{"id":120,"date":"2026-05-05T04:27:25","date_gmt":"2026-05-05T04:27:25","guid":{"rendered":"https:\/\/79.buffdemo.com\/index.php\/2026\/05\/05\/tong-hop-cong-thuc-ly-12\/"},"modified":"2026-05-05T07:00:40","modified_gmt":"2026-05-05T07:00:40","slug":"tong-hop-cong-thuc-ly-12","status":"publish","type":"post","link":"https:\/\/79.buffdemo.com\/index.php\/2026\/05\/05\/tong-hop-cong-thuc-ly-12\/","title":{"rendered":"T\u1ed5ng h\u1ee3p c\u00f4ng th\u1ee9c L\u00fd 12 (Ch\u01b0\u01a1ng tr\u00ecnh m\u1edbi)"},"content":{"rendered":"<p>\u0110\u1ec3 h\u1ed7 tr\u1ee3 c\u00e1c b\u1ea1n h\u1ecdc sinh d\u1ec5 d\u00e0ng \u00f4n luy\u1ec7n trong c\u00e1c cu\u1ed9c thi quan tr\u1ecdng nh\u01b0 gi\u1eefa k\u1ef3, h\u1ecdc k\u1ef3 \u0111\u1eb7c bi\u1ec7t l\u00e0 THPT qu\u1ed1c gia. <strong><a href=\"https:\/\/tailieuonthi.edu.vn\/\" target=\"_blank\" rel=\"noopener\">T\u00e0i Li\u1ec7u \u00d4n Thi<\/a><\/strong> xin chia s\u1ebb t\u1edbi c\u00e1c b\u1ea1n h\u1ecdc sinh <a href=\"https:\/\/tailieuonthi.edu.vn\/tong-hop-cong-thuc-ly-12\/\" target=\"_blank\" rel=\"noopener\"><strong>t\u1ed5ng h\u1ee3p c\u00f4ng th\u1ee9c L\u00fd 12<\/strong><\/a> (Ch\u01b0\u01a1ng tr\u00ecnh m\u1edbi) gi\u00fap c\u00e1c b\u1ea1n n\u1eafm v\u1eefng c\u00e1c c\u00f4ng th\u1ee9c t\u1eeb \u0111\u00f3 t\u1ef1 tin trong c\u00e1c cu\u1ed9c thi.<\/p>\n<h2>C\u00f4ng th\u1ee9c v\u1eadt l\u00fd ch\u01b0\u01a1ng 1: V\u1eadt l\u00fd nhi\u1ec7t<\/h2>\n<h3>1. \u0110\u1ecbnh lu\u1eadt 1 nhi\u1ec7t \u0111\u1ed9ng l\u1ef1c h\u1ecdc<\/h3>\n<p>\u0394 U = A + Q<\/p>\n<p>\u2013 N\u1ed9i dung: \u0110\u1ed9 bi\u1ebfn thi\u00ean n\u1ed9i n\u0103ng c\u1ee7a v\u1eadt b\u1eb1ng t\u1ed5ng c\u00f4ng v\u00e0 nhi\u1ec7t l\u01b0\u1ee3ng m\u00e0 v\u1eadt nh\u1eadn \u0111\u01b0\u1ee3c.<\/p>\n<p>\u2013 Quy \u01b0\u1edbc v\u1ec1 d\u1ea5u:<\/p>\n<ul>\n<li>Q &gt; 0: V\u1eadt nh\u1eadn nhi\u1ec7t l\u01b0\u1ee3ng t\u1eeb v\u1eadt kh\u00e1c.<\/li>\n<li>Q &lt; 0: V\u1eadt truy\u1ec1n nhi\u1ec7t l\u01b0\u1ee3ng cho v\u1eadt kh\u00e1c. A &gt; 0: V\u1eadt nh\u1eadn c\u00f4ng t\u1eeb v\u1eadt kh\u00e1c.<\/li>\n<li>A &lt; 0: V\u1eadt th\u1ef1c hi\u1ec7n c\u00f4ng l\u00ean v\u1eadt kh\u00e1c.<\/li>\n<\/ul>\n<h3>2. C\u00f4ng th\u1ee9c chuy\u1ec3n nhi\u1ec7t \u0111\u1ed9 t\u1eeb thang Celsius sang thang Kelvin<\/h3>\n<p>T(K) = t(^\u00b0C) + 273<\/p>\n<h3>3. H\u1ec7 th\u1ee9c t\u00ednh nhi\u1ec7t l\u01b0\u1ee3ng trong qu\u00e1 tr\u00ecnh truy\u1ec1n nhi\u1ec7t c\u1ee7a v\u1eadt \u0111\u1ec3 l\u00e0m thay \u0111\u1ed5i nhi\u1ec7t \u0111\u1ed9 c\u1ee7a v\u1eadt<\/h3>\n<p data-end=\"11\" data-start=\"0\">Q = mc\u0394 T<\/p>\n<p data-end=\"11\" data-start=\"0\">Trong \u0111\u00f3:<\/p>\n<ul data-end=\"195\" data-is-last-node=\"\" data-is-only-node=\"\" data-start=\"12\">\n<li data-end=\"59\" data-start=\"12\"><span class=\"katex\"><span class=\"katex-mathml\">Q<\/span><\/span>: nhi\u1ec7t l\u01b0\u1ee3ng c\u1ea7n truy\u1ec1n cho v\u1eadt (J)<\/li>\n<li data-end=\"92\" data-start=\"60\"><span class=\"katex\"><span class=\"katex-mathml\">m<\/span><\/span>: kh\u1ed1i l\u01b0\u1ee3ng v\u1eadt (kg)<\/li>\n<li data-end=\"148\" data-start=\"93\"><span class=\"katex\"><span class=\"katex-mathml\">c<\/span><\/span>: nhi\u1ec7t dung ri\u00eang c\u1ee7a ch\u1ea5t l\u00e0m v\u1eadt (J\/kg.K)<\/li>\n<li data-end=\"195\" data-is-last-node=\"\" data-start=\"149\"><span class=\"katex\"><span class=\"katex-mathml\">\u0394T<\/span><\/span>: \u0111\u1ed9 t\u0103ng nhi\u1ec7t \u0111\u1ed9 c\u1ee7a v\u1eadt (K)<\/li>\n<\/ul>\n<h3>4. H\u1ec7 th\u1ee9c t\u00ednh nhi\u1ec7t l\u01b0\u1ee3ng trong qu\u00e1 tr\u00ecnh truy\u1ec1n nhi\u1ec7t c\u1ee7a v\u1eadt \u0111\u1ec3 l\u00e0m v\u1eadt n\u00f3ng ch\u1ea3y ho\u00e0n to\u00e0n<\/h3>\n<p>Q = \u03bb m<\/p>\n<p data-end=\"45\" data-start=\"34\">Trong \u0111\u00f3:<\/p>\n<ul data-end=\"189\" data-is-last-node=\"\" data-is-only-node=\"\" data-start=\"46\">\n<li data-end=\"93\" data-start=\"46\"><span class=\"katex\"><span class=\"katex-mathml\">Q<\/span><\/span>: nhi\u1ec7t l\u01b0\u1ee3ng c\u1ea7n truy\u1ec1n cho v\u1eadt (J)<\/li>\n<li data-end=\"126\" data-start=\"94\"><span class=\"katex\"><span class=\"katex-mathml\">m<\/span><\/span>: kh\u1ed1i l\u01b0\u1ee3ng v\u1eadt (kg)<\/li>\n<li data-end=\"189\" data-is-last-node=\"\" data-start=\"127\"><span class=\"katex\"><span class=\"katex-mathml\">\u03bb<\/span><\/span>: nhi\u1ec7t n\u00f3ng ch\u1ea3y ri\u00eang c\u1ee7a ch\u1ea5t l\u00e0m v\u1eadt (J\/kg)<\/li>\n<\/ul>\n<h3>5. H\u1ec7 th\u1ee9c t\u00ednh nhi\u1ec7t l\u01b0\u1ee3ng trong qu\u00e1 tr\u00ecnh truy\u1ec1n nhi\u1ec7t khi m\u1ed9t l\u01b0\u1ee3ng ch\u1ea5t l\u1ecfng h\u00f3a h\u01a1i \u1edf nhi\u1ec7t \u0111\u1ed9 kh\u00f4ng \u0111\u1ed5i<\/h3>\n<p>Q = Lm<\/p>\n<p data-end=\"38\" data-start=\"27\">Trong \u0111\u00f3:<\/p>\n<ul data-end=\"171\" data-is-last-node=\"\" data-is-only-node=\"\" data-start=\"39\">\n<li data-end=\"86\" data-start=\"39\"><span class=\"katex\"><span class=\"katex-mathml\">Q<\/span><\/span>: nhi\u1ec7t l\u01b0\u1ee3ng c\u1ea7n truy\u1ec1n cho v\u1eadt (J)<\/li>\n<li data-end=\"119\" data-start=\"87\"><span class=\"katex\"><span class=\"katex-mathml\">m<\/span><\/span>: kh\u1ed1i l\u01b0\u1ee3ng v\u1eadt (kg)<\/li>\n<li data-end=\"171\" data-is-last-node=\"\" data-start=\"120\"><span class=\"katex\"><span class=\"katex-mathml\">L<\/span><\/span>: nhi\u1ec7t h\u00f3a h\u01a1i ri\u00eang c\u1ee7a ch\u1ea5t l\u1ecfng (J\/kg)<\/li>\n<\/ul>\n<h2>C\u00f4ng th\u1ee9c V\u1eadt L\u00fd ch\u01b0\u01a1ng 2: Kh\u00ed l\u00fd t\u01b0\u1edfng<\/h2>\n<h3>1. \u0110\u1ecbnh lu\u1eadt Boyle (qu\u00e1 tr\u00ecnh \u0111\u1eb3ng nhi\u1ec7t)<\/h3>\n<p>pV = h\u1eb1ng s\u1ed1 hay p\u2081 V\u2081 = p\u2082 V\u2082<\/p>\n<h3>2. \u0110\u1ecbnh lu\u1eadt Charles (qu\u00e1 tr\u00ecnh \u0111\u1eb3ng \u00e1p)<\/h3>\n<p>V\/T = h\u1eb1ng s\u1ed1 hay (V\u2081)\/(T\u2081) = (V\u2082)\/(T\u2082)<\/p>\n<h3>3. Ph\u01b0\u01a1ng tr\u00ecnh tr\u1ea1ng th\u00e1i kh\u00ed l\u00ed t\u01b0\u1edfng<\/h3>\n<p>(p\u2081 V\u2081)\/(T\u2081) = (p\u2082 V\u2082)\/(T\u2082) \u21d2 pV\/T = h\u1eb1ng s\u1ed1<\/p>\n<h3>4. Ph\u01b0\u01a1ng tr\u00ecnh Clapeyron<\/h3>\n<p>pV = nRT<\/p>\n<p>Trong \u0111\u00f3:<\/p>\n<ul>\n<li> R : h\u1eb1ng s\u1ed1 kh\u00ed l\u00ed t\u01b0\u1edfng,  R = 8,31 (J\/mol.K) <\/li>\n<li> n : s\u1ed1 mol kh\u00ed,  n = (m (kg))\/(M (kg\/mol)) <\/li>\n<\/ul>\n<h3>5. \u00c1p su\u1ea5t ch\u1ea5t kh\u00ed theo m\u00f4 h\u00ecnh \u0111\u1ed9ng h\u1ecdc ph\u00e2n t\u1eed<\/h3>\n<p>p = 1\/3 \u03bc m overlinev\u2082 = 2\/3 \u03bc E_d<\/p>\n<p>Trong \u0111\u00f3:<\/p>\n<ul>\n<li> \u03bc : m\u1eadt \u0111\u1ed9 ph\u00e2n t\u1eed kh\u00ed  ( \u03bc = N\/V ) <\/li>\n<li> overlinev\u00b2 : trung b\u00ecnh c\u1ee7a c\u00e1c b\u00ecnh ph\u01b0\u01a1ng t\u1ed1c \u0111\u1ed9 ph\u00e2n t\u1eed<\/li>\n<\/ul>\n<h3>6. Li\u00ean h\u1ec7 gi\u1eefa \u0111\u1ed9ng n\u0103ng trung b\u00ecnh c\u1ee7a ph\u00e2n t\u1eed v\u00e0 nhi\u1ec7t \u0111\u1ed9<\/h3>\n<p>E_d = 3\/2 kT<\/p>\n<p>Trong \u0111\u00f3:  k : h\u1eb1ng s\u1ed1 Boltzmann  ( k = 1,38 \u00d7 10\u207b\u00b2\u00b3 J\/K ) <\/p>\n<h2>C\u00f4ng th\u1ee9c V\u1eadt L\u00fd ch\u01b0\u01a1ng 3: T\u1eeb tr\u01b0\u1eddng<\/h2>\n<h3>1. C\u00f4ng th\u1ee9c c\u1ee7a \u0111\u1ecbnh lu\u1eadt ampe v\u1ec1 l\u1ef1c t\u1eeb t\u00e1c d\u1ee5ng l\u00ean \u0111o\u1ea1n d\u00e2y d\u1eabn mang d\u00f2ng \u0111i\u1ec7n \u0111\u1eb7t trong t\u1eeb tr\u01b0\u1eddng \u0111\u1ec1u<\/h3>\n<p>F = BIL sin \u03b1<\/p>\n<p>Trong \u0111\u00f3:<\/p>\n<ul>\n<li> B : c\u1ea3m \u1ee9ng t\u1eeb (T)<\/li>\n<li> I : c\u01b0\u1eddng \u0111\u1ed9 d\u00f2ng \u0111i\u1ec7n (A)<\/li>\n<li> L : chi\u1ec1u d\u00e0i \u0111o\u1ea1n d\u00e2y mang d\u00f2ng \u0111i\u1ec7n \u0111\u1eb7t trong t\u1eeb tr\u01b0\u1eddng (m)<\/li>\n<li> \u03b1 : g\u00f3c h\u1ee3p b\u1edfi \u0111o\u1ea1n d\u00e2y mang d\u00f2ng \u0111i\u1ec7n v\u00e0 vect\u01a1 c\u1ea3m \u1ee9ng t\u1eeb  B\u20d7 <\/li>\n<\/ul>\n<h3>2. \u0110\u1ed9 l\u1edbn c\u1ea3m \u1ee9ng t\u1eeb B<\/h3>\n<p>B = (F)\/(IL sin \u03b1)<\/p>\n<p>Trong \u0111\u00f3:  B : c\u1ea3m \u1ee9ng t\u1eeb (T)<\/p>\n<h3>3. C\u00f4ng th\u1ee9c x\u00e1c \u0111\u1ecbnh t\u1eeb th\u00f4ng<\/h3>\n<p>\u03a6 = B S cos \u03b1<\/p>\n<p>Trong \u0111\u00f3:<\/p>\n<ul>\n<li> \u03a6 : t\u1eeb th\u00f4ng qua di\u1ec7n t\u00edch  S  (Wb)<\/li>\n<li> S : di\u1ec7n t\u00edch v\u00f2ng d\u00e2y ( m\u00b2 )<\/li>\n<li> B : \u0111\u1ed9 l\u1edbn c\u1ea3m \u1ee9ng t\u1eeb (T)<\/li>\n<li> \u03b1 : g\u00f3c h\u1ee3p b\u1edfi vect\u01a1 ph\u00e1p tuy\u1ebfn  n\u20d7  c\u1ee7a v\u00f2ng d\u00e2y v\u00e0 vect\u01a1 c\u1ea3m \u1ee9ng t\u1eeb  B\u20d7 <\/li>\n<\/ul>\n<h3>4. \u0110\u1ecbnh lu\u1eadt FARADAY (Bi\u1ec3u th\u1ee9c su\u1ea5t \u0111i\u1ec7n \u0111\u1ed9ng c\u1ea3m \u1ee9ng)<\/h3>\n<p>e_C = -N (\u0394 \u03a6)\/(\u0394 t)<\/p>\n<p>Trong \u0111\u00f3:<\/p>\n<ul>\n<li> N : s\u1ed1 v\u00f2ng d\u00e2y<\/li>\n<li> | (\u0394 \u03a6)\/(\u0394 t) | : t\u1ed1c \u0111\u1ed9 bi\u1ebfn thi\u00ean t\u1eeb th\u00f4ng qua m\u1ea1ch k\u00edn<\/li>\n<\/ul>\n<h3>5. D\u00f2ng \u0111i\u1ec7n xoay chi\u1ec1u c\u00f3 c\u01b0\u1eddng \u0111\u1ed9 bi\u1ebfn thi\u00ean theo c\u00f4ng th\u1ee9c<\/h3>\n<p>i = I\u2080 cos(\u03c9 t + \u03c6_i)<\/p>\n<h3>6. M\u1ed1i quan h\u1ec7 gi\u1eefa gi\u00e1 tr\u1ecb hi\u1ec7u d\u1ee5ng v\u00e0 gi\u00e1 tr\u1ecb c\u1ef1c \u0111\u1ea1i<\/h3>\n<p>I = (I\u2080)\/(\u221a2) ; U = (U\u2080)\/(\u221a2)<\/p>\n<p>Trong \u0111\u00f3:<\/p>\n<ul>\n<li> I  v\u00e0  U  l\u00e0 c\u01b0\u1eddng \u0111\u1ed9 d\u00f2ng \u0111i\u1ec7n v\u00e0 \u0111i\u1ec7n \u00e1p hi\u1ec7u d\u1ee5ng<\/li>\n<li> I\u2080  v\u00e0  U\u2080  l\u00e0 c\u01b0\u1eddng \u0111\u1ed9 d\u00f2ng \u0111i\u1ec7n v\u00e0 \u0111i\u1ec7n \u00e1p c\u1ef1c \u0111\u1ea1i<\/li>\n<\/ul>\n<h3>7. C\u00f4ng th\u1ee9c v\u1ec1 m\u00e1y bi\u1ebfn \u00e1p<\/h3>\n<p>(U\u2081)\/(U\u2082) = (N\u2081)\/(N\u2082)<\/p>\n<p>Trong \u0111\u00f3:<\/p>\n<ul>\n<li> U\u2081  v\u00e0  U\u2082  l\u00e0 \u0111i\u1ec7n \u00e1p hi\u1ec7u d\u1ee5ng gi\u1eefa 2 \u0111\u1ea7u cu\u1ed9n d\u00e2y s\u01a1 c\u1ea5p v\u00e0 th\u1ee9 c\u1ea5p.<\/li>\n<li> N\u2081  v\u00e0  N\u2082  l\u00e0 s\u1ed1 v\u00f2ng d\u00e2y c\u1ee7a cu\u1ed9n d\u00e2y s\u01a1 c\u1ea5p v\u00e0 th\u1ee9 c\u1ea5p.<\/li>\n<\/ul>\n<h3>8. B\u01b0\u1edbc s\u00f3ng c\u1ee7a s\u00f3ng \u0111i\u1ec7n t\u1eeb<\/h3>\n<p>\u03bb = cT = c\/f<\/p>\n<h2>C\u00f4ng th\u1ee9c V\u1eadt L\u00fd ch\u01b0\u01a1ng 4: V\u1eadt l\u00ed h\u1ea1t nh\u00e2n<\/h2>\n<h3>1. C\u00f4ng th\u1ee9c \u0111\u1ed9 h\u1ee5t kh\u1ed1i<\/h3>\n<p>\u0394 m = [ Z m_p + (A &#8211; Z) m_n ] &#8211; m_X<\/p>\n<h3>2. N\u0103ng l\u01b0\u1ee3ng li\u00ean k\u1ebft v\u00e0 n\u0103ng l\u01b0\u1ee3ng li\u00ean k\u1ebft ri\u00eang<\/h3>\n<p>E_lk = \u0394 m \u00b7 c\u00b2<\/p>\n<p>E_lkr = (E_lk)\/(A)<\/p>\n<h3>3. N\u0103ng l\u01b0\u1ee3ng t\u1ecfa ho\u1eb7c thu c\u1ee7a ph\u1ea3n \u1ee9ng h\u1ea1t nh\u00e2n<\/h3>\n<p>\u0394 E = (m_sau &#8211; m_trc) c\u00b2<\/p>\n<p>Trong \u0111\u00f3:<\/p>\n<ul>\n<li>\u0394\ud835\udc38&gt;0: Ph\u1ea3n \u1ee9ng t\u1ecfa n\u0103ng l\u01b0\u1ee3ng<\/li>\n<li>\u0394\ud835\udc38&lt;0: Ph\u1ea3n \u1ee9ng thu n\u0103ng l\u01b0\u1ee3ng<\/li>\n<\/ul>\n<h3>4. \u0110\u1ecbnh lu\u1eadt ph\u00f3ng x\u1ea1<\/h3>\n<p>N_t = N\u2080 . 2^-k (t = kT)<\/p>\n<p>\u21d2 N_t = N\u2080 . 2^-t\/T = N\u2080 . 2^-\u03bb t ( \u03bb = (ln 2)\/(T) )<\/p>\n<h3>5. \u0110\u1ed9 ph\u00f3ng x\u1ea1<\/h3>\n<p>H_t = \u03bb N_t = H\u2080 e^-\u03bb t<\/p>\n<h2>T\u1ea3i T\u1ed5ng h\u1ee3p c\u00f4ng th\u1ee9c L\u00fd 12 (Ch\u01b0\u01a1ng tr\u00ecnh m\u1edbi)<\/h2>\n<p>\u0110\u1ec3 c\u00f3 th\u1ec3 thu\u1eadn ti\u1ec7n cho vi\u1ec7c h\u1ecdc t\u1eadp. C\u00e1c em t\u1ea3i T\u1ed5ng h\u1ee3p c\u00f4ng th\u1ee9c L\u00fd 12 (Ch\u01b0\u01a1ng tr\u00ecnh m\u1edbi) theo li\u00ean k\u1ebft b\u00ean d\u01b0\u1edbi nh\u00e9<\/p>\n<p><a class=\"custom-button\" href=\"https:\/\/drive.google.com\/file\/d\/1MejZ9-1z_ddAKNCiwUsqkW1aU3-4MIQU\/view\" rel=\"nofollow noopener\" target=\"_blank\">T\u1ea3i T\u1ed5ng h\u1ee3p c\u00f4ng th\u1ee9c L\u00fd 12 (Ch\u01b0\u01a1ng tr\u00ecnh m\u1edbi)<\/a><\/p>\n","protected":false},"excerpt":{"rendered":"<p>\u0110\u1ec3 h\u1ed7 tr\u1ee3 c\u00e1c b\u1ea1n h\u1ecdc sinh d\u1ec5 d\u00e0ng \u00f4n luy\u1ec7n trong c\u00e1c cu\u1ed9c thi quan tr\u1ecdng nh\u01b0 gi\u1eefa k\u1ef3, h\u1ecdc k\u1ef3 \u0111\u1eb7c bi\u1ec7t l\u00e0 THPT qu\u1ed1c gia. T\u00e0i Li\u1ec7u \u00d4n Thi xin chia s\u1ebb t\u1edbi c\u00e1c b\u1ea1n h\u1ecdc sinh t\u1ed5ng h\u1ee3p c\u00f4ng th\u1ee9c L\u00fd 12 (Ch\u01b0\u01a1ng tr\u00ecnh m\u1edbi) gi\u00fap c\u00e1c b\u1ea1n n\u1eafm v\u1eefng c\u00e1c [&#8230;]\n","protected":false},"author":1,"featured_media":1320,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[22],"tags":[23],"class_list":["post-120","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-vat-ly-12","tag-vat-ly-12"],"_links":{"self":[{"href":"https:\/\/79.buffdemo.com\/index.php\/wp-json\/wp\/v2\/posts\/120","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/79.buffdemo.com\/index.php\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/79.buffdemo.com\/index.php\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/79.buffdemo.com\/index.php\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/79.buffdemo.com\/index.php\/wp-json\/wp\/v2\/comments?post=120"}],"version-history":[{"count":1,"href":"https:\/\/79.buffdemo.com\/index.php\/wp-json\/wp\/v2\/posts\/120\/revisions"}],"predecessor-version":[{"id":1321,"href":"https:\/\/79.buffdemo.com\/index.php\/wp-json\/wp\/v2\/posts\/120\/revisions\/1321"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/79.buffdemo.com\/index.php\/wp-json\/wp\/v2\/media\/1320"}],"wp:attachment":[{"href":"https:\/\/79.buffdemo.com\/index.php\/wp-json\/wp\/v2\/media?parent=120"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/79.buffdemo.com\/index.php\/wp-json\/wp\/v2\/categories?post=120"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/79.buffdemo.com\/index.php\/wp-json\/wp\/v2\/tags?post=120"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}