{"id":1353,"date":"2025-03-22T11:14:28","date_gmt":"2025-03-22T08:14:28","guid":{"rendered":"https:\/?p=1353"},"modified":"2025-04-12T21:16:07","modified_gmt":"2025-04-12T18:16:07","slug":"kutsal-geometri-ve-evrensel-duzen","status":"publish","type":"post","link":"https:\/\/leyhatlari.com\/index.php\/dogadaki-geometri\/kutsal-geometri-ve-evrensel-duzen\/","title":{"rendered":"Kutsal Geometri ve Evrensel D\u00fczen"},"content":{"rendered":"<p>Evren, mikro \u00f6l\u00e7ekte atomlardan makro \u00f6l\u00e7ekte galaksilere kadar uzanan bir d\u00fczende i\u015fler. Bu d\u00fczen, belirli matematiksel ve geometrik kurallara dayan\u0131r. Antik \u00e7a\u011f filozoflar\u0131 ve din adamlar\u0131, g\u00f6zlem, mant\u0131k ve sezgi yoluyla bu d\u00fczeni fark etmi\u015f ve onu \u201cKutsal Geometri\u201d olarak adland\u0131rm\u0131\u015ft\u0131r. Tanr\u0131\u2019y\u0131 ise \u201cY\u00fcce Geometri Ustas\u0131\u201d olarak g\u00f6rm\u00fc\u015flerdir. Bu nedenle tap\u0131nak mimarisinde ve s\u00fcslemelerinde daireler, \u00fc\u00e7genler, d\u00f6rtgenler, be\u015fgenler ve alt\u0131genler gibi temel geometrik formlar kullan\u0131larak bu inan\u00e7 yans\u0131t\u0131lm\u0131\u015ft\u0131r.<\/p>\n<p>Do\u011faya dikkatle bakt\u0131\u011f\u0131m\u0131zda her \u015feyin estetik, oran, ritim, denge ve uyum i\u00e7inde oldu\u011funu g\u00f6r\u00fcr\u00fcz. Canl\u0131lar\u0131n DNA yap\u0131s\u0131ndan \u00e7i\u00e7eklerin ta\u00e7 yapraklar\u0131na, a\u011fa\u00e7 g\u00f6vdelerinden \u00f6r\u00fcmcek a\u011flar\u0131na, ar\u0131 peteklerinden kar tanelerine, G\u00fcne\u015f Sistemi\u2019ndeki gezegenlerin y\u00f6r\u00fcngelerine kadar** bu evrensel mimari g\u00f6zlemlenebilir. Bu geometrik uyum, yarat\u0131l\u0131\u015ftaki ilahi akl\u0131n bir tecellisidir ve bu tecellide binlerce s\u0131r sakl\u0131d\u0131r. \u0130nsan, bu s\u0131rlar\u0131 \u00e7\u00f6zd\u00fck\u00e7e evrenin daha derin katmanlar\u0131na ula\u015fabilir. Kutsal Geometri, her \u015feyin dili ve evrenin bilgisini yans\u0131tma arac\u0131d\u0131r. Bu y\u00fczden t\u00fcm varl\u0131klar belirli geometrik \u00f6zelliklerle donat\u0131lm\u0131\u015ft\u0131r.<\/p>\n<p>Son y\u0131llarda modern bilim de bu kadim bilgilere y\u00f6nelmi\u015f ve evrenin geometrik yap\u0131s\u0131, bir\u00e7ok bilimsel ke\u015ffin temelini olu\u015fturmu\u015ftur. \u00d6zellikle Fibonacci say\u0131 dizisi ve alt\u0131n oran, bu kutsal d\u00fczenin bilimsel temelini olu\u015fturan en \u00f6nemli unsurlar aras\u0131nda yer al\u0131r.<\/p>\n<p><strong>\u00a0 \u00a0 Fibonacci Say\u0131 Dizisi ve Alt\u0131n Oran<\/strong><\/p>\n<p>Alt\u0131n oran, (1,618\u2026), estetik ve matematiksel a\u00e7\u0131dan \u00f6zel bir oran olup, do\u011fada ve sanatta s\u0131k\u00e7a g\u00f6r\u00fcl\u00fcr. Bu oran, antik \u00e7a\u011flardan beri mimari yap\u0131larda ve sanat eserlerinde estetik bir \u00f6l\u00e7\u00fc d\u00fczeni olarak kullan\u0131lm\u0131\u015ft\u0131r. Matematiksel olarak ilk kez M.\u00d6. 3. y\u00fczy\u0131lda \u00d6klid taraf\u0131ndan \u201c\u00d6\u011feler\u201d adl\u0131 eserinde \u201ca\u015f\u0131t ve ortalama oran\u201d ad\u0131yla tan\u0131mlanm\u0131\u015ft\u0131r. Ancak bu bilgi, \u00e7ok daha eskilere dayan\u0131r. Eski M\u0131s\u0131r\u2019da M.\u00d6. 3000\u2019li y\u0131llarda alt\u0131n oran\u0131n bilindi\u011fi ve piramitler gibi mimari eserlerde kullan\u0131ld\u0131\u011f\u0131 bilinmektedir.<\/p>\n<p>Alt\u0131n oran, bir do\u011fru par\u00e7as\u0131n\u0131n belirli bir noktadan AB\/AC = AC\/CB olacak \u015fekilde b\u00f6l\u00fcnmesiyle elde edilir. Matematiksel olarak ifade edersek:<\/p>\n<p>x + 1 = x^2<\/p>\n<p>x^2 \u2013 x \u2013 1 = 0<\/p>\n<p>Bu denklemin \u00e7\u00f6z\u00fcm\u00fc, 1.618\u2026 (fi, \u03c6) de\u011ferini verir. Alt\u0131n oran, kendine \u00f6zg\u00fc birka\u00e7 e\u015fsiz matematiksel \u00f6zelli\u011fe sahiptir:<\/p>\n<ol>\n<li>Tersi al\u0131nd\u0131\u011f\u0131nda (1\/1.618) de\u011feri, yine alt\u0131n oranla ili\u015fkili olan 0.618\u2019i verir.<\/li>\n<\/ol>\n<p>1\/\u03c6 = 0.618<\/p>\n<p>\u03c6 + 1 = \u03c6^2<\/p>\n<p>Bu \u00f6zel oran, Fibonacci say\u0131 dizisi ile de do\u011frudan ba\u011flant\u0131l\u0131d\u0131r.<\/p>\n<p><strong>Fibonacci Say\u0131 Dizisi<\/strong><\/p>\n<p>Fibonacci dizisi, 0, 1 ile ba\u015flar ve her yeni say\u0131, kendisinden \u00f6nce gelen iki say\u0131n\u0131n toplam\u0131 olarak devam eder:<\/p>\n<p>0, 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 610, 987, 1597\u2026<\/p>\n<p>Bu dizide, her say\u0131 kendinden \u00f6nceki say\u0131ya b\u00f6l\u00fcnd\u00fc\u011f\u00fcnde alt\u0131n orana yak\u0131n bir de\u011fer verir. \u00d6rne\u011fin:<\/p>\n<p>34 \u00f7 21 = 1.619<\/p>\n<p>55 \u00f7 34 = 1.618<\/p>\n<p>89 \u00f7 55 = 1.618<\/p>\n<p>144 \u00f7 89 = 1.618<\/p>\n<p>Bu oran, dizi ilerledik\u00e7e 1.618\u2019e giderek daha fazla yakla\u015f\u0131r. Ayn\u0131 \u015fekilde, her Fibonacci say\u0131s\u0131n\u0131n bir sonraki say\u0131ya b\u00f6l\u00fcm\u00fc de 0.618 oran\u0131na yakla\u015f\u0131r. Bu nedenle alt\u0131n oran hem 1.618 hem de 0.618 olarak iki farkl\u0131 \u015fekilde tan\u0131mlanabilir.<\/p>\n<p><strong>\u00a0\u00a0 \u00a0Fibonacci Say\u0131lar\u0131 ve Alt\u0131n Oran Tablolar\u0131<\/strong><\/p>\n<p>A\u015fa\u011f\u0131daki tabloda Fibonacci dizisinin her bir say\u0131s\u0131n\u0131n, kendisinden \u00f6nceki ve sonraki say\u0131ya b\u00f6l\u00fcnmesiyle elde edilen alt\u0131n oran ve ters alt\u0131n oran de\u011ferleri g\u00f6sterilmektedir:<\/p>\n<p>Tablo incelendi\u011finde, Fibonacci dizisinin b\u00fcy\u00fcd\u00fck\u00e7e alt\u0131n orana sabitlenme e\u011filiminde oldu\u011fu a\u00e7\u0131k\u00e7a g\u00f6r\u00fclebilir.<\/p>\n<table width=\"0\">\n<tbody>\n<tr>\n<td colspan=\"4\" width=\"326\">Her say\u0131, kendinden\u00a0<strong>SONRAK\u0130<\/strong>\u00a0say\u0131ya b\u00f6l\u00fcnd\u00fc\u011f\u00fcnde: (0,618)<\/td>\n<td colspan=\"3\" width=\"298\">Her say\u0131, kendinden\u00a0<strong>\u00d6NCEK\u0130<\/strong>\u00a0say\u0131ya b\u00f6l\u00fcnd\u00fc\u011f\u00fcnde: (1,618)<\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>1.s<\/strong><\/td>\n<td width=\"57\">1<\/td>\n<td width=\"59\">1<\/td>\n<td width=\"171\"><strong>1<\/strong><\/td>\n<td width=\"56\">1<\/td>\n<td width=\"57\">1<\/td>\n<td width=\"185\"><strong>1<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>2.s<\/strong><\/td>\n<td width=\"57\">1<\/td>\n<td width=\"59\">2<\/td>\n<td width=\"171\"><strong>0,5<\/strong><\/td>\n<td width=\"56\">2<\/td>\n<td width=\"57\">1<\/td>\n<td width=\"185\"><strong>2<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>3.s<\/strong><\/td>\n<td width=\"57\">2<\/td>\n<td width=\"59\">3<\/td>\n<td width=\"171\"><strong>0,6666666666666666<\/strong><\/td>\n<td width=\"56\">3<\/td>\n<td width=\"57\">2<\/td>\n<td width=\"185\"><strong>1,5<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>4.s<\/strong><\/td>\n<td width=\"57\">3<\/td>\n<td width=\"59\">5<\/td>\n<td width=\"171\"><strong>0,6<\/strong><\/td>\n<td width=\"56\">5<\/td>\n<td width=\"57\">3<\/td>\n<td width=\"185\"><strong>1,666666666666666<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>5.s<\/strong><\/td>\n<td width=\"57\">5<\/td>\n<td width=\"59\">8<\/td>\n<td width=\"171\"><strong>0,625<\/strong><\/td>\n<td width=\"56\">8<\/td>\n<td width=\"57\">5<\/td>\n<td width=\"185\"><strong>1,6<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>6.s<\/strong><\/td>\n<td width=\"57\">8<\/td>\n<td width=\"59\">13<\/td>\n<td width=\"171\"><strong>0,615384615384615<\/strong><\/td>\n<td width=\"56\">13<\/td>\n<td width=\"57\">8<\/td>\n<td width=\"185\"><strong>1,625<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>7.s<\/strong><\/td>\n<td width=\"57\">13<\/td>\n<td width=\"59\">21<\/td>\n<td width=\"171\"><strong>0,619047619047619<\/strong><\/td>\n<td width=\"56\">21<\/td>\n<td width=\"57\">13<\/td>\n<td width=\"185\"><strong>1,615384615384615<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>8.<\/strong><\/td>\n<td width=\"57\">21<\/td>\n<td width=\"59\">34<\/td>\n<td width=\"171\"><strong>0,617647058823529<\/strong><\/td>\n<td width=\"56\">34<\/td>\n<td width=\"57\">21<\/td>\n<td width=\"185\"><strong>1,619047619047619<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>9.s<\/strong><\/td>\n<td width=\"57\">34<\/td>\n<td width=\"59\">55<\/td>\n<td width=\"171\"><strong>0,6181818181818181<\/strong><\/td>\n<td width=\"56\">55<\/td>\n<td width=\"57\">34<\/td>\n<td width=\"185\"><strong>1,617647058823529<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>10.s<\/strong><\/td>\n<td width=\"57\">55<\/td>\n<td width=\"59\">89<\/td>\n<td width=\"171\"><strong>0,6179775280898876<\/strong><\/td>\n<td width=\"56\">89<\/td>\n<td width=\"57\">55<\/td>\n<td width=\"185\"><strong>1,6181818181818181<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>11.s<\/strong><\/td>\n<td width=\"57\">89<\/td>\n<td width=\"59\">144<\/td>\n<td width=\"171\"><strong>0,6180555555555555<\/strong><\/td>\n<td width=\"56\">144<\/td>\n<td width=\"57\">89<\/td>\n<td width=\"185\"><strong>1,617977528089888<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>12.s<\/strong><\/td>\n<td width=\"57\">144<\/td>\n<td width=\"59\">233<\/td>\n<td width=\"171\"><strong>0,6180257510729614<\/strong><\/td>\n<td width=\"56\">233<\/td>\n<td width=\"57\">144<\/td>\n<td width=\"185\"><strong>1,618055555555555<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>13.s<\/strong><\/td>\n<td width=\"57\">233<\/td>\n<td width=\"59\">377<\/td>\n<td width=\"171\"><strong>0,6180371352785146<\/strong><\/td>\n<td width=\"56\">377<\/td>\n<td width=\"57\">233<\/td>\n<td width=\"185\"><strong>1,618025751072961<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>14.s<\/strong><\/td>\n<td width=\"57\">377<\/td>\n<td width=\"59\">610<\/td>\n<td width=\"171\"><strong>0,6180327868852459<\/strong><\/td>\n<td width=\"56\">610<\/td>\n<td width=\"57\">377<\/td>\n<td width=\"185\"><strong>1,618037135278514<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>15.s<\/strong><\/td>\n<td width=\"57\">610<\/td>\n<td width=\"59\">987<\/td>\n<td width=\"171\"><strong>0,6180344478216819<\/strong><\/td>\n<td width=\"56\">987<\/td>\n<td width=\"57\">610<\/td>\n<td width=\"185\"><strong>1,618032786885245<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>16.s<\/strong><\/td>\n<td width=\"57\">987<\/td>\n<td width=\"59\">1597<\/td>\n<td width=\"171\"><strong>0,6180338134001252<\/strong><\/td>\n<td width=\"56\">1597<\/td>\n<td width=\"57\">987<\/td>\n<td width=\"185\"><strong>1,618034447821682<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>17.s<\/strong><\/td>\n<td width=\"57\">1597<\/td>\n<td width=\"59\">2584<\/td>\n<td width=\"171\"><strong>0,6180340557275542<\/strong><\/td>\n<td width=\"56\">2584<\/td>\n<td width=\"57\">1597<\/td>\n<td width=\"185\"><strong>1,618033813400125<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>18.<\/strong><\/td>\n<td width=\"57\">2584<\/td>\n<td width=\"59\">4181<\/td>\n<td width=\"171\"><strong>0,6180339631667065<\/strong><\/td>\n<td width=\"56\">4181<\/td>\n<td width=\"57\">2584<\/td>\n<td width=\"185\"><strong>1,618034055727554<\/strong><\/td>\n<\/tr>\n<tr>\n<td width=\"39\"><strong>19.s<\/strong><\/td>\n<td width=\"57\">4181<\/td>\n<td width=\"59\">6765<\/td>\n<td width=\"171\"><strong>0,6180339985218034<\/strong><\/td>\n<td width=\"56\">6765<\/td>\n<td width=\"57\">4181<\/td>\n<td width=\"185\"><strong>1,618033963166707<\/strong><\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<p><strong>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 Alt\u0131n Oran ve Do\u011fadaki Yans\u0131malar\u0131<\/strong><\/p>\n<p>Alt\u0131n oran, do\u011fan\u0131n bir\u00e7ok alan\u0131nda kendini g\u00f6sterir:<\/p>\n<ol>\n<li>\u0130nsan V\u00fccudu:<\/li>\n<\/ol>\n<p>Parmak bo\u011fumlar\u0131 aras\u0131ndaki uzunluklar,<\/p>\n<p>Kol ve el oranlar\u0131,<\/p>\n<p>Omurga ve v\u00fccut oranlar\u0131,<\/p>\n<p>Y\u00fczdeki simetri ve oranlar.<\/p>\n<ol>\n<li>Bitkilerde:<\/li>\n<\/ol>\n<p>Ay\u00e7i\u00e7e\u011fi \u00e7ekirdeklerinin dizilimi,<\/p>\n<p>\u00c7am kozala\u011f\u0131 sarmallar\u0131,<\/p>\n<p>A\u011fa\u00e7 dallanma oranlar\u0131.<\/p>\n<ol>\n<li>Hayvanlar Alemi:<\/li>\n<\/ol>\n<p>Deniz kabuklar\u0131n\u0131n sarmal yap\u0131s\u0131,<\/p>\n<p>Kartal ve \u015fahinlerin u\u00e7u\u015f e\u011frileri,<\/p>\n<p>\u00d6r\u00fcmcek a\u011flar\u0131n\u0131n geometrisi.<\/p>\n<ol>\n<li>Astronomi:<\/li>\n<\/ol>\n<p>Gezegen y\u00f6r\u00fcngelerindeki mesafeler,<\/p>\n<p>Galaksilerin spiral yap\u0131lar\u0131.<\/p>\n<p>Bu veriler, evrenin temel yasalar\u0131n\u0131n belirli geometrik ve matematiksel ilkelerle i\u015fledi\u011fini g\u00f6stermektedir. Fibonacci say\u0131lar\u0131 ve alt\u0131n oran, sadece matematiksel bir ilke de\u011fil, ayn\u0131 zamanda evrenin bir dili, kutsal bir geometri ve do\u011fan\u0131n temel yap\u0131s\u0131d\u0131r.<\/p>\n<p><strong>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 Sonu\u00e7<\/strong><\/p>\n<p>Kutsal Geometri, do\u011fa, sanat ve bilimdeki estetik ve matematiksel uyumu temsil eder. Fibonacci dizisi ve alt\u0131n oran, bu kozmik d\u00fczenin matematiksel ifadelerinden biridir. Modern bilim, bu kadim bilgileri ke\u015ffederek evrenin s\u0131rlar\u0131n\u0131 \u00e7\u00f6zmeye devam etmektedir. Bu bilgiler, sadece teorik matematik i\u00e7in de\u011fil, ayn\u0131 zamanda mimari, sanat, biyoloji, fizik ve astronomi gibi pek \u00e7ok alanda devrim niteli\u011finde ke\u015fiflere yol a\u00e7maktad\u0131r.<\/p>\n<p><a href=\"https:\/index.php\/birinci-bolum\/fibonacci-sayi-dizisi-ve-altin-oran\/#_ftnref1\">[1]<\/a>\u00a0http:\/\/www.bilimist.com\/blog-90\/altin-oran-nedir-altin-oran-arastirmalari-fibonacci-sayilari-altin-oran-sayisi.html<\/p>\n<p><a href=\"https:\/index.php\/birinci-bolum\/fibonacci-sayi-dizisi-ve-altin-oran\/#_ftnref2\">[2]<\/a>\u00a0Erdo\u011fan \u015een, \u201cFibonacci Say\u0131lar\u0131, Alt\u0131n Oran ve Uygulamalar\u0131\u201d, Matematik Anabilim Dal\u0131, Gebze, 2008.<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Evren, mikro \u00f6l\u00e7ekte atomlardan makro \u00f6l\u00e7ekte galaksilere kadar uzanan bir d\u00fczende i\u015fler. Bu d\u00fczen, belirli matematiksel ve geometrik kurallara dayan\u0131r. Antik \u00e7a\u011f filozoflar\u0131 ve din adamlar\u0131, g\u00f6zlem, mant\u0131k ve sezgi yoluyla bu d\u00fczeni fark etmi\u015f ve onu \u201cKutsal Geometri\u201d olarak adland\u0131rm\u0131\u015ft\u0131r. Tanr\u0131\u2019y\u0131 ise \u201cY\u00fcce Geometri Ustas\u0131\u201d olarak g\u00f6rm\u00fc\u015flerdir. Bu nedenle tap\u0131nak mimarisinde ve s\u00fcslemelerinde daireler, [&hellip;]<\/p>\n","protected":false},"author":1,"featured_media":396,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[358],"tags":[495,494,26,499,501,504,505,503,487,508,488,483,496,509,482,493,491,30,490,507,481,497,502,485,25,484,498,486,18,506,489,500,492],"class_list":["post-1353","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-dogadaki-geometri","tag-0-618","tag-1-618","tag-altin-oran","tag-antik-bilgelik","tag-ari-petekleri","tag-aycicegi-spiral","tag-cam-kozalagi","tag-dna","tag-dna-geometrisi","tag-doga-ve-matematik","tag-dogadaki-oranlar","tag-dogal-geometri","tag-estetik-matematik","tag-evrenin-dili","tag-evrensel-duzen","tag-fi","tag-fibonacci-dizisi","tag-fibonacci-sayilari","tag-galaksi-yapilari","tag-geometrik-felsefe","tag-geometrik-uyum","tag-ilahi-mimari","tag-kar-taneleri","tag-kozmik-mimari","tag-kutsal-geometri","tag-matematik-ve-doga","tag-mimari-geometri","tag-oklid","tag-piramitler","tag-sanat-ve-bilim","tag-spiraller","tag-yuce-geometri-ustasi","tag-492"],"jetpack_featured_media_url":"https:\/\/leyhatlari.com\/wp-content\/uploads\/2020\/04\/fibonacci-dizisi.jpg","jetpack_sharing_enabled":true,"_links":{"self":[{"href":"https:\/\/leyhatlari.com\/index.php\/wp-json\/wp\/v2\/posts\/1353","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/leyhatlari.com\/index.php\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/leyhatlari.com\/index.php\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/leyhatlari.com\/index.php\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/leyhatlari.com\/index.php\/wp-json\/wp\/v2\/comments?post=1353"}],"version-history":[{"count":0,"href":"https:\/\/leyhatlari.com\/index.php\/wp-json\/wp\/v2\/posts\/1353\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/leyhatlari.com\/index.php\/wp-json\/wp\/v2\/media\/396"}],"wp:attachment":[{"href":"https:\/\/leyhatlari.com\/index.php\/wp-json\/wp\/v2\/media?parent=1353"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/leyhatlari.com\/index.php\/wp-json\/wp\/v2\/categories?post=1353"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/leyhatlari.com\/index.php\/wp-json\/wp\/v2\/tags?post=1353"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}