Intermediate Value Theorem

Intermediate value theorem
Calculus I
Calculus II
Chemistry
Physics
Oceanography

By Rick Stoll

Intermediate Value Theorem. Let f (x) be a continuous function on the interval [a, b]. If d $\in$ [f (a), f (b)], then there is a c $\in$ [a, b] such that f (c) = d.

In the case where f (a) > f (b), [f (a), f (b)] is meant to be the same as [f (b), f (a)]. Another way to state the Intermediate Value Theorem is to say that the image of a closed interval under a continuous function is a closed interval. We will present an outline of the proof of the Intermediate Value Theorem on the next page.

Here is a classical consequence of the Intermediate Value Theorem:

Example. Every polynomial of odd degree has at least one real root.

We want to show that if P(x) = a_nxⁿ + a_{n -
1}x^{n - 1} + ^...+ a₁x + a₀ is a polynomial with n odd and a_n $\not=$ 0, then there is a real number c, such that P(c) = 0.

First let me remind you that it follows from the results in previous pages that every polynomial is continuous on the real line. There you also learned that

$\displaystyle \lim_{n\to\infty}^{}$ $\displaystyle {\frac{P(x)}{a_n x^n}}$ = 1 and $\displaystyle \lim_{n\to-\infty}^{}$ $\displaystyle {\frac{P(x)}{a_n x^n}}$ = 1.

Consequently for | x| large enough, P(x) and a_nxⁿ have the same sign. But a_nxⁿ has opposite signs for positive x and negative x. Thus it follows that if a_n > 0, there are real numbers x₀ < x₁ such that P(x₀) < 0 and P(x₁) > 0. Similarly if a_n < 0, we can find x₀ < x₁ such that P(x₀) > 0 and P(x₁) < 0. In either case, it now follows directly from the Intermediate Value Theorem that (for d = 0) there is a real number c $\in$ [x₀, x₁] with P(c) = 0.

The natural question arises whether every function which satisfies the conclusion of the Intermediate Value Theorem must be continuous. Unfortunately, the answer is no and counterexamples are quite messy. The easiest counterexample is the function

f (x) = $\displaystyle \left\{\vphantom{ \begin{array}{cl}\sin\left(\frac{1}{x}\right)&\mbox{, if } x\not=0 0&\mbox{, if }x=0\end{array}}\right.$ $\displaystyle \begin{array}{cl}\sin\left(\frac{1}{x}\right)&\mbox{, if } x\not=0 0&\mbox{, if }x=0\end{array}$

As you found out on an earlier page, this function fails to be continuous at x = 0. On the other hand, it is not too hard to see that f (x) has the "Intermediate Value Property" even on closed intervals containing x = 0.

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Send mail to m_engineer2002@netzero.com with questions or comments about this web site. Copyright © 2001 Math Depot Last modified: April 30, 2001

Send mail to m_engineer2002@netzero.com with questions or comments about this web site.
Copyright © 2001 Math Depot
Last modified: April 30, 2001