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What kind of polynomials are there?
Trinomials, Binomials and Monomials
Division of Monomials and Polynomials by Monomials?
to multiplya polynomial by a monomial,use the distributive property and then combine like terms.
Do you always use the property of distribution when multiplying monomials and polynomials?
Yes.
What is the formula of monomials?
monomials are just polynomials with one term, i.e. 2xy2, n3, etc. A binomial has two terms, i.e. 3xy2+2, etc.
What is the common multiply of the monomials 13 and 49?
637
What kind of polynomials are there?
Trinomials, Binomials and Monomials
Division of Monomials and Polynomials by Monomials?
to multiplya polynomial by a monomial,use the distributive property and then combine like terms.
What does polynomials mean in mathematical terms?
It means the sum of several monomials.
Do you always use the property of distribution when multiplying monomials and polynomials?
Yes.
What career uses dividing monomials?
This is a tough question. There aren't many jobs that use monomials and polynomials daily but if you want to have a career as a math teacher you have to know this.
What is the formula of monomials?
monomials are just polynomials with one term, i.e. 2xy2, n3, etc. A binomial has two terms, i.e. 3xy2+2, etc.
What is the process to solve multiplying polynomials?
what is the prosses to multiply polynomials
Do you always use the property of distribution when multiplying monomials and polynomials Explain why or why not In what situations would distribution become important?
The answer to your question is a yes. The Distributive property is a property, which is used to multiply a term and two or more terms inside the parentheses.
Monomials Binomials Trinomials and then what comes next?
I think it's just polynomials after that. I don't think there's a quadranomial or anything.
What is the common multiply of the monomials 13 and 49?
637
Explain the FOIL method of multiplying polynomials?
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
How do you multiply three or more polynomials?
To multiply TWO polynomials, you multiply each term in the first, by each term in the second. This can be justified by a repeated application of the distributive law. Two multiply more than two polynomials, you multiply the first two. Then you multiply the result with the third polynomial. If there are any more, multiply the result with the fourth polynomial, etc. Actually the polynomials can be multiplied in any order; both the communitative and associate laws apply.
