0644 \u0631\u0627\u0634\u062f \u0639\u0644\u064a \u0639\u0628\u062f<\/td><td class=\"column-4\">di-Interpolation methods<\/td>\n<\/tr>\n<tr class=\"row-188\">\n\t<td class=\"column-1\">187<\/td><td class=\"column-2\">\u0627\u0646\u0627\u0633 \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f \u0641\u0647\u062f<\/td><td class=\"column-3\">\u0645. \u0631\u0646\u0627 \u0646\u0648\u0631\u064a \u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">On Closed Submodules<\/td>\n<\/tr>\n<tr class=\"row-189\">\n\t<td class=\"column-1\">188<\/td><td class=\"column-2\">\u062a\u0642\u0649 \u0645\u0647\u062f\u064a \u062d\u0633\u064a\u0646 \u0645\u062e\u064a\u0644\u0641<\/td><td class=\"column-3\">\u0645.\u062f. \u0639\u0627\u062f\u0644 \u0631\u0627\u0634\u062f \u0639\u0644\u064a \u0639\u0628\u062f<\/td><td class=\"column-4\">Numerical solution of a linear system of equations<\/td>\n<\/tr>\n<tr class=\"row-190\">\n\t<td class=\"column-1\">189<\/td><td class=\"column-2\">\u062c\u0639\u0641\u0631 \u0633\u0639\u062f \u0646\u0627\u0635\u0631 \u062c\u0627\u0633\u0645<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u063a\u0627\u062f\u0629 \u062d\u0633\u0646 \u0627\u0628\u0631\u0627\u0647\u064a\u0645<\/td><td class=\"column-4\">Introduction for the fourier Transforms and their applications<\/td>\n<\/tr>\n<tr class=\"row-191\">\n\t<td class=\"column-1\">190<\/td><td class=\"column-2\">\u0631\u0627\u0626\u062f \u0645\u0647\u062f\u064a \u062c\u0645\u064a\u0644 \u062d\u0633\u064a\u0646<\/td><td class=\"column-3\">\u0645.\u0645. \u0647\u062f\u0649 \u0639\u0645\u0627\u062f \u0627\u0644\u062f\u064a\u0646 \u062c\u0645\u064a\u0644<\/td><td class=\"column-4\">Applications of The Riemann-Liouville Fractional Derivative<\/td>\n<\/tr>\n<tr class=\"row-192\">\n\t<td class=\"column-1\">191<\/td><td class=\"column-2\">\u0631\u0639\u062f \u0633\u0627\u0645\u064a \u062f\u0627\u0648\u062f \u064a\u0639\u0643\u0648\u0628 <\/td><td class=\"column-3\">\u0645.\u062f. \u0645\u062d\u0645\u062f \u0639\u0644\u064a \u0627\u062d\u0645\u062f<\/td><td class=\"column-4\">On antimagic of some graphs<\/td>\n<\/tr>\n<tr class=\"row-193\">\n\t<td class=\"column-1\">192<\/td><td class=\"column-2\">\u0631\u0648\u064a\u062f\u0647 \u0641\u0627\u062e\u0631 \u0634\u0627\u0643\u0631 \u0639\u0628\u062f \u0639\u0644\u064a<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0627\u0644\u0647\u0627\u0645 \u062c\u0628\u0627\u0631 \u0641\u0627\u0631\u0633<\/td><td class=\"column-4\">\u062a\u0648\u0638\u064a\u0641 \u0627\u0644\u0627\u0646\u0641\u0648\u0643\u0631\u0627\u0641\u064a\u0643 \u0641\u064a \u062a\u0642\u062f\u064a\u0645 \u0645\u062d\u062a\u0648\u064a\u0627\u062a \u0643\u062a\u0627\u0628 \u0627\u0644\u0631\u064a\u0627\u0636\u064a\u0627\u062a \u0644\u0635\u0641 \u0627\u0644\u0627\u0648\u0644 \u0645\u062a\u0648\u0633\u0637<\/td>\n<\/tr>\n<tr class=\"row-194\">\n\t<td class=\"column-1\">193<\/td><td class=\"column-2\">\u0631\u064a\u0645 \u0639\u064a\u0633\u0649 \u0643\u0631\u062f\u064a \u062d\u0645\u0627\u062f\u064a<\/td><td class=\"column-3\">\u0645.\u0645. \u0639\u0628\u064a\u0631 \u062d\u0633\u064a\u0646<\/td><td class=\"column-4\">Graph theory \u2013introduction to tree<\/td>\n<\/tr>\n<tr class=\"row-195\">\n\t<td class=\"column-1\">194<\/td><td class=\"column-2\">\u0632\u0647\u0631\u0627\u0621 \u062c\u0627\u0633\u0645 \u0639\u0628\u062f \u0627\u0644\u0633\u062a\u0627\u0631 \u0645\u0643\u0637\u0648\u0641<\/td><td class=\"column-3\">\u0645.\u0645. \u0647\u062f\u0649 \u0639\u0645\u0627\u062f \u0627\u0644\u062f\u064a\u0646 \u062c\u0645\u064a\u0644<\/td><td class=\"column-4\">Solving Linear Volterra Integral Equation by using the Successive Approximations Method and Adomian Decomposition Method<\/td>\n<\/tr>\n<tr class=\"row-196\">\n\t<td class=\"column-1\">195<\/td><td class=\"column-2\">\u0632\u064a\u062f \u0648\u0639\u062f \u0641\u0627\u0636\u0644 \u0645\u062d\u0645\u062f <\/td><td class=\"column-3\">\u0627.\u0645. \u0627\u064a\u0645\u0627\u0646 \u0639\u0628\u062f \u0627\u0644\u0644\u0637\u064a\u0641<\/td><td class=\"column-4\">Some nonclassical hyperbolic problems<\/td>\n<\/tr>\n<tr class=\"row-197\">\n\t<td class=\"column-1\">196<\/td><td class=\"column-2\">\u0632\u064a\u0646\u0628 \u0645\u0647\u062f\u064a \u0643\u0632\u0627\u0631 \u062e\u0644\u064a\u0641\u0647<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0632\u064a\u0646\u0629 \u062d\u0633\u064a\u0646 \u0645\u0639\u064a\u0628\u062f<\/td><td class=\"column-4\">The convergence to fixed point in G-matric space<\/td>\n<\/tr>\n<tr class=\"row-198\">\n\t<td class=\"column-1\">197<\/td><td class=\"column-2\">\u0633\u0627\u0631\u0647 \u0639\u0644\u064a \u0645\u062d\u0645\u062f \u0639\u0644\u064a<\/td><td class=\"column-3\">\u0627.\u0645. \u0627\u064a\u0645\u0627\u0646 \u0639\u0628\u062f \u0627\u0644\u0644\u0637\u064a\u0641<\/td><td class=\"column-4\">Other approaches to high resolution<\/td>\n<\/tr>\n<tr class=\"row-199\">\n\t<td class=\"column-1\">198<\/td><td class=\"column-2\">\u0633\u062c\u0649 \u062c\u062f\u0648\u0639 \u062d\u0633\u0646 \u0645\u062d\u0645\u062f<\/td><td class=\"column-3\">\u0645.\u062f. \u063a\u0627\u0644\u0628 \u0627\u062d\u0645\u062f \u062d\u0645\u0648\u062f<\/td><td class=\"column-4\">\u0627\u0644\u0645\u0642\u0627\u0633\u0627\u062a \u0627\u0644\u062c\u0632\u0626\u064a\u0629 \u0627\u0644\u0627\u0648\u0644\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-200\">\n\t<td class=\"column-1\">199<\/td><td class=\"column-2\">\u0633\u062c\u0649 \u0639\u0644\u064a \u062d\u0646\u0648\u0646 \u0643\u0627\u0638\u0645<\/td><td class=\"column-3\">\u0645.\u0645. \u0631\u064a\u0645 \u0645\u0646\u0630\u0631 \u064a\u0648\u0646\u0633<\/td><td class=\"column-4\">The Adomain decomposition Method For solving Fredholm Integral Equations of The second kind<\/td>\n<\/tr>\n<tr class=\"row-201\">\n\t<td class=\"column-1\">200<\/td><td class=\"column-2\">\u0633\u0631\u0648\u0631 \u0639\u0644\u064a \u062d\u0633\u064a\u0646 \u0639\u0631\u064a\u0628\u064a<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0631\u0634\u0627 \u0646\u0627\u0635\u0631 \u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">Continuous between Nano Topological spaces<\/td>\n<\/tr>\n<tr class=\"row-202\">\n\t<td class=\"column-1\">201<\/td><td class=\"column-2\">\u0633\u0645\u0631 \u062e\u0644\u0648\u0642 \u0646\u0627\u0635\u0631 \u062d\u0627\u0645\u062f<\/td><td class=\"column-3\">\u0645.\u0645. \u0631\u064a\u0645 \u0645\u0646\u0630\u0631 \u064a\u0648\u0646\u0633<\/td><td class=\"column-4\">The Series Solution Method For solving Volterra-Fredhom  Integral Equations<\/td>\n<\/tr>\n<tr class=\"row-203\">\n\t<td class=\"column-1\">202<\/td><td class=\"column-2\">\u0633\u0646\u0627 \u0643\u0646\u0639\u0627\u0646 \u0627\u0628\u0631\u0627\u0647\u064a\u0645 \u0643\u0627\u0638\u0645<\/td><td class=\"column-3\">\u0645. \u062d\u0646\u0627\u0646 \u0641\u0627\u0631\u0648\u0642 \u0642\u0627\u0633\u0645<\/td><td class=\"column-4\">Transformation Laplace and inverse<\/td>\n<\/tr>\n<tr class=\"row-204\">\n\t<td class=\"column-1\">203<\/td><td class=\"column-2\">\u0634\u0647\u062f \u0627\u0628\u0631\u0627\u0647\u064a\u0645 \u0639\u0628\u062f \u0627\u0644\u0644\u0647 \u0627\u0628\u0631\u0627\u0647\u064a\u0645<\/td><td class=\"column-3\">\u0645.\u0645. \u0639\u0628\u064a\u0631 \u062d\u0633\u064a\u0646<\/td><td class=\"column-4\">Graph theory- introduction to tree and forest<\/td>\n<\/tr>\n<tr class=\"row-205\">\n\t<td class=\"column-1\">204<\/td><td class=\"column-2\">\u0634\u0647\u062f \u0643\u0631\u064a\u0645 \u0637\u0627\u0647\u0631 \u0645\u062d\u0645\u0648\u062f<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0635\u0628\u0627\u062d \u062d\u0633\u0646 \u0645\u0627\u0644\u062d<\/td><td class=\"column-4\">Fixed points in fuzzy metric space<\/td>\n<\/tr>\n<tr class=\"row-206\">\n\t<td class=\"column-1\">205<\/td><td class=\"column-2\">\u0634\u064a\u0645\u0627\u0621 \u064a\u0648\u0633\u0641 \u0645\u062c\u0646\u0648\u0646 <\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0627\u064a\u0645\u0627\u0646 \u0645\u062d\u0645\u062f \u0646\u0639\u0645\u0629<\/td><td class=\"column-4\">Solving Volterra Integro-Differential Equation by Variational Iteation Method<\/td>\n<\/tr>\n<tr class=\"row-207\">\n\t<td class=\"column-1\">206<\/td><td class=\"column-2\">\u0636\u062d\u0649 \u0633\u062a\u0627\u0631 \u0631\u062d\u0645\u0646 \u0645\u0631\u0647\u0648\u0646<\/td><td class=\"column-3\">\u0645.\u062f. \u0647\u064a\u0627\u0645 \u0645\u0647\u062f\u064a \u062c\u0648\u0627\u062f<\/td><td class=\"column-4\">Mathematics Representations included in the mathematics book for the second intermediate grade<\/td>\n<\/tr>\n<tr class=\"row-208\">\n\t<td class=\"column-1\">207<\/td><td class=\"column-2\">\u0637\u0647 \u0639\u0627\u0645\u0631 \u0639\u0628\u062f \u0627\u0644\u0644\u0647 \u0639\u0628\u0627\u0633<\/td><td class=\"column-3\">\u0645.\u0645. \u0645\u0631\u0648\u0647 \u0645\u0643\u064a \u062f\u062d\u0627\u0645<\/td><td class=\"column-4\">Some concepts of m-Kc-space<\/td>\n<\/tr>\n<tr class=\"row-209\">\n\t<td class=\"column-1\">208<\/td><td class=\"column-2\">\u0637\u0647 \u064a\u0627\u0633\u064a\u0646 \u0639\u0628\u062f \u0627\u0644\u0644\u0647 \u0631\u0648\u0643\u0627\u0646<\/td><td class=\"column-3\">\u0645.\u0627\u0631\u064a\u062c \u0635\u0644\u0627\u062d<\/td><td class=\"column-4\">decomposition Method for solving second Order Linear and Nonlinear Ordinary Differential Equation<\/td>\n<\/tr>\n<tr class=\"row-210\">\n\t<td class=\"column-1\">209<\/td><td class=\"column-2\">\u0639\u0628\u0627\u0633 \u0639\u0637\u0627 \u0639\u0628\u062f \u0633\u0644\u0645\u0627\u0646 <\/td><td class=\"column-3\">\u0645. \u0627\u062d\u0645\u062f \u0639\u064a\u0633\u0649 \u0639\u0628\u062f \u0627\u0644\u0646\u0628\u064a<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u0627\u0646\u0648\u0627\u0639 \u0627\u0644\u062a\u0648\u0632\u064a\u0639\u0627\u062a \u0627\u0644\u0627\u062d\u062a\u0645\u0627\u0644\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-211\">\n\t<td class=\"column-1\">210<\/td><td class=\"column-2\">\u0639\u0628\u0627\u0633 \u0639\u0644\u064a \u062d\u0645\u064a\u062f \u0639\u0628\u062f<\/td><td class=\"column-3\">\u0645. \u0646\u0627\u062f\u064a\u0629 \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0643\u0627\u0645\u0644 \u0627\u0644\u0645\u0639\u062a\u0644 \u0648\u062a\u0637\u0628\u064a\u0642\u0627\u062a\u0647<\/td>\n<\/tr>\n<tr class=\"row-212\">\n\t<td class=\"column-1\">211<\/td><td class=\"column-2\">\u0639\u0628\u062f \u0627\u0644\u062d\u0645\u064a\u062f \u0627\u0633\u0645\u0627\u0639\u064a\u0644 \u062e\u0644\u064a\u0644 <\/td><td class=\"column-3\">\u0623.\u0645. \u0633\u0646\u0627\u0646 \u0647\u0627\u062a\u0641 \u0639\u0628\u062f \u0627\u0644\u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">Elzaki transform for solving some partial differential equation<\/td>\n<\/tr>\n<tr class=\"row-213\">\n\t<td class=\"column-1\">212<\/td><td class=\"column-2\">\u0639\u0644\u064a \u0635\u0627\u0644\u062d \u062d\u0633\u064a\u0646<\/td><td class=\"column-3\">\u0627.\u0645.\u062f \u0631\u0646\u0627 \u0628\u0647\u062c\u062a<\/td><td class=\"column-4\">\u0627\u0644\u0641\u0636\u0627\u0621\u0627\u062a \u0627\u0644\u062a\u0628\u0648\u0644\u0648\u062c\u064a\u0629 \u0627\u0644\u0645\u062b\u0627\u0644\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-214\">\n\t<td class=\"column-1\">213<\/td><td class=\"column-2\">\u0639\u0644\u064a \u0635\u0627\u0644\u062d \u063a\u0627\u0644\u0628 \u062c\u0627\u0628\u0631  <\/td><td class=\"column-3\">\u0627. \u062f. \u062d\u0627\u062a\u0645 \u064a\u062d\u064a\u0649 \u062e\u0644\u0641<\/td><td class=\"column-4\">The most important results of concepts in Number theory<\/td>\n<\/tr>\n<tr class=\"row-215\">\n\t<td class=\"column-1\">214<\/td><td class=\"column-2\">\u0639\u0645\u0627\u0631 \u0632\u064a\u0627\u062f \u0637\u0627\u0631\u0642 \u0645\u062d\u0645\u062f<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0641\u0627\u0637\u0645\u0629 \u0641\u064a\u0635\u0644 \u0643\u0631\u064a\u0645<\/td><td class=\"column-4\">Isomorphism groups and its applications<\/td>\n<\/tr>\n<tr class=\"row-216\">\n\t<td class=\"column-1\">215<\/td><td class=\"column-2\">\u0639\u0645\u0631 \u0639\u0644\u064a \u0645\u062d\u0645\u062f \u0639\u0644\u064a<\/td><td class=\"column-3\">\u0645.\u0645. \u0645\u0631\u0648\u0647 \u0645\u0643\u064a \u062f\u062d\u0627\u0645<\/td><td class=\"column-4\">On minimal compact semi- closed space<\/td>\n<\/tr>\n<tr class=\"row-217\">\n\t<td class=\"column-1\">216<\/td><td class=\"column-2\">\u0639\u0645\u0631 \u0643\u0627\u0638\u0645 \u0635\u0627\u062f\u0642 \u0645\u0637\u0631 <\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0646\u064a\u0631\u0627\u0646 \u0635\u0628\u0627\u062d \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">\u062d\u0642\u0648\u0644 \u0627\u0644\u0627\u0646\u0634\u0637\u0627\u0631<\/td>\n<\/tr>\n<tr class=\"row-218\">\n\t<td class=\"column-1\">217<\/td><td class=\"column-2\">\u063a\u062f\u064a\u0631 \u0645\u062d\u0645\u062f \u064a\u0627\u0633\u064a\u0646 \u062e\u0644\u0641<\/td><td class=\"column-3\">\u0645.\u0645. \u0627\u064a\u0645\u0627\u0646 \u0627\u062d\u0645\u062f \u0639\u0628\u062f \u0627\u0644\u0644\u0637\u064a\u0641<\/td><td class=\"column-4\">History of mathematics<\/td>\n<\/tr>\n<tr class=\"row-219\">\n\t<td class=\"column-1\">218<\/td><td class=\"column-2\">\u0641\u0627\u062a\u0646 \u0631\u062d\u064a\u0645 \u062d\u0633\u0646 \u0634\u0644\u0628\u064a\u0647 <\/td><td class=\"column-3\">\u0645. \u0633\u0645\u0627\u0647\u0631 \u0645\u0631\u0632 \u064a\u0627\u0633\u064a\u0646<\/td><td class=\"column-4\">Variational Iteration Method for solving korteweg-de Vries Equation<\/td>\n<\/tr>\n<tr class=\"row-220\">\n\t<td class=\"column-1\">219<\/td><td class=\"column-2\">\u0641\u0627\u0637\u0645\u0647 \u0639\u0628\u062f \u0627\u0644\u0627\u0645\u064a\u0631 \u0633\u0643\u0631\u0627\u0646 <\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0628\u0627\u0633\u0645 \u0645\u062d\u0645\u062f \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">\u0627\u0644\u062a\u0645\u064a\u064a\u0632 \u0627\u0644\u0631\u064a\u0627\u0636\u064a \u0644\u062f\u0649 \u0637\u0644\u0628\u0629 \u0642\u0633\u0645 \u0627\u0644\u0631\u064a\u0627\u0636\u064a\u0627\u062a \u0641\u064a \u0643\u0644\u064a\u0629 \u0627\u0644\u062a\u0631\u0628\u064a\u0629 \u0644\u0644\u0639\u0644\u0648\u0645 \u0627\u0644\u0635\u0631\u0641\u0629 \u0627\u0628\u0646 \u0627\u0644\u0647\u064a\u062b\u0645<\/td>\n<\/tr>\n<tr class=\"row-221\">\n\t<td class=\"column-1\">220<\/td><td class=\"column-2\">\u0641\u0627\u0637\u0645\u0647 \u0639\u0628\u062f \u0627\u0644\u0627\u0645\u064a\u0631 \u0648\u0627\u0644\u064a <\/td><td class=\"column-3\">\u0645.\u0645. \u0645\u0631\u0648\u0647 \u0645\u0643\u064a \u062f\u062d\u0627\u0645<\/td><td class=\"column-4\">On minimal Lindelof semi closed space<\/td>\n<\/tr>\n<tr class=\"row-222\">\n\t<td class=\"column-1\">221<\/td><td class=\"column-2\">\u0641\u0631\u0627\u0633 \u0641\u0627\u0636\u0644 \u0639\u0628\u064a\u062f \u062d\u0633\u0648\u0646<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0645\u064a\u0633\u0648\u0646 \u0639\u0628\u062f \u0647\u0627\u0645\u0644<\/td><td class=\"column-4\">Pure ideals<\/td>\n<\/tr>\n<tr class=\"row-223\">\n\t<td class=\"column-1\">222<\/td><td class=\"column-2\">\u0644\u064a\u0644\u0649 \u062e\u0636\u0631 \u0639\u0644\u064a \u064a\u0648\u0646\u0633<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u063a\u0627\u062f\u0629 \u062d\u0633\u0646 \u0627\u0628\u0631\u0627\u0647\u064a\u0645<\/td><td class=\"column-4\">Using the Fourier Transform for solving Ordinary Differential equations<\/td>\n<\/tr>\n<tr class=\"row-224\">\n\t<td class=\"column-1\">223<\/td><td class=\"column-2\">\u0645\u0627\u0632\u0646 \u062c\u0633\u0627\u0645 \u0645\u062d\u0645\u062f \u062e\u0644\u0641 <\/td><td class=\"column-3\">\u0623.\u0645. \u0633\u0646\u0627\u0646 \u0647\u0627\u062a\u0641 \u0639\u0628\u062f \u0627\u0644\u0645\u062c\u064a\u062f<\/td><td class=\"column-4\">\u0646\u0645\u0648\u0630\u062c SIQR \u0644\u0641\u0627\u064a\u0631\u0648\u0633 \u0643\u0648\u0631\u0648\u0646\u0627 \u0627\u0644\u0645\u0633\u062a\u062c\u062f<\/td>\n<\/tr>\n<tr class=\"row-225\">\n\t<td class=\"column-1\">224<\/td><td class=\"column-2\">\u0645\u0627\u0647\u0631 \u0639\u0628\u062f \u0627\u0644\u0644\u0637\u064a\u0641 \u0647\u0627\u064a\u0633 <\/td><td class=\"column-3\">\u0645.\u062f. \u0633\u0639\u0627\u062f \u062c\u062f\u0639\u0627\u0646<\/td><td class=\"column-4\">Separation Axioms in generalized topological space<\/td>\n<\/tr>\n<tr class=\"row-226\">\n\t<td class=\"column-1\">225<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u0627\u062d\u0645\u062f \u0639\u064a\u0633\u0649 <\/td><td class=\"column-3\">\u0623. \u0639\u0628\u0627\u0633 \u0646\u062c\u0645 \u0633\u0644\u0645\u0627\u0646<\/td><td class=\"column-4\">\u062a\u0642\u062f\u064a\u0631 \u0645\u0639\u0627\u0644\u0645 \u0648\u0627\u0644\u062f\u0627\u0644\u0629 \u0627\u0644\u0645\u0648\u0644\u064a\u0629 \u0644\u0627\u062d\u062f \u062a\u0648\u0632\u064a\u0639\u0627\u062a \u0627\u0644\u0641\u0634\u0644 \u0627\u0644\u062e\u0627\u0635\u0629<\/td>\n<\/tr>\n<tr class=\"row-227\">\n\t<td class=\"column-1\">226<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u0627\u0643\u0631\u0645 \u062e\u0636\u064a\u0631 \u0633\u0628\u0639 <\/td><td class=\"column-3\">\u0645.\u0645. \u0627\u064a\u0645\u0627\u0646 \u062d\u0633\u0646 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">Riemann integral for Non-mathematicians<\/td>\n<\/tr>\n<tr class=\"row-228\">\n\t<td class=\"column-1\">227<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u0631\u062d\u0645\u0646 \u062d\u0633\u064a\u0646 \u0639\u0644\u064a<\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0635\u0628\u0627\u062d \u062d\u0633\u0646 \u0645\u0627\u0644\u062d<\/td><td class=\"column-4\">Fixed point in Banach space and its Application<\/td>\n<\/tr>\n<tr class=\"row-229\">\n\t<td class=\"column-1\">228<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u0631\u0634\u064a\u062f \u062d\u0633\u064a\u0646 \u0639\u0644\u064a<\/td><td class=\"column-3\">\u0627.\u062f. \u0628\u062b\u064a\u0646\u0629 \u0646\u062c\u0627\u062f \u0634\u0647\u0627\u0628<\/td><td class=\"column-4\">prime and Maximal ideals<\/td>\n<\/tr>\n<tr class=\"row-230\">\n\t<td class=\"column-1\">229<\/td><td class=\"column-2\">\u0645\u062d\u0645\u062f \u0633\u062a\u0627\u0631 \u0639\u0628\u062f \u0627\u0644\u062c\u0628\u0627\u0631 <\/td><td class=\"column-3\">\u0645.\u0645. \u0645\u0635\u0637\u0641\u0649 \u0645\u062d\u0645\u062f \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">Homotopic Theory<\/td>\n<\/tr>\n<tr class=\"row-231\">\n\t<td class=\"column-1\">230<\/td><td class=\"column-2\">\u0645\u062d\u0645\u0648\u062f \u062d\u0645\u064a\u062f \u0646\u0627\u0635\u0631 \u0645\u0637\u0631 <\/td><td class=\"column-3\">\u0645.\u0645. \u0627\u064a\u0645\u0627\u0646 \u0627\u062d\u0645\u062f \u0639\u0628\u062f \u0627\u0644\u0644\u0637\u064a\u0641<\/td><td class=\"column-4\">\u062a\u0642\u062f\u064a\u0631 \u0645\u0639\u0644\u0645\u0629 \u062a\u0648\u0632\u064a\u0639 \u0644\u0648\u0645\u0627\u0643\u0633<\/td>\n<\/tr>\n<tr class=\"row-232\">\n\t<td class=\"column-1\">231<\/td><td class=\"column-2\">\u0645\u0631\u062a\u0636\u0649 \u062d\u0628\u064a\u0628 \u0644\u0647\u0645\u0648\u062f \u062c\u0648\u062f\u0647<\/td><td class=\"column-3\">\u0645.\u062f. \u0639\u0642\u064a\u0644 \u0641\u0627\u0644\u062d \u062c\u062f\u0648\u0639<\/td><td class=\"column-4\">Applying Series Solution Method for Fredholm Integro-Differential Equation<\/td>\n<\/tr>\n<tr class=\"row-233\">\n\t<td class=\"column-1\">232<\/td><td class=\"column-2\">\u0645\u0631\u062a\u0636\u0649 \u062d\u0633\u064a\u0646 \u0647\u0648\u064a\u062f\u064a <\/td><td class=\"column-3\">\u0627.\u0645.\u062f. \u0641\u0627\u0637\u0645\u0629 \u0641\u064a\u0635\u0644 \u0643\u0631\u064a\u0645<\/td><td class=\"column-4\">The cyclic groups and its applications<\/td>\n<\/tr>\n<tr class=\"row-234\">\n\t<td class=\"column-1\">233<\/td><td class=\"column-2\">\u0645\u0631\u062a\u0636\u0649 \u0645\u062d\u064a\u0633\u0646 \u0645\u0647\u062f\u064a \u0639\u0644\u064a <\/td><td class=\"column-3\">\u0645. \u0646\u0627\u062f\u064a\u0629 \u062c\u0627\u0633\u0645 \u0645\u062d\u0645\u062f<\/td><td class=\"column-4\">\u0627\u0644\u0642\u0637\u0648\u0639 \u0627\u0644\u0645\u062e\u0631\u0648\u0637\u064a\u0629 \u0648\u062a\u0637\u0628\u064a\u0642\u0627\u062a\u0647\u0627 \u0627\u0644\u0639\u0644\u0645\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-235\">\n\t<td class=\"column-1\">234<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u0635\u0641\u0627\u0621 \u0645\u062c\u064a\u062f <\/td><td class=\"column-3\">\u0645.\u062f. \u0645\u062d\u0645\u062f \u0639\u0644\u064a \u0627\u062d\u0645\u062f<\/td><td class=\"column-4\">On labeling for new families of graphs<\/td>\n<\/tr>\n<tr class=\"row-236\">\n\t<td class=\"column-1\">235<\/td><td class=\"column-2\">\u0645\u0635\u0637\u0641\u0649 \u0641\u0627\u0631\u0633 \u0633\u0627\u0645\u064a \u0633<\/td><td class=\"column-3\">\u0645.\u062f. \u0633\u0639\u0627\u062f \u062c\u062f\u0639\u0627\u0646<\/td><td class=\"column-4\">Introduction generalized topology<\/td>\n<\/tr>\n<tr class=\"row-237\">\n\t<td class=\"column-1\">236<\/td><td class=\"column-2\">\u0645\u0646\u062a\u0638\u0631 \u062c\u0644\u064a\u0644 \u062a\u0627\u064a\u0647 \u062c\u062d\u064a\u0646 <\/td><td class=\"column-3\">\u0645.\u062f. \u0645\u0647\u0646\u062f \u0646\u0627\u0641\u0639<\/td><td class=\"column-4\">SIQR Modeling of covid-19<\/td>\n<\/tr>\n<tr class=\"row-238\">\n\t<td class=\"column-1\">237<\/td><td class=\"column-2\">\u0645\u0646\u0647 \u0627\u0644\u0644\u0647 \u0645\u062d\u0645\u062f \u0643\u0627\u0638\u0645 \u0639\u0628\u062f \u0627\u0644\u0644\u0647<\/td><td class=\"column-3\">\u0645.\u0645.\u0645\u0631\u0648\u0647 \u0645\u0643\u064a \u062f\u062d\u0627\u0645<\/td><td class=\"column-4\">Some concepts of m-Lc-space<\/td>\n<\/tr>\n<tr class=\"row-239\">\n\t<td class=\"column-1\">238<\/td><td class=\"column-2\">\u0645\u0647\u0627 \u0631\u0628\u0627\u062d \u062e\u0644\u064a\u0644 \u062e\u0644\u0641<\/td><td class=\"column-3\">\u0645. \u0627\u062d\u0645\u062f \u0639\u064a\u0633\u0649 \u0639\u0628\u062f \u0627\u0644\u0646\u0628\u064a<\/td><td class=\"column-4\">\u062a\u0637\u0628\u064a\u0642\u0627\u062a \u0644\u0628\u0639\u0636 \u0627\u0644\u062a\u0648\u0632\u064a\u0639\u0627\u062a \u0627\u0644\u0627\u062d\u062a\u0645\u0627\u0644\u064a\u0629<\/td>\n<\/tr>\n<tr class=\"row-240\">\n\t<td class=\"column-1\">239<\/td><td class=\"column-2\">\u0645\u064a\u0644\u0627\u0646 \u062d\u0633\u064a\u0646 \u0639\u0628\u0627\u0633 \u0633\u0644\u0648\u0645\u064a<\/td><td class=\"column-3\">\u0645.\u062f. \u062a\u0645\u0627\u0631\u0627 \u0634\u0647\u0627\u0628 \u0627\u062d\u0645\u062f<\/td><td class=\"column-4\">The solving of Sine-Gordon equation by using iteration method<\/td>\n<\/tr>\n<tr class=\"row-241\">\n\t<td class=\"column-1\">240<\/td><td class=\"column-2\">\u0646\u0648\u0631 \u0639\u0628\u0627\u0633 \u062c\u0628\u0631 \u0639\u0644\u0648\u0627\u0646<\/td><td class=\"column-3\">\u0627. \u062f. \u062d\u0627\u062a\u0645 \u064a\u062d\u064a\u0649 \u062e\u0644\u0641<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u0627\u0644\u062e\u0635\u0627\u0626\u0635 \u0627\u0644\u0627\u0633\u0627\u0633\u064a\u0629 \u0641\u064a \u0646\u0638\u0631\u064a\u0629 \u0627\u0644\u0627\u0639\u062f\u0627\u062f<\/td>\n<\/tr>\n<tr class=\"row-242\">\n\t<td class=\"column-1\">241<\/td><td class=\"column-2\">\u0647\u0627\u0644\u0647 \u062e\u0644\u064a\u0644 \u0630\u064a\u0627\u0628 \u062e\u0644\u0641 <\/td><td class=\"column-3\">\u0623.\u0645.\u062f. \u0646\u064a\u0631\u0627\u0646 \u0635\u0628\u0627\u062d \u062c\u0627\u0633\u0645<\/td><td class=\"column-4\">\u0628\u0639\u0636 \u0627\u0644\u0627\u0646\u0648\u0627\u0639 \u0645\u0646 \u0627\u0645\u062a\u062f\u0627\u062f \u0627\u0644\u062d\u0642\u0648\u0644<\/td>\n<\/tr>\n<tr class=\"row-243\">\n\t<td class=\"column-1\">242<\/td><td class=\"column-2\">\u0647\u062f\u0649 \u0639\u0644\u064a \u0643\u0627\u0638\u0645 \u062c\u0639\u0641\u0631<\/td><td class=\"column-3\">\u0645.\u062f. \u0639\u0642\u064a\u0644 \u0641\u0627\u0644\u062d \u062c\u062f\u0648\u0639<\/td><td class=\"column-4\">The Adomian Decomposiyion Method to solve Fredholm Integro-Differential Equation<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n[\/vc_column_text][\/vc_column][\/vc_row][vc_row][vc_column]<div class=\"cz_gap clr \" style=\"height: 25px\"><\/div>[\/vc_column][\/vc_row][vc_row full_width=&#8221;stretch_row_content&#8221; css=&#8221;.vc_custom_1727435144292{margin-top: 5px !important;margin-right: 5px !important;margin-bottom: 5px !important;margin-left: 5px !important;border-top-width: 5px !important;border-right-width: 5px !important;border-bottom-width: 5px !important;border-left-width: 5px !important;border-left-style: groove !important;border-right-style: groove !important;border-top-style: groove !important;border-bottom-style: groove !important;border-radius: 10px !important;border-color: #000000 !important;}&#8221;][vc_column][vc_row_inner][vc_column_inner width=&#8221;1\/6&#8243;]<div class=\"cz_gap clr \" style=\"height: 15px\"><\/div><div class=\"cz_btn_block\"><div class=\"cz_23863_p\"><a id=\"cz_23863\" class=\"cz_23863 cz_btn cz_btn_txt_no_fx cz_btn_no_fx\" href=\"https:\/\/ihcoedu.uobaghdad.edu.iq\/?page_id=48700\" title=\"\u062e\u062f\u0645\u0629 \u0627\u0644\u0645\u062c\u062a\u0645\u0639\" aria-label=\"\u062e\u062f\u0645\u0629 \u0627\u0644\u0645\u062c\u062a\u0645\u0639\"><span><strong>\u062e\u062f\u0645\u0629 \u0627\u0644\u0645\u062c\u062a\u0645\u0639<\/strong><\/span><b class=\"cz_btn_onhover\"><strong>\u062e\u062f\u0645\u0629 \u0627\u0644\u0645\u062c\u062a\u0645\u0639<\/strong><\/b><\/a><\/div><\/div>[\/vc_column_inner][vc_column_inner width=&#8221;1\/6&#8243;]<div class=\"cz_gap clr \" style=\"height: 15px\"><\/div><div class=\"cz_btn_block\"><div class=\"cz_23844_p\"><a id=\"cz_23844\" class=\"cz_23844 cz_btn cz_btn_txt_no_fx cz_btn_no_fx\" href=\"https:\/\/ihcoedu.uobaghdad.edu.iq\/?page_id=30387\" title=\"\u0627\u0644\u0627\u062e\u0628\u0627\u0631\" aria-label=\"\u0627\u0644\u0627\u062e\u0628\u0627\u0631\"><span><strong>\u0627\u0644\u062a\u0646\u0645\u064a\u0629 \u0627\u0644\u0645\u0633\u062a\u062f\u0627\u0645\u0629<\/strong><\/span><b class=\"cz_btn_onhover\"><strong>\u0627\u0644\u062a\u0646\u0645\u064a\u0629 \u0627\u0644\u0645\u0633\u062a\u062f\u0627\u0645\u0629<\/strong><\/b><\/a><\/div><\/div>[\/vc_column_inner][vc_column_inner width=&#8221;1\/6&#8243;]<div class=\"cz_gap clr \" style=\"height: 15px\"><\/div><div class=\"cz_btn_block\"><div class=\"cz_80139_p\"><a id=\"cz_80139\" class=\"cz_80139 cz_btn cz_btn_txt_no_fx cz_btn_no_fx\" href=\"https:\/\/ihcoedu.uobaghdad.edu.iq\/?page_id=41455\" title=\"\u0627\u0644\u0627\u062e\u0628\u0627\u0631\" aria-label=\"\u0627\u0644\u0627\u062e\u0628\u0627\u0631\"><span><strong>\u0634\u0624\u0648\u0646 \u0627\u0644\u0637\u0644\u0628\u0629<\/strong><\/span><b class=\"cz_btn_onhover\"><strong>\u0634\u0624\u0648\u0646 \u0627\u0644\u0637\u0644\u0628\u0629<\/strong><\/b><\/a><\/div><\/div>[\/vc_column_inner][vc_column_inner width=&#8221;1\/6&#8243;]<div class=\"cz_gap clr \" style=\"height: 15px\"><\/div><div class=\"cz_btn_block\"><div class=\"cz_46247_p\"><a id=\"cz_46247\" class=\"cz_46247 cz_btn cz_btn_txt_no_fx cz_btn_no_fx\" href=\"https:\/\/ihcoedu.uobaghdad.edu.iq\/?page_id=22669\" title=\"\u0627\u0644\u0627\u062e\u0628\u0627\u0631\" aria-label=\"\u0627\u0644\u0627\u062e\u0628\u0627\u0631\"><span><strong>\u0627\u0644\u0647\u064a\u0626\u0629 \u0627\u0644\u062a\u062f\u0631\u064a\u0633\u064a\u0629<\/strong><\/span><b class=\"cz_btn_onhover\"><strong>\u0627\u0644\u0647\u064a\u0626\u0629 \u0627\u0644\u062a\u062f\u0631\u064a\u0633\u064a\u0629<\/strong><\/b><\/a><\/div><\/div>[\/vc_column_inner][vc_column_inner width=&#8221;1\/6&#8243;]<div class=\"cz_gap clr \" style=\"height: 15px\"><\/div><div class=\"cz_btn_block\"><div class=\"cz_48281_p\"><a id=\"cz_48281\" class=\"cz_48281 cz_btn cz_btn_txt_no_fx cz_btn_no_fx\" href=\"https:\/\/ihcoedu.uobaghdad.edu.iq\/?page_id=23214\"><span><strong>\u0627\u0642\u0633\u0627\u0645 \u0627\u0644\u0643\u0644\u064a\u0629<\/strong><\/span><b class=\"cz_btn_onhover\"><strong>\u0627\u0642\u0633\u0627\u0645 \u0627\u0644\u0643\u0644\u064a\u0629<\/strong><\/b><\/a><\/div><\/div>[\/vc_column_inner][vc_column_inner width=&#8221;1\/6&#8243;]<div class=\"cz_gap clr \" style=\"height: 15px\"><\/div><div class=\"cz_btn_block\"><div class=\"cz_101505_p\"><a id=\"cz_101505\" class=\"cz_101505 cz_btn cz_btn_txt_no_fx cz_btn_no_fx\" href=\"https:\/\/ihcoedu.uobaghdad.edu.iq\/?page_id=48426\" title=\"\u0627\u0644\u0627\u062e\u0628\u0627\u0631\" aria-label=\"\u0627\u0644\u0627\u062e\u0628\u0627\u0631\"><span><strong>\u0627\u0644\u0627\u062e\u0628\u0627\u0631<\/strong><\/span><b class=\"cz_btn_onhover\"><strong>\u0627\u0644\u0627\u062e\u0628\u0627\u0631<\/strong><\/b><\/a><\/div><\/div>[\/vc_column_inner][\/vc_row_inner][vc_row_inner][vc_column_inner width=&#8221;1\/2&#8243;]<div class=\"cz_gap clr \" style=\"height: 15px\"><\/div><div class=\"cz_btn_block\"><div class=\"cz_104059_p\"><a id=\"cz_104059\" class=\"cz_104059 cz_btn cz_btn_txt_no_fx cz_btn_no_fx\" href=\"https:\/\/mohesr.gov.iq\/ar\/\" 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