Algebra: A Combined Approach (4th Edition)

Published by Pearson
ISBN 10: 0321726391
ISBN 13: 978-0-32172-639-1

Chapter 5 - Section 5.7 - Dividing Polynomials - Exercise Set - Page 396: 2

Answer

Given $\frac{(15x^{2} - 9x^{5})}{x}$ the answer, simplified, is $15x - 9x^{4}$

Work Step by Step

Given $\frac{(15x^{2} - 9x^{5})}{x}$ the answer, simplified, is $15x - 9x^{4}$ • We can separate the polynomial (top) by its terms to divide it by the monomial (bottom). So, if we separate the polynomial (the quotient, which is also the numerator of the equation), it looks like this: Term #1: $15x^{2}$ Term #2: $- 9x^{5}$ Adding its divisor, our equation would then look like this: $\frac{15x^{2}}{x}$ $-$$\frac{9x^{5}}{x}$ • Now we need to simplify each fraction, consisting of the one term of the polynomial and the monomial. And we can further simplify each term into its coefficients and exponents to make it a little easier. So, our equation will then look like this: $(\frac{15}{1})$$(\frac{x^{2}}{x})$ $-$ $(\frac{9}{1})$$(\frac{x^{5}}{x})$ • Now, let's take the 1st term that we have set up, and divide the coefficients and the exponents. (Remember that when we divide exponents, we are really just subtracting the denominator's exponent from the numerator's exponent.) For $(\frac{15}{1})$$(\frac{x^{2}}{x})$, $(\frac{15}{1})$ $=15$ and $(\frac{x^{2}}{x})$ is $x^{2-1}$ $= x$ which, combined, can be simplified to $15x$ • Now, let's take the 2nd term that we have set up, and divide the coefficients and the exponents. (Remember that when we divide exponents, we are really just subtracting the denominator's exponent from the numerator's exponent.) For $-$$(\frac{9}{1})$$(\frac{x^{5}}{x})$, $-$$(\frac{9}{1})$ $=-9$ and $(\frac{x^{5}}{x})$ is $x^{5-1}$ $= x^{4}$ which, combined, can be simplified to $-9x^{4}$ • Now that we have simplified each polynomial's terms when each is divided by the monomial, our equation of $(\frac{15}{1})$$(\frac{x^{2}}{x})$ $-$ $(\frac{9}{1})$$(\frac{x^{5}}{x})$ is simplified to the final answer of: $15x - 9x^{4}$
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