Rewrite the following expression with positive exponents
(33xy)^-3/7
Would it be 1 over (33xy)^3/7?
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Thank you
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To rewrite the expression (33xy)^-3/7 with positive exponents, we can use the property of exponents that states: (a^m)^n = a^(m * n).
Therefore, we can rewrite (33xy)^-3/7 as 1 / (33xy)^(3/7).
Now, to simplify further, we can apply the property of exponents that states: a^(m/n) = (n√a)^m.
Applying this property, we can rewrite (33xy)^(3/7) as the 7th root of (33xy) raised to the power of 3:
(33xy)^(3/7) = [(33xy)^(1/7)]^3.
So the final expression with positive exponents is 1 / [(33xy)^(1/7)]^3.