Math

QuestionMultiply the polynomials and combine like terms: (7x5)(x+2)(7x - 5)(x + 2).

Studdy Solution

STEP 1

Assumptions1. We are given two polynomials 7x57x -5 and x+x +. . We need to multiply these polynomials using the distributive property.
3. The distributive property states that a(b+c)=ab+aca(b + c) = ab + ac.
4. We need to combine like terms after multiplication.

STEP 2

First, apply the distributive property to multiply the first term of the first polynomial (7x7x) with each term in the second polynomial (xx and 22).
7x(x+2)=7xx+7x27x \cdot (x +2) =7x \cdot x +7x \cdot2

STEP 3

Perform the multiplication operations.
7xx+7x2=7x2+14x7x \cdot x +7x \cdot2 =7x^2 +14x

STEP 4

Next, apply the distributive property to multiply the second term of the first polynomial (-) with each term in the second polynomial (xx and 22).
(x+2)=x2- \cdot (x +2) = - \cdot x - \cdot2

STEP 5

Perform the multiplication operations.
5x52=5x10-5 \cdot x -5 \cdot2 = -5x -10

STEP 6

Combine the results from3 and5 to get the final result.
x2+14x5x10x^2 +14x -5x -10

STEP 7

Combine like terms to simplify the expression.
7x2+(14x5x)107x^2 + (14x -5x) -10

STEP 8

Perform the subtraction operation.
7x2+x107x^2 +x -10So, the result of multiplying the polynomials 7x57x -5 and x+2x +2 is 7x2+x107x^2 +x -10.

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