Let us assume that panticle in an infinite well ig descrubet by the following wove function (at t=0) 4 (25 0) = E Y, (x) +늠 42(2) + J% w3 (x) %3D carry out a meagurement of energy is made then find out the Energies and probabilitieg coresponting to them. How will wave function evolve with Eime ie w (x, t) ? What uill be the average energyT Then if we
Let us assume that panticle in an infinite well ig descrubet by the following wove function (at t=0) 4 (25 0) = E Y, (x) +늠 42(2) + J% w3 (x) %3D carry out a meagurement of energy is made then find out the Energies and probabilitieg coresponting to them. How will wave function evolve with Eime ie w (x, t) ? What uill be the average energyT Then if we
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Transcribed Image Text:Let us a8sume that
function (at t=0)
panticle. in an infinite well ig describet by the following wove
4 (3y0) = J y (x) +능 42(2) + J'g 4'3 (x)
Then if we
a meagurement of energy ig made then find out the
energies and probabilitieg corregpontine to them. How wl wave function
evolve with time ie w(x,) ? What uill be the average energy T
Carry out
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