 4.3.1: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.2: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.3: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.4: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.5: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.6: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.7: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.8: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.9: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.10: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.11: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.12: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.13: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.14: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.15: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.16: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.17: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.18: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.19: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.20: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.21: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.22: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.23: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.24: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.25: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.26: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.27: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.28: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.29: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.30: In Exercises 130, divide the polynomials using long division. Use e...
 4.3.31: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.32: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.33: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.34: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.35: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.36: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.37: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.38: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.39: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.40: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.41: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.42: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.43: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.44: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.45: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.46: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.47: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.48: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.49: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.50: In Exercises 3150, divide the polynomial by the linear factor with ...
 4.3.51: In Exercises 5160, divide the polynomials by either long division o...
 4.3.52: In Exercises 5160, divide the polynomials by either long division o...
 4.3.53: In Exercises 5160, divide the polynomials by either long division o...
 4.3.54: In Exercises 5160, divide the polynomials by either long division o...
 4.3.55: In Exercises 5160, divide the polynomials by either long division o...
 4.3.56: In Exercises 5160, divide the polynomials by either long division o...
 4.3.57: In Exercises 5160, divide the polynomials by either long division o...
 4.3.58: In Exercises 5160, divide the polynomials by either long division o...
 4.3.59: In Exercises 5160, divide the polynomials by either long division o...
 4.3.60: In Exercises 5160, divide the polynomials by either long division o...
 4.3.61: The area of a rectangle is 6x4 4x3 x2 2x 1 square feet. If the leng...
 4.3.62: The area of a rectangle is 6x4 4x3 x2 2x 1 square feet. If the leng...
 4.3.63: If a car travels a distance of x3 60x2 x 60 miles at an average spe...
 4.3.64: If a quarterback throws a ball x2 5x 50 yards in 5 x seconds, how f...
 4.3.65: In Exercises 6568, explain the mistake that is made.
 4.3.66: In Exercises 6568, explain the mistake that is made.
 4.3.67: In Exercises 6568, explain the mistake that is made.
 4.3.68: In Exercises 6568, explain the mistake that is made.
 4.3.69: A fifthdegree polynomial divided by a thirddegree polynomial will...
 4.3.70: A thirddegree polynomial divided by a linear polynomial will yield...
 4.3.71: Synthetic division can be used whenever the degree of the dividend ...
 4.3.72: When the remainder is zero, the divisor is a factor of the dividend.
 4.3.73: Is x b a factor of x3 (2b a)x2 (b2 2ab)x ab2 ? 74
 4.3.74: Is x b a factor of x4 (b2 a2 )x2 a2 b2 ?
 4.3.75: Divide x3n x2n xn 1 by xn 1. 76
 4.3.76: Divide x3n 5x2n 8xn 4 by xn 1.
 4.3.77: Plot . What type of function is it? Perform this division using lon...
 4.3.78: Plot . What type of function is it? Perform this division using syn...
 4.3.79: Plot . What type of function is it? Perform this division using syn...
 4.3.80: Plot . What type of function is it? Perform this division using lon...
 4.3.81: Plot . What type of function is it? Perform this division using lon...
 4.3.82: Plot . What type of function is it? Perform this division using lon...
Solutions for Chapter 4.3: Dividing Polynomials: Long Division and Synthetic Division
Full solutions for Algebra and Trigonometry,  3rd Edition
ISBN: 9780840068132
Solutions for Chapter 4.3: Dividing Polynomials: Long Division and Synthetic Division
Get Full SolutionsAlgebra and Trigonometry, was written by and is associated to the ISBN: 9780840068132. This expansive textbook survival guide covers the following chapters and their solutions. Chapter 4.3: Dividing Polynomials: Long Division and Synthetic Division includes 82 full stepbystep solutions. This textbook survival guide was created for the textbook: Algebra and Trigonometry,, edition: 3. Since 82 problems in chapter 4.3: Dividing Polynomials: Long Division and Synthetic Division have been answered, more than 44977 students have viewed full stepbystep solutions from this chapter.

Bounded below
A function is bounded below if there is a number b such that b ? ƒ(x) for all x in the domain of f.

Bounded interval
An interval that has finite length (does not extend to ? or ?)

Cone
See Right circular cone.

Continuous at x = a
lim x:a x a ƒ(x) = ƒ(a)

Cosecant
The function y = csc x

Distributive property
a(b + c) = ab + ac and related properties

Fitting a line or curve to data
Finding a line or curve that comes close to passing through all the points in a scatter plot.

Function
A relation that associates each value in the domain with exactly one value in the range.

Measure of center
A measure of the typical, middle, or average value for a data set

Onetoone function
A function in which each element of the range corresponds to exactly one element in the domain

Onetoone rule of exponents
x = y if and only if bx = by.

Period
See Periodic function.

Positive numbers
Real numbers shown to the right of the origin on a number line.

Quadratic function
A function that can be written in the form ƒ(x) = ax 2 + bx + c, where a, b, and c are real numbers, and a ? 0.

Rational zeros
Zeros of a function that are rational numbers.

Resolving a vector
Finding the horizontal and vertical components of a vector.

Right triangle
A triangle with a 90° angle.

Time plot
A line graph in which time is measured on the horizontal axis.

Translation
See Horizontal translation, Vertical translation.

Unbounded interval
An interval that extends to ? or ? (or both).