Consider a three-dimensional infinite potential well with a quantized energy of Ennynz i %3D mca (n + ng + n²), where ng = 1,2,3, ..., ny = 1,2,3, ..,n̟ = 1,2,3, and a represents the 2ma² potential well width in the x, y, and z directions. . Let (n, = 2, n, = 2, n, = 2). What is the probability that an electron exists in the intervals %3D %3D OSxs;, 0Sys,and 0 < z s?
Consider a three-dimensional infinite potential well with a quantized energy of Ennynz i %3D mca (n + ng + n²), where ng = 1,2,3, ..., ny = 1,2,3, ..,n̟ = 1,2,3, and a represents the 2ma² potential well width in the x, y, and z directions. . Let (n, = 2, n, = 2, n, = 2). What is the probability that an electron exists in the intervals %3D %3D OSxs;, 0Sys,and 0 < z s?
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Transcribed Image Text:Consider a three-dimensional infinite potential well with a quantized energy of Ennyn,
(n² + n + n²), where n = 1,2,3, ...,n, = 1,2,3, ..., ng = 1,2,3, and a represents the
2ma2
potential well width in the x, y, and z directions.
. Let (n, = 2,n, = 2,ng = 2). What is the probability that an electron exists in the intervals
0sxs, 0sys, and 0 szs?
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