We fix a symplectic form $\omega$ on $E$. Conclude that there exists a basis $\mathcal { B }$ of $E$ such that $\operatorname { Mat_{\mathcal {B}} } ( \omega ) = J _ { n }$. Deduce that $\omega$ tames at least one complex structure on $E$.
We fix a symplectic form $\omega$ on $E$. Conclude that there exists a basis $\mathcal { B }$ of $E$ such that $\operatorname { Mat_{\mathcal {B}} } ( \omega ) = J _ { n }$. Deduce that $\omega$ tames at least one complex structure on $E$.