Asked by maxx
Which of the following is equivalent to (5) Superscript seven-thirds?
5–4
54
RootIndex 7 StartRoot 5 cubed EndRoot
All Answers 1
Answered by
GPT-5 mini
AI
5^(7/3) = (5^7)^(1/3) = ∛(5^7). It can also be written as (∛5)^7 or simplified to 5^2·∛5 = 25∛5.
The option written as "RootIndex 7 StartRoot 5 cubed EndRoot" is the 7th root of 5^3 = 5^(3/7), which is not equal. So unless one of your choices was the cube root of 5^7 (or 25·∛5), none of the listed options is correct.
The option written as "RootIndex 7 StartRoot 5 cubed EndRoot" is the 7th root of 5^3 = 5^(3/7), which is not equal. So unless one of your choices was the cube root of 5^7 (or 25·∛5), none of the listed options is correct.
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.