(1/81)^-3/4

2 min read Jun 16, 2024
(1/81)^-3/4

Simplifying (1/81)^(-3/4)

This problem involves simplifying an expression with a fractional base and a fractional exponent. Let's break down the steps:

Understanding the Properties of Exponents

  • Negative Exponent: A negative exponent indicates the reciprocal of the base raised to the positive version of the exponent.
    • x^-n = 1/x^n
  • Fractional Exponent: A fractional exponent indicates a root. The denominator of the fraction represents the type of root, and the numerator represents the power.
    • x^(m/n) = (n√x)^m

Applying the Properties to our Problem

  1. Address the Negative Exponent:

    • (1/81)^(-3/4) = 1/[(1/81)^(3/4)]
  2. Address the Fractional Exponent:

    • 1/[(1/81)^(3/4)] = 1/[(⁴√(1/81))^3]
  3. Simplify the Root:

    • 1/[(⁴√(1/81))^3] = 1/[(1/3)^3]
  4. Calculate the Power:

    • 1/[(1/3)^3] = 1/(1/27)
  5. Simplify the Division:

    • 1/(1/27) = 27

Therefore, (1/81)^(-3/4) simplifies to 27.

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