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Mean Value Theorem for Derivatives
4.10 Mean Value Theorem for Derivatives Teddy Roosevelt National Park, North Dakota Greg Kelly, Hanford High School, Richland, Washington Photo by Vickie Kelly, 2002
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If f (x) is a differentiable function over [a,b], then at some point between a and b:
Mean Value Theorem for Derivatives
![If f (x) is a differentiable function over [a,b], then at some point between a and b:](http://slideplayer.com/slide/13523088/82/images/2/If+f+%28x%29+is+a+differentiable+function+over+%5Ba%2Cb%5D%2C+then+at+some+point+between+a+and+b%3A.jpg "Mean Value Theorem for Derivatives.")
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If f (x) is a differentiable function over [a,b], then at some point between a and b:
Mean Value Theorem for Derivatives Differentiable implies that the function is also continuous.
![If f (x) is a differentiable function over [a,b], then at some point between a and b:](http://slideplayer.com/slide/13523088/82/images/3/If+f+%28x%29+is+a+differentiable+function+over+%5Ba%2Cb%5D%2C+then+at+some+point+between+a+and+b%3A.jpg "Mean Value Theorem for Derivatives. Differentiable implies that the function is also continuous.")
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If f (x) is a differentiable function over [a,b], then at some point between a and b:
Mean Value Theorem for Derivatives Differentiable implies that the function is also continuous. The Mean Value Theorem only applies over a closed interval.
![If f (x) is a differentiable function over [a,b], then at some point between a and b:](http://slideplayer.com/slide/13523088/82/images/4/If+f+%28x%29+is+a+differentiable+function+over+%5Ba%2Cb%5D%2C+then+at+some+point+between+a+and+b%3A.jpg "Mean Value Theorem for Derivatives. Differentiable implies that the function is also continuous. The Mean Value Theorem only applies over a closed interval.")
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If f (x) is a differentiable function over [a,b], then at some point between a and b:
Mean Value Theorem for Derivatives The Mean Value Theorem says that at some point in the closed interval, the actual slope equals the average slope.
![If f (x) is a differentiable function over [a,b], then at some point between a and b:](http://slideplayer.com/slide/13523088/82/images/5/If+f+%28x%29+is+a+differentiable+function+over+%5Ba%2Cb%5D%2C+then+at+some+point+between+a+and+b%3A.jpg "Mean Value Theorem for Derivatives. The Mean Value Theorem says that at some point in the closed interval, the actual slope equals the average slope.")
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Tangent parallel to chord.
Slope of tangent: Slope of chord:
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Example: Verify that the Mean-Value Theorem holds true for the following function over the given interval.
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If f (x) is a differentiable function over [a,b].
If , then there is at least one point c in [a, b] where Rolle’s Theorem for Derivatives The Rolle’s Theorem says that at some point in the closed interval, the slope equals 0.
![If f (x) is a differentiable function over [a,b].](http://slideplayer.com/slide/13523088/82/images/8/If+f+%28x%29+is+a+differentiable+function+over+%5Ba%2Cb%5D..jpg "If , then there is at least one point c. in [a, b] where. Rolle’s Theorem for Derivatives. The Rolle’s Theorem says that at some point in the closed interval, the slope equals 0.")
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Example: Verify that Rolle’s Theorem holds true for the following function over the given interval.
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