At time t = 0, the wave function describing the state of a particle takes the form V(x,0) = C (441(x) — 2i½2(x) + + √544

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At Time T 0 The Wave Function Describing The State Of A Particle Takes The Form V X 0 C 441 X 2i 2 X 544 1 (54.77 KiB) Viewed 53 times

At time t = 0, the wave function describing the state of a particle takes the form V(x,0) = C (441(x) — 2i½2(x) + + √544(x)), • where (x) are normalized energy eigenfunctions for the particle with corresponding eigenvalues En = n²n²h²/2mL², where n = 1, 2, 3 .... (a) Find the value of C1² and hence obtain values for the probabilities of obtaining the energies E₁, E2 and E4. (b) Calculate the expectation value of the energy in the state described by V(x, 0), give the answer in terms of m, L and ħ.