1000 Solved Problems in Modern Physics

(Romina) #1

3.3 Solutions 169


Or

d^2 ψ(x)
dx^2

+

(

2 mE
^2

)

ψ(x)=0(2)

Writing

α^2 =

2 mE
^2

(3)

Equation (2) becomes
d^2 ψ
dx^2

+α^2 ψ=0(4)

which has the solution
ψ(x)=Asinαx+Bcosαx (5)

where AandBare constants of integration. Take the origin at the left
corner, Fig 3.5.

Fig. 3.5Square potential
well of infinite depth


Boundary condition:

ψ(0)=0;ψ(a)= 0
The first one givesB=0. We are left with

ψ=Asinαx (6)

The second one gives
αa=nπ,n= 1 , 2 , 3 ... (7)

n=0 is excluded as it would give a trivial solution.
Using the value ofαin (6)

ψn(x)=Asin

(nπx
a

)

(8)

This is an unnormalized solution. The constantAis determined from
normalization condition.
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