Using the standard representation of the Pauli spin matrices, show that complex conjugation with a rotation of

Question:

Using the standard representation of the Pauli spin matrices, show that complex conjugation with a rotation of $\pi$ about the $y$-axis reverses the orientation of the spin; i.e., show that $\left(i \sigma^{2}\right) \sigma^{*}\left(i \sigma^{2}\right)^{\dagger}=-\sigma$.

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