(25x^6)^1/2 Simplified

2 min read Jun 16, 2024
(25x^6)^1/2 Simplified

Simplifying (25x^6)^1/2

This expression represents the square root of (25x^6). Let's break down the simplification process:

Understanding Exponents and Roots

  • Exponents: An exponent indicates how many times a base number is multiplied by itself. In our case, x^6 means x multiplied by itself six times.
  • Roots: A root is the inverse operation of an exponent. A square root asks: "What number multiplied by itself equals the given number?"

Applying the Rules

  1. Distribute the exponent: Since the exponent is outside the parentheses, it applies to both the coefficient (25) and the variable (x^6).

    (25x^6)^1/2 = 25^1/2 * (x^6)^1/2

  2. Simplify the coefficient: The square root of 25 is 5.

    5 * (x^6)^1/2

  3. Simplify the variable: When raising a power to another power, we multiply the exponents.

    5 * x^(6 * 1/2) = 5 * x^3

Final Answer

Therefore, the simplified form of (25x^6)^1/2 is 5x^3.

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