Distributive Property - Pre-Algebra

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Question

Expand:

Answer

Distribute the by multiplying it by each term inside the parentheses.

$5\cdot 2=10$

and

$5\cdot y=5y$

Therefore, 5(2 + y) = 10 + 5y.

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Question

Which of the following is equivalent to ?

Answer

We need to distribute -3 by multiplying both terms inside the parentheses by -3.:

.

Now we can multiply and simplify. Remember that multiplying two negative numbers results in a positive number:

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Question

Expand:

Answer

$\small -4x(3x^2-7x+2)$

Use the distributive property. Do not forget that the negative sign needs to be distributed as well!

$\small \small (-4x)(3x^2)=-12x^3$

$\small (-4x)(-7x)=28x^2$

$\small (-4x)(2)=-8x$

Add the terms together:

$\small -12x^3+28x^2+(-8x)=-12x^3+28x^2-8x$

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Question

Distribute:

Answer

Remember that a negative multiplied by a negative is positive, and a negative multiplied by a positive is negative.

Distribute the through the parentheses by multiplying it by each of the two terms:

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Question

Simplify the expression.

Answer

Multiply the mononomial by each term in the binomial, using the distributive property.

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Question

Simplify the expression.

Answer

Use the distributive property to multiply each term by $\small 2x$ .

Simplify.

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Question

Distribute:

Answer

When distributing with negative numbers we must remember to distribute the negative to all of the terms in the parentheses.

Remember, a negative multiplied by a negative is positive, and a negative multiplied by a positive number is negative.

Distribute the through the parentheses:

Perform the multiplication, remembering the positive/negative rules:

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Question

Find the value of .

Answer

We can seperate the problem into two steps:

We then combine the two parts:

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Question

Distribute .

Answer

When distributing with negative numbers we must remember to distribute the negative to all of the variables in the parentheses.

Distribute the through the parentheses by multiplying it with each object in the parentheses to get .

Perform the multiplication remembering the positive/negative rules to get , our answer.

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Question

Simplify the expression.

Answer

Use the distributive property to multiply each term of the polynomial by $\small -2$ . Be careful to distribute the negative as well.

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Question

Simplify the expression:

Answer

To solve this question you must use the distrubitive property by multiplying x by -2 and the 2 by -2, making sure to distribute the negative as well. This gives you:

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Question

Simplify the expression:

$\small x^2y(3+2x+xy)$

Answer

Recall the distributive property: $\small a(b+c+d) = (ab)+(ac)+(ad)$

Therefore, we must multiply everything inside the parentheses by $\small x^2y$ .

$\small (3x^2y)+(2xx^2y)+(xyx^2y)$

To simplify further, recall that multiplying like bases mean you add their exponents.

$\small \small 3x^2y+2x^{1+2}y+x^{1+2}y^{1+1}$

$\small 3x^2y+2x^3y+x^3y^2$

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Question

Which answer correctly simplifies this expression?

Answer

To simplify this expression, use the distributive property. This means that we have to multiply the 2 times both terms inside the parentheses. , and . So, our answer is .

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Question

Simplify the following expression:

Answer

Apply the distributive property of multiplication to remove the parenthesis from the given expression. Multiply the term outside of the parenthesis to each of the terms inside the parenthesis.

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Question

Which of the answers correctly shows the following equation distributed correctly?

Answer

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Question

Simplify the following expression using the distributive property.

Answer

Distributive property is used to multiply a single term by two or more terms inside a set of parenthesis. Multiply the outside term (5) by 7 first.

$5\times7x=35x$

Then multiply the outside term (5) by 9.

$5\times9=45$

Combine the two remaining terms by keeping the sign that was originally inside the parenthesis.

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Question

Solve the equation using the distributive property.

Answer

First, we must use the distributive property on both sides of the equation.

The distributive property states:

Therefore:

Now, we can solve the expression like a two-step equation with variables on both sides. Do not forget the properties of equality and perform the same operations on both sides.

Subtract from both sides.

${\color{Red} -2q }$ ${\color{Red} -2q}$

Simplify.

Now, the problem is a one-step equation.

Add to both sides.

${\color{Red} + 15}$ ${\color{Red} + 15}$

Solve.

Check the answer by substituting it back into the original equation. Both sides should equal to each other.

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Question

Simplify:

Answer

Use the distributive property to simplify the expression.

This means multiply the with each term within the parentheses.

$\2x(3+4x+3xy) \$

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Question

Use the distributive property to evaluate:

Answer

Distribute throughout every term in the parentheses.

Simplify the terms.

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Question

Name the property used to solve the problem.

Answer

Multiplying each term on the outside of the parenthesis by each term on the inside refers to the distributive property.

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