Show that if $\langle X,AX\rangle = 0$, then $AX = 0$

linear-algebra

Since $A$ is symmetric, ${\bf R}^n$ has a basis consisting of eigenvectors of $A$. Express $X$ as a linear combination of these eigenvectors, then calculate $X^tAX$, then use the hypothesis about $A$ being positive semi-definite.

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