show that each of the following number is a perfect cube also find the number whose cube is the given number 59319
Answers
Answered by
1
Answer:
First we factor the number,
59319=3\times 3\times 3\times 13\times 13\times 1359319=3×3×3×13×13×13
59319=3^3\times 13^359319=3
3
×13
3
59319=(3\times 13)^359319=(3×13)
3
59319=(39)^359319=(39)
3
Taking cube root both side,
\sqrt[3]{59319}=39
3
59319= 39
Answered by
1
Answer:
Cube root of 59319 by prime factorization is 39.
Step-by-step explanation:
To find : Cube root of 59319 by prime factorization ?
Solution :
First we factor the number,
59319=3\times 3\times 3\times 13\times 13\times 1359319=3×3×3×13×13×13
59319=3^3\times 13^359319=3
3
×13
3
59319=(3\times 13)^359319=(3×13)
3
59319=(39)^359319=(39)
3
Taking cube root both side,
\sqrt[3]{59319}=39
3
59319
=39
Therefore, Cube root of 59319 by prime factorization is 39.
I hope this will help you..
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