The functions in Exercises 11-28 are all one-to-one. For each function, a. Find an equation for f^-1(x), the inverse function. b. Verify that your equation is correct by showing that f(ƒ^-1 (x)) = = x and ƒ^-1 (f(x)) = x. f(x) = 1/x

A one-to-one function is a type of function where each output is produced by exactly one input. This means that if f(a) = f(b), then a must equal b. One-to-one functions have unique inverses, which is crucial for finding the inverse function f^-1(x). Understanding this property ensures that we can correctly derive and verify the inverse.

An inverse function reverses the effect of the original function. For a function f(x), its inverse f^-1(x) satisfies the equations f(f^-1(x)) = x and f^-1(f(x)) = x. To find the inverse, we typically swap the roles of x and y in the equation and solve for y. This concept is essential for part a of the question, where we need to derive f^-1(x).

Verifying that two functions are inverses involves showing that applying one function to the result of the other returns the original input. This is done through the equations f(f^-1(x)) = x and f^-1(f(x)) = x. This verification is crucial for part b of the question, as it confirms the correctness of the derived inverse function.