what is the simplified form of the following expression? Assume x≠0. ^5√10x/3x^3.
A) ^5√10x/3x
B) ^5√30/3x
C) ^5√120x^3/3x
D) ^5√810x^3/3x

To solve this problem you must apply the proccedure shown below:
1. You have the following expression given in the problem above:
[tex] \sqrt[5]{10x/3x^3} [/tex]
2. You can rewrite the expression as following:
[tex] (\sqrt[5]{10}) x^{1/5}/ (\sqrt[5]{3}) x^{3/5} [/tex]
3. Applying the exponetns properties, you can substract the exponents whose bases are equal. In this case, you need to substract the exponents of x:
[tex] \sqrt[5]{10}/ (\sqrt[5]{3})x^{2/5} [/tex]
[tex] \sqrt[5]{10/3 x^{2}}[/tex]
Therefore, the answer is: [tex] \sqrt[5]{10/3x^{2} } [/tex]

nparrish13 nparrish13 · Answer 2 · 2020-04-11T06:31:30+02:00

nparrish13 nparrish13

11-04-2020

Answer:

It is answer a on eden

Step-by-step explanation:

I did the exam

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what is the simplified form of the following expression? Assume x≠0. ^5√10x/3x^3. A) ^5√10x/3x B) ^5√30/3x C) ^5√120x^3/3x D) ^5√810x^3/3x

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what is the simplified form of the following expression? Assume x≠0. ^5√10x/3x^3.
A) ^5√10x/3x
B) ^5√30/3x
C) ^5√120x^3/3x
D) ^5√810x^3/3x