Which value of n makes the following equation true? 3 sqrt n=8 a.2 b.16 c.24 d.512

Question

Which value of n makes the following equation true?

3 sqrt n=8

a.2
b.16
c.24
d.512

in progress 0
Amara 2 weeks 2021-10-11T18:11:59+00:00 2 Answers 0

Answers ( )

    0
    2021-10-11T18:13:17+00:00

    Answer:

    the answer is D

    Step-by-step explanation:

    0
    2021-10-11T18:13:39+00:00

    Answer: d. 512

    Step-by-step explanation:

    You need to remember that:

    (\sqrt[3]{x})^3=x

    Then, given the equation:

    \sqrt[3]{n}=8

    You can find the value of “n” that make the equation true, by solving for “n”.

    So, to solve for “n”, you need to raise both side of the equation to power 3. Therefore, you get:

     \sqrt[3]{n}=8

     (\sqrt[3]{n})^3=(8)^3

     n=512

    Then, the value of “n” that makes the equation \sqrt[3]{n}=8 true is: 512 (You can observe that this matches with the option d).

Leave an answer

Browse
Browse

27:3+15-4x7+3-1=? ( )