Asked by Leo
What is the cube root of 24 plus the fith root of 192
Answers
Answered by
Reiny
24^(1/3) + 192^(1/5)
= 8^(1/3)*3^(1/3) + 32^(1/5)*6^(1/5)
= 2*3^(1/3) + 2*6^(1/5)
if you need an approximation, use your calculator.
= 8^(1/3)*3^(1/3) + 32^(1/5)*6^(1/5)
= 2*3^(1/3) + 2*6^(1/5)
if you need an approximation, use your calculator.
Answered by
MathMate
(24)<sup>1/3</sup>
=8<sup>1/3</sup>*3<sup>1/3</sup>
=2*3<sup>1/3</sup>
You can do the same for 192<sup>1/5</sup> and find common factors, if any.
If you need a numerical answer, your calculator is your best tool. (ans.≅5.7464...)
=8<sup>1/3</sup>*3<sup>1/3</sup>
=2*3<sup>1/3</sup>
You can do the same for 192<sup>1/5</sup> and find common factors, if any.
If you need a numerical answer, your calculator is your best tool. (ans.≅5.7464...)
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