%5E3(x%5E2y%5E3)%5E3.jpeg "(xy^2)^3(x^2y^3)^3")
Simplifying Expressions with Exponents
In mathematics, we often encounter expressions involving exponents. These expressions can be simplified using various rules of exponents. Let's consider the expression:
(xy^2)^3(x^2y^3)^3
To simplify this expression, we'll use the following rules:
- Power of a Product: (ab)^n = a^n * b^n
- Power of a Power: (a^m)^n = a^(m*n)
Step 1: Apply the power of a product rule to each term.
This gives us: (x^3 * y^6)(x^6 * y^9)
Step 2: Apply the power of a power rule.
This simplifies to: x^(3+6) * y^(6+9)
Step 3: Combine the exponents.
This leads to the final simplified expression: x^9 * y^15
Therefore, the simplified form of (xy^2)^3(x^2y^3)^3 is x^9y^15.
Key Takeaways:
- Understanding the rules of exponents is crucial for simplifying complex expressions.
- By applying these rules step-by-step, we can systematically simplify expressions involving exponents.
- The simplified form of the expression is a more concise representation of the original expression.