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Chapter 3: Problem 97

Explain why a polynomial function of degree 20 cannot cross the \(x\) -axis exactly once.

Short Answer

Expert verified
A polynomial function of degree 20 cannot cross the x-axis exactly once because according to the Fundamental Theorem of Algebra, a polynomial of degree 20 has up to 20 roots and hence can cross the x-axis up to 20 times not once.

Step by step solution

01

Define a Polynomial Function and Degree

A degree of a polynomial is the highest exponent of the variable \(x\) in a polynomial function. Polynomial of degree 20 means that the highest exponent of \(x\) in the equation is 20.
02

Interpret the Relationship of Degree and X-Intercepts

The fundamental theorem of Algebra states that a polynomial of degree \(n\) has exactly \(n\) roots, or x-intercepts, in the complex plane. This means that it can cross the x-axis up to \(n\) times. Therefore, a polynomial of degree 20 can have up to 20 x-intercepts.
03

Final Explanation

Now, it should be clear that a polynomial function of degree 20 cannot cross the x-axis exactly once because it could have up to 20 different x-intercepts or roots.

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Most popular questions from this chapter

Use a graphing utility to graph \(f\) and \(g\) in the same viewing rectangle. Then use the ZOOM OUT feature to show that f and g have identical end behavior. \(f(x)=x^{3}-6 x+1, g(x)=x^{3}\)

In Exercises 41–64, a. Use the Leading Coefficient Test to determine the graph’s end behavior. b. Find the x-intercepts. State whether the graph crosses the x-axis, or touches the x-axis and turns around, at each intercept. c. Find the y-intercept. d. Determine whether the graph has y-axis symmetry, origin symmetry, or neither. e. If necessary, find a few additional points and graph the function. Use the maximum number of turning points to check whether it is drawn correctly. $$f(x)=3 x^{2}-x^{3}$$

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