%5E-4%2F3.jpeg "(27/64)^-4/3")
Simplifying (27/64)^(-4/3)
This article will guide you through simplifying the expression (27/64)^(-4/3). We will use the properties of exponents to arrive at the solution.
Understanding the Properties of Exponents
Before we begin, let's refresh our memory on a couple of key exponent properties:
- Negative Exponents: x^(-n) = 1/x^n
- Fractional Exponents: x^(m/n) = (x^m)^(1/n) = (x^(1/n))^m
Simplifying the Expression
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Applying the Negative Exponent Property:
(27/64)^(-4/3) = 1 / (27/64)^(4/3)
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Applying the Fractional Exponent Property:
1 / (27/64)^(4/3) = 1 / [(27/64)^(1/3)]^4
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Simplifying the Cube Root:
1 / [(27/64)^(1/3)]^4 = 1 / (3/4)^4
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Evaluating the Power:
1 / (3/4)^4 = 1 / (81/256)
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Dividing by a Fraction:
1 / (81/256) = 256/81
Therefore, (27/64)^(-4/3) simplifies to 256/81.