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Published byAlicia Bond Modified over 9 years ago
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To get derivatives of inverse trigonometric functions we were able to use implicit differentiation. Sometimes it is not possible/plausible to explicitly find inverse function, but we still want to find derivative of inverse function at certain point (slope). QUESTION: What is the relationship between derivatives of a function and its inverse ????
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example: So
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The relation
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A typical problem using this formula might look like this: Given:Find: example:
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f -1 (a) = b. (f -1 )’(a) = tan . f’(b) = tan + = π/2
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example: If f(3) = 8, and f’(3)= 5, what do we know about f -1 ? Since f passes through the point (3, 8), f -1 must pass through the point (8, 3). Furthermore, since the graph of f has slope 5 at (3, 8), the graph of f -1 must have slope 1/5 at (8, 3).
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If f (x)= 2x 5 + x 3 + 1, find (a) f (1) and f '(1) and (b) (f -1 )(4) and (f -1 )'(4). y=2x 5 + x 3 + 1. y’ = 10x 4 + 3x 2 is positive everywhere y is strictly increasing, thus f (x) has an inverse. example: f (1)=2(1) 5 + (1) 3 +1=4 f '(x)=10x 4 + 3x 2 f '(1)=10(1) 4 +3(1) 2 =13 Since f(1)=4 implies the point (1, 4) is on the curve f(x)=2x 5 +x 3 +1, therefore, the point (4, 1) (which is the reflection of (1, 4) on y =x) is on the curve (f -1 )(x). Thus, (f -1 )(4)=1.
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example: If f(x)=5x 3 + x +8, find (f -1 ) '(8). Since y is strictly increasing near x =8, f(x) has an inverse near x =8. Note that f(0)=5(0) 3 +0+8=8 which implies the point (0, 8) is on the curve of f(x). Thus, the point (8, 0) is on the curve of (f -1 )(x). f '(x)=15x 2 +1 f '(0)=1 http://www.millersville.edu/~bikenaga/calculu s/inverse-functions/inverse-functions.html
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We have been more careful than usual in our statement of the differentiability result for inverse functions. You should notice that the differentiation formula for the inverse function involves division by f '(f -1 (x)). We must therefore assume that this value is not equal to zero. There is also a graphical explanation for this necessity. Example. The graphs of the cubing function f(x) = x 3 and its inverse (the cube root function) are shown below. Notice that f '(x)=3x 2 and so f '(0)=0. The cubing function has a horizontal tangent line at the origin. Taking cube roots we find that f -1 (0)=0 and so f '(f -1 (0))=0. The differentiation formula for f -1 can not be applied to the inverse of the cubing function at 0 since we can not divide by zero. This failure shows up graphically in the fact that the graph of the cube root function has a vertical tangent line (slope undefined) at the origin.
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Recognizing a given limit as a derivative (!!!!!!) Example: Tricky, isn’t it? A lot of grey cells needed.
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