A rock from Australia contains 0.438 g of Pb-206 for every 1.0...

Question

A rock from Australia contains 0.438 g of Pb-206 for every 1.00 g of U-238. Assuming that the rock did not contain any Pb-206 at the time of its formation, how old is the rock?

Accepted Answer

Understand that the problem involves radioactive decay, specifically the decay of Uranium-238 (U-238) to Lead-206 (Pb-206).. Use the decay equation: $ N = N_0 e^{-\lambda t} $, where $ N $ is the number of undecayed nuclei, $ N_0 $ is the initial number of nuclei, $ \lambda $ is the decay constant, and $ t $ is the time.. Recognize that the decay constant $ \lambda $ is related to the half-life $ t_{1/2} $ of U-238 by the equation $ \lambda = \frac{\ln(2)}{t_{1/2}} $. The half-life of U-238 is approximately 4.468 billion years.. Set up the ratio of Pb-206 to U-238 to find the number of half-lives that have passed. Use the relationship: $ \frac{N_0 - N}{N} = \frac{\text{mass of Pb-206}}{\text{mass of U-238}} $.. Solve for $ t $ using the decay equation and the known values, including the calculated decay constant and the ratio of Pb-206 to U-238.