{"id":1940,"date":"2023-11-22T22:11:37","date_gmt":"2023-11-22T21:11:37","guid":{"rendered":"http:\/\/localhost:8080\/maxblog\/?p=1940"},"modified":"2023-11-22T22:14:00","modified_gmt":"2023-11-22T21:14:00","slug":"se-constituer-un-repertoire-de-fonctions-de-reference","status":"publish","type":"post","link":"https:\/\/www.maxdecours.com\/maxblog\/se-constituer-un-repertoire-de-fonctions-de-reference\/","title":{"rendered":"Se constituer un r\u00e9pertoire de fonctions de r\u00e9f\u00e9rence"},"content":{"rendered":"\t\t<div data-elementor-type=\"wp-post\" data-elementor-id=\"1940\" class=\"elementor elementor-1940\">\n\t\t\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-7d71a4a elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"7d71a4a\" data-element_type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-389cd7d\" data-id=\"389cd7d\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-a8169f1 elementor-widget elementor-widget-spacer\" data-id=\"a8169f1\" data-element_type=\"widget\" data-widget_type=\"spacer.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t<div class=\"elementor-spacer\">\n\t\t\t<div class=\"elementor-spacer-inner\"><\/div>\n\t\t<\/div>\n\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-7643655 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"7643655\" data-element_type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-f297427\" data-id=\"f297427\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-361d80f elementor-widget elementor-widget-heading\" data-id=\"361d80f\" data-element_type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elementor-heading-title elementor-size-xl\">Se constituer un r\u00e9pertoire de fonctions de r\u00e9f\u00e9rence<\/div>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-de06178 elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"de06178\" data-element_type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-50 elementor-top-column elementor-element elementor-element-c8b729b\" data-id=\"c8b729b\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap\">\n\t\t\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t<div class=\"elementor-column elementor-col-50 elementor-top-column elementor-element elementor-element-1f07f28\" data-id=\"1f07f28\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap\">\n\t\t\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<section class=\"elementor-section elementor-top-section elementor-element elementor-element-b7c611b elementor-section-boxed elementor-section-height-default elementor-section-height-default\" data-id=\"b7c611b\" data-element_type=\"section\">\n\t\t\t\t\t\t<div class=\"elementor-container elementor-column-gap-default\">\n\t\t\t\t\t<div class=\"elementor-column elementor-col-100 elementor-top-column elementor-element elementor-element-9a7e2c2\" data-id=\"9a7e2c2\" data-element_type=\"column\">\n\t\t\t<div class=\"elementor-widget-wrap elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-fffe349 nc-justify-text elementor-widget elementor-widget-text-editor\" data-id=\"fffe349\" data-element_type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<div id=\"ez-toc-container\" class=\"ez-toc-v2_0_82_2 counter-hierarchy ez-toc-counter ez-toc-grey ez-toc-container-direction\">\n<div class=\"ez-toc-title-container\">\n<p class=\"ez-toc-title\" style=\"cursor:inherit\">Table of Contents<\/p>\n<span class=\"ez-toc-title-toggle\"><a href=\"#\" class=\"ez-toc-pull-right ez-toc-btn ez-toc-btn-xs ez-toc-btn-default ez-toc-toggle\" aria-label=\"Toggle Table of Content\"><span class=\"ez-toc-js-icon-con\"><span class=\"\"><span class=\"eztoc-hide\" style=\"display:none;\">Toggle<\/span><span class=\"ez-toc-icon-toggle-span\"><svg style=\"fill: #999;color:#999\" xmlns=\"http:\/\/www.w3.org\/2000\/svg\" class=\"list-377408\" width=\"20px\" height=\"20px\" viewBox=\"0 0 24 24\" fill=\"none\"><path d=\"M6 6H4v2h2V6zm14 0H8v2h12V6zM4 11h2v2H4v-2zm16 0H8v2h12v-2zM4 16h2v2H4v-2zm16 0H8v2h12v-2z\" fill=\"currentColor\"><\/path><\/svg><svg style=\"fill: #999;color:#999\" class=\"arrow-unsorted-368013\" xmlns=\"http:\/\/www.w3.org\/2000\/svg\" width=\"10px\" height=\"10px\" viewBox=\"0 0 24 24\" version=\"1.2\" baseProfile=\"tiny\"><path d=\"M18.2 9.3l-6.2-6.3-6.2 6.3c-.2.2-.3.4-.3.7s.1.5.3.7c.2.2.4.3.7.3h11c.3 0 .5-.1.7-.3.2-.2.3-.5.3-.7s-.1-.5-.3-.7zM5.8 14.7l6.2 6.3 6.2-6.3c.2-.2.3-.5.3-.7s-.1-.5-.3-.7c-.2-.2-.4-.3-.7-.3h-11c-.3 0-.5.1-.7.3-.2.2-.3.5-.3.7s.1.5.3.7z\"\/><\/svg><\/span><\/span><\/span><\/a><\/span><\/div>\n<nav><ul class='ez-toc-list ez-toc-list-level-1 ' ><li class='ez-toc-page-1 ez-toc-heading-level-1'><a class=\"ez-toc-link ez-toc-heading-1\" href=\"https:\/\/www.maxdecours.com\/maxblog\/se-constituer-un-repertoire-de-fonctions-de-reference\/#Introduction\" >Introduction<\/a><\/li><li class='ez-toc-page-1 ez-toc-heading-level-1'><a class=\"ez-toc-link ez-toc-heading-2\" href=\"https:\/\/www.maxdecours.com\/maxblog\/se-constituer-un-repertoire-de-fonctions-de-reference\/#Cours\" >Cours<\/a><ul class='ez-toc-list-level-2' ><li class='ez-toc-heading-level-2'><a class=\"ez-toc-link ez-toc-heading-3\" href=\"https:\/\/www.maxdecours.com\/maxblog\/se-constituer-un-repertoire-de-fonctions-de-reference\/#1_Fonctions_de_reference\" >1. Fonctions de r\u00e9f\u00e9rence<\/a><\/li><\/ul><\/li><li class='ez-toc-page-1 ez-toc-heading-level-1'><a class=\"ez-toc-link ez-toc-heading-4\" href=\"https:\/\/www.maxdecours.com\/maxblog\/se-constituer-un-repertoire-de-fonctions-de-reference\/#Methodes\" >M\u00e9thodes<\/a><ul class='ez-toc-list-level-2' ><li class='ez-toc-heading-level-2'><a class=\"ez-toc-link ez-toc-heading-5\" href=\"https:\/\/www.maxdecours.com\/maxblog\/se-constituer-un-repertoire-de-fonctions-de-reference\/#1_Comparaison_de_fa_et_fb_pour_a_et_b_donnes\" >1. Comparaison de f(a) et f(b) pour a et b donn\u00e9s<\/a><\/li><li class='ez-toc-page-1 ez-toc-heading-level-2'><a class=\"ez-toc-link ez-toc-heading-6\" href=\"https:\/\/www.maxdecours.com\/maxblog\/se-constituer-un-repertoire-de-fonctions-de-reference\/#2_Resolution_graphique_ou_algebrique_dune_equation_ou_dune_inequation_du_type_fx_k_ou_fx_%3C_k\" >2. R\u00e9solution graphique ou alg\u00e9brique d&rsquo;une \u00e9quation ou d&rsquo;une in\u00e9quation du type f(x) = k ou f(x) &lt; k<\/a><\/li><\/ul><\/li><\/ul><\/nav><\/div>\n<h1><span class=\"ez-toc-section\" id=\"Introduction\"><\/span>Introduction<span class=\"ez-toc-section-end\"><\/span><\/h1><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\">Se constituer un r\u00e9pertoire de fonctions de r\u00e9f\u00e9rence permet d&rsquo;avoir des outils de base pour analyser une grande vari\u00e9t\u00e9 de fonctions. La ma\u00eetrise de ces fonctions de base et des m\u00e9thodes associ\u00e9es est fondamentale pour progresser dans l&rsquo;\u00e9tude des fonctions plus complexes.<\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\">\u00a0<\/p><h1><span class=\"ez-toc-section\" id=\"Cours\"><\/span>Cours<span class=\"ez-toc-section-end\"><\/span><\/h1><p class=\"MsoNormal\">\u00a0<\/p><h2><span class=\"ez-toc-section\" id=\"1_Fonctions_de_reference\"><\/span>1. Fonctions de r\u00e9f\u00e9rence<span class=\"ez-toc-section-end\"><\/span><\/h2><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>1.1 Fonction carr\u00e9 : <span class=\"katex-eq\" data-katex-display=\"false\">f(x) = x^2<\/span><\/b><\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>D\u00e9finition<\/b> : La fonction carr\u00e9 associe \u00e0 un nombre <span class=\"katex-eq\" data-katex-display=\"false\">x<\/span> son carr\u00e9 <span class=\"katex-eq\" data-katex-display=\"false\">x^2<\/span>.<\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>Courbe repr\u00e9sentative<\/b> : Il s&rsquo;agit d&rsquo;une parabole sym\u00e9trique par rapport \u00e0 l&rsquo;axe des ordonn\u00e9es, ouverte vers le haut, ayant son sommet en <span class=\"katex-eq\" data-katex-display=\"false\">O(0,0)<\/span>.<\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>1.2 Fonction inverse : <span class=\"katex-eq\" data-katex-display=\"false\">f(x) = \\frac{1}{x}<\/span><\/b><\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>D\u00e9finition<\/b> : La fonction inverse associe \u00e0 un nombre <span class=\"katex-eq\" data-katex-display=\"false\">x<\/span>, diff\u00e9rent de 0, son inverse <span class=\"katex-eq\" data-katex-display=\"false\">\\frac{1}{x}<\/span>.<\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>Courbe repr\u00e9sentative <\/b>: Cette fonction est repr\u00e9sent\u00e9e par deux hyperboles sym\u00e9triques par rapport \u00e0 l&rsquo;origine, une dans chaque quadrant impair (I et III).<\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>1.3 Fonction racine carr\u00e9e : <span class=\"katex-eq\" data-katex-display=\"false\">f(x) = \\sqrt{x}<\/span><\/b><\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>D\u00e9finition<\/b> : La fonction racine carr\u00e9e associe \u00e0 un nombre <span class=\"katex-eq\" data-katex-display=\"false\">x<\/span> positif ou nul, sa racine carr\u00e9e <span class=\"katex-eq\" data-katex-display=\"false\">\\sqrt{x}<\/span>.<\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>Courbe repr\u00e9sentative<\/b> : La courbe est semblable \u00e0 la moiti\u00e9 gauche d&rsquo;une parabole qui serait inclin\u00e9e de 90\u00b0, d\u00e9butant \u00e0 l&rsquo;origine et croissant lorsque <span class=\"katex-eq\" data-katex-display=\"false\">x<\/span> augmente.<\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>1.4. Fonction cube : <span class=\"katex-eq\" data-katex-display=\"false\">f(x) = x^3<\/span><\/b><\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>D\u00e9finition<\/b> : La fonction cube associe \u00e0 un nombre <span class=\"katex-eq\" data-katex-display=\"false\">x<\/span> son cube <span class=\"katex-eq\" data-katex-display=\"false\">x^3<\/span>.<\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>Courbe repr\u00e9sentative<\/b> : La courbe de cette fonction ressemble \u00e0 celle de <span class=\"katex-eq\" data-katex-display=\"false\">x^2<\/span>, mais pr\u00e9sente une sym\u00e9trie par rapport \u00e0 l&rsquo;origine (contrairement \u00e0 <span class=\"katex-eq\" data-katex-display=\"false\">x^2<\/span> qui est sym\u00e9trique par rapport \u00e0 l&rsquo;axe des ordonn\u00e9es), cro\u00eet moins vite avant 1, et cro\u00eet plus vite apr\u00e8s 1.<\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\">\u00a0<\/p><h1><span class=\"ez-toc-section\" id=\"Methodes\"><\/span>M\u00e9thodes<span class=\"ez-toc-section-end\"><\/span><\/h1><p class=\"MsoNormal\">\u00a0<\/p><h2><span class=\"ez-toc-section\" id=\"1_Comparaison_de_fa_et_fb_pour_a_et_b_donnes\"><\/span>1. Comparaison de <span class=\"katex-eq\" data-katex-display=\"false\">f(a)<\/span> et <span class=\"katex-eq\" data-katex-display=\"false\">f(b)<\/span> pour <span class=\"katex-eq\" data-katex-display=\"false\">a<\/span> et <span class=\"katex-eq\" data-katex-display=\"false\">b<\/span> donn\u00e9s<span class=\"ez-toc-section-end\"><\/span><\/h2><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>M\u00e9thode num\u00e9rique :<\/b><\/p><p class=\"MsoNormal\">a) Calculez <span class=\"katex-eq\" data-katex-display=\"false\">f(a)<\/span> et <span class=\"katex-eq\" data-katex-display=\"false\">f(b)<\/span>.<span style=\"mso-spacerun: yes;\">\u00a0 <\/span><\/p><p class=\"MsoNormal\">b) Comparez les deux valeurs obtenues. Si <span class=\"katex-eq\" data-katex-display=\"false\">f(a) &gt; f(b)<\/span>, alors la courbe de la fonction est plus haute en <span class=\"katex-eq\" data-katex-display=\"false\">a<\/span> qu&rsquo;en <span class=\"katex-eq\" data-katex-display=\"false\">b<\/span>. Sinon, c&rsquo;est l&rsquo;inverse.<\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>M\u00e9thode graphique :<\/b><\/p><p class=\"MsoNormal\">a) Tracez la courbe repr\u00e9sentative de <span class=\"katex-eq\" data-katex-display=\"false\">f<\/span>.<span style=\"mso-spacerun: yes;\">\u00a0 <\/span><\/p><p class=\"MsoNormal\">b) Rep\u00e9rez les points <span class=\"katex-eq\" data-katex-display=\"false\">A(a, f(a))<\/span> et <span class=\"katex-eq\" data-katex-display=\"false\">B(b, f(b))<\/span> sur le graphique.<span style=\"mso-spacerun: yes;\">\u00a0 <\/span><\/p><p class=\"MsoNormal\">c) Comparez la hauteur des deux points pour d\u00e9terminer lequel est le plus haut.<\/p><p class=\"MsoNormal\">\u00a0<\/p><h2><span class=\"ez-toc-section\" id=\"2_Resolution_graphique_ou_algebrique_dune_equation_ou_dune_inequation_du_type_fx_k_ou_fx_%3C_k\"><\/span>2. R\u00e9solution graphique ou alg\u00e9brique d&rsquo;une \u00e9quation ou d&rsquo;une in\u00e9quation du type <span class=\"katex-eq\" data-katex-display=\"false\">f(x) = k<\/span> ou <span class=\"katex-eq\" data-katex-display=\"false\">f(x) &lt; k<\/span><span class=\"ez-toc-section-end\"><\/span><\/h2><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>M\u00e9thode graphique :<span style=\"mso-spacerun: yes;\">\u00a0 <\/span><\/b><\/p><p class=\"MsoNormal\">a) Tracez la courbe repr\u00e9sentative de <span class=\"katex-eq\" data-katex-display=\"false\">f<\/span>.<span style=\"mso-spacerun: yes;\">\u00a0 <\/span><\/p><p class=\"MsoNormal\">b) Tracez la droite horizontale d&rsquo;\u00e9quation <span class=\"katex-eq\" data-katex-display=\"false\">y = k<\/span>.<span style=\"mso-spacerun: yes;\">\u00a0 <\/span><\/p><p class=\"MsoNormal\">c) Les points d&rsquo;intersection entre la courbe de <span class=\"katex-eq\" data-katex-display=\"false\">f<\/span> et cette droite correspondent aux solutions de <span class=\"katex-eq\" data-katex-display=\"false\">f(x) = k<\/span>.<span style=\"mso-spacerun: yes;\">\u00a0 <\/span><\/p><p class=\"MsoNormal\">d) Pour l&rsquo;in\u00e9quation, d\u00e9terminez les zones o\u00f9 la courbe est au-dessus (ou en dessous) de la droite <span class=\"katex-eq\" data-katex-display=\"false\">y = k<\/span>.<\/p><p class=\"MsoNormal\">\u00a0<\/p><p class=\"MsoNormal\"><b>M\u00e9thode alg\u00e9brique : <\/b><\/p><p class=\"MsoNormal\">a) Posez l&rsquo;\u00e9quation <span class=\"katex-eq\" data-katex-display=\"false\">f(x) = k<\/span> ou l&rsquo;in\u00e9quation <span class=\"katex-eq\" data-katex-display=\"false\">f(x) &lt; k<\/span>.<span style=\"mso-spacerun: yes;\">\u00a0 <\/span><\/p><p class=\"MsoNormal\">b) R\u00e9solvez l&rsquo;\u00e9quation ou l&rsquo;in\u00e9quation obtenue. Les solutions trouv\u00e9es sont les <span class=\"katex-eq\" data-katex-display=\"false\">x<\/span> pour lesquels <span class=\"katex-eq\" data-katex-display=\"false\">f(x)<\/span> vaut <span class=\"katex-eq\" data-katex-display=\"false\">k<\/span> ou est inf\u00e9rieur \u00e0 <span class=\"katex-eq\" data-katex-display=\"false\">k<\/span>.<\/p><p class=\"MsoNormal\">\u00a0<\/p><p><style>@font-face\n\t{font-family:\"Cambria Math\";\n\tpanose-1:2 4 5 3 5 4 6 3 2 4;\n\tmso-font-charset:0;\n\tmso-generic-font-family:roman;\n\tmso-font-pitch:variable;\n\tmso-font-signature:-536870145 1107305727 0 0 415 0;}@font-face\n\t{font-family:Calibri;\n\tpanose-1:2 15 5 2 2 2 4 3 2 4;\n\tmso-font-charset:0;\n\tmso-generic-font-family:swiss;\n\tmso-font-pitch:variable;\n\tmso-font-signature:-536859905 -1073732485 9 0 511 0;}@font-face\n\t{font-family:\"Calibri Light\";\n\tpanose-1:2 15 3 2 2 2 4 3 2 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elementor-element-populated\">\n\t\t\t\t\t\t<div class=\"elementor-element elementor-element-342de24 elementor-widget elementor-widget-spacer\" data-id=\"342de24\" data-element_type=\"widget\" data-widget_type=\"spacer.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t<div class=\"elementor-spacer\">\n\t\t\t<div class=\"elementor-spacer-inner\"><\/div>\n\t\t<\/div>\n\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t<\/section>\n\t\t\t\t<\/div>\n\t\t","protected":false},"excerpt":{"rendered":"<p>Se constituer un r\u00e9pertoire de fonctions de r\u00e9f\u00e9rence Introduction Se constituer un r\u00e9pertoire de fonctions de r\u00e9f\u00e9rence permet d&rsquo;avoir des outils de base pour analyser une grande vari\u00e9t\u00e9 de fonctions. La ma\u00eetrise de ces fonctions de base et des m\u00e9thodes associ\u00e9es est fondamentale pour progresser dans l&rsquo;\u00e9tude des fonctions plus complexes. Cours 1. Fonctions de [&hellip;]<\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"elementor_canvas","format":"standard","meta":{"footnotes":""},"categories":[25,26,5],"tags":[],"_links":{"self":[{"href":"https:\/\/www.maxdecours.com\/maxblog\/wp-json\/wp\/v2\/posts\/1940"}],"collection":[{"href":"https:\/\/www.maxdecours.com\/maxblog\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/www.maxdecours.com\/maxblog\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/www.maxdecours.com\/maxblog\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/www.maxdecours.com\/maxblog\/wp-json\/wp\/v2\/comments?post=1940"}],"version-history":[{"count":5,"href":"https:\/\/www.maxdecours.com\/maxblog\/wp-json\/wp\/v2\/posts\/1940\/revisions"}],"predecessor-version":[{"id":1945,"href":"https:\/\/www.maxdecours.com\/maxblog\/wp-json\/wp\/v2\/posts\/1940\/revisions\/1945"}],"wp:attachment":[{"href":"https:\/\/www.maxdecours.com\/maxblog\/wp-json\/wp\/v2\/media?parent=1940"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.maxdecours.com\/maxblog\/wp-json\/wp\/v2\/categories?post=1940"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.maxdecours.com\/maxblog\/wp-json\/wp\/v2\/tags?post=1940"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}