Answer :
The remainder will be constant if the divisor of a polynomial is a factor.
Given,
Polynomial division;
Divide the first term of the dividend by the first term of the divisor to divide polynomials using long division. The quotient's initial term is this. Dividend is calculated by multiplying the new term by the divisor. The new dividend is this difference.
We have to find the remainder if the divisor of a polynomial is a factor;
Here,
You know, from long division of regular numbers, that your residue (if there is one) has to be smaller than whatever you divided by. Since we're dividing by a linear factor (i.e., a factor whose degree on x is just an understandable "1"), the remainder in polynomial terms must be a constant value.
That is,
If a polynomial's divisor is a factor, the residual will always be a fixed number.
Learn more about polynomial division here;
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