Calculation of half-life for alpha emission usingtime-independent
Schrodinger Equation using the following followinginformation:
Radionuclide: 241-Am (Z=95); Ea = 5.49 MeV; MeasuredHalf-Life~432y
Follow the steps involved and show your work for each subsetquestion, not the
final answer:
(a) Evaluate the well radius [=separation distance (r) between thecenter of
the alpha particle as it abuts the recoil nucleus];
(b) Evaluate the coulomb barrier potential energy (U) for thewell;
(c) Estimate the separation distance (r*) from the center of thepotential well
where the coulomb potential equals the energy of the alphaparticle;
(d) Assuming a square shaped single barrier of height “Uâ€, evaluatethe
tunneling probability by solving for the transmission coefficientand use of
the associated separation (=r*-r);
(e) Calculate the frequency with which the alpha particle strikesthe well
boundary to try to get out of the well;
(f) Calculate the half-life and compare it with the known half-lifefor alpha
emission from 238U;
(g) Use the spatially-averaged effective approximation for theheight of the
barrier by integrating the variation of “U†with distance from “râ€to “r*†and
re-calculate the half-life and compare it with the known half-lifefor alpha
emission from 238U;
(h) Approximate the hyperbolic shaped barrier variation outside ofthe well
by breaking them up into 5 progressively reduced height squareshaped
barriers, each with a width = (r*-r)/5 and calculate thetunneling
probabilities associated with each segment;
(i) Re-calculate for the half-life combining the probabilities fromeach of the 5
bins, and compare the value with the known half-life.
