Chapter 5.2, Problem 30AYU

To determine

To find: The inverse of each one to one function and then state the domain and the range of each of the inverse function.

Answer to Problem 30AYU

The domain of the inverse of the function is $\left\{2,6,8,-3,9\right\}$ and the range of the inverse function is $\left\{-2,-1,0,1,2\right\}$ . The inverse function is $\left\{\left(2,-2\right),\left(6,-1\right),\left(8,0\right),\left(-3,1\right),\left(9,2\right)\right\}$ .

Explanation of Solution

Given:

The given function is $\left\{\left(-2,2\right),\left(-1,6\right),\left(0,8\right),\left(1,-3\right),\left(2,9\right)\right\}$ .

Calculation:

Consider the given function is,

  $\left\{\left(-2,2\right),\left(-1,6\right),\left(0,8\right),\left(1,-3\right),\left(2,9\right)\right\}$

The inverse function is,

  $\left\{\left(2,-2\right),\left(6,-1\right),\left(8,0\right),\left(-3,1\right),\left(9,2\right)\right\}$

For the above function, the domain of the inverse of the given function is the range of the function and the range for the inverse of the function is the domain of the function.

Thus the domain of the inverse of the function is,

  $\left\{2,6,8,-3,9\right\}$

The range of the function is,

  $\left\{-2,-1,0,1,2\right\}$