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Description:Added Hermitian real eigenvalues theorem

# Hermitian matrices have real eigenvalues.

Put content here**Theorem:** Hermitian matrices have real eigenvalues. **Proof:** If $Av = \lambda v$ with $v \neq 0$, then $v^*Av = \lambda v^*v$ and also $v^*Av = v^*A^*v = (Av)^*v = \overline{\lambda}v^*v$. So $\lambda = \overline{\lambda}$, meaning $\lambda$ is real.

# Parents

* Particular types of matrices