Answered

From personal advice to professional guidance, IDNLearn.com has the answers you seek. Ask your questions and get detailed, reliable answers from our community of experienced experts.

An artifact originally had 16 grams of carbon-14 present. The decay model [tex]A=16 e^{-0.000121 t}[/tex] describes the amount of carbon-14 present after [tex]t[/tex] years. Use the model to determine how many grams of carbon-14 will be present in 7186 years.

The amount of carbon-14 present in 7186 years will be approximately [tex]\square[/tex] grams. (Round to the nearest whole number.)

Sagot :

GinnyAnsweridn
To determine the amount of carbon-14 remaining in an artifact after 7186 years using the decay model [tex]\( A = 16 e^{-0.000121 t} \)[/tex], we can follow these steps:

1. Identify the given values:
- Initial amount of carbon-14, [tex]\( A_0 = 16 \)[/tex] grams
- Decay constant, [tex]\( k = -0.000121 \)[/tex]
- Time period, [tex]\( t = 7186 \)[/tex] years

2. Substitute the given values into the decay model:
The decay model is [tex]\( A = 16 e^{-0.000121 \cdot 7186} \)[/tex]

3. Calculate the exponent:
Compute the value of the exponent [tex]\( -0.000121 \cdot 7186 \)[/tex]:
[tex]\[ -0.000121 \cdot 7186 = -0.869306 \][/tex]

4. Evaluate the exponential function:
Calculate [tex]\( e^{-0.869306} \)[/tex]:
The value of [tex]\( e^{-0.869306} \)[/tex] approximately equals 0.419158.

5. Multiply by the initial amount:
Multiply the initial amount of carbon-14 by the value of the exponential function:
[tex]\[ 16 \cdot 0.419158 \approx 6.7065 \][/tex]

6. Round to the nearest whole number:
Since the value [tex]\( 6.7065 \)[/tex] is closer to 7, we round it to the nearest whole number.

Therefore, the amount of carbon-14 present in 7186 years will be approximately 7 grams.
Thank you for using this platform to share and learn. Keep asking and answering. We appreciate every contribution you make. Thank you for visiting IDNLearn.com. We’re here to provide clear and concise answers, so visit us again soon.