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Algebra 1 : Distributive Property

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Example Questions

Example Question #81 : Distributive Property

Simplify the following expression: (5x-4)(4x-5) .

Possible Answers:

$20x^{2}-41x-20$

$-20x^{2}-41x+20$

$20x^{2}+41x+20$

$20x^{2}+41x-20$

$20x^{2}-41x+20$

Correct answer:

$20x^{2}-41x+20$

Explanation:

In order to simplify the above expression, we can use the FOIL Method (First, Outer, Inner, Last) to multiply the elements of the expression and add the results. Given (5x-4)(4x-5) , then:

First: $5x\times4x=20x^{2}$

Outer: $5x\times-5=-25x$

Inner: $-4\times4x=-16x$

Last: $-4\times-5=20$

Thus, by FOIL:

$20x^{2}+(-25x)+(-16x)+20$

$=20x^{2}-41x+20$

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Example Question #82 : Distributive Property

Simplify the following expression: $(x^{2}+x)(7+x)$ .

Possible Answers:

$x^{3}-8x^{2}+7x$

$x^{3}+8x^{2}+7x$

$x^{3}-8x^{2}-7x$

$-x^{3}+8x^{2}+7x$

$x^{3}+8x^{2}-7x$

Correct answer:

$x^{3}+8x^{2}+7x$

Explanation:

In order to simplify the above expression, we can use the FOIL Method (First, Outer, Inner, Last) to multiply the elements of the expression and add the results. Given $(x^{2}+x)(7+x)$ , then:

First: $x^{2}\times7=7x^{2}$

Outer: $x^{2}\times x=x^{3}$

Inner: $x\times7=7x$

Last: $x\times x=x^{2}$

Thus, by FOIL:

$7x^{2}+x^{3}+7x+x^{2}$

$=x^{3}+8x^{2}+7x$

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Example Question #83 : Distributive Property

Simplify the following expression: (1-3x)(4x+x) .

Possible Answers:

None of the above

5x(1-3x)

5x(1+3x)

-5x(1+3x)

-5x(1-3x)

Correct answer:

5x(1-3x)

Explanation:

In order to simplify the above expression, we can use the FOIL Method (First, Outer, Inner, Last) to multiply the elements of the expression and add the results. Given (1-3x)(4x+x) , then:

First: $1\times4x=4x$

Outer: $1\times x=x$

Inner: $-3x\times4x=-12x^{2}$

Last: $-3x\times x=-3x^{2}$

Thus, by FOIL:

$4x+x+(-12x^{2})+(-3x^{2})$

$=-15x^{2}+5x$

=5x(1-3x)

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Example Question #4895 : Algebra 1

Expand

(3x-7y)(-4x+2y)

Possible Answers:

-12x^2-22xy-14y^2

-12x^2+34xy-14y^2

-12x^2+22xy-14y^2 2

-12x^2-34xy-14y^2

-12x^2-14y^2

Correct answer:

-12x^2+34xy-14y^2

Explanation:

To expand this set of binomials we need to FOIL the terms. FOIL is the multiplication steps that need to be applied to a set of binomials.

(3x-7y)(-4x+2y)

First: $3x\cdot-4x=-12x^2$

Outer: $3x\cdot2y=6xy$

Inner: $-7y\cdot-4x=28xy$

Last: $-7y\cdot2y=-14y^2$

$Sum $=-12x^2+6xy+28xy-14y^2

Solution:

-12x^2+34xy-14y^2

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Example Question #4896 : Algebra 1

Simplify: (2-3x)(2x+2)

Possible Answers:

-6x^2-4

-3x+4

-6x^2+2x+4

-6x^2+4

-6x^2-2x+4

Correct answer:

-6x^2-2x+4

Explanation:

Use the FOIL method to simplify this expression.

(2-3x)(2x+2)= (2)(2x)+ (2)(2) + (-3x)(2x)+(-3x)(2)

=4x+4-6x^2-6x = -6x^2-2x+4

The answer is: -6x^2-2x+4

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Example Question #86 : Distributive Property

Simplify the following expression: (2x-5)(5x+2) .

Possible Answers:

$10x^{2}-21x-10$

$10x^{2}+21x-10$

$-10x^{2}+21x+10$

$-10x^{2}-21x-10$

$10x^{2}-21x+10$

Correct answer:

$10x^{2}-21x-10$

Explanation:

In order to simplify the above expression, we can use the FOIL Method (First, Outer, Inner, Last) to multiply the elements of the expression and add the results. Given (2x-5)(5x+2) , then:

First: $2x\times\5x=10x^{2}$

Outer: $2x\times2=4x$

Inner: $-5\times5x=-25x$

Last: $-5\times2=-10$

Thus, by FOIL:

(2x-5)(5x+2)

$=10x^{2}+4x-25x-10$

$=10x^{2}-21x-10$

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Example Question #4901 : Algebra 1

Simplify the following expression: $(7+3x)(4x^{3}+5)$ .

Possible Answers:

$12x^{4}+28x^{3}-15x+35$

$-12x^{4}+28x^{3}+15x+35$

$12x^{4}+28x^{3}+15x+35$

$12x^{4}+28x^{3}+15x-35$

$12x^{4}-28x^{3}+15x+35$

Correct answer:

$12x^{4}+28x^{3}+15x+35$

Explanation:

In order to simplify the above expression, we can use the FOIL Method (First, Outer, Inner, Last) to multiply the elements of the expression and add the results. Given $(7+3x)(4x^{3}+5)$ , then:

First: $7\times4x^{3}=28x^{3}$

Outer: $7\times5=35$

Inner: $3x\times4x^{3}=12x^{4}$

Last: $3x\times5=15x$

Thus, by FOIL:

$(7+3x)(4x^{3}+5)$

$=12x^{4}+28x^{3}+15x+35$

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Example Question #4902 : Algebra 1

Simplify the following expression: (-x-1)(1+x) .

Possible Answers:

$-x^{2}-2x-1$

$x^{2}-2x-1$

$x^{2}-2x+1$

$x^{2}+2x-1$

$-x^{2}+2x+1$

Correct answer:

$-x^{2}-2x-1$

Explanation:

In order to simplify the above expression, we can use the FOIL Method (First, Outer, Inner, Last) to multiply the elements of the expression and add the results. Given (-x-1)(1+x) , then:

First: $-x\times\1=-x$

Outer: $-x\times x=-x^{2}$

Inner: $-1\times1=-1$

Last: $-1\times x=-x$

Thus, by FOIL:

(-x-1)(1+x)

$=-x+(-x^{2})+(-1)+(-x)$

$=-x^{2}-2x-1$

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Example Question #4903 : Algebra 1

2x(x+1)(x-1)

Multiply. Select the answer that is equivalent to this expression.

Possible Answers:

2x^2 -2x

2x^3 - 2x^2

4x^4 - 4x^2

2x^3 - 2x

2x^2 + 3x - 1

Correct answer:

2x^3 - 2x

Explanation:

2x(x+1)(x-1)

2x, (x+1), and (x-1) are separate factors being multiplied, so it doesn't matter what order you multiply them together. I choose to multiply (x+1) and (x-1) first.

= 2x(x^2 + x - x - 1)

= 2x(x^2-1)

= 2x^3 - 2x

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Example Question #4904 : Algebra 1

(x+1)(x^2 + 2x -1)

Multiply. Select the answer that is equivalent to this expression.

Possible Answers:

x^3 + 3x^2 + 3x -1

x^2 + 6x - 1

x^3 + 3x^2 - x -1

x^3 + 3x^2 + 3x +1

x^3 + 3x^2 + x - 1

Correct answer:

x^3 + 3x^2 + x - 1

Explanation:

(x+1)(x^2 + 2x - 1)

Following the pattern of FOIL, we muliply each element of each polynomial with each other and add them together:

= x^3 + 2x^2 - x + x^2 + 2x -1

= x^3 + 3x^2 + x - 1

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Algebra 1 : Distributive Property

Study concepts, example questions & explanations for Algebra 1

All Algebra 1 Resources

Example Questions

Example Question #81 : Distributive Property

Example Question #82 : Distributive Property

Example Question #83 : Distributive Property

Example Question #4895 : Algebra 1

Example Question #4896 : Algebra 1

Example Question #86 : Distributive Property

Example Question #4901 : Algebra 1

Example Question #4902 : Algebra 1

Example Question #4903 : Algebra 1

Example Question #4904 : Algebra 1

All Algebra 1 Resources

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