(x-2)%2B(x%2B6)(x-3).jpeg "(x+9)(x-2)+(x+6)(x-3)")
Expanding and Simplifying the Expression (x+9)(x-2)+(x+6)(x-3)
This article will guide you through the process of expanding and simplifying the algebraic expression (x+9)(x-2)+(x+6)(x-3).
Expanding the Expression
To expand the expression, we need to use the distributive property (also known as FOIL).
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(x+9)(x-2):
- Multiply the first terms: x * x = x²
- Multiply the outer terms: x * -2 = -2x
- Multiply the inner terms: 9 * x = 9x
- Multiply the last terms: 9 * -2 = -18
-
(x+6)(x-3):
- Multiply the first terms: x * x = x²
- Multiply the outer terms: x * -3 = -3x
- Multiply the inner terms: 6 * x = 6x
- Multiply the last terms: 6 * -3 = -18
Now, the expanded expression looks like this: x² - 2x + 9x - 18 + x² - 3x + 6x - 18
Simplifying the Expression
The next step is to combine like terms:
- Combine the x² terms: x² + x² = 2x²
- Combine the x terms: -2x + 9x - 3x + 6x = 10x
- Combine the constant terms: -18 - 18 = -36
The simplified expression is: 2x² + 10x - 36
Final Result
Therefore, the expanded and simplified form of the expression (x+9)(x-2)+(x+6)(x-3) is 2x² + 10x - 36.