2. In this equation we will consider a finite potential well in which V = −V0 in the interval −L/2 ≤ x ≤ L/2 , and V = 0 ( where V0 is a postive real number ). a) For a particle with in the range −V0 < E < 0 , write and solve the time-independent Schrödinger equation in the classicaly allowed and classically forbidden regions . Remember to keep the wavemnubers and exponetial factors in your solutions real ! Note : for this part of the question , you have not been asked to apply any boundary conditions to your solutions
2. In this equation we will consider a finite potential well in which V = −V0 in the interval −L/2 ≤ x ≤ L/2 , and V = 0 ( where V0 is a postive real number ). a) For a particle with in the range −V0 < E < 0 , write and solve the time-independent Schrödinger equation in the classicaly allowed and classically forbidden regions . Remember to keep the wavemnubers and exponetial factors in your solutions real ! Note : for this part of the question , you have not been asked to apply any boundary conditions to your solutions
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2. In this equation we will consider a finite potential well in which V = −V0 in the interval −L/2 ≤ x ≤ L/2 , and V = 0 ( where V0 is a postive real number ).
a) For a particle with in the range −V0 < E < 0 , write and solve the time-independent Schrödinger equation in the classicaly allowed and classically forbidden regions . Remember to keep the wavemnubers and exponetial factors in your solutions real !
Note : for this part of the question , you have not been asked to apply any boundary conditions to your solutions .
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