What is #root3 (-x^15y^9)#?

2 Answers
Jul 14, 2016

#root(3)(-x^15y^9) = -x^5y^3#

Explanation:

For all Real values of #a#:

#root(3)(a^3) = a#

Putting #a=-x^5y^3#, we find:

#root(3)(-x^15y^9) = root(3)((-x^5y^3)^3) = -x^5y^3#

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Footnote

It is a common error to think that a similar property holds for square roots, namely:

#sqrt(a^2) = a#

but this is only generally true when #a >= 0#.

What we can say for square roots is:

#sqrt(a^2) = abs(a)#

This works for any Real number #a#.

Real cube roots behave better in this case.

Jul 14, 2016

#root(3)(-x^15*y^9)=-x^5y^3#

Explanation:

In #root(3)(-x^15*y^9)#, we have #-1# a factor and as we are seeking cube root, let us write it as #(-1)^3#. Also, let us write #x^15=(x^5)^3# and #y^9=(y^3)^3#

Hence #root(3)(-x^15*y^9)#

= #root(3)((-1)^3*(x^5)^3*(y^3)^3)#

= #(-1)x^5y^3#

= #-x^5y^3#