## Precalculus: Concepts Through Functions, A Unit Circle Approach to Trigonometry (3rd Edition)

The domain of the inverse function is given by: $\{49.7,43.8,4.2,61.9,12.8\}$. The range of the inverse function is given by: $\{\text{Atlanta, GA}, \text{Boston, MA}, \text{Las Vegas, NV}, \text{Miami, FL}, \text{Los Angeles, CA}\}$. The inverse function can be written with the ordered pairs $\{(49.7,\text{Atlanta, GA}), (43.8,\text{Boston, MA}), (4.2,\text{Las Vegas, NV}), (61.9,\text{Miami, FL}), (12.8,\text{Los Angeles, CA})\}$
The inverse of a function interchanges a function's domain and range. This means that the domain of the inverse is the range of the original function, and vice-versa (the range of the inverse is the domain of the original function). Therefore, the inverse of the original function can be computed by switching the domain elements with the range elements. The domain of the inverse function is given by: $\{49.7,43.8,4.2,61.9,12.8\}$. The range of the inverse function is given by: $\{\text{Atlanta, GA}, \text{Boston, MA}, \text{Las Vegas, NV}, \text{Miami, FL}, \text{Los Angeles, CA}\}$. The inverse function can be written with the ordered pairs $\{(49.7,\text{Atlanta, GA}), (43.8,\text{Boston, MA}), (4.2,\text{Las Vegas, NV}), (61.9,\text{Miami, FL}), (12.8,\text{Los Angeles, CA})\}$