- By Definition Hermitian Operator A Satisfies Ff X A G X Dx F A F X G X Dx Show That The Momentum Operator P I 1 (12.78 KiB) Viewed 36 times
By definition, Hermitian operator  satisfies ff(x)* g(x) dx = f{ f(x)} *g(x)dx. Show that the momentum operator, p=-i
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By definition, Hermitian operator  satisfies ff(x)* g(x) dx = f{ f(x)} *g(x)dx. Show that the momentum operator, p=-i
By definition, Hermitian operator  satisfies ff(x)* g(x) dx = f{ f(x)} *g(x)dx. Show that the momentum operator, p=-ih is a Hermitian operator, assuming that the functions f(x) and g(x) are for bound (stationary) states.
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