Would like to have some guidance. $P$ is projection matrix on $U$ and $0\notin v\notin \mathbb{R}^2$
I need to show that if $v$ is element of $U$ than $v$ is Eigenvector of $P$ with Eigenvalue 1.
I know that for projection matrix Eigenvalue is $1$ or $0$... but why in this case only $1$?