Question: Show that if an operator is hermitian, then its matrix elements in any orthonormal basis satisfy That is, the corresponding matrix is equal to its

Show that if an operatorShow that if an operator is hermitian, then its matrix elements in any is hermitian, then its matrix elements in any orthonormal basis satisfy orthonormal basis satisfy That is, the corresponding matrix is equal to its transposeThat is, the corresponding matrix is equal to its transpose conjugate.

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