9.9 Sample Test Problems
- A beam of 100 eV (kinetic energy) electrons is incident upon apotential stepof height
V 0 = 10 eV. Calculate the probability to be transmitted. Get a numericalanswer.
2.*Find the energy eigenstates (and energy eigenvalues) of a particleof massmbound in the
1D potentialV(x) =−V 0 δ(x). AssumeV 0 is a positive real number. (Don’t assume thatV 0
has the units of energy.) You need not normalize the state.
Answerκ=√
− 2 mE
̄h^2
du
dx∣
∣
∣
∣
+−
du
dx∣
∣
∣
∣
−=
− 2 mV 0
̄h^2eκ^0−κ−(+κ) =− 2 mV 0
̄h^2
κ=mV 0
̄h^2E=−̄h^2 κ^2
2 m=−
̄h^2
2 mm^2 V 02
̄h^4=
mV 02
2 ̄h^23.*A beam of particles of wave-numberk(this meanseikx) is incident upon a one dimensional
potentialV(x) =aδ(x). Calculate the probability to be transmitted. Graph it as a function
ofk.
Answer
To the left of the origin the solution iseikx+Re−ikx. To the right of the origin the solution is
Teikx. Continuity ofψat the origin implies 1+R=T. The discontinuity in the first derivative
is∆dψ
dx=
2 ma
̄h^2ψ(0).ikT−(ik−ikR) =2 ma
̄h^2T
2 ik(T−1) =2 ma
̄h^2T
(
2 ik−2 ma
̄h^2)
T= 2ikT=
2 ik
2 ik+^2 ̄hma 2PT=|T|^2 =4 k^2
4 k^2 +^4 m(^2) a 2
̄h^4
Transmission probability starts at zero fork= 0 then approachesP= 1 asymptotically for
k >ma ̄h 2.
4.*A beam of particles of energyE >0 coming from−∞is incident upon a delta function
potential in one dimension. That isV(x) =λδ(x).
a) Find the solution to the Schr ̈odinger equation for this problem.