Answer:
13,307 years
Explanation:
The expression for the decay of a radiactive material is:
A = B*(1/2)^(t/HL),
where A is the amount remaining, B is the initial amount, t is time (in years), and HL is the half life (in years).
We learn that A is 20% of B, so let's rewrite for that:
0.20B = B*(1/2)^(t/HL)
and we can divide both sides by B to leave us:
0.20 = (1/2)^(t/HL)
The HL is 5730 years:
0.20 = (1/2)^(t/5730)
We need to solve this expression for t, the time (in years) that is required before we have 20% of the carbon remaining.
The answer I get, by graphing, is 13,305 years, The closest to this is A) 13,307 years. An algebraic solution might result in a slightly different number.