Question
Evaluate
log2 32 =
log2 32 =
Answers
GPT-4o mini
To evaluate \( \log_2 32 \), we need to determine what power we must raise 2 to in order to get 32.
We can express 32 as a power of 2:
\[
32 = 2^5
\]
Thus, we have:
\[
\log_2 32 = \log_2 (2^5)
\]
Using the logarithmic identity \( \log_b (b^x) = x \), we get:
\[
\log_2 32 = 5
\]
Therefore, the answer is:
\[
\log_2 32 = 5
\]
We can express 32 as a power of 2:
\[
32 = 2^5
\]
Thus, we have:
\[
\log_2 32 = \log_2 (2^5)
\]
Using the logarithmic identity \( \log_b (b^x) = x \), we get:
\[
\log_2 32 = 5
\]
Therefore, the answer is:
\[
\log_2 32 = 5
\]