{"id":343,"date":"2023-07-06T03:16:38","date_gmt":"2023-07-06T03:16:38","guid":{"rendered":"https:\/\/mathority.org\/id\/contoh-dan-sifat-matriks-sejenis-atau-serupa\/"},"modified":"2023-07-06T03:16:38","modified_gmt":"2023-07-06T03:16:38","slug":"contoh-dan-sifat-matriks-sejenis-atau-serupa","status":"publish","type":"post","link":"https:\/\/mathority.org\/id\/contoh-dan-sifat-matriks-sejenis-atau-serupa\/","title":{"rendered":"Matriks serupa atau serupa"},"content":{"rendered":"<p>Di halaman ini Anda akan menemukan penjelasan tentang matriks-matriks sejenis, disebut juga matriks-matriks sejenis. Selain itu, kami tunjukkan contoh jelas dari dua matriks serupa dan semua properti dari matriks jenis ini sehingga Anda tidak perlu ragu. Terakhir, Anda bahkan dapat melihat hubungannya dengan matriks-matriks yang kongruen.<\/p>\n<h2 class=\"wp-block-heading\"> Apa yang dimaksud dengan matriks serupa (atau serupa)?<\/h2>\n<p> Pengertian matriks sejenis adalah sebagai berikut: <\/p>\n<div style=\"background-color:#dff6ff;padding-top: 20px; padding-bottom: 0.5px; padding-right: 40px; padding-left: 30px\" class=\"has-background\">\n<p style=\"text-align:left\"> dua matriks<\/p>\n<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-25b206f25506e6d6f46be832f7119ffa_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"A\" title=\"Rendered by QuickLaTeX.com\" height=\"13\" width=\"13\" style=\"vertical-align: 0px;\"><\/p>\n<p> Dan<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-770fd1447ccf2fc229801b486b0d8f8a_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"B\" title=\"Rendered by QuickLaTeX.com\" height=\"12\" width=\"14\" style=\"vertical-align: 0px;\"><\/p>\n<p> <strong>serupa (atau serupa)<\/strong> jika terdapat matriks<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-650eb7688af6737ac325425b5c9a5982_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"P\" title=\"Rendered by QuickLaTeX.com\" height=\"12\" width=\"14\" style=\"vertical-align: 0px;\"><\/p>\n<p> yang memenuhi kondisi berikut:<\/p>\n<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-7a9d8fcb81e8bfa5645d23ba85832892_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"P^{-1}AP = B\" title=\"Rendered by QuickLaTeX.com\" height=\"15\" width=\"97\" style=\"vertical-align: 0px;\"><\/p>\n<\/p>\n<p style=\"text-align:left\"> Atau setara:<\/p>\n<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-1aab9713a82d78b188aaf0e426aca74f_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"AP = PB\" title=\"Rendered by QuickLaTeX.com\" height=\"13\" width=\"79\" style=\"vertical-align: 0px;\"><\/p>\n<\/p>\n<\/div>\n<p> Faktanya, matriks<\/p>\n<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-650eb7688af6737ac325425b5c9a5982_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"P\" title=\"Rendered by QuickLaTeX.com\" height=\"12\" width=\"14\" style=\"vertical-align: 0px;\"><\/p>\n<p> bertindak sebagai matriks perubahan basis. Oleh karena itu, yang dimaksud dengan persamaan ini adalah matriks<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-25b206f25506e6d6f46be832f7119ffa_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"A\" title=\"Rendered by QuickLaTeX.com\" height=\"13\" width=\"13\" style=\"vertical-align: 0px;\"><\/p>\n<p> dapat dinyatakan dalam basis lain (<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-650eb7688af6737ac325425b5c9a5982_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"P\" title=\"Rendered by QuickLaTeX.com\" height=\"12\" width=\"14\" style=\"vertical-align: 0px;\"><\/p>\n<p> ), yang memunculkan matriks<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-770fd1447ccf2fc229801b486b0d8f8a_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"B\" title=\"Rendered by QuickLaTeX.com\" height=\"12\" width=\"14\" style=\"vertical-align: 0px;\"><\/p>\n<p> .<\/p>\n<p> Istilah ini juga bisa disebut <em>transformasi kesamaan<\/em> , karena kita sebenarnya mentransformasikan matriks<\/p>\n<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-25b206f25506e6d6f46be832f7119ffa_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"A\" title=\"Rendered by QuickLaTeX.com\" height=\"13\" width=\"13\" style=\"vertical-align: 0px;\"><\/p>\n<p> dalam matriks<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-770fd1447ccf2fc229801b486b0d8f8a_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"B\" title=\"Rendered by QuickLaTeX.com\" height=\"12\" width=\"14\" style=\"vertical-align: 0px;\"><\/p>\n<p> .<\/p>\n<p> Jelas matriksnya<\/p>\n<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-650eb7688af6737ac325425b5c9a5982_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"P\" title=\"Rendered by QuickLaTeX.com\" height=\"12\" width=\"14\" style=\"vertical-align: 0px;\"><\/p>\n<p> matriks tersebut harus berupa matriks beraturan atau tidak berdegenerasi (determinan bukan nol).<\/p>\n<p> Di sisi lain, kita dapat menunjukkan bahwa dua matriks serupa dengan ekspresi berikut: <\/p>\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-large is-resized\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/uploads\/2023\/07\/explication-des-matrices-similaires-ou-similaires.webp\" alt=\"penjelasan matriks yang serupa atau serupa\" class=\"wp-image-3488\" width=\"71\" height=\"71\" srcset=\"\" sizes=\"auto, \"><\/figure>\n<\/div>\n<p> Kelas matriks ini lebih penting daripada yang terlihat pada aljabar linier. Mereka terutama digunakan untuk matriks yang dapat didiagonalisasi, karena prosedur untuk mendiagonalisasi matriks apa pun didasarkan pada konsep kesamaan matriks.<\/p>\n<p> Faktanya, proses mendiagonalisasi suatu matriks melibatkan penghitungan matriks serupa yang sekaligus merupakan matriks diagonal. Anda dapat melihat cara melakukannya di <a href=\"https:\/\/mathority.org\/id\/cara-mendiagonalisasi-matriks-yang-dapat-didiagonalisasi-latihan-diagonalisasi-matriks-2x2-3x3-4x4-diselesaikan-langkah-demi-langkah\/\">cara mendiagonalisasi matriks<\/a> .<\/p>\n<h2 class=\"wp-block-heading\"> Contoh matriks sejenis atau sejenis<\/h2>\n<p> Kemudian kita akan melihat contoh matriks serupa berdimensi 2\u00d72 untuk menyelesaikan asimilasi konsepnya.<\/p>\n<ul>\n<li> Matriks persegi A dan B sebangun satu sama lain melalui matriks inversi P:<\/li>\n<\/ul>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-4978e1117b69063b63256a0663eaf207_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"\\displaystyle A= \\begin{pmatrix}-1&amp;2\\\\[1.1ex] 3&amp;1\\end{pmatrix} \\qquad B= \\begin{pmatrix}-5&amp;-3\\\\[1.1ex] 6&amp;5\\end{pmatrix}\" title=\"Rendered by QuickLaTeX.com\" height=\"54\" width=\"275\" style=\"vertical-align: 0px;\"><\/p>\n<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-6344f1d5a14dd381ab105bcb52827455_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"\\displaystyle P= \\begin{pmatrix}2&amp;1\\\\[1.1ex] -1&amp;0\\end{pmatrix}\" title=\"Rendered by QuickLaTeX.com\" height=\"54\" width=\"109\" style=\"vertical-align: 0px;\"><\/p>\n<\/p>\n<p> Untuk menunjukkan bahwa matriks-matriks tersebut saling sebangun, pertama-tama kita harus menghitung <a href=\"https:\/\/mathority.org\/id\/matriks-terbalik\/\">invers matriks<\/a> dari P:<\/p>\n<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-c49a4a995246e782635e2e2b43302798_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"\\displaystyle P^{-1}= \\begin{pmatrix}0&amp;-1\\\\[1.1ex] 1&amp;2\\end{pmatrix}\" title=\"Rendered by QuickLaTeX.com\" height=\"54\" width=\"128\" style=\"vertical-align: 0px;\"><\/p>\n<\/p>\n<p> Dan sekarang kita memeriksa kemiripannya dengan melakukan perkalian matriks yang mendefinisikan kemiripan dua matriks: <\/p>\n<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-08a687bbdc46a46639909c263d9a9864_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"\\displaystyle P^{-1}AP = B \\quad ?\" title=\"Rendered by QuickLaTeX.com\" height=\"16\" width=\"123\" style=\"vertical-align: 0px;\"><\/p>\n<\/p>\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-large is-resized\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/uploads\/2023\/07\/exemple-de-matrices-similaires-ou-similaires-22152-1.webp\" alt=\"contoh matriks 2x2 yang sebangun atau sejenis\" class=\"wp-image-3472\" width=\"529\" height=\"73\" srcset=\"\" sizes=\"auto, \"><\/figure>\n<\/div>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-aa1f8005d6559c27a4c9871fbd071d34_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"\\displaystyle P^{-1}AP = B\" title=\"Rendered by QuickLaTeX.com\" height=\"16\" width=\"97\" style=\"vertical-align: 0px;\"><\/p>\n<p> \u2705<\/p>\n<p> Ya, relasi kemiripannya terpenuhi, jadi matriks-matriksnya sebangun.<\/p>\n<h2 class=\"wp-block-heading\"> Properti matriks serupa<\/h2>\n<p> Dua matriks A dan B yang serupa mempunyai ciri-ciri sebagai berikut:<\/p>\n<ul>\n<li> Pangkat yang sama.<\/li>\n<\/ul>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-36c08d3b697e5c80c43bc8eca0eb994e_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"rg(A)=rg(B)\" title=\"Rendered by QuickLaTeX.com\" height=\"19\" width=\"113\" style=\"vertical-align: -5px;\"><\/p>\n<\/p>\n<ul>\n<li> determinan kedua matriks tersebut sama.<\/li>\n<\/ul>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-96449de60b8a83016035f562f99e2ca3_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"det(A)=det(B)\" title=\"Rendered by QuickLaTeX.com\" height=\"19\" width=\"126\" style=\"vertical-align: -5px;\"><\/p>\n<\/p>\n<ul>\n<li> Pelacakan yang sama.<\/li>\n<\/ul>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-39c97e89fcd3198999489af3ede0f8ec_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"tr(A)=tr(B)\" title=\"Rendered by QuickLaTeX.com\" height=\"19\" width=\"108\" style=\"vertical-align: -5px;\"><\/p>\n<\/p>\n<ul>\n<li> <a href=\"https:\/\/mathority.org\/id\/menghitung-nilai-eigennilai-eigen-dan-vektor-eigenvektor-eigen-suatu-matriks\/\">Nilai eigen<\/a> (atau nilai eigen) yang sama. Namun, vektor eigen (atau vektor eigen) biasanya berbeda.<\/li>\n<\/ul>\n<ul>\n<li> Polinomial karakteristik dan polinomial minimum yang sama.<\/li>\n<\/ul>\n<ul>\n<li> <a href=\"https:\/\/mathority.org\/id\/contoh-matriks-yang-ditransposisikan-atau-ditransposisikan-dan-latihan-yang-diselesaikan\/\">Transposisi suatu matriks<\/a> mirip dengan matriks aslinya.<\/li>\n<\/ul>\n<ul>\n<li> Matriks B dapat dicari dengan menerapkan operasi elementer pada baris-baris matriks A, dan sebaliknya.<\/li>\n<\/ul>\n<ul>\n<li> Jelas sekali kemiripannya tercermin. Artinya, jika A mirip dengan B, maka B juga mirip dengan A.<\/li>\n<\/ul>\n<ul>\n<li> Selain itu, kemiripan matriks juga bersifat simetris. Dengan kata lain, jika dengan matriks P dapat diperoleh matriks yang sebangun dengan A (B), maka matriks yang sebangun dengan B (A) juga dapat diperoleh dengan matriks P yang sama:<\/li>\n<\/ul>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-b42b2b64f904396c1ab3a7c395ec1948_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"B=P^{-1}AP\" title=\"Rendered by QuickLaTeX.com\" height=\"15\" width=\"97\" style=\"vertical-align: 0px;\"><\/p>\n<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-163fd36257f7436438080e7f9fa92dfc_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"A=PBP^{-1}\" title=\"Rendered by QuickLaTeX.com\" height=\"15\" width=\"96\" style=\"vertical-align: 0px;\"><\/p>\n<\/p>\n<ul>\n<li> Selain itu, kesamaan bersifat transitif. Jadi jika matriks A sebangun dengan matriks B dan matriks B sebangun dengan matriks C, maka matriks A juga sebangun dengan matriks C.<\/li>\n<\/ul>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-a9f845ee4a4c9e72220ecb4033ea9640_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"\\left. \\begin{array}{l}A\\sim B \\\\[2ex] B \\sim C \\end{array}\\right\\} \\longrightarrow A \\sim C\" title=\"Rendered by QuickLaTeX.com\" height=\"65\" width=\"165\" style=\"vertical-align: 0px;\"><\/p>\n<\/p>\n<ul>\n<li> Terakhir, setiap dadu mirip dengan dadu gigi gergaji. Dan dari sifat ini kita dapat menyimpulkan akibat wajar berikut: setiap matriks persegi sebangun dengan matriks segitiga.<\/li>\n<\/ul>\n<div class=\"adsb30\" style=\" margin:px; text-align:\"><\/div>\n<h2 class=\"wp-block-heading\"> matriks yang kongruen<\/h2>\n<p> Di sisi lain, ada juga hubungan lain yang sangat mirip antara matriks, tetapi bukan dengan matriks invers, melainkan dengan matriks transpos. Ini disebut <strong>kongruensi<\/strong> .<\/p>\n<p> Dua matriks A dan B <strong>kongruen<\/strong> jika terdapat matriks P yang dapat dibalik dan memenuhi persamaan berikut:<\/p>\n<\/p>\n<p class=\"has-text-align-center\"><img decoding=\"async\" loading=\"lazy\" src=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-d41e2b46ad81b140c9f4908d5f3df744_l3.png\" class=\"ql-img-inline-formula quicklatex-auto-format\" alt=\"P^tAP = B\" title=\"Rendered by QuickLaTeX.com\" height=\"15\" width=\"84\" style=\"vertical-align: 0px;\"><\/p>\n<\/p>\n<p> Seperti yang Anda lihat, ini adalah analog dari matriks serupa tetapi matriksnya ditransposisikan.<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Di halaman ini Anda akan menemukan penjelasan tentang matriks-matriks sejenis, disebut juga matriks-matriks sejenis. Selain itu, kami tunjukkan contoh jelas dari dua matriks serupa dan semua properti dari matriks jenis ini sehingga Anda tidak perlu ragu. Terakhir, Anda bahkan dapat melihat hubungannya dengan matriks-matriks yang kongruen. Apa yang dimaksud dengan matriks serupa (atau serupa)? Pengertian &hellip;<\/p>\n<p class=\"read-more\"> <a class=\"\" href=\"https:\/\/mathority.org\/id\/contoh-dan-sifat-matriks-sejenis-atau-serupa\/\"> <span class=\"screen-reader-text\">Matriks serupa atau serupa<\/span> Selengkapnya &raquo;<\/a><\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"site-sidebar-layout":"default","site-content-layout":"","ast-site-content-layout":"","site-content-style":"default","site-sidebar-style":"default","ast-global-header-display":"","ast-banner-title-visibility":"","ast-main-header-display":"","ast-hfb-above-header-display":"","ast-hfb-below-header-display":"","ast-hfb-mobile-header-display":"","site-post-title":"","ast-breadcrumbs-content":"","ast-featured-img":"","footer-sml-layout":"","theme-transparent-header-meta":"","adv-header-id-meta":"","stick-header-meta":"","header-above-stick-meta":"","header-main-stick-meta":"","header-below-stick-meta":"","astra-migrate-meta-layouts":"","footnotes":""},"categories":[52],"tags":[],"class_list":["post-343","post","type-post","status-publish","format-standard","hentry","category-lukisan"],"yoast_head":"<!-- This site is optimized with the Yoast SEO plugin v21.2 - https:\/\/yoast.com\/wordpress\/plugins\/seo\/ -->\n<title>Matriks serupa atau serupa - Mathority<\/title>\n<meta name=\"robots\" content=\"index, follow, max-snippet:-1, max-image-preview:large, max-video-preview:-1\" \/>\n<link rel=\"canonical\" href=\"https:\/\/mathority.org\/id\/contoh-dan-sifat-matriks-sejenis-atau-serupa\/\" \/>\n<meta property=\"og:locale\" content=\"id_ID\" \/>\n<meta property=\"og:type\" content=\"article\" \/>\n<meta property=\"og:title\" content=\"Matriks serupa atau serupa - Mathority\" \/>\n<meta property=\"og:description\" content=\"Di halaman ini Anda akan menemukan penjelasan tentang matriks-matriks sejenis, disebut juga matriks-matriks sejenis. Selain itu, kami tunjukkan contoh jelas dari dua matriks serupa dan semua properti dari matriks jenis ini sehingga Anda tidak perlu ragu. Terakhir, Anda bahkan dapat melihat hubungannya dengan matriks-matriks yang kongruen. Apa yang dimaksud dengan matriks serupa (atau serupa)? Pengertian &hellip; Matriks serupa atau serupa Selengkapnya &raquo;\" \/>\n<meta property=\"og:url\" content=\"https:\/\/mathority.org\/id\/contoh-dan-sifat-matriks-sejenis-atau-serupa\/\" \/>\n<meta property=\"article:published_time\" content=\"2023-07-06T03:16:38+00:00\" \/>\n<meta property=\"og:image\" content=\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-25b206f25506e6d6f46be832f7119ffa_l3.png\" \/>\n<meta name=\"author\" content=\"Tim Mathority\" \/>\n<meta name=\"twitter:card\" content=\"summary_large_image\" \/>\n<meta name=\"twitter:label1\" content=\"Ditulis oleh\" \/>\n\t<meta name=\"twitter:data1\" content=\"Tim Mathority\" \/>\n\t<meta name=\"twitter:label2\" content=\"Estimasi waktu membaca\" \/>\n\t<meta name=\"twitter:data2\" content=\"2 menit\" \/>\n<script type=\"application\/ld+json\" class=\"yoast-schema-graph\">{\"@context\":\"https:\/\/schema.org\",\"@graph\":[{\"@type\":\"Article\",\"@id\":\"https:\/\/mathority.org\/id\/contoh-dan-sifat-matriks-sejenis-atau-serupa\/#article\",\"isPartOf\":{\"@id\":\"https:\/\/mathority.org\/id\/contoh-dan-sifat-matriks-sejenis-atau-serupa\/\"},\"author\":{\"name\":\"Tim Mathority\",\"@id\":\"https:\/\/mathority.org\/id\/#\/schema\/person\/ea4523caf53a07e2ebf32e306a925b38\"},\"headline\":\"Matriks serupa atau serupa\",\"datePublished\":\"2023-07-06T03:16:38+00:00\",\"dateModified\":\"2023-07-06T03:16:38+00:00\",\"mainEntityOfPage\":{\"@id\":\"https:\/\/mathority.org\/id\/contoh-dan-sifat-matriks-sejenis-atau-serupa\/\"},\"wordCount\":496,\"commentCount\":0,\"publisher\":{\"@id\":\"https:\/\/mathority.org\/id\/#organization\"},\"articleSection\":[\"Lukisan\"],\"inLanguage\":\"id\",\"potentialAction\":[{\"@type\":\"CommentAction\",\"name\":\"Comment\",\"target\":[\"https:\/\/mathority.org\/id\/contoh-dan-sifat-matriks-sejenis-atau-serupa\/#respond\"]}]},{\"@type\":\"WebPage\",\"@id\":\"https:\/\/mathority.org\/id\/contoh-dan-sifat-matriks-sejenis-atau-serupa\/\",\"url\":\"https:\/\/mathority.org\/id\/contoh-dan-sifat-matriks-sejenis-atau-serupa\/\",\"name\":\"Matriks serupa atau serupa - 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