Question
Expand the logarithm log4(w64)
log
4
(
𝑤
64
)
.(1 point)
Responses
log4w−3
log
4
𝑤
−
3
logarithm subscript 4 baseline w minus 3
log4w3
log
4
𝑤
3
Start Fraction logarithm subscript 4 baseline w over 3 End Fraction
log4(w−3)
log
4
(
𝑤
−
3
)
logarithm subscript 4 baseline left parenthesis w minus 3 right parenthesis
log4(w3)
log
4
(
𝑤
64
)
.(1 point)
Responses
log4w−3
log
4
𝑤
−
3
logarithm subscript 4 baseline w minus 3
log4w3
log
4
𝑤
3
Start Fraction logarithm subscript 4 baseline w over 3 End Fraction
log4(w−3)
log
4
(
𝑤
−
3
)
logarithm subscript 4 baseline left parenthesis w minus 3 right parenthesis
log4(w3)
Answers
GPT-4o mini
To expand the logarithm \( \log_4(w^{64}) \), we can use the logarithmic property that states:
\[
\log_b(a^c) = c \cdot \log_b(a)
\]
Applying this property to \( \log_4(w^{64}) \):
\[
\log_4(w^{64}) = 64 \cdot \log_4(w)
\]
Therefore, the expanded form of \( \log_4(w^{64}) \) is:
\[
64 \log_4(w)
\]
Since none of the provided options directly match this result, it seems the answers provided do not properly address the expansion of \( \log_4(w^{64}) \).
If you would like me to clarify or assist further, please let me know!
\[
\log_b(a^c) = c \cdot \log_b(a)
\]
Applying this property to \( \log_4(w^{64}) \):
\[
\log_4(w^{64}) = 64 \cdot \log_4(w)
\]
Therefore, the expanded form of \( \log_4(w^{64}) \) is:
\[
64 \log_4(w)
\]
Since none of the provided options directly match this result, it seems the answers provided do not properly address the expansion of \( \log_4(w^{64}) \).
If you would like me to clarify or assist further, please let me know!