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A particle of a mass m is located in a two-diamensional square potential well with absolutely impenetrable walls. Find: (a) the particles permitted energy values if the sides of the well are l_(1) and l_(2) (b) the energy values of the particle at the first four levels if the well has the shape of a square with side l. |
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Answer» Solution :(a) Here the schrodinger equation is `(ħ^(2))/(2m)((del^(2))/(delx^(2))+(del^(2))/(dely^(2)))Psi=EPsi` We take the origin at one of the corners of the rectangle where the particles can lie. Then the wave function must VANISH for `x=0 or x= l_(1)` or `y=0 or y=l_(2)` We look for a solution in the form `Psi= A sin k_(1) x sin k_(2)y` cosines are not permitted by the boundary conditions. Then `k_(1)=(n_(i)pi)/(l_(1)),k_(2)=n_(2)(pi)/(l_(2))` and `E=(k_(1)^(2)+k_(2)^(2))/(2m)ħ^(2)=(pi^(2)ħ^(2))/(2m)((n_(1)^(2))/(t_(1)^(2))+(n_(2)^(2))/(t_(2)^(2)))` Here, `n_(1),n_(2)` are nonzero integers (b) If `l_(1)=l_(2)=1` then `(E)/(ħ^(2)//ML^(2))=(n_(1)^(2)+n_(2)^(2))/(2)pi^(2)` 1st level: `n_(1)=n_(2)=2= 1rarrpi^(2)=9.87` `2^(nd)` level: `,{:(n_(1),=,n_(2),=,2),(or n_(1),=2,n_(2),=,1):}}rarr(5)/(2)pi^(2)= 24.7` `3^(ST)" level": n_(1)=2,n_(2)=2 rarr 4pi^(2)= 39.5` `4^(nd)" level":{:(n_(1)1,=,n_(2),=,3),(n_(1),=3,n_(2),=,1):}}rarr 5pi^(2)= 49.3` |
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