(6xy^5)^3

2 min read Jun 16, 2024
(6xy^5)^3

Simplifying (6xy^5)^3

In mathematics, simplifying expressions is a crucial skill. One common type of simplification involves expressions raised to a power, such as (6xy^5)^3. Let's break down how to simplify this expression:

Understanding the Rules

The key rule we need is the power of a product rule:

(ab)^n = a^n * b^n

This rule states that when raising a product to a power, we raise each factor in the product to that power.

Applying the Rule

  1. Identify the factors: In our expression (6xy^5)^3, the factors are 6, x, and y^5.

  2. Apply the power rule: We raise each factor to the power of 3.

    • 6^3 = 6 * 6 * 6 = 216
    • x^3 = x^3
    • (y^5)^3 = y^(5*3) = y^15
  3. Multiply the results: Now we multiply the simplified factors together.

    • 216 * x^3 * y^15 = 216x^3y^15

Conclusion

Therefore, the simplified form of (6xy^5)^3 is 216x^3y^15.

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