Euclidean vector space/R^3/Proper isometry/Representation/Fact/Proof

Due to fact, there exists an eigenvector ${\displaystyle {}u}$ for the eigenvalue ${\displaystyle {}1}$. Let ${\displaystyle {}U=\mathbb {R} u}$ denote the corresponding line. This line is fixed and, in particular, invariant under ${\displaystyle {}\varphi }$. Because of fact, also the orthogonal complement ${\displaystyle {}U^{\perp }}$ is invariant under ${\displaystyle {}\varphi }$. That is, there exists a linear isometry

${\displaystyle \varphi _{2}\colon U^{\perp }\longrightarrow U^{\perp }}$

that coincides on ${\displaystyle {}U^{\perp }}$ with ${\displaystyle {}\varphi }$. Here, ${\displaystyle {}\varphi _{2}}$ is proper. Therefore, by fact, ${\displaystyle {}\varphi _{2}}$ is a plane rotation. If we choose a vector of length one in ${\displaystyle {}U}$, and an orthonormal basis of ${\displaystyle {}U^{\perp }}$, then ${\displaystyle {}\varphi }$ has with respect to this basis the given matrix form.