multiply the polynomials using the distributive property and combine like terms (-2x-2) (9x+1)
To multiply the polynomials using the distributive property, you will need to distribute each term of the first polynomial to each term of the second polynomial.
Let's start with the -2x term from the first polynomial:
-2x * (9x + 1) = -18x^2 - 2x
Now, let's move on to the -2 term from the first polynomial:
-2 * (9x + 1) = -18x - 2
Now, let's combine the two results we got:
(-18x^2 - 2x) + (-18x - 2) = -18x^2 - 20x - 2
Therefore, the result of multiplying the polynomials (-2x - 2) and (9x + 1) using the distributive property and combining like terms is -18x^2 - 20x - 2.