Suppose you have a polynomial, p(x) = a0 + a1x + a2x^2 + a3x^3 + ... + anx^n
then (ax - b) is a factor of the polynomial if and only if p(b/a) = 0
yes a binomial is a polynomial
To determine which binomial is a factor of a given polynomial, you can apply the Factor Theorem. According to this theorem, if you substitute a value ( c ) into the polynomial and it equals zero, then ( (x - c) ) is a factor. Alternatively, you can perform polynomial long division or synthetic division with the given binomials to see if any of them divides the polynomial without a remainder. If you provide the specific polynomial and the binomials you're considering, I can assist further.
yes a binomial is a polynomial
factor
A binomial is a polynomial with exactly 2 terms.
yes a binomial is a polynomial
yes a binomial is a polynomial
yes a binomial is a polynomial
factor
A binomial is a polynomial with exactly 2 terms.
binomial
It is a binomial, which is also a polynomial.
A binomial is a polynomial with two terms.
It is a polynomial (monomial). It is a polynomial (monomial). It is a polynomial (monomial). It is a polynomial (monomial).
A binomial is a mathematical term for a polynomial with two terms.
Do the division, and see if there is a remainder.
The only difference is that a binomial has two terms and a polynomial has three or more terms.