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Use the function f and the given real number a to find (f -1)'(a). (Hint: See Example 5. If an answer does not exist, enter DNE.)f(x) = cos(2x), 0 ≤ x ≤ /2, a = 1

Use the function f and the given real number a to find (f -1)'(a). (Hint: See Example-example-1
User Pixelou
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1 Answer

25 votes
25 votes

The answer is:


(f^(-1))^(\prime)(1)=DNE

Step-by-step explanation:

We need to use the theorem for the inverse of the derivative:


(f^(-1))^(\prime)(x)=(1)/(f^(\prime)(f^(-1)(x)))

Then, we need to calculate the derivative of f and its inverse.

To find the derivative, we know that the derivative of cosine is negative sine, and by the chain rule:


f^(\prime)(x)=-2\sin(2x)

ANd to find the inverse, we call f(x) = y and solve for x:


\begin{gathered} y=\cos(2x) \\ \cos^(-1)(y)=2x \\ \end{gathered}
x=(\cos^(-1)(y))/(2)

Now, we switch the variables, and we have the inverse:


f^(-1)(x)=(\cos^(-1)(x))/(2)

And now, by the theorem:


(f^(-1))^(\prime)(x)=(1)/(f^(\prime)(f^(-1)(x)))

To find the derivative of the inverse in x = 1, we need to find first:


f^(-1)(1)=(\cos^(-1)(1))/(2)=(0)/(2)=0

Now:


(f^(-1))^(\prime)(x)=(1)/(f^(\prime)(0))
f^(\prime)(0)=-2\sin(2\cdot0)=-2\cdot0=0

And finally:


(f^(-1))^(\prime)(x)=(1)/(0)=DNE

Thus, the correct answer is DNE

User Adam Plumb
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