You divide each term of the binomial by the monomial, and add everything up. This also works for the division of any polynomial by a monomial.
If the quotient of a certain binomial and 20x2 is is the polynomial
You use long division of polynomials.
Monomial.
Monomial. Monomial. Monomial. Monomial.
Binomial. Binomial. Binomial. Binomial.
If the quotient of a certain binomial and 20x2 is is the polynomial
You use long division of polynomials.
Monomial.
Monomial. Monomial. Monomial. Monomial.
its a monomial.....
Monomial.
Monomial.
Binomial. Binomial. Binomial. Binomial.
No, it is a monomial.
It is a polynomial (monomial). It is a polynomial (monomial). It is a polynomial (monomial). It is a polynomial (monomial).
To find the product of a monomial by a binomial, you can use the distributive property. Multiply the monomial by each term in the binomial separately. For example, if you have a monomial (a) and a binomial (b + c), you would calculate (a \cdot b + a \cdot c). This method ensures that each term in the binomial is accounted for in the final expression.
No, that is a binomial. if it were just 9kp it would be a monomial.