(vii) 5x-2x^(2)-8 8x^(2)-7x-9 3+7x^(2)-2x

3 min read Jun 16, 2024
(vii) 5x-2x^(2)-8 8x^(2)-7x-9 3+7x^(2)-2x

Simplifying and Combining Polynomials

This article will explore how to simplify and combine the following polynomials:

  • 5x - 2x^(2) - 8
  • 8x^(2) - 7x - 9
  • 3 + 7x^(2) - 2x

Understanding Polynomials

Polynomials are mathematical expressions consisting of variables and constants combined using addition, subtraction, and multiplication. Each term in a polynomial is a product of a constant and one or more variables raised to non-negative integer powers.

Simplifying Polynomials

Simplifying polynomials involves combining like terms. Like terms are terms with the same variable(s) raised to the same power.

Here's how we simplify each polynomial:

1. 5x - 2x^(2) - 8

This polynomial is already in its simplest form. We can rearrange the terms for easier reading:

-2x^(2) + 5x - 8

2. 8x^(2) - 7x - 9

This polynomial is also in its simplest form.

3. 3 + 7x^(2) - 2x

Rearranging terms for clarity:

7x^(2) - 2x + 3

Combining Polynomials

To combine polynomials, we simply add or subtract their like terms.

Let's combine the three simplified polynomials:

(-2x^(2) + 5x - 8) + (8x^(2) - 7x - 9) + (7x^(2) - 2x + 3)

  1. Combine the x^(2) terms: -2x^(2) + 8x^(2) + 7x^(2) = 13x^(2)
  2. Combine the x terms: 5x - 7x - 2x = -4x
  3. Combine the constant terms: -8 - 9 + 3 = -14

The combined polynomial is:

13x^(2) - 4x - 14

Conclusion

By understanding the concepts of like terms and simplification, we can easily combine polynomials to create a single, simplified expression. This process is fundamental in various mathematical operations and applications.

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