1 Answer

Gowtham R · Answer 1 · 2018-05-08T08:35:42+0000

Answer:

The polynomial is
x^3+2x-3 .

Explanation:

The quotient stands for division, so when we are told that the quotient of
x^5-3x^3-3x^2-10x+15 and a polynomial, we have to think of a division which result is
x^2-5 . The goal of this exercise is to find the value of such polynomial that is divisor.

Solving for the divisor

We can write the quotient in a general way using proper naming as follows:

$\cfrac{\text{dividend}}{\text{divisor}}=\text{result}$

Solving for the divisor we have

$\text{dividend}=\text{divisor} *\text{result}\\\cfrac{\text{dividend}}{\text{result}}=\text{divisor}$

So the goal is to work with that division to find the polynomial, that is

$\cfrac{x^5-3x^3-3x^2-10x+15}{x^2-5}$

Long division

In order to set up for long division, we have to realize that the dividend or numerator has not the
x^4 term, so we can fill it with
0x^4

So we will have

x^5+0x^4-3x^3-3x^2-10x+15

Please check the attached image file to see the steps for the long division that will be explained here in text.

The first step is to divide always the first term of the dividend that is the
x^5 by the first term of the polynomial we are dividing by, that is
x^2 , so we get