Suppose the slope of the curve y=f^−1(x) at (4, 7) is 4/5. Find f′(7).

The Inverse Function Theorem states that if a function f is continuously differentiable and its derivative f' is non-zero at a point, then its inverse function f^−1 is also differentiable at the corresponding point. The derivative of the inverse function can be calculated using the formula (f^−1)'(y) = 1 / f'(x), where y = f(x). This theorem is crucial for relating the slopes of a function and its inverse.

The derivative of a function, denoted f'(x), represents the rate of change of the function's output with respect to its input. It is a fundamental concept in calculus that provides information about the slope of the tangent line to the curve at any given point. Understanding how to compute and interpret derivatives is essential for analyzing the behavior of functions and their inverses.

The slope of a curve at a specific point is defined as the value of the derivative at that point. For the curve y = f^−1(x) at the point (4, 7), the slope is given as 4/5. This information is used to find the derivative of the original function f at the corresponding point, which is necessary for solving problems involving inverse functions and their properties.