%5E3(2x%5E4y%5E2)%5E2.jpeg "(3x^3y^2)^3(2x^4y^2)^2")
Simplifying the Expression (3x³y²)^3(2x⁴y²)^2
This article will guide you through simplifying the expression (3x³y²)^3(2x⁴y²)^2. We'll break down the steps using the properties of exponents.
Understanding the Properties of Exponents
Before we start, let's recall some key properties of exponents:
- Product of Powers: (x^m) * (x^n) = x^(m+n)
- Power of a Product: (xy)^n = x^n * y^n
- Power of a Power: (x^m)^n = x^(m*n)
Simplifying the Expression
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Distribute the exponents:
- (3x³y²)^3 = 3³ * (x³)^3 * (y²)^3 = 27x⁹y⁶
- (2x⁴y²)^2 = 2² * (x⁴)² * (y²)² = 4x⁸y⁴
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Multiply the simplified terms:
- 27x⁹y⁶ * 4x⁸y⁴ = (27 * 4) * (x⁹ * x⁸) * (y⁶ * y⁴)
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Apply the Product of Powers property:
- 108x¹⁷y¹⁰
Final Answer
Therefore, the simplified expression is 108x¹⁷y¹⁰.