Answer to Question #177723 in Quantum Mechanics for Rianta

Question #177723

Consider an infinitely deep potential well of width 2a centered at x = 0.

The probability of finding a particle of mass m in the ground, first and

second excited state is 60%, 30% and 10% respectively. What is the energy

expectation value of the particle ?

Expert's answer

Permitted energy level for n^th state, "E=\\dfrac{n^{2}h^{2}}{8ml^2}"

For Ground state, n=1

"E_1=\\dfrac{1^2\\times(4.135\\times10^{-15})^2}{8\\times9.1\\times10^{-31}\\times4a^2}\\\\ E_1=\\dfrac{0.587}{a^2}eV"

For First Excited state, n=2

"E_2=\\dfrac{(2)^2\\times0.587}{a^2}=\\dfrac{2.34}{a^2}eV"

For Second Excited state, n=3

"E_3=\\dfrac{9\\times0.587}{a^2}=\\dfrac{5.283}{a^2}eV"

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