By substituting in the Schrodinger equation for hte harmonic oscillator, show that the ground-state vibrational wave function is an eigenfunction of hte total energy operator. Determine the energy eigenvalue.
2007-03-20 13:49:33 · 2 answers · asked by Anonymous in Science & Mathematics ➔ Chemistry
This is such a blatant attempt to cheat by getting people to do your homework for you that it's pathetic. First, not only can people not write equations on here very well, but second you make no attempt to even disguise the fact that you're just posting your homework questions. If you want actual help try doing something like "I need to blah blah blah, but I don't know how to start" or "I'm stuck on this step."
2007-03-23 16:51:39 · answer #1 · answered by Some Body 4 · 0⤊ 2⤋
No, they don't conflict. i'm especially specific you could teach the HUP from the Schrodinger wave equation. As I recollect it comes from the actuality that the momentum wave functionality (which tells you the uncertainty in momentum) and the area wave functionality (which provides the uncertainty in place) are Fourier transforms. The p you utilize interior the Schroedinger equation is an operator. this is not a numerical fee. The measured fee of momentum is calculated from the operator applying the wave functionality. And the actuality that the aptitude V(x) relies upon on x has no touching on besides the fact that in case you have a precise wisdom of x the two.
2016-11-27 01:48:28 · answer #2 · answered by Anonymous · 0⤊ 0⤋