All Algebra 1 Resources
Example Questions
Example Question #82 : Variables
Divide the polynomials and .
Write an expression to divide the polynomials.
Both polynomials can be factorized.
The numerator will be simplified to .
The denominator cannot be factorized as is. Pull a common factor of two in the denominator.
The term can be factorized to .
We can now rewrite the fraction.
The common terms in the numerator and denominator can be cancelled.
Distribute the two in the denominator through both terms in the binomial.
The answer is:
Example Question #1 : How To Multiply Polynomials
Expand:
Distribute through every term in the parentheses.
This gives us the following:
Example Question #1 : How To Multiply Polynomials
Multiply:
First multiply each of the terms inside the second parentheses by :
Next multiply each of the terms inside the second parentheses by :
Finally multiply each of the terms inside the second parentheses by 5:
By combining all like terms we get the correct answer:
Example Question #91 : Variables
Expand:
The first step is to distribute the first term in the binomial across the trinomial:
Then multiply the second term in the binomial across the same trinomial:
You can then combine like terms to reach a simplified answer:
Example Question #91 : Polynomials
Multiply the expression:
When we FOIL this expression, we start by multiplying the first term of the first binomial with the first term of the second binomial. Then we multiply the two "outside" terms (in this case those are and 4). Next we multiply the "inside" terms (in this case the two inside terms are and ) and finally the last terms.
When we combine terms in this way, it is important to make sure we are paying attention to the exponents! We want to add the exponents when we multiply terms. So, when multiplying , we want to add the 2 with 1 (the exponent of an un-powered variable is always 1!) and we get 3! So we know the resulting power would be 3, like this:
Using that skill and the FOIL technique, we end up with the answer,
Example Question #5 : How To Multiply Polynomials
Expand:
When we FOIL this expression, we start by multiplying the first term of the first binomial with the first term of the second binomial. Then we multiply the two "outside" terms (in this case those are the and ). Next we multiply the "inside" terms (in this case the two inside terms are and ) and finally the last terms.
When we combine terms in this way, it is important to make sure we are paying attention to the exponents! When we multiply like terms with exponents, we can add the exponents together! In this case, we have an (which since it has no power, means it is to the power of 1) and an . We can add these exponents together when we go through our FOIL process and get . So we know the resulting power would be , like this:
Using that skill and the FOIL technique, we end up with the answer:
Example Question #1 : Simplifying Polynomials
Multiply:
Example Question #1 : Simplifying Polynomials
Simplify the expression.
Use FOIL to expand the monomials.
Return this expansion to the original expression.
Distribute negative sign.
Combine like terms.
Example Question #4321 : Algebra 1
Simplify the expression.
The expression cannot be simplified further.
When multiplying exponential components, you must add the powers of each term together.
Example Question #4322 : Algebra 1
None of the other answers are correct.
When multiplying polynomials, add the powers of each like-termed variable together.
For x: 5 + 2 = 7
For y: 17 + 2 = 19
Therefore the answer is .
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