SOLUTION: Rewrite with positive exponents. Assume that even roots are of nonnegative quantities and that all denominators are nonzero. {{{ (4q^-1/z^-3)^-2 }}} I have {{{ (4z^3/q)^-2

SOLUTION: Rewrite with positive exponents. Assume that even roots are of nonnegative quantities and that all denominators are nonzero. {{{ (4q^-1/z^-3)^-2 }}} I have {{{ (4z^3/q)^-2

Algebra.Com

Question 367483: Rewrite with positive exponents. Assume that even roots are of nonnegative quantities and that all denominators are nonzero.

I have but don't know how to get rid of to the power of -2
Would you divide and get 4z^3/q divided by q/4z^3?
Answer by scott8148(6628) (Show Source): You can put this solution on YOUR website!
inverting the fraction changes the sign of the exponent
RELATED QUESTIONS
Rewrite with positive exponents. Assume that even roots are of nonnegative quantities and (answered by Alan3354)

Rewrite with positive exponents. Assume that even roots are of nonnegative quantities and (answered by Alan3354)

rewrite with positive exponents. Assume that even roots are of nonnegative quantities and (answered by Alan3354)

Rewrite with positive exponents. Assume that even roots are of nonnegative quantities and (answered by rapaljer)

Rewrite with positive exponents. Assume that even roots are of nonnegative quantities and (answered by edjones)

Rewrite with positive exponents. Assume that even roots are of nonnegative quantities and (answered by jsmallt9)

Rewrite with positive exponents. Assume that even roots are of nonnegative quantities and (answered by jim_thompson5910)

Rewrite with positive exponents. Assume that even roots are of nonnegative quantities and (answered by Edwin McCravy)

Rewrite with positive exponents. Assume that even roots are of nonnegative quantities... (answered by MathLover1)

I really need help please. Rewrite with positive exponents. Assume that even roots are (answered by stanbon)