This problem can be solved using the formula for exponential decay, which is:

N = N0 * e^(-λt)

where:
N is the final amount of the substance,
N0 is the initial amount of the substance,
λ is the decay constant, and
t is the time.

In this case, we know that N = 3 grams, N0 = 15 grams, and λ = 0.03 per year. We want to solve for t.

Rearranging the formula to solve for t gives us:

t = -ln(N/N0) / λ

Substituting the given values into this formula gives us:

t = -ln(3/15) / 0.03

Calculating this gives us:

t ≈ 54.4 years

So, the answer is c.) 54.4 years.

Question

This problem can be solved using the formula for exponential decay, which is:

N = N0 * e^(-λt)

where:
N is the final amount of the substance,
N0 is the initial amount of the substance,
λ is the decay constant, and
t is the time.

In this case, we know that N = 3 grams, N0 = 15 grams, and λ = 0.03 per year. We want to solve for t.

Rearranging the formula to solve for t gives us:

t = -ln(N/N0) / λ

Substituting the given values into this formula gives us:

t = -ln(3/15) / 0.03

Calculating this gives us:

t ≈ 54.4 years

So, the answer is c.) 54.4 years.

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