Consider the following a-decay of the Uranium nucleus236 U → 332Th + a.90(a) Show how the mass number (Aa) and atomic number (Za) of the alpha particle are obtained fromthis equation.(b) Calculate the Q-value (Qa) of the reaction.(c) Calculate the speed va = √2MQ of the alpha particle after it has been ejected from the parentnucleus, in terms of the speed of light c. M =-, mp and ma are the atomic masses(ma+mp) x mampof the daugher nucleus and the alpha particle, respectively.(d) Calculate the classical turning radius Re= 2Zpe²/Qa, where Zp is the atomic number of thedaughter nucleus, and e² = 1.44 MeV. fm.(e) Calculate the decay probability Pa that the alpha particle will tunnel through the barrier.HINT: In calculating the probability, use the fact that ħc=197.327 MeV fm. The formula to useis given on page 5.

Given (a) 92U236→90Th232 +αi.e. 92U236→90Th232 +XαY The atomic number and atomic mass number should…

Answered: Consider the following a-decay of the…

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