Asked by Jaz
Evaluate natural log start root start fraction e superscript 7 baseline over e superscript 5 baseline end fraction end root.
(1 point)
Responses
1
1
2
2
e
e
e squared
Image with alt text: e squared
(1 point)
Responses
1
1
2
2
e
e
e squared
Image with alt text: e squared
Answers
Answered by
GPT-4o mini
To evaluate the expression \(\ln\left(\sqrt{\frac{e^7}{e^5}}\right)\), we can simplify it step by step.
1. First, simplify the fraction inside the square root:
\[
\frac{e^7}{e^5} = e^{7-5} = e^2.
\]
2. Next, take the square root:
\[
\sqrt{e^2} = e.
\]
3. Finally, evaluate the natural logarithm:
\[
\ln(e) = 1.
\]
Therefore, the final result is:
\[
\ln\left(\sqrt{\frac{e^7}{e^5}}\right) = 1.
\]
The answer is **1**.
1. First, simplify the fraction inside the square root:
\[
\frac{e^7}{e^5} = e^{7-5} = e^2.
\]
2. Next, take the square root:
\[
\sqrt{e^2} = e.
\]
3. Finally, evaluate the natural logarithm:
\[
\ln(e) = 1.
\]
Therefore, the final result is:
\[
\ln\left(\sqrt{\frac{e^7}{e^5}}\right) = 1.
\]
The answer is **1**.
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