Polynomials - High School Math

Card 0 of 20

Question

Find the zeros.

$f(x)=x^{3}-1$

Answer

This is a difference of perfect cubes so it factors to . Only the first expression will yield an answer when set equal to 0, which is 1. The second expression will never cross the -axis. Therefore, your answer is only 1.

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Question

Find the zeros.

Answer

Factor the equation to . Set and get one of your 's to be . Then factor the second expression to . Set them equal to zero and you get $\pm \sqrt{2}$ .

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Question

Factor $x^{3}-64$

Answer

Use the difference of perfect cubes equation:

In $x^{3}-64$ ,

and $b=\sqrt[3]{64}=4$

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Question

Factor the polynomial completely and solve for .

Answer

To factor and solve for in the equation

Factor out of the equation

$\rightarrow 8x(4x^2-1)$

Use the "difference of squares" technique to factor the parenthetical term, which provides the completely factored equation:

$\rightarrow 8x(2x+1)(2x-1)$

Any value that causes any one of the three terms , , and to be will be a solution to the equation, therefore

$x = \left {-\frac{1}{2}, 0, \frac{1}{2} \right }$

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Question

Factor the following expression:

Answer

You can see that each term in the equation has an "x", therefore by factoring "x" from each term you can get that the equation equals .

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Question

Factor this expression:

Answer

First consider all the factors of 12:

1 and 12

2 and 6

3 and 4

Then consider which of these pairs adds up to 7. This pair is 3 and 4.

Therefore the answer is .

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Question

Factor the following polynomial:

Answer

Begin by extracting from the polynomial:

Now, factor the remainder of the polynomial as a difference of cubes:

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Question

Factor the following polynomial:

Answer

Begin by rearranging like terms:

Now, factor out like terms:

Rearrange the polynomial:

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Question

Factor the following polynomial:

Answer

Begin by rearranging like terms:

Now, factor out like terms:

Rearrange the polynomial:

Factor:

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Question

Factor the following polynomial:

Answer

Begin by separating into like terms. You do this by multiplying and , then finding factors which sum to

Now, extract like terms:

Simplify:

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Question

Factor the following polynomial:

Answer

To begin, distribute the squares:

Now, combine like terms:

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Question

Factor the following polynomial:

Answer

Begin by extracting from the polynomial:

Now, distribute the cubic polynomial:

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Question

Factor the following polynomial:

Answer

Begin by extracting like terms:

Now, rearrange the right side of the polynomial by reversing the signs:

Combine like terms:

Factor the square and cubic polynomial:

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Question

Factor the following polynomial:

Answer

Begin by rearranging the terms to group together the quadratic:

Now, convert the quadratic into a square:

Finally, distribute the :

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Question

Factor the following polynomial:

Answer

Begin by extracting from the polynomial:

Now, rearrange to combine like terms:

Extract the like terms and factor the cubic:

Simplify by combining like terms:

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Question

Factor the following polynomial:

Answer

Begin by extracting from the polynomial:

Now, rearrange to combine like terms:

Extract the like terms and factor the cubic:

Simplify by combining like terms:

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Question

Simplify.

$x^{-6}x^3x^9$

Answer

Put the negative exponent on the bottom so that you have $\frac{x^{12}}{x^{6}}$ which simplifies further to $x^{6}$ .

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Question

Simplify the following expression:

$3x^9y^4 \cdot (2y)^3$ .

Answer

First, multiply out the second expression so that you get .

Then, multiply your like terms, taking care to remember that when multiplying terms that have the same base, you add the exponents. Thus, you get $24x^9y^{12}$ .

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Question

Simplify:

$\frac{13x^2y^5z^9}{169xy^5z^4}$

Answer

Focus on each pair of like terms. The completely cancel out, there is one left on top, and five left on the bottom.

$\frac{13}{169}$ reduces to $\frac{1}{13}$ .

Put that all together to get $\frac{xz^5}{13}$ .

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Question

Expand this expression:

Answer

Use the FOIL method (First, Outer, Inner, Last):

Put all of these terms together:

Combine like terms:

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