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Let f and g be differentiable functions. If g and f are inverses of each other,

g(-4)= 7, and f'(7) = 2, then g'(-4) =

Select one answer
A -2
B -1/2
C 1/2
D 2

User Fdvfarzin
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1 Answer

13 votes
13 votes

Answer:

C 1/2

Explanation:

You have differentiable functions f and g that are inverses of each other with ...

  • f(7) = -4
  • f'(7) = 2
  • g(-4) = 7

and you want to know g'(-4).

Solution

Consider the composition ...

f(g(x)) = x . . . . . . the functions are inverses of each other.

Differentiating with respect to x, we get ...

f'(g(x))·g'(x) = 1

g'(x) = 1/f'(g(x)) . . . . . . divide by the coefficient of g'(x)

For x = -4, this is ...

g'(-4) = 1/f'(g(-4)) = 1/f'(7) . . . . . use the given values

g'(-4) = 1/2

__

Additional comment

In the attachment, you can consider the red line to be the tangent to f(x) at x=7, and the blue line to be tangent to g(x) at x=-4. The slope of the tangent, g'(-4), is 1/2, the reciprocal of the slope at f(7)=-4.

A function and its inverse are reflections of each other in the line y=x. That line is shown as dashed orange, and the points of interest are marked: (7, -4) and its inverse, (-4, 7).

Let f and g be differentiable functions. If g and f are inverses of each other, g-example-1