(2a^2+7a-10)(a-5)

2 min read Jun 16, 2024
(2a^2+7a-10)(a-5)

Multiplying Polynomials: (2a^2 + 7a - 10)(a - 5)

This article will guide you through the steps of multiplying the polynomials (2a^2 + 7a - 10) and (a - 5). We'll use the distributive property to expand the product and simplify the resulting expression.

1. The Distributive Property

The distributive property states that for any numbers a, b, and c: a(b + c) = ab + ac

We'll apply this property twice to multiply our polynomials.

2. Expanding the Product

First, distribute the (a - 5) term across the entire (2a^2 + 7a - 10) expression:

(2a^2 + 7a - 10)(a - 5) = a(2a^2 + 7a - 10) - 5(2a^2 + 7a - 10)

Now, distribute the a and the -5 terms individually:

  • a(2a^2 + 7a - 10) = 2a^3 + 7a^2 - 10a
  • -5(2a^2 + 7a - 10) = -10a^2 - 35a + 50

3. Combining Like Terms

Finally, combine the like terms from each distribution to obtain the simplified expression:

(2a^3 + 7a^2 - 10a) + (-10a^2 - 35a + 50) = 2a^3 - 3a^2 - 45a + 50

4. The Result

Therefore, the product of (2a^2 + 7a - 10) and (a - 5) is 2a^3 - 3a^2 - 45a + 50.

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