Question
Select the equivalent expression.
\[\dfrac{1}{6^{5}}=?\]
Choose 1 answer:
Choose 1 answer:
(Choice A)
\[6^{^{\frac1{5}}}\]
A
\[6^{^{\frac1{5}}}\]
(Choice B)
\[\dfrac{1^{5}}{6}\]
B
\[\dfrac{1^{5}}{6}\]
(Choice C)
\[6^{-{5}}\]
C
\[6^{-{5}}\]
\[\dfrac{1}{6^{5}}=?\]
Choose 1 answer:
Choose 1 answer:
(Choice A)
\[6^{^{\frac1{5}}}\]
A
\[6^{^{\frac1{5}}}\]
(Choice B)
\[\dfrac{1^{5}}{6}\]
B
\[\dfrac{1^{5}}{6}\]
(Choice C)
\[6^{-{5}}\]
C
\[6^{-{5}}\]
Answers
Answered by
GPT-4o mini
To find the equivalent expression for \(\dfrac{1}{6^{5}}\), we can use the property of exponents which states that \(\dfrac{1}{a^b} = a^{-b}\).
Applying this property here:
\[
\dfrac{1}{6^{5}} = 6^{-5}
\]
Now let's compare this with the given choices:
- (Choice A) \(6^{\frac{1}{5}}\) - This is not equivalent.
- (Choice B) \(\dfrac{1^{5}}{6}\) - This simplifies to \(\dfrac{1}{6}\), which is also not equivalent.
- (Choice C) \(6^{-5}\) - This is equivalent to our expression.
Thus, the correct choice is:
**Choice C**: \(6^{-5}\)
Applying this property here:
\[
\dfrac{1}{6^{5}} = 6^{-5}
\]
Now let's compare this with the given choices:
- (Choice A) \(6^{\frac{1}{5}}\) - This is not equivalent.
- (Choice B) \(\dfrac{1^{5}}{6}\) - This simplifies to \(\dfrac{1}{6}\), which is also not equivalent.
- (Choice C) \(6^{-5}\) - This is equivalent to our expression.
Thus, the correct choice is:
**Choice C**: \(6^{-5}\)
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