Consider a particle in the n = 1 state in a one-dimensional box of length a and infinite potential at the walls where the normalized wave function is given by 2 44(x) = sin(x) a (a) Calculate the probability for finding the particle between 2 and a. (Hint: It might help if you draw a picture of the box and sketch the probability density.)
Consider a particle in the n = 1 state in a one-dimensional box of length a and infinite potential at the walls where the normalized wave function is given by 2 44(x) = sin(x) a (a) Calculate the probability for finding the particle between 2 and a. (Hint: It might help if you draw a picture of the box and sketch the probability density.)
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Transcribed Image Text:Consider a particle in the n = 1 state in a one-dimensional box of length a and infinite potential
at the walls where the normalized wave function is given by
2 nTX
a
y(x) = sin
(a) Calculate the probability for finding the particle between 2 and a. (Hint: It might help if
you draw a picture of the box and sketch the probability density.)
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