(3x^2y^2)^4

2 min read Jun 16, 2024
(3x^2y^2)^4

Simplifying (3x^2y^2)^4

In mathematics, simplifying expressions is a fundamental skill. Let's break down how to simplify the expression (3x^2y^2)^4.

Understanding the Power of a Power Rule

The key to solving this lies in the power of a power rule. This rule states that when raising a power to another power, you multiply the exponents.

In our case, we have a base of (3x^2y^2) raised to the power of 4.

Applying the Rule

Let's apply the power of a power rule:

  • (3x^2y^2)^4 = 3^4 * (x^2)^4 * (y^2)^4

Now, we need to apply the power of a power rule again to the terms with exponents:

  • 3^4 * (x^2)^4 * (y^2)^4 = 81 * x^(24) * y^(24)

Simplifying the Expression

Finally, we can simplify the expression to:

  • 81 * x^(24) * y^(24) = 81x^8y^8

Conclusion

Therefore, the simplified form of (3x^2y^2)^4 is 81x^8y^8. This illustrates how understanding and applying the power of a power rule can help simplify complex expressions.

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