{"id":78,"date":"2026-03-02T15:18:05","date_gmt":"2026-03-02T14:18:05","guid":{"rendered":"https:\/\/zalapto.pl\/baza\/?p=78"},"modified":"2026-03-04T20:12:01","modified_gmt":"2026-03-04T19:12:01","slug":"funkcja-kwadratowa-zadania","status":"publish","type":"post","link":"https:\/\/zalapto.pl\/baza\/funkcja-kwadratowa-zadania\/","title":{"rendered":"Funkcja kwadratowa zadania &#8211; trening do matury"},"content":{"rendered":"\r\n\r\n\r\n<div class=\"alert alert-primary border-0 shadow-sm rounded-4 p-4 mb-4\">\r\n    <h4 class=\"fw-bold mb-0\"><i class=\"bi bi-rocket-takeoff\"><\/i> Interaktywny Trening Maturalny!<\/h4>\r\n    <p class=\"small muted text-secondary opacity-50 m-0 mb-1\">Funkcja kwadratowa zadania<\/p>\r\n    <p class=\"mb-0\">Przed Tob\u0105 3 typowe zadania z funkcji kwadratowej. Rozwi\u0105\u017c je na kartce, a nast\u0119pnie <strong>wpisz sw\u00f3j wynik w pole poni\u017cej<\/strong>, aby system sprawdzi\u0142 Twoj\u0105 odpowied\u017a. Je\u015bli utkniesz, kliknij w podpowied\u017a!<\/p>\r\n<\/div>\r\n\r\n<figure class=\"wp-block-image size-full\"><img loading=\"lazy\" decoding=\"async\" width=\"630\" height=\"591\" src=\"https:\/\/zalapto.pl\/baza\/wp-content\/uploads\/2026\/03\/HzadT2x.png\" alt=\"funkcja kwadratowa zadania - wykres paraboli\" class=\"wp-image-112 mx-auto d-block\" style=\"width: 15rem; height: auto;\" srcset=\"https:\/\/zalapto.pl\/baza\/wp-content\/uploads\/2026\/03\/HzadT2x.png 630w, https:\/\/zalapto.pl\/baza\/wp-content\/uploads\/2026\/03\/HzadT2x-300x281.png 300w\" sizes=\"auto, (max-width: 630px) 100vw, 630px\" \/><\/figure>\r\n\r\n<div class=\"card border border-light shadow-sm rounded-4 mb-5\">\r\n    <div class=\"card-body p-4 p-md-5\">\r\n        <h3 class=\"fw-bold text-dark mb-3\">Zadanie 1: Klasyczne miejsca zerowe<\/h3>\r\n        <p class=\"fs-5\">Wyznacz miejsca zerowe funkcji kwadratowej okre\u015blonej wzorem:<\/p>\r\n        \r\n        <div class=\"text-center my-4 fs-4\">\r\n            $$ f(x) = x^2 &#8211; 5x + 6 $$\r\n        <\/div>\r\n\r\n        <details class=\"mb-4\">\r\n            <summary class=\"btn btn-warning text-dark fw-bold rounded-pill px-4\" style=\"cursor: pointer;\">\r\n                <i class=\"bi bi-lightbulb\"><\/i> Potrzebuj\u0119 podpowiedzi\r\n            <\/summary>\r\n            <div class=\"p-4 mt-3 bg-light border rounded-4\">\r\n                Wypisz wsp\u00f3\u0142czynniki \\( a \\), \\( b \\), \\( c \\) i skorzystaj z klasycznego wzoru na wyr\u00f3\u017cnik r\u00f3wnania kwadratowego (delt\u0119): \r\n                $$ \\Delta = b^2 &#8211; 4ac $$\r\n<span class=\"text-secondary small\">Wi\u0119cej o wymaganiach maturalnych w tym zakresie znajdziesz na oficjalnej <a href=\"https:\/\/cke.gov.pl\/\" class=\"text-primary\" target=\"_blank\" rel=\"noopener\">stronie CKE<\/a>.<\/span>\r\n            <\/div>\r\n        <\/details>\r\n\r\n        <div class=\"bg-light p-4 rounded-4 border\">\r\n            <h5 class=\"fw-bold mb-3 text-primary\"><i class=\"bi bi-pencil-square\"><\/i> Twoja odpowied\u017a:<\/h5>\r\n            <div class=\"row g-3 align-items-center mb-2\">\r\n                <div class=\"col-auto\">\r\n                    <div class=\"input-group shadow-sm\">\r\n                        <span class=\"input-group-text bg-white fw-bold\">x\u2081 =<\/span>\r\n                        <input type=\"number\" id=\"t1-ans1\" class=\"form-control text-center\" style=\"max-width: 80px;\" placeholder=\"np. 1\">\r\n                    <\/div>\r\n                <\/div>\r\n                <div class=\"col-auto\">\r\n                    <div class=\"input-group shadow-sm\">\r\n                        <span class=\"input-group-text bg-white fw-bold\">x\u2082 =<\/span>\r\n                        <input type=\"number\" id=\"t1-ans2\" class=\"form-control text-center\" style=\"max-width: 80px;\" placeholder=\"np. 2\">\r\n                    <\/div>\r\n                <\/div>\r\n                <div class=\"col-auto\">\r\n                    <button class=\"btn btn-primary fw-bold rounded-pill px-4 shadow-sm\" onclick=\"checkTask1()\">Sprawd\u017a<\/button>\r\n                <\/div>\r\n            <\/div>\r\n            \r\n            <div id=\"t1-feedback\" class=\"mt-3 fs-6\"><\/div>\r\n            <button class=\"btn btn-outline-secondary btn-sm rounded-pill mt-2 d-none\" id=\"t1-show-btn\" onclick=\"showSolution('t1')\"><i class=\"bi bi-eye\"><\/i> Poddaj\u0119 si\u0119, poka\u017c rozwi\u0105zanie<\/button>\r\n        <\/div>\r\n\r\n        <div id=\"t1-solution\" class=\"p-4 mt-4 bg-success bg-opacity-10 border border-success rounded-4 d-none\">\r\n            <h5 class=\"text-success fw-bold border-bottom border-success pb-2 mb-3\">Rozwi\u0105zanie krok po kroku:<\/h5>\r\n            <p><strong>1. Wypisujemy wsp\u00f3\u0142czynniki:<\/strong><br>\r\n            \\( a = 1 \\), \\( b = -5 \\), \\( c = 6 \\)<\/p>\r\n            \r\n            <p><strong>2. Liczymy delt\u0119:<\/strong><\/p>\r\n            $$ \\Delta = (-5)^2 &#8211; 4 \\cdot 1 \\cdot 6 $$\r\n            $$ \\Delta = 25 &#8211; 24 = 1 $$\r\n            \r\n            <p>Poniewa\u017c \\( \\Delta > 0 \\), mamy dwa miejsca zerowe (\\( \\sqrt{\\Delta} = 1 \\)):<\/p>\r\n            $$ x_1 = \\frac{-b &#8211; \\sqrt{\\Delta}}{2a} = \\frac{5 &#8211; 1}{2} = 2 $$\r\n            $$ x_2 = \\frac{-b + \\sqrt{\\Delta}}{2a} = \\frac{5 + 1}{2} = 3 $$\r\n            \r\n            <p class=\"fw-bold mb-0 mt-3 text-success\">Odpowied\u017a: Miejsca zerowe tej funkcji to \\( x = 2 \\) oraz \\( x = 3 \\).<\/p>\r\n        <\/div>\r\n    <\/div>\r\n<\/div>\r\n\r\n<div class=\"card border border-light shadow-sm rounded-4 mb-5\">\r\n    <div class=\"card-body p-4 p-md-5\">\r\n        <h3 class=\"fw-bold text-dark mb-3\">Zadanie 2: Szukamy wierzcho\u0142ka<\/h3>\r\n        <p class=\"fs-5\">Podaj wsp\u00f3\u0142rz\u0119dne wierzcho\u0142ka paraboli b\u0119d\u0105cej wykresem funkcji:<\/p>\r\n        \r\n        <div class=\"text-center my-4 fs-4\">\r\n            $$ f(x) = -2x^2 + 8x &#8211; 3 $$\r\n        <\/div>\r\n\r\n        <details class=\"mb-4\">\r\n            <summary class=\"btn btn-warning text-dark fw-bold rounded-pill px-4\" style=\"cursor: pointer;\">\r\n                <i class=\"bi bi-lightbulb\"><\/i> Potrzebuj\u0119 podpowiedzi\r\n            <\/summary>\r\n            <div class=\"p-4 mt-3 bg-light border rounded-4\">\r\n                Wsp\u00f3\u0142rz\u0119dne wierzcho\u0142ka paraboli oznaczamy jako \\( W = (p, q) \\).<br>\r\n                U\u017cyj wzoru na pierwsz\u0105 wsp\u00f3\u0142rz\u0119dn\u0105: \\( p = \\frac{-b}{2a} \\). Nast\u0119pnie oblicz \\( q \\) podstawiaj\u0105c wynik do wzoru funkcji, czyli \\( q = f(p) \\).\r\n            <\/div>\r\n        <\/details>\r\n\r\n        <div class=\"bg-light p-4 rounded-4 border\">\r\n            <h5 class=\"fw-bold mb-3 text-primary\"><i class=\"bi bi-pencil-square\"><\/i> Twoja odpowied\u017a:<\/h5>\r\n            <div class=\"row g-3 align-items-center mb-2\">\r\n                <div class=\"col-auto\">\r\n                    <div class=\"input-group shadow-sm\">\r\n                        <span class=\"input-group-text bg-white fw-bold\">W = (<\/span>\r\n                        <input type=\"number\" id=\"t2-p\" class=\"form-control text-center\" style=\"max-width: 70px;\" placeholder=\"p\">\r\n                        <span class=\"input-group-text bg-white fw-bold\">,<\/span>\r\n                        <input type=\"number\" id=\"t2-q\" class=\"form-control text-center\" style=\"max-width: 70px;\" placeholder=\"q\">\r\n                        <span class=\"input-group-text bg-white fw-bold\">)<\/span>\r\n                    <\/div>\r\n                <\/div>\r\n                <div class=\"col-auto\">\r\n                    <button class=\"btn btn-primary fw-bold rounded-pill px-4 shadow-sm\" onclick=\"checkTask2()\">Sprawd\u017a<\/button>\r\n                <\/div>\r\n            <\/div>\r\n            \r\n            <div id=\"t2-feedback\" class=\"mt-3 fs-6\"><\/div>\r\n            <button class=\"btn btn-outline-secondary btn-sm rounded-pill mt-2 d-none\" id=\"t2-show-btn\" onclick=\"showSolution('t2')\"><i class=\"bi bi-eye\"><\/i> Poddaj\u0119 si\u0119, poka\u017c rozwi\u0105zanie<\/button>\r\n        <\/div>\r\n\r\n        <div id=\"t2-solution\" class=\"p-4 mt-4 bg-success bg-opacity-10 border border-success rounded-4 d-none\">\r\n            <h5 class=\"text-success fw-bold border-bottom border-success pb-2 mb-3\">Rozwi\u0105zanie krok po kroku:<\/h5>\r\n            <p><strong>1. Wyznaczamy wsp\u00f3\u0142rz\u0119dn\u0105 \\( p \\):<\/strong><\/p>\r\n            $$ p = \\frac{-8}{2 \\cdot (-2)} = \\frac{-8}{-4} = 2 $$\r\n            \r\n            <p><strong>2. Wyznaczamy wsp\u00f3\u0142rz\u0119dn\u0105 \\( q \\):<\/strong><br>\r\n            Zamiast uczy\u0107 si\u0119 na pami\u0119\u0107 wzoru z delt\u0105 (\\( \\frac{-\\Delta}{4a} \\)), pro\u015bciej jest podstawi\u0107 wyliczone \\( p \\) do wzoru naszej funkcji:<\/p>\r\n            $$ q = f(2) = -2 \\cdot (2)^2 + 8 \\cdot 2 &#8211; 3 $$\r\n            $$ q = -2 \\cdot 4 + 16 &#8211; 3 $$\r\n            $$ q = -8 + 16 &#8211; 3 = 5 $$\r\n            \r\n            <p class=\"fw-bold mb-0 mt-3 text-success\">Odpowied\u017a: Wierzcho\u0142ek paraboli ma wsp\u00f3\u0142rz\u0119dne \\( W = (2, 5) \\).<\/p>\r\n        <\/div>\r\n    <\/div>\r\n<\/div>\r\n\r\n<div class=\"card border border-light shadow-sm rounded-4 mb-5\">\r\n    <div class=\"card-body p-4 p-md-5\">\r\n        <h3 class=\"fw-bold text-dark mb-3\">Zadanie 3: Nier\u00f3wno\u015b\u0107 kwadratowa<\/h3>\r\n        <p class=\"fs-5\">Rozwi\u0105\u017c nier\u00f3wno\u015b\u0107:<\/p>\r\n        \r\n        <div class=\"text-center my-4 fs-4\">\r\n            $$ -x^2 + 4x + 5 \\ge 0 $$\r\n        <\/div>\r\n\r\n        <details class=\"mb-4\">\r\n            <summary class=\"btn btn-warning text-dark fw-bold rounded-pill px-4\" style=\"cursor: pointer;\">\r\n                <i class=\"bi bi-lightbulb\"><\/i> Potrzebuj\u0119 podpowiedzi\r\n            <\/summary>\r\n            <div class=\"p-4 mt-3 bg-light border rounded-4\">\r\n                1. Zamie\u0144 nier\u00f3wno\u015b\u0107 na r\u00f3wnanie i policz pierwiastki (\\( x_1, x_2 \\)).<br>\r\n                2. Narysuj o\u015b liczbow\u0105. Zastan\u00f3w si\u0119, w kt\u00f3r\u0105 stron\u0119 skierowane s\u0105 ramiona paraboli (sp\u00f3jrz na znak przy \\( x^2 \\)).<br>\r\n                3. Odczytaj z wykresu, gdzie warto\u015bci s\u0105 wi\u0119ksze b\u0105d\u017a r\u00f3wne zeru.\r\n            <\/div>\r\n        <\/details>\r\n\r\n        <div class=\"bg-light p-4 rounded-4 border\">\r\n            <h5 class=\"fw-bold mb-3 text-primary\"><i class=\"bi bi-pencil-square\"><\/i> Twoja odpowied\u017a:<\/h5>\r\n            <div class=\"row g-3 align-items-center mb-2\">\r\n                <div class=\"col-auto\">\r\n                    <div class=\"input-group shadow-sm\">\r\n                        <span class=\"input-group-text bg-white fw-bold\">x \u2208<\/span>\r\n                        <input type=\"text\" id=\"t3-ans\" class=\"form-control\" style=\"max-width: 150px;\" placeholder=\"np. <-4, 7&gt;\">\r\n                    <\/div>\r\n                <\/div>\r\n                <div class=\"col-auto\">\r\n                    <button class=\"btn btn-primary fw-bold rounded-pill px-4 shadow-sm\" onclick=\"checkTask3()\">Sprawd\u017a<\/button>\r\n                <\/div>\r\n            <\/div>\r\n            <div class=\"form-text small\"><i class=\"bi bi-info-circle\"><\/i> U\u017cyj nawias\u00f3w ostrych <strong>< ><\/strong> dla przedzia\u0142\u00f3w domkni\u0119tych.<\/div>\r\n            \r\n            <div id=\"t3-feedback\" class=\"mt-3 fs-6\"><\/div>\r\n            <button class=\"btn btn-outline-secondary btn-sm rounded-pill mt-2 d-none\" id=\"t3-show-btn\" onclick=\"showSolution('t3')\"><i class=\"bi bi-eye\"><\/i> Poddaj\u0119 si\u0119, poka\u017c rozwi\u0105zanie<\/button>\r\n        <\/div>\r\n\r\n        <div id=\"t3-solution\" class=\"p-4 mt-4 bg-success bg-opacity-10 border border-success rounded-4 d-none\">\r\n            <h5 class=\"text-success fw-bold border-bottom border-success pb-2 mb-3\">Rozwi\u0105zanie krok po kroku:<\/h5>\r\n            <p><strong>1. Wyznaczamy pierwiastki (miejsca zerowe):<\/strong><\/p>\r\n            $$ \\Delta = 4^2 &#8211; 4 \\cdot (-1) \\cdot 5 = 16 + 20 = 36 $$\r\n            $$ \\sqrt{\\Delta} = 6 $$\r\n            $$ x_1 = \\frac{-4 &#8211; 6}{-2} = 5 $$\r\n            $$ x_2 = \\frac{-4 + 6}{-2} = -1 $$\r\n            \r\n            <p><strong>2. Szkicujemy wykres:<\/strong><br>\r\n            Wsp\u00f3\u0142czynnik \\( a = -1 \\) (jest ujemny), wi\u0119c ramiona paraboli s\u0105 skierowane w d\u00f3\u0142. Miejsca zerowe to \\( -1 \\) i \\( 5 \\).<\/p>\r\n            \r\n            <p><strong>3. Odczytujemy rozwi\u0105zanie z osi:<\/strong><br>\r\n            Szukamy warto\u015bci wi\u0119kszych b\u0105d\u017a r\u00f3wnych zero (\\( \\ge 0 \\)), czyli wykresu znajduj\u0105cego si\u0119 <strong>nad<\/strong> osi\u0105 OX (wraz z samymi miejscami zerowymi).<\/p>\r\n            \r\n            <p class=\"fw-bold mb-0 mt-3 text-success\">Odpowied\u017a: Rozwi\u0105zaniem nier\u00f3wno\u015bci jest przedzia\u0142 domkni\u0119ty \\( x \\in \\langle -1, 5 \\rangle \\).<\/p>\r\n        <\/div>\r\n    <\/div>\r\n<\/div>\r\n\r\n<script>\r\n    \/\/ Funkcja do pokazywania rozwi\u0105za\u0144 na \u017c\u0105danie (gdy ucze\u0144 si\u0119 podda)\r\n    function showSolution(taskId) {\r\n        document.getElementById(taskId + '-solution').classList.remove('d-none');\r\n        document.getElementById(taskId + '-show-btn').classList.add('d-none');\r\n        document.getElementById(taskId + '-feedback').innerHTML = ''; \/\/ Czy\u015bcimy komunikat o b\u0142\u0119dzie\r\n    }\r\n\r\n    \/\/ Walidacja Zadania 1\r\n    function checkTask1() {\r\n        const v1 = document.getElementById('t1-ans1').value.trim();\r\n        const v2 = document.getElementById('t1-ans2').value.trim();\r\n        const feedback = document.getElementById('t1-feedback');\r\n        const showBtn = document.getElementById('t1-show-btn');\r\n\r\n        if ((v1 === '2' && v2 === '3') || (v1 === '3' && v2 === '2')) {\r\n            feedback.innerHTML = '<span class=\"text-success fw-bold\"><i class=\"bi bi-check-circle-fill\"><\/i> Rewelacja! Odpowied\u017a jest poprawna.<\/span>';\r\n            document.getElementById('t1-solution').classList.remove('d-none');\r\n            showBtn.classList.add('d-none');\r\n        } else {\r\n            feedback.innerHTML = '<span class=\"text-danger fw-bold\"><i class=\"bi bi-x-circle-fill\"><\/i> Niestety to nie to. Spr\u00f3buj przeliczy\u0107 jeszcze raz!<\/span>';\r\n            showBtn.classList.remove('d-none'); \/\/ Pokazujemy przycisk z poddaniem si\u0119\r\n        }\r\n    }\r\n\r\n    \/\/ Walidacja Zadania 2\r\n    function checkTask2() {\r\n        const p = document.getElementById('t2-p').value.trim();\r\n        const q = document.getElementById('t2-q').value.trim();\r\n        const feedback = document.getElementById('t2-feedback');\r\n        const showBtn = document.getElementById('t2-show-btn');\r\n\r\n        if (p === '2' && q === '5') {\r\n            feedback.innerHTML = '<span class=\"text-success fw-bold\"><i class=\"bi bi-check-circle-fill\"><\/i> Idealnie! Wsp\u00f3\u0142rz\u0119dne wyznaczone bezb\u0142\u0119dnie.<\/span>';\r\n            document.getElementById('t2-solution').classList.remove('d-none');\r\n            showBtn.classList.add('d-none');\r\n        } else {\r\n            feedback.innerHTML = '<span class=\"text-danger fw-bold\"><i class=\"bi bi-x-circle-fill\"><\/i> Gdzie\u015b uciek\u0142 minus albo pomyli\u0142e\u015b wzory. Spr\u00f3buj ponownie!<\/span>';\r\n            showBtn.classList.remove('d-none');\r\n        }\r\n    }\r\n\r\n    \/\/ Walidacja Zadania 3\r\n    function checkTask3() {\r\n        \/\/ Pobieramy i czy\u015bcimy wszystkie spacje z wyniku\r\n        const ans = document.getElementById('t3-ans').value.replace(\/\\s\/g, '');\r\n        const feedback = document.getElementById('t3-feedback');\r\n        const showBtn = document.getElementById('t3-show-btn');\r\n\r\n        \/\/ Sprawdzamy kilka dozwolonych format\u00f3w (zwyk\u0142e ostre nawiasy lub kwadratowe dla zaawansowanych)\r\n        if (ans === '<-1,5>' || ans === '[-1,5]') {\r\n            feedback.innerHTML = '<span class=\"text-success fw-bold\"><i class=\"bi bi-check-circle-fill\"><\/i> Genialnie! Znaki nier\u00f3wno\u015bci ogarni\u0119te perfekcyjnie.<\/span>';\r\n            document.getElementById('t3-solution').classList.remove('d-none');\r\n            showBtn.classList.add('d-none');\r\n        } else {\r\n            feedback.innerHTML = '<span class=\"text-danger fw-bold\"><i class=\"bi bi-x-circle-fill\"><\/i> B\u0142\u0119dny przedzia\u0142. Upewnij si\u0119, \u017ce ramiona paraboli id\u0105 w dobr\u0105 stron\u0119.<\/span>';\r\n            showBtn.classList.remove('d-none');\r\n        }\r\n    }\r\n<\/script>\r\n\r\n\r\n\r\n<p>Czujesz, \u017ce potrzebujesz wi\u0119cej praktyki lub chcesz przerobi\u0107 ten albo inny dzia\u0142 z do\u015bwiadczonym nauczycielem, kt\u00f3ry wyt\u0142umaczy Ci to w zrozumia\u0142y spos\u00f3b?<br>Wpadaj do nas i za\u0142ap matematyk\u0119!<\/p>\r\n\r\n\r\n\r\n<p><a href=\"https:\/\/zalapto.pl#zapisy\" class=\"btn btn-primary btn-lg px-4 py-3 mt-2 rounded-pill fw-bold shadow-lg shadow-primary-sm transition-hover\">Zapisz si\u0119 teraz<\/a><\/p>\r\n\r\n\r\n\r\n<p><\/p>\r\n","protected":false},"excerpt":{"rendered":"<p>Interaktywny Trening Maturalny! Funkcja kwadratowa zadania Przed Tob\u0105 3 typowe zadania z funkcji kwadratowej. Rozwi\u0105\u017c je na kartce, a nast\u0119pnie wpisz sw\u00f3j wynik w pole poni\u017cej, aby system sprawdzi\u0142 Twoj\u0105 odpowied\u017a. Je\u015bli utkniesz, kliknij w podpowied\u017a! Zadanie 1: Klasyczne miejsca zerowe Wyznacz miejsca zerowe funkcji kwadratowej okre\u015blonej wzorem: $$ f(x) = x^2 &#8211; 5x + [&hellip;]<\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[3,26],"tags":[],"class_list":["post-78","post","type-post","status-publish","format-standard","hentry","category-matura-podstawowa","category-zadania"],"jetpack_featured_media_url":"","jetpack_sharing_enabled":true,"_links":{"self":[{"href":"https:\/\/zalapto.pl\/baza\/wp-json\/wp\/v2\/posts\/78","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/zalapto.pl\/baza\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/zalapto.pl\/baza\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/zalapto.pl\/baza\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/zalapto.pl\/baza\/wp-json\/wp\/v2\/comments?post=78"}],"version-history":[{"count":35,"href":"https:\/\/zalapto.pl\/baza\/wp-json\/wp\/v2\/posts\/78\/revisions"}],"predecessor-version":[{"id":136,"href":"https:\/\/zalapto.pl\/baza\/wp-json\/wp\/v2\/posts\/78\/revisions\/136"}],"wp:attachment":[{"href":"https:\/\/zalapto.pl\/baza\/wp-json\/wp\/v2\/media?parent=78"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/zalapto.pl\/baza\/wp-json\/wp\/v2\/categories?post=78"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/zalapto.pl\/baza\/wp-json\/wp\/v2\/tags?post=78"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}