An electron is described by the wave function ¥(x)=0 for x<0 ¥(x)=Ce^-x(1-e^-x) for x>0 Where x is in nanometres and C is constant (a) Find the value of C that normalizes ¥(x). (b) Where is the electron most likely to be found; that is, for what value of x is the probability of finding the electron largest?
An electron is described by the wave function ¥(x)=0 for x<0 ¥(x)=Ce^-x(1-e^-x) for x>0 Where x is in nanometres and C is constant (a) Find the value of C that normalizes ¥(x). (b) Where is the electron most likely to be found; that is, for what value of x is the probability of finding the electron largest?
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An electron is described by the wave function
¥(x)=0 for x<0
¥(x)=Ce^-x(1-e^-x) for x>0
Where x is in nanometres and C is constant
(a) Find the value of C that normalizes ¥(x).
(b) Where is the electron most likely to be found; that is, for what value of x is the probability of finding the electron largest?
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