1 Answer

Lavanya Mohan · Answer 1 · 2021-12-17T13:04:02+0000

Answer: 54678 years

Explanation:

This can be solved by the following equation:

$N_(t)=N_(o)e^(-\lambda t)$ (1)

Where:

$N_(t)=54\%=0.54$ is the quantity of atoms of carbon-14 left after time

N_(o)=1 is the initial quantity of atoms of C-14 in the mammal hide

$\lambda$ is the rate constant for carbon-14 radioactive decay

is the time elapsed

On the other hand,
$\lambda$ has a relation with the half life
of the C-14, which is
5730 years :

$\lambda=(ln(2))/(h)=(ln(2))/(5730 years)=1.21(10)^(-4) years^(-1)=0.000121 years^(-1)$ (2)

Substituting (2) in (1):

$0.54=1e^{-(0.000121 years^(-1)) t}$ (3)

Applying natural logarithm on both sides of the equation:

$ln(0.54)=ln(1e^{-(0.000121 years^(-1)) t})$ (4)

-0.616=-(0.000121 years^(-1)) t (5)

Isolating
:

t=(-0.616)/(-0.000121 years^(-1)) (6)

$t=54677.68 years \approx 54678 years$ (7) This is the age of the mammal hide

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