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Chapter 3: Problem 80

Explain why all polynomial functions of odd degree must have at least one real zero.

Short Answer

Expert verified
All polynomial functions of odd degree must have at least one real zero because their end behaviour dictates they cross the x-axis at some point.

Step by step solution

01

Understand polynomial functions of odd degree

A polynomial function of odd degree is a function with the highest power of the variable (usually x) being odd. Examples are \(x^3\), \(x^5 + 3x\), \(2x^7 - 3x^6 + 5\) etc.
02

Recognize the end behaviour

The end behaviour of polynomial functions depends on the degree and the leading coefficient. If the degree is odd and leading coefficient positive, as x approaches positive or negative infinity, \(y\) will respectively approach positive or negative infinity. Similarly, if the degree is odd and leading coefficient negative, as x approaches positive or negative infinity, \(y\) will respectively approach negative or positive infinity.
03

Identify the zero

Because a polynomial of odd degree must end in opposite directions, it has to cross the x-axis at least once, meaning it must have at least one real zero.

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Real Zeros
In mathematics, a **real zero** of a polynomial function is the value of the variable that makes the entire polynomial equal to zero. Think of it as the "x" value where the function crosses or touches the x-axis on a graph. This is crucial because it represents a real-world solution or intersection point, which can often be physically meaningful.
  • Real zeros can be simple, meaning they cross the x-axis, or they can "bounce off," known as having a multiplicity greater than one.
  • For example, in the function \( f(x) = x^2 - 4 \), the real zeros are \( x = 2 \) and \( x = -2 \), both of which are simple zeros.
Recognizing these zeros is essential in understanding the behavior of polynomial functions, predicting movements and ensuring accurate mathematical modeling of various phenomena.
Odd Degree Polynomials
**Odd degree polynomials** are fascinating due to their structural properties. These are polynomial functions where the highest power of the variable is an odd number. For instance, functions like \( f(x) = x^3 \) or \( g(x) = 2x^5 - x^2 + 4 \) are odd degree polynomials.
  • When dealing with odd degree polynomials, keep in mind that they always have at least one real zero. This is mainly because they extend their arms in opposite directions towards infinity.
  • In simpler terms, if you were to graph such a polynomial, you would see it rise or fall infinitely in opposite quadrants. Thus, it is guaranteed to cross the x-axis somewhere, confirming the existence of at least one real zero.
This feature ensures that odd degree polynomials are always connected to the x-axis, creating an inevitable real intersection point with the zero of the polynomial.
End Behavior of Polynomials
The **end behavior of polynomials** describes how the function behaves as the variable approaches infinity or negative infinity. Understanding this concept is vital as it allows for the prediction of the graph's direction at its extremes.
  • With a polynomial of odd degree, the end behavior is characterized by the leading term (the term with the highest exponent).
  • If the leading coefficient is positive, as \( x \) approaches infinity, \( y \) goes to infinity, and as \( x \) approaches negative infinity, \( y \) goes to negative infinity. Conversely, if the leading coefficient is negative, the arrows switch directions.
This opposite behavior on either side of the graph implies that a crossing point exists, reinforcing why odd degree polynomials must possess at least one real zero. By understanding the end behaviors, one can more easily anticipate the overall shape and trajectory of the polynomial graph.

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Most popular questions from this chapter

Give a possible expression for a rational function \(r(x)\) of the following description: the graph of \(r\) is symmetric with respect to the \(y\) -axis; it has a horizontal asymptote \(y=0\) and a vertical asymptote \(x=0,\) with no \(x-\) or \(y^{2}\) intercepts. It may be helpful to sketch the graph of \(r\) first. You may check your answer with a graphing utility.

Graph the function using a graphing utility, and find its zeros. $$f(x)=x^{3}+x^{2}+x-3.1 x^{2}-2.5 x-4$$

Use Descartes' Rule of Signs to determine the number of positive and negative zeros of \(p\). You need not find the zeros. $$p(x)=x^{6}+4 x^{3}-3 x+7$$

A wireless phone company has a pricing scheme that includes 250 minutes worth of phone usage in the basic monthly fee of \(\$ 30 .\) For each minute over and above the first 250 minutes of usage, the user is charged an additional \(\$ 0.60\) per minute. (a) Let \(x\) be the number of minutes of phone usage per month. What is the expression for the average cost per minute if the value of \(x\) is in the interval (0,250)\(?\) (b) What is the expression for the average cost per minute if the value of \(x\) is above \(250 ?\) (c) If phone usage in a certain month is 600 minutes, what is the average cost per minute?

Find all real solutions of the polynomial equation. $$2 x^{3}-3 x^{2}=11 x-6$$
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