Multiplying a Trinomial By a Binomial
Multiplying a Trinomial by a Binomial
We have multiplied monomials by monomials, monomials by polynomials, and binomials by binomials. Now we’re ready to multiply a trinomial by a binomial. Remember, FOIL will not work in this case, but we can use either the Distributive Property or the Vertical Method. We first look at an example using the Distributive Property.
Example
Multiply using the Distributive Property: \(\left(b+3\right)\left(2{b}^{2}-5b+8\right).\)
Solution
| Distribute. | |
| Multiply. | |
| Combine like terms. |
Now let’s do this same multiplication using the Vertical Method.
Example
Multiply using the Vertical Method: \(\left(b+3\right)\left(2{b}^{2}-5b+8\right).\)
Solution
It is easier to put the polynomial with fewer terms on the bottom because we get fewer partial products this way.
| Multiply (2b2 − 5b + 8) by 3. | |
| Multiply (2b2 − 5b + 8) by b. | |
| Add like terms. |
We have now seen two methods you can use to multiply a trinomial by a binomial. After you practice each method, you’ll probably find you prefer one way over the other. We list both methods are listed here, for easy reference.
Multiplying a Trinomial by a Binomial
To multiply a trinomial by a binomial, use the:
- Distributive Property
- Vertical Method
Optional Videos:
Access these online resources for additional instruction and practice with multiplying polynomials:
Multiplying Exponents 1
Multiplying Exponents 2
Multiplying Exponents 3
This lesson is part of:
Polynomials II