Question

Whole numbers are closed under addition

because the sum of two whole numbers is always
a whole number. Explain how the process of
checking polynomial division supports the fact that
polynomials are closed under multiplication and
addition,

Answer 1

When checking polynomial division, you multiply the quotient by the divisor.

The quotient will be a polynomial (with or without a remainder). Multiplying this polynomial by the polynomial divisor, we get a polynomial in which the exponents and coefficients have changed. Thus polynomials are closed under multiplication.

There will usually be at least two terms in the divisor. When we multiply the quotient by this, we will use the distributive property, multiplying the entire quotient by each term of the divisor. When this process is finished, we will need to add the polynomials we had from multiplying together. Doing this, we get a polynomial answer in which the coefficients have changed. Thus polynomials are closed under addition.

Answer 2

There will usually be at least two terms in the divisor. When we multiply the quotient by this, we will use the distributive property, multiplying the entire quotient by each term of the divisor. When this process is finished, we will need to add the polynomials we had from multiplying them together. Doing this, we get a polynomial answer in which the coefficients have changed. Thus polynomials are closed under addition.

Explanation:

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