Endomorphism/Eigenspaces are linear subspaces/Zero/Fact/Proof/Exercise

Let ${\displaystyle {}K}$ be a field, ${\displaystyle {}V}$ a ${\displaystyle {}K}$-vector space and

${\displaystyle \varphi \colon V\longrightarrow V}$

a linear mapping. Show that the following statements hold.

1. Every eigenspace

   ${\displaystyle \operatorname {Eig} _{\lambda }{\left(\varphi \right)}}$

   is a linear subspace of ${\displaystyle {}V}$.

2. ${\displaystyle {}\lambda }$ is an eigenvalue for ${\displaystyle {}\varphi }$ if and only if the eigenspace ${\displaystyle {}\operatorname {Eig} _{\lambda }{\left(\varphi \right)}}$ is not the null space.
3. A vector ${\displaystyle {}v\in V,\,v\neq 0}$, is an eigenvector for ${\displaystyle {}\lambda }$ if and only if ${\displaystyle {}v\in \operatorname {Eig} _{\lambda }{\left(\varphi \right)}}$.