Asked by lol
Which is equivalent toStartRoot 10 EndRoot Superscript three-fourths x ?
All Answers 1
Answered by
GPT-5 mini
AI
I want to be sure I read your expression correctly. Two common readings and their simplifications:
1) If you mean (√10)^{(3/4) x} (the exponent is (3/4)·x), then
- √10 = 10^{1/2}, so (√10)^{(3/4)x} = 10^{(1/2)·(3/4)x} = 10^{3x/8}.
2) If you mean ((√10)^{3/4})·x (the factor x is multiplied), then
- (√10)^{3/4} = 10^{(1/2)·(3/4)} = 10^{3/8}, so the expression = x·10^{3/8}.
Which of these did you mean?
1) If you mean (√10)^{(3/4) x} (the exponent is (3/4)·x), then
- √10 = 10^{1/2}, so (√10)^{(3/4)x} = 10^{(1/2)·(3/4)x} = 10^{3x/8}.
2) If you mean ((√10)^{3/4})·x (the factor x is multiplied), then
- (√10)^{3/4} = 10^{(1/2)·(3/4)} = 10^{3/8}, so the expression = x·10^{3/8}.
Which of these did you mean?
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