4th Edition

ISBN: 9781337516853

Author: Larson

Publisher: CENGAGE CO

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Question

Chapter 2.3, Problem 48E

To determine

To write : the function of the form f(x)=(x−k)⋅q(x)+r for the given value of k

Expert Solution & Answer

Answer to Problem 48E

10x3−22x2−3x+4=(10x2−20x−7)(x−(1/5))+(13/5)

Explanation of Solution

Given information : f(x)=10x3−22x2−3x+4, k=15

Concept Involved:

For long division of polynomials by divisors of the form x - k, there is a shortcut

called synthetic division. The pattern for synthetic division of a cubic polynomial is

summarized below. (The pattern for higher-degree polynomials is similar.)

Synthetic Division (for a Cubic Polynomial): To divide ax3 + bx2 + cx + d by x−k , use this pattern.

k| abcd↓ka↓↓↓_︷Coefficient of dividend ↗↗↗ a ︸Coefficient of quotient r←Remainder

In case when we have a polynomial with a missing term, insert placeholders with zero coefficients for missing powers of the variable.
Vertical pattern: Add terms in columns
Diagonal pattern: Multiply results by k.
This algorithm for synthetic division works only for divisors of the form x - k.
Remember that x+k =x−(−k).

The Division Algorithm : If f(x) and d(x) are polynomials such that d(x)≠0 , and the degree of d(x) isless than or equal to the degree of f(x) , then there exist unique polynomials q(x) and r(x) such that f (x)Dividend↑ = d(x)Divisor↑⋅q(x)Quotient↑ + r (x)Remainder↑ where r(x)=0 or the degree of r(x) is less than the degree of d(x) . If theremainder r(x) is zero, then d(x) divides evenly into f(x) .

Calculation:

Set up the synthetic division to divide f(x)=10x3−22x2−3x+4, k=1/5 .

If k=1/5 is zero, then x−k that is x−(1/5) will be the divisor. When you set this up using synthetic division write 1/5 for the divisor. Then write the coefficients of the dividend to the right, across the top. Include any 0's that were inserted in for missing terms. In this polynomial there is no missing zeros. Write the terms of the dividend and divisor in descending powers of the variable.

1/5| 10−22−34 _︷Coefficient of dividend

Bring down the leading coefficient to the bottom row.

1/5| 10−22−34↓_ 10

Multiply 1/5 by the value just written on the bottom row. Place this value right beneath the next coefficient in the dividend:

1/5↘| 10−22−34 2_ 10↗

Add the column created and write the sum in the bottom row:

1/5| 10−22−34 2↓_ 10 −20

Repeat until done. Multiply 1/5 by the value just written on the bottom row. Place this value right beneath the next coefficient in the dividend:

1/5↘| 10−22−34 2−4_ 10 −20↗

Add the column created and write the sum in the bottom row:

1/5| 10−22−34 2 −4↓_ 10 −20 −7

Repeat until done. Multiply 1/5 by the value just written on the bottom row. Place this value right beneath the next coefficient in the dividend

1/5↘| 10−22−34 2 −4−7/5_ 10 −20 −7↗

Add the column created and write the sum in the bottom row:

1/5| 10−22−3 4 2 −4−7/5↓_ 10 −20 −7 13/5

Write out the answer.The numbers in the last row make up your coefficients of the quotient as well as the remainder. The final value on the right is the remainder. Working right to left, the next number is your constant, the next is the coefficient for x , the next is the coefficient for x squared, and so on.

(10x3−22x2−3x+4)÷(x−(1/5))=10x2−20x−7+(13/5)x−(1/5)

By dividing the given polynomial 10x3−22x2−3x+4 by x−(1/5) using the synthetic division we get the quotient as 10x2−20x−7 and the remainder as 13/5 . We can write the function in the form:

10x3−22x2−3x+4=(10x2−20x−7)(x−(1/5))+(13/5)

Substituting 1/5 for k in the function to show that f(k)=r , in our problem k=1/5 and we got remainder r=13/5

f(1/5)=10(1/5)3−22(1/5)2−3(1/5)+4 = 10⋅1125−22⋅125−3⋅15+4 =10125+−2225+−35+41 =10125+−22⋅525⋅5+−3⋅255⋅25+4⋅1251⋅125 =(10−110−75+500)/125 =325÷25125÷25 =13/5

Chapter 2.3, Problem 47E

Chapter 2.3, Problem 49E

Chapter 2 Solutions

EBK PRECALCULUS W/LIMITS

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Prob. 64E Ch. 2.6 - Prob. 65E Ch. 2.6 - Prob. 66E Ch. 2.6 - Prob. 67E Ch. 2.6 - Prob. 68E Ch. 2.6 - Prob. 69E Ch. 2.6 - Prob. 70E Ch. 2.6 - Prob. 71E Ch. 2.6 - Prob. 72E Ch. 2.6 - Prob. 73E Ch. 2.6 - Prob. 74E Ch. 2.6 - Prob. 75E Ch. 2.6 - Prob. 76E Ch. 2.6 - Prob. 77E Ch. 2.6 - Prob. 78E Ch. 2.6 - Prob. 79E Ch. 2.6 - Prob. 80E Ch. 2.6 - Prob. 81E Ch. 2.6 - Prob. 82E Ch. 2.7 - Prob. 1E Ch. 2.7 - Prob. 2E Ch. 2.7 - Prob. 3E Ch. 2.7 - Prob. 4E Ch. 2.7 - Prob. 5E Ch. 2.7 - Prob. 6E Ch. 2.7 - Prob. 7E Ch. 2.7 - Prob. 8E Ch. 2.7 - Prob. 9E Ch. 2.7 - Prob. 10E Ch. 2.7 - Prob. 11E Ch. 2.7 - Prob. 12E Ch. 2.7 - Prob. 13E Ch. 2.7 - Prob. 14E Ch. 2.7 - Prob. 15E Ch. 2.7 - Prob. 16E Ch. 2.7 - Prob. 17E Ch. 2.7 - Prob. 18E Ch. 2.7 - Prob. 19E Ch. 2.7 - Prob. 20E Ch. 2.7 - Prob. 21E Ch. 2.7 - Prob. 22E Ch. 2.7 - Prob. 23E Ch. 2.7 - Prob. 24E Ch. 2.7 - Prob. 25E Ch. 2.7 - Prob. 26E Ch. 2.7 - Prob. 27E Ch. 2.7 - Prob. 28E Ch. 2.7 - Prob. 29E Ch. 2.7 - Prob. 30E Ch. 2.7 - Prob. 31E Ch. 2.7 - Prob. 32E Ch. 2.7 - Prob. 33E Ch. 2.7 - Prob. 34E Ch. 2.7 - Prob. 35E Ch. 2.7 - Prob. 36E Ch. 2.7 - Prob. 37E Ch. 2.7 - Prob. 38E Ch. 2.7 - Prob. 39E Ch. 2.7 - Prob. 40E Ch. 2.7 - Prob. 41E Ch. 2.7 - Prob. 42E Ch. 2.7 - Prob. 43E Ch. 2.7 - Prob. 44E Ch. 2.7 - Prob. 45E Ch. 2.7 - Prob. 46E Ch. 2.7 - Prob. 47E Ch. 2.7 - Prob. 48E Ch. 2.7 - Prob. 49E Ch. 2.7 - Prob. 50E Ch. 2.7 - Prob. 51E Ch. 2.7 - Prob. 52E Ch. 2.7 - Prob. 53E Ch. 2.7 - Prob. 54E Ch. 2.7 - Prob. 55E Ch. 2.7 - Prob. 56E Ch. 2.7 - Prob. 57E Ch. 2.7 - Prob. 58E Ch. 2.7 - Prob. 59E Ch. 2.7 - Prob. 60E Ch. 2.7 - Prob. 61E Ch. 2.7 - Prob. 62E Ch. 2.7 - Prob. 63E Ch. 2.7 - Prob. 64E Ch. 2.7 - Prob. 65E Ch. 2.7 - Prob. 66E Ch. 2.7 - Prob. 67E Ch. 2.7 - Prob. 68E Ch. 2.7 - Prob. 69E Ch. 2.7 - Prob. 70E Ch. 2.7 - Prob. 71E Ch. 2.7 - Prob. 72E Ch. 2.7 - Prob. 73E Ch. 2.7 - Prob. 74E Ch. 2.7 - Prob. 75E Ch. 2.7 - Prob. 76E Ch. 2.7 - Prob. 77E Ch. 2.7 - Prob. 78E Ch. 2.7 - Prob. 79E Ch. 2.7 - Prob. 80E Ch. 2.7 - Prob. 81E Ch. 2.7 - Prob. 82E Ch. 2.7 - Prob. 83E Ch. 2.7 - Prob. 84E Ch. 2.7 - Prob. 85E Ch. 2.7 - Prob. 86E Ch. 2.7 - Prob. 87E Ch. 2.7 - Prob. 88E Ch. 2.7 - Prob. 89E Ch. 2.7 - Prob. 90E Ch. 2 - Prob. 1RE Ch. 2 - Prob. 2RE Ch. 2 - Prob. 3RE Ch. 2 - Prob. 4RE Ch. 2 - Prob. 5RE Ch. 2 - Prob. 6RE Ch. 2 - Prob. 7RE Ch. 2 - Prob. 8RE Ch. 2 - Prob. 9RE Ch. 2 - Prob. 10RE Ch. 2 - Prob. 11RE Ch. 2 - Prob. 12RE Ch. 2 - Prob. 13RE Ch. 2 - Prob. 14RE Ch. 2 - Prob. 15RE Ch. 2 - Prob. 16RE Ch. 2 - Prob. 17RE Ch. 2 - Prob. 18RE Ch. 2 - Prob. 19RE Ch. 2 - Prob. 20RE Ch. 2 - Prob. 21RE Ch. 2 - Prob. 22RE Ch. 2 - Prob. 23RE Ch. 2 - Prob. 24RE Ch. 2 - Prob. 25RE Ch. 2 - Prob. 26RE Ch. 2 - Prob. 27RE Ch. 2 - Prob. 28RE Ch. 2 - Prob. 29RE Ch. 2 - Prob. 30RE Ch. 2 - Prob. 31RE Ch. 2 - Prob. 32RE Ch. 2 - Prob. 33RE Ch. 2 - Prob. 34RE Ch. 2 - Prob. 35RE Ch. 2 - Prob. 36RE Ch. 2 - Prob. 37RE Ch. 2 - Prob. 38RE Ch. 2 - Prob. 39RE Ch. 2 - Prob. 40RE Ch. 2 - Prob. 41RE Ch. 2 - Prob. 42RE Ch. 2 - Prob. 43RE Ch. 2 - Prob. 44RE Ch. 2 - Prob. 45RE Ch. 2 - Prob. 46RE Ch. 2 - Prob. 47RE Ch. 2 - Prob. 48RE Ch. 2 - Prob. 49RE Ch. 2 - Prob. 50RE Ch. 2 - Prob. 51RE Ch. 2 - Prob. 52RE Ch. 2 - Prob. 53RE Ch. 2 - Prob. 54RE Ch. 2 - Prob. 55RE Ch. 2 - Prob. 56RE Ch. 2 - Prob. 57RE Ch. 2 - Prob. 58RE Ch. 2 - Prob. 59RE Ch. 2 - Prob. 60RE Ch. 2 - Prob. 61RE Ch. 2 - Prob. 62RE Ch. 2 - Prob. 63RE Ch. 2 - Prob. 64RE Ch. 2 - Prob. 65RE Ch. 2 - Prob. 66RE Ch. 2 - Prob. 67RE Ch. 2 - Prob. 68RE Ch. 2 - Prob. 1CT Ch. 2 - Prob. 2CT Ch. 2 - Prob. 3CT Ch. 2 - Prob. 4CT Ch. 2 - Prob. 5CT Ch. 2 - Prob. 6CT Ch. 2 - Prob. 7CT Ch. 2 - Prob. 8CT Ch. 2 - Prob. 9CT Ch. 2 - Prob. 10CT Ch. 2 - Prob. 11CT Ch. 2 - Prob. 12CT Ch. 2 - Prob. 13CT Ch. 2 - Prob. 14CT Ch. 2 - Prob. 15CT Ch. 2 - Prob. 16CT Ch. 2 - Prob. 17CT Ch. 2 - Prob. 18CT Ch. 2 - Prob. 1PS Ch. 2 - Prob. 2PS Ch. 2 - Prob. 3PS Ch. 2 - Prob. 4PS Ch. 2 - Prob. 5PS Ch. 2 - Prob. 6PS Ch. 2 - Prob. 7PS Ch. 2 - Prob. 8PS Ch. 2 - Prob. 9PS Ch. 2 - Prob. 10PS Ch. 2 - Prob. 11PS Ch. 2 - Prob. 12PS Ch. 2 - Prob. 13PS

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the function of the form f ( x ) = ( x − k ) ⋅ q ( x ) + r for the given value of k

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To write : the function of the form f(x)=(x−k)⋅q(x)+r for the given value of k

Answer to Problem 48E

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Chapter 2 Solutions