Revision as of 21:37, 22 April 2025 by Bot (Created page with "<div class="d-none"><math> \newcommand{\mathds}{\mathbb}</math></div> {{Alert-warning|This article was automatically generated from a tex file and may contain conversion errors. If permitted, you may login and edit this article to improve the conversion. }}Prove that the symmetry and projection with respect to the <math>Ox</math> axis rotated by an angle <math>t/2\in\mathbb R</math> are given by the matrices <math display="block"> S_t=\begin{pmatrix}\cos t&\sin t\\ \...")
BBot
Apr 22'25
Exercise
[math]
\newcommand{\mathds}{\mathbb}[/math]
This article was automatically generated from a tex file and may contain conversion errors. If permitted, you may login and edit this article to improve the conversion.
Prove that the symmetry and projection with respect to the [math]Ox[/math] axis rotated by an angle [math]t/2\in\mathbb R[/math] are given by the matrices
[[math]]
S_t=\begin{pmatrix}\cos t&\sin t\\ \sin t&-\cos t\end{pmatrix}
[[/math]]
[[math]]
P_t=\frac{1}{2}\begin{pmatrix}1+\cos t&\sin t\\ \sin t&1-\cos t\end{pmatrix}
[[/math]]
and then diagonalize these matrices, and if possible without computations.