No. Even if the answer is zero, zero is still a polynomial.
it means you're multiplying them.
The result is their product.
It means finding numbers (constant terms), or polynomials of the same or smaller order that multiply together to give the original polynomial.
You simply need to multiply EACH term in one polynomial by EACH term in the other polynomial, and add everything together.
You multiply each term of one binomial by each term of the other binomial. In fact, this works for multiplying any polynomials: multiply each term of one polynomial by each term of the other one. Then add all the terms together.
Add together the coefficients of "like" terms. Like terms are those that have the same powers of the variables in the polynomials.
No. Even if the answer is zero, zero is still a polynomial.
When multiplying 2 fractions, we multiply the two numerators together and the two denominators together.
Multiplying two odds together gives an odd result Otherwise multiplying one even and one odd, or two even numbers together gives an even result.
By multiplying them together.
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When you add polynomials, you combine only like terms together. For example, (x^3+x^2)+(2x^2+x)= x^3+(1+2)x^2+x=x^3+3x^2+x When you multiply polynomials, you multiply all pairs of terms together. (x^2+x)(x^3+x)=(x^2)(x^3)+(x^2)(x)+(x)(x^3)+(x)(x)=x^5+x^3+x^4+x^2 Basically, in addition you look at like terms to simplify. In multiplication, you multiply each term individually with every term on the opposite side, ignoring like terms.
The FOIL method is used to multiply together two polynomials, each consisting of two terms. In general the polynomials could be of any degree and each could contain a number of variables. However, FOIL is generally used for two monomials in one variable; that is (ax + b) and (cx + d) To multiply these two monomials together - F = Multiply together the FIRST term of each bracket: ax * cx = acx2 O = Multiply the OUTER terms in the way the brackets are written out= ax * d = adx I = Multiply the INNER terms = b * cx = bcx L = Multiply the LAST terms of each bracket = b * d = bd Add together: acx2 + adx + bcx + bd Lastly, combine the middle two terms which are "like" terms to give acx2 + (ad + bc)*x + bd
By multiplying them together.
it means you're multiplying them.
The result is their product.