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The Intermediate Value Theorem
Section 5.5 The Intermediate Value Theorem Rolle’s Theorem The Mean Value Theorem 3.6
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Intermediate Value Theorem (IVT)
If f is continuous on [a, b] and N is a value between f(a) and f(b), then there is at least one point c between a and b where f takes on the value N. b f(b) N c a f(a)
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Rolle’s Theorem If f is continuous on [a, b], if f(a) = 0, f(b) = 0, then there is at least one number c on (a, b) where f ‘ (c ) = 0 slope = 0 c f ‘ (c ) = 0 a b
![Rolle’s Theorem If f is continuous on [a, b], if f(a) = 0, f(b) = 0, then there is at least one number c on (a, b) where f ‘ (c ) = 0.](http://slideplayer.com/slide/16184339/95/images/3/Rolle%E2%80%99s+Theorem+If+f+is+continuous+on+%5Ba%2C+b%5D%2C+if+f%28a%29+%3D+0%2C+f%28b%29+%3D+0%2C+then+there+is+at+least+one+number+c+on+%28a%2C+b%29+where+f+%E2%80%98+%28c+%29+%3D+0..jpg "slope = 0. c. f ‘ (c ) = 0. a. b.")
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Given the curve: f(x+h) x+h x f(x)
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The Mean Value Theorem (MVT)
aka the ‘crooked’ Rolle’s Theorem If f is continuous on [a, b] and differentiable on (a, b) There is at least one number c on (a, b) at which Conclusion: Slope of Secant Line Equals Slope of Tangent Line a b f(a) f(b) c
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Show that has exactly one solution on [0, 1].
f(0) = -1 and f(1) = 2 By IVT, there is AT LEAST ONE solution on [0, 1] Since there is no max/min on (0, 1), there is EXACTLY One solution on [0, 1].
![Show that has exactly one solution on [0, 1].](http://slideplayer.com/slide/16184339/95/images/6/Show+that+has+exactly+one+solution+on+%5B0%2C+1%5D..jpg "f(0) = -1 and f(1) = 2. By IVT, there is AT LEAST ONE solution on [0, 1] Since there is no max/min on (0, 1), there is EXACTLY. One solution on [0, 1].")
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f(0) = f(1) = 2
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Find the value(s) of c which satisfy Rolle’s Theorem for
on the interval [0, 1]. Verify…..f(0) = 0 – 0 = f(1) = 1 – 1 = 0 which is on [0, 1]
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Find the value(s) of c that satisfy the Mean Value Theorem for
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Find the value(s) of c that satisfy the Mean Value Theorem for
Note: The Mean Value Theorem requires the function to be continuous on [-4, 4] and differentiable on (-4, 4). Therefore, since f(x) is discontinuous at x = 0 which is on [-4, 4], there may be no value of c which satisfies the Mean Value Theorem Since has no real solution, there is no value of c on [-4, 4] which satisfies the Mean Value Theorem
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Given the graph of f(x) below, use the graph of f to estimate the
numbers on [0, 3.5] which satisfy the conclusion of the Mean Value Theorem.
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f(x) is continuous and differentiable on [-2, 2]
On the interval [-2, 2], c = 0 satisfies the conclusion of MVT
![f(x) is continuous and differentiable on [-2, 2]](http://slideplayer.com/slide/16184339/95/images/12/f%28x%29+is+continuous+and+differentiable+on+%5B-2%2C+2%5D.jpg "On the interval [-2, 2], c = 0 satisfies the conclusion of MVT.")
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f(x) is continuous and differentiable on [-2, 1]
On the interval [-2, 1], c = 0 satisfies the conclusion of MVT
![f(x) is continuous and differentiable on [-2, 1]](http://slideplayer.com/slide/16184339/95/images/13/f%28x%29+is+continuous+and+differentiable+on+%5B-2%2C+1%5D.jpg "On the interval [-2, 1], c = 0 satisfies the conclusion of MVT.")
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Since f(x) is discontinuous at x = 2, which is part of the interval
[0, 4], the Mean Value Theorem does not apply
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f(x) is continuous and differentiable on [-1, 2]
c = 1 satisfies the conclusion of MVT
![f(x) is continuous and differentiable on [-1, 2]](http://slideplayer.com/slide/16184339/95/images/15/f%28x%29+is+continuous+and+differentiable+on+%5B-1%2C+2%5D.jpg "c = 1 satisfies the conclusion of MVT.")
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CALCULATOR REQUIRED If , how many numbers on [-2, 3] satisfy the conclusion of the Mean Value Theorem. A B C D E. 4 f(3) = f(-2) = 64 For how many value(s) of c is f ‘ (c ) = -5? X X X
![CALCULATOR REQUIRED If , how many numbers on [-2, 3] satisfy.](http://slideplayer.com/slide/16184339/95/images/16/CALCULATOR+REQUIRED+If+%2C+how+many+numbers+on+%5B-2%2C+3%5D+satisfy..jpg "the conclusion of the Mean Value Theorem. A. 0 B. 1 C. 2 D. 3 E. 4. f(3) = 39 f(-2) = 64. For how many value(s) of c is f ‘ (c ) = -5 X. X. X.")
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