(3x^4y^2)^3

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

Simplifying Expressions with Exponents: (3x^4y^2)^3

In mathematics, simplifying expressions can often involve working with exponents. One common type of problem is simplifying expressions that involve raising a product to a power. Let's look at the expression (3x^4y^2)^3.

Understanding the Rules of Exponents

The key to simplifying this expression lies in understanding the following rules of exponents:

  • Power of a product: (ab)^n = a^n * b^n
  • Power of a power: (a^m)^n = a^(m*n)

Simplifying the Expression

  1. Apply the power of a product rule: (3x^4y^2)^3 = 3^3 * (x^4)^3 * (y^2)^3

  2. Apply the power of a power rule: 3^3 * (x^4)^3 * (y^2)^3 = 27 * x^(43) * y^(23)

  3. Simplify: 27 * x^(43) * y^(23) = 27x^12y^6

Conclusion

By applying the rules of exponents, we have successfully simplified the expression (3x^4y^2)^3 to 27x^12y^6. This process demonstrates how understanding the properties of exponents can be used to manipulate and simplify complex mathematical expressions.

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