(10x2−7x+7)−(4x2+5x−9) Perform The Operation

2 min read Jun 16, 2024
(10x2−7x+7)−(4x2+5x−9) Perform The Operation

Simplifying Polynomial Expressions

This article will guide you through the process of simplifying the expression (10x²−7x+7)−(4x²+5x−9).

Understanding the Process

The key to simplifying this expression is understanding that subtracting a polynomial is equivalent to adding its opposite.

1. Distribute the Negative Sign:

Begin by distributing the negative sign in front of the second set of parentheses. This means multiplying each term inside the second parentheses by -1.

(10x²−7x+7)−(4x²+5x−9) = 10x²−7x+7 -4x² -5x + 9

2. Combine Like Terms:

Now, identify terms with the same variable and exponent (like terms).

  • x² terms: 10x² - 4x² = 6x²
  • x terms: -7x - 5x = -12x
  • Constant terms: 7 + 9 = 16

3. Write the Simplified Expression:

Combine the simplified terms to obtain the final simplified expression.

6x² - 12x + 16

Therefore, the simplified form of (10x²−7x+7)−(4x²+5x−9) is 6x² - 12x + 16.