Question: Verify that (dot{M}) and (dot{M}^{*}) defined below (4.10) are both symmetric, idempotent, and satisfy (dot{M} dot{M}^{*}=dot{M}^{*}). = *8* + (4.10)

Verify that \(\dot{M}\) and \(\dot{M}^{*}\) defined below (4.10) are both symmetric, idempotent, and satisfy \(\dot{M} \dot{M}^{*}=\dot{M}^{*}\).

= *8* + (4.10)

= *8* + (4.10)

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