Transcript 4.2 - The Mean Value Theorem

4.2 - The Mean Value
Theorem
Theorems If the conditions (hypotheses) of a theorem
are satisfied, the conclusion is known to be true. If the
hypotheses of a theorem are not satisfied, the conclusion
may still be true, but not guaranteed.
Rolle’s Theorem
Let f be a function that satisfies the following
three hypotheses:
1. f is continuous on the closed interval [a, b].
2. f is differentiable on the open interval (a, b).
3. f (a) = f (b)
Then there is a number c in (a, b) such that
f ′(c) = 0.
Examples: Rolle’s Theorem
1. Explain why the conclusion to Rolle’s
Theorem is not guaranteed for the function
f (x) = x / (x – 3) on the interval [1, 6].
2. Verify that the function satisfies the three
hypotheses of Rolle’s Theorem on the given
interval. Then find all numbers c that satisfy
the conclusion of Rolle’s Theorem.
f ( x)  x x  6; [6,0]
The Mean Value Theorem
Let f be a function that satisfies the following two
hypotheses:
1. f is continuous on the closed interval [a, b].
2. f is differentiable on the open interval (a, b).
Then there is a number c in (a, b) such that
f (b)  f (a)

f (c ) 
or f (b)  f (a)  f  (c)(b  a)
ba
Example: Mean Value Theorem
3. Verify that the function satisfies the two
hypotheses of Mean Value Theorem on the
given interval. Then find all numbers c that
satisfy the conclusion of Mean Value
Theorem.
x
f ( x) 
; [1, 4]
x2
Theorem
If f ′(x) = 0 for all x in an interval (a, b), then f is
constant on (a, b).
Corollary If f ′(x) = g′(x) for all x in an interval
(a, b), then f – g is constant on (a, b); that is,
f(x) = g(x) + c where c is a constant.
Example: If f (x) = x2 + 3 and g(x) = x2 + 7,
find f ′(x), g ′(x), and (f – g)(x).
Proof By Contradiction
1. Assume that something is true.
2. Show that under your assumptions, the
conditions of a known theorem are satisfied.
This guarantees the conclusion of that theorem.
3. Show that the conclusion of the theorem is, in
fact, not true under the assumptions.
4. Since the conclusion of the theorem must be
true if the assumptions were satisfied, the only
conclusion left is that the assumptions must be
incorrect.
Example
Show that the equation 2x – 1 – sin x = 0 has
exactly one real root.