All Algebra 1 Resources
Example Questions
Example Question #4613 : Algebra 1
Factor the polynomial.
This polynomial is formed by multiplying two factors that look something like this:
In order to successfully factor a polynomial, find the factors of 12 that add up to 7.
They are 3 and 4.
That gives you the answer .
Example Question #381 : Variables
Factor the polynomial.
This polynomial is formed by multiplying two factors that look something like this:
In order to successfully factor a polynomial, find the factors of 6 and factors of 3 that, when combined, add up to -11.
They are 3 and 2 and -1 and -3.
That gives you the answer .
Example Question #61 : Factoring Polynomials
Factor the following polynomial
Factoring a polynomial is the reverse of distributing. What common factor exists for both and ? We know that
and
So we can factor out from the expression and get
Don't forget the negative sign!
Example Question #381 : Variables
Factor
First, since there are no subtractive operations in the original expression, start by noting that all signs within the factors will be positive (i.e. (x + x)(x + x)).
Then, look at the highest degree variables.
We have .
The only possible ways to factor that are
and .
Then look at .
The only way to fact that is , so we know that 2x and x will appear in our final answer.
Write down .
Then, try inserting the possibilities we came up with for creating into the blank spaces.
By trying the various permutations you should come up with the answer.
Example Question #382 : Variables
Solve for :
The goal is to get x by itself on one side.
Start by getting all terms with x in them on the left side of the equation.
Add to each side to get
.
Then, factor x out of the left side of the equation to get
.
Divide each side of the equation by to solve for x and get the answer to the problem.
Example Question #383 : Variables
Solve for :
Remember to read the question carefully.
It asks you to solve for h, not x.
So you can eliminate two answers right away.
Then, look to see if you can factor anything.
Factor x out of the right side of the equation to get
.
Divide both sides of the equation by x to get
.
Then, subtract from each side and divide by to get the answer!
Example Question #384 : Variables
Factor
.
Start with the highest exponent. In two factors, can only be made by multplying and . Because everything in the original expression is positive, you know that all the factors in the answer also have to be positive.
Write down what you know if the form
.
Now, look at the term with the lowest exponent, 4. You can only make this with positive number by squaring 2 or multiplying 4 by 1. Then notice that the term is multiplied by 4 and not 2. This means that 4 must be factored into 1 and 4 in our answer. Ths also means that the 4 must be in the factor with , because if it was in the factor with they would never be multiplied together to create .
Try inserting 1 and 4 into the blank spaces of our previous expression. Foil the expression you created to check your answer.
Example Question #381 : Variables
Factor .
Cannot be factored
This may look complicated at first, but it's just a special case of a polynomial called a 'difference of squares.' That means that there are two terms, one is negative, and they are both perfect squares. In this case, the negative is -16. The was to factor this type of polynomial is to follow this formula:
(square root of the positive perfect square + square root of the negative perfect square) x (square root of the positive perfect square - square root of the negative perfect square).
This gives the answer for this problem.
Remember, you can always check your work by foiling the factored expression out to make sure it matches the original polynomial.
Example Question #4621 : Algebra 1
Solve for :
First isolate all terms with x to one side and keep all other terms on the other side.
To this end, multiple both sides of the equation by c.
This gives
.
Then factor x out of the right side of the equation to get
.
Finally, divide both sides of the equation by to get the answer.
Example Question #4622 : Algebra 1
Factor the polynomial:
The common factor in this problem is only , because each number in this term share the same factor.
By pulling this term out of the expression, we need to find , , and that would match the terms of the problem.
Determine . Divide by on both sides.
Determine .
Determine .
Resubstitute the variables.
This means that .
The answer is: