Question

Suppose a sample of radioactive substance weighs 40 mg. One year later the sample weighs 29.5 mg. What is the half life of the substance?

Answer 1

The half-life of a radioactive substance can be calculated using a decay formula where the initial amount, final amount, and elapsed time are known. The decay formula is rearranged and solved for the half-life using logarithms.

Step-by-step explanation:

To determine the half-life of a radioactive substance based on its decay over a set period, we use the formula N_t = N_0 (1/2)^(t/T), where N_t is the remaining amount of the substance at time t, N_0 is the original amount, and T is the half-life. In this case, we started with 40 mg of a substance and ended with 29.5 mg after one year.

We assume the decay process follows first-order kinetics (a common assumption for nuclear decay), so we need to solve for T when N_t = 29.5 mg and N_0 = 40 mg. This involves taking the logarithm of both sides of the equation and rearranging to isolate T.

Answer 2

Answer:Use the radioactive decay formula: A = Ao*2^(-t/h), where:

A = Amt of remaining after t time

Step-by-step explanation:

Ao = Initial amt

t = time of decay

h = half-life of the substance

in this problem

A = 21.5

Ao = 38

t = 1 year

h = half life of substance