naar de volgorde van de matrix \u2013 1<\/em> .<\/li>\n<\/ul>\n![\"\\displaystyle](\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-1f7e94cc5a528abace04016dc263c8f9_l3.png\" "\\"Rendered")
<\/p>\n<\/p>\n
Bewerkingen met scalaire matrices<\/h2>\n
Een van de redenen waarom scalaire matrices zo veel worden gebruikt in de lineaire algebra is het gemak waarmee u berekeningen kunt uitvoeren. Daarom zijn ze zo belangrijk in de wiskunde.<\/p>\n
Laten we eens kijken waarom het zo eenvoudig is om berekeningen uit te voeren met dit type vierkante matrix:<\/p>\n
Optellen en aftrekken van scalaire matrices<\/h3>\n
Het optellen (en aftrekken) van twee scalaire matrices is heel eenvoudig: u hoeft alleen maar de getallen op de hoofddiagonalen op te tellen (of af te trekken). Bijvoorbeeld:<\/p>\n<\/p>\n
![\"\\displaystyle](\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-761de4b4c9bdbbc835b366b21d8cfc2d_l3.png\" "\\"Rendered")
<\/p>\n<\/p>\n
Scalaire matrixvermenigvuldiging<\/h3>\n
Net als bij optellen en aftrekken, vermenigvuldigt u eenvoudigweg de elementen van de diagonalen daartussen om een vermenigvuldiging of matrixproduct tussen twee scalaire matrices op te lossen. Bijvoorbeeld:<\/p>\n<\/p>\n
![\"\\displaystyle](\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-d30acbf9c6ad31625f8253549e659b02_l3.png\" "\\"Rendered")
<\/p>\n<\/p>\n
Kracht van scalaire matrices<\/h3>\n
Het berekenen van de kracht van een scalaire matrix is ook heel eenvoudig: je moet elk element van de diagonaal verheffen tot de exponent. Bijvoorbeeld:<\/p>\n
*** QuickLaTeX cannot compile formula:\n\\displaystyle\\left. \\begin{pmatrix} 2 & 0 & 0 \\\\[1.1ex] 0 & 2 & 0 \\\\[1.1ex] 0 & 0 & 2 \\end{pmatrix}\\right.^4=\\begin{pmatrix} 2^ 4 & 0 & 0 \\\\[1.1ex] 0 & 2^\n\n*** Error message:\nMissing $ inserted.\nleading text: \\displaystyle\nMissing { inserted.\nleading text: \\end{document}\n\\begin{pmatrix} on input line 9 ended by \\end{document}.\nleading text: \\end{document}\nImproper \\prevdepth.\nleading text: \\end{document}\nMissing $ inserted.\nleading text: \\end{document}\nMissing } inserted.\nleading text: \\end{document}\nMissing } inserted.\nleading text: \\end{document}\nMissing \\cr inserted.\nleading text: \\end{document}\nMissing $ inserted.\nleading text: \\end{document}\nYou can't use `\\end' in internal vertical mode.\nleading text: \\end{document}\n\\begin{pmatrix} on input line 9 ended by \\end{document}.\nleading text: \\end{document}\nMissing } inserted.\nleading text: \\end{document}\nMissing \\right. inserted.\nleading text: \\end{document}\n\n<\/pre>\n & 0 \\\\[1.1ex] 0 & 0 & 2^4 \\end{pmatrix}= \\begin{pmatrix} 16 & 0 & 0 \\\\[1.1ex] 0 & 16 & 0 \\\\[1.1ex] 0 & 0 & 16 \\end{pmatrix}<\/p>\n
![\"\n\n<div](\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-ca97d1162704371c21b308778890f436_l3.png\")
<\/div>\n
D\u00e9terminant d’une matrice scalaire<\/h2>\n
Calculer le d\u00e9terminant d’une matrice scalaire<\/strong> revient \u00e0 r\u00e9soudre le d\u00e9terminant d’une matrice diagonale : le r\u00e9sultat est le produit des \u00e9l\u00e9ments sur la diagonale principale.” title=”Rendered by QuickLaTeX.com” height=”106″ width=”582″ style=”vertical-align: -4px;”><\/p>\n \\displaystyle \\text{det}(A)= \\prod_{i =1}^n a_i<\/p>\n
![\"](\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-7b3ddf4b77e65a9bd0387f51b7bcaa40_l3.png\" "\\"Rendered")
<\/p>\n
\\displaystyle \\begin{vmatrix} 7 & 0 & 0 \\\\[1.1ex] 0 & 7 & 0 \\\\[1.1ex] 0 & 0 & 7 \\end{vmatrix} = 7 \\cdot 7 \\cdot 7 = \\bm {343}<\/p>\n
![\"](\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-773692a573846f155d4c92f1e9075001_l3.png\" "\\"Rendered")
<\/p>\n
\\displaystyle \\begin{vmatrix} 7 & 0 & 0 \\\\[1.1ex] 0 & 7 & 0 \\\\[1.1ex] 0 & 0 & 7 \\end{vmatrix} = 7^3= \\bm{343}<\/p>\n
![\"](\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-d24f9aa91fc9fe8ed74f705f83be3b32_l3.png\")
d\u00e9monstration<\/strong> de la formule utilisant une matrice scalaire g\u00e9n\u00e9rique :” title=”Rendered by QuickLaTeX.com” height=”62″ width=”1060″ style=”vertical-align: -4px;”><\/p>\n
\\begin{uitgelijnd} \\begin{vmatrix} a & 0 & 0 \\\\[1.1ex] 0 & a & 0 \\\\[1.1ex] 0 & 0 & a \\end{vmatrix}& = a \\cdot \\begin{ vmatrix} a & 0 \\\\[1.1ex] 0 & a \\end{vmatrix} \u2013 0 \\cdot \\begin{vmatrix} 0 & 0 \\\\[1.1ex] 0 & a \\end{vmatrix} + 0 \\cdot \\ begin{vmatrix} 0 & a \\\\[1.1ex] 0 & 0 \\end{vmatrix} \\\\[2ex] & =a \\cdot (a\\cdot a) \u2013 0 \\cdot 0 + 0 \\cdot 0 \\\\[ 2ex] & = a \\cdot a \\cdot a \\\\[2ex] & = a^3 \\end{uitgelijnd}<\/p>\n
![\"](\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-dc127c7827a5f62c565b8ada378986a8_l3.png\" "\\"Rendered")
<\/p>\n
een^3<\/p>\n
![\"car](\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-49f5afdd3e1e9918f5323139662a2138_l3.png\")
\n
<\/div>\n<\/div>\n
Inverser une matrice scalaire<\/h2>\n
Une matrice scalaire est inversible si, et seulement si, tous les \u00e9l\u00e9ments de la diagonale principale sont diff\u00e9rents de 0<\/strong> . Dans ce cas on dit que la matrice scalaire est une matrice r\u00e9guli\u00e8re. De plus, l’inverse d’une matrice scalaire sera toujours une autre matrice scalaire avec les inverses<\/strong> de la diagonale principale :” title=”Rendered by QuickLaTeX.com” height=”174″ width=”1250″ style=”vertical-align: -5px;”><\/p>\n \\displaystyle A= \\begin{pmatrix} 9 & 0 & 0 \\\\[1.1ex] 0 & 9 & 0 \\\\[1.1ex] 0 & 0 & 9 \\end{pmatrix} \\ \\longrightarrow \\ A^{-1 }=\\begin{pmatrix} \\frac{1}{9} & 0 & 0 \\\\[1.1ex] 0 & \\frac{1}{9} & 0 \\\\[1.1ex] 0 & 0 & \\frac{ 1}{9} \\end{pmatrix}<\/p>\n
![\"](\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-9eaf19f57b0cbab7f60c5c1dc0ec45eb_l3.png\" "\\"Rendered")
<\/p>\n
\\displaystyle B= \\begin{pmatrix} 2 & 0 & 0 \\\\[1.1ex] 0 & 2 & 0 \\\\[1.1ex] 0 & 0 & 2 \\end{pmatrix} \\displaystyle\\left| B^{-1}\\right|=\\cfrac{1}{2} \\cdot \\cfrac{1}{2} \\cdot \\cfrac{1}{2}=\\cfrac{1}{8} = $ 0,125<\/p>\n","protected":false},"excerpt":{"rendered":"
Op deze pagina vind je wat een scalaire matrix is en diverse voorbeelden van scalaire matrices zodat het perfect begrepen wordt. Bovendien kunt u alle eigenschappen van scalaire matrices zien en de voordelen van het uitvoeren van bewerkingen ermee. Ten slotte leggen we uit hoe je de determinant van een scalaire matrix kunt berekenen en …<\/p>\n
Scalaire matrix<\/span> Lees meer »<\/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":[64],"tags":[],"class_list":["post-355","post","type-post","status-publish","format-standard","hentry","category-soorten-tafels"],"yoast_head":"\nScalaire matrix - 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\/nl\/scalaire-matrix\/\" \/>\n<meta property=\"og:locale\" content=\"nl_NL\" \/>\n<meta property=\"og:type\" content=\"article\" \/>\n<meta property=\"og:title\" content=\"Scalaire matrix - Mathority\" \/>\n<meta property=\"og:description\" content=\"Op deze pagina vind je wat een scalaire matrix is en diverse voorbeelden van scalaire matrices zodat het perfect begrepen wordt. 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![\"voorbeeld](\"https:\/\/mathority.org\/wp-content\/uploads\/2023\/07\/exemple-de-matrice-scalaire-de-dimension-22152-1.webp\")
<\/figure>\n<\/div>\n![\"voorbeeld](\"https:\/\/mathority.org\/wp-content\/uploads\/2023\/07\/exemple-de-matrice-scalaire-3-dimensionnelle-3-1.webp\")
<\/figure>\n<\/div>\n![\"voorbeeld](\"https:\/\/mathority.org\/wp-content\/uploads\/2023\/07\/exemple-de-matrice-scalaire-de-dimension-42154-1.webp\")
<\/figure>\n<\/div>\n![\"4](\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-b77f7d177c2769b0847de258adfd1386_l3.png\" "\\"Rendered")
<\/p>\n<\/p>\n![\"\\begin{pmatrix}](\"https:\/\/mathority.org\/wp-content\/ql-cache\/quicklatex.com-2513b8d4aeb6d932d9870934102a1637_l3.png\" "\\"Rendered")
<\/p>\n<\/p>\n