-(3x%5E2y).jpeg "(7x^4y^2-2x^2y^2-5x^3y^4) (3x^2y)")
Multiplying Polynomials: (7x⁴y² - 2x²y² - 5x³y⁴) (3x²y)
This article will guide you through the process of multiplying the polynomials (7x⁴y² - 2x²y² - 5x³y⁴) and (3x²y). We will use the distributive property to simplify this expression.
The Distributive Property
The distributive property states that for any numbers a, b, and c:
a(b + c) = ab + ac
We can apply this property to multiply polynomials by distributing each term of the first polynomial to each term of the second polynomial.
Applying the Distributive Property
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Distribute the first term (3x²y) to each term inside the first polynomial:
(3x²y) * (7x⁴y²) = 21x⁶y³ (3x²y) * (-2x²y²) = -6x⁴y³ (3x²y) * (-5x³y⁴) = -15x⁵y⁵
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Combine the resulting terms:
21x⁶y³ - 6x⁴y³ - 15x⁵y⁵
Simplified Expression
Therefore, the simplified expression for (7x⁴y² - 2x²y² - 5x³y⁴) (3x²y) is 21x⁶y³ - 6x⁴y³ - 15x⁵y⁵.