Quantum Physics Consider a normalized state of an harmonic oscillator which is given in terms of threeorthonomal vectors. [0), |2) and |4) as follows:ly) = A |0) +-1|2) + 14).a) Find the normalization constant A.b) Find expectation values of H.c) Find (x) and (px).d) Find AxAp.

The constant A is determined by normalization condition: Therefore,…

Consider a normalized state of an harmonic oscillator which is given in terms of three orthonormal vectors, |0), |2) and |4) as follows: ly) = A |0) + 1 |2) 14). a) Find the normalization constant A. b) Find expectation values of H. c) Find (x) and (px). d) Find AxAp.

Consider a normalized state of an harmonic oscillator which is given in terms of three orthonormal vectors, |0), |2) and |4) as follows: ly) = A |0) + 1 |2) 14). a) Find the normalization constant A. b) Find expectation values of H. c) Find (x) and (px). d) Find AxAp.

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Question

Quantum Physics

Consider a normalized state of an harmonic oscillator which is given in terms of three
orthonomal vectors. [0), |2) and |4) as follows:
ly) = A |0) +-
1
|2) + 14).
a) Find the normalization constant A.
b) Find expectation values of H.
c) Find (x) and (px).
d) Find AxAp.

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