Asked by d
Approximate the solution to the equation 20=125e^x
by locating the intersection point of y=125e^x
and y=20
.(1 point)
Responses
x≈20
x approximately equals 20
x≈−1.8
x approximately equals negative 1.8
x≈125
x approximately equals 125
x≈1.8
x approximately equals 1.8
by locating the intersection point of y=125e^x
and y=20
.(1 point)
Responses
x≈20
x approximately equals 20
x≈−1.8
x approximately equals negative 1.8
x≈125
x approximately equals 125
x≈1.8
x approximately equals 1.8
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To solve the equation \( 20 = 125e^x \), we can rewrite it as:
\[
e^x = \frac{20}{125}
\]
Simplifying the fraction:
\[
e^x = \frac{4}{25}
\]
Now, take the natural logarithm of both sides:
\[
x = \ln\left(\frac{4}{25}\right)
\]
Using properties of logarithms:
\[
x = \ln(4) - \ln(25)
\]
We can approximate this value. We know that:
\[
\ln(4) \approx 1.386 \quad \text{and} \quad \ln(25) = \ln(5^2) = 2\ln(5) \approx 2 \times 1.609 = 3.218
\]
So:
\[
x \approx 1.386 - 3.218 \approx -1.832
\]
This indicates that \( x \) is approximately \(-1.8\).
Thus, the correct response is:
**x ≈ -1.8**.
\[
e^x = \frac{20}{125}
\]
Simplifying the fraction:
\[
e^x = \frac{4}{25}
\]
Now, take the natural logarithm of both sides:
\[
x = \ln\left(\frac{4}{25}\right)
\]
Using properties of logarithms:
\[
x = \ln(4) - \ln(25)
\]
We can approximate this value. We know that:
\[
\ln(4) \approx 1.386 \quad \text{and} \quad \ln(25) = \ln(5^2) = 2\ln(5) \approx 2 \times 1.609 = 3.218
\]
So:
\[
x \approx 1.386 - 3.218 \approx -1.832
\]
This indicates that \( x \) is approximately \(-1.8\).
Thus, the correct response is:
**x ≈ -1.8**.
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