Answer Happy

2. Consider a nonrelativistic particle of mass M that oscillates back and forth with some angular frequency w along the x axis. The particle's wave function is given by 1 Y(x, t): = (340e-lat/2-√8₁e-3lwt/2 + √8₂e-Siwt/2), where {n(x)} are the pertinent normalized energy eigenfunctions. At some positive time T, the wave function is given by C Y(x, 7) = (340 + √8₁ + √8 4₂), where C is a constant. Without determining C, find the smallest possible value of T.