http://ricefriedegg.com:80/mediawiki/index.php?action=history&feed=atom&title=DiagonalizationDiagonalization - Revision history2026-05-26T21:41:31ZRevision history for this page on the wikiMediaWiki 1.41.0http://ricefriedegg.com:80/mediawiki/index.php?title=Diagonalization&diff=908&oldid=prevRice: Created page with "= Conditions = There are two important cases indicating that A is diagonlizable: 1. If the charateristic polynomial has n distinct roots 2. If A is symmetric in the real case or Hermitian in the complex case, it always has a basis of eigenvectors, which can be orthogonal."2024-06-10T06:49:34Z<p>Created page with "= Conditions = There are two important cases indicating that A is diagonlizable: 1. If the <a href="/mediawiki/index.php/Eigenvector" title="Eigenvector">charateristic polynomial</a> has n distinct roots 2. If A is symmetric in the real case or <a href="/mediawiki/index.php?title=Hermitian&action=edit&redlink=1" class="new" title="Hermitian (page does not exist)">Hermitian</a> in the complex case, it always has a basis of eigenvectors, which can be orthogonal."</p>
<p><b>New page</b></p><div>= Conditions =<br />
There are two important cases indicating that A is diagonlizable:<br />
<br />
1. If the [[eigenvector|charateristic polynomial]] has n distinct roots<br />
2. If A is symmetric in the real case or [[Hermitian]] in the complex case, it always has a basis of eigenvectors, which can be orthogonal.</div>Rice