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Scientists found an animal skull during an excavation and tested the amount of carbon-14 left in it. They found that 55 percent of the carbon-14 in the skull remained. How many years ago was the animal buried? Round your answer to nearest whole number. (Hint: A = A0e-0.000124t.)

A) 443,548 years
B) 362,903 years
C) 6,439 years
D) 4,821 years

Respuesta :

55% of the Carbon is left in the skull.

If A₀ was the original amount of Carbon, the amount of Carbon that is remaining will be 55% of A₀  which equals 0.55A₀ 

Using the given equation:

[tex]A= A_{o}e^{-0.000124t} \\ \\ 0.55A_{o}=A_{o}e^{-0.000124t} \\ \\ 0.55=e^{-0.000124t} \\ \\ ln(0.55)=ln(e^{-0.000124t}) \\ \\ ln(0.55)=-0.000124t*ln(e) \\ \\ ln(0.55)=-0.000124t \\ \\ t= \frac{ln(0.55)}{-0.000124} \\ \\ t= 4821[/tex]

Rounding of to nearest year, we can conclude that the animal was buried 4821 years ago. So option D gives the correct answer

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