solve

1. Consider the curve = f(r) = 2* -1. A. Find the exact area of the region in the first quadrant bounded by the curves y = f(x) = 2* -1 and y=x. (\"Exact area\" means no calculator numbers.) B. Find the inverse function = f-! (x). Cc. Using part A and the notion of symmetry between a function and its inverse, find the exact area of the region in the first quadrant bounded by the curves -f} (x) and y =x. Explain your reasoning. (Hint: Think \"graphically\" and little or no math will need to be done!) D. Find a value for a such that the average value of the function /(x) on the interval [0,a] is equal to 1. You may use a calculator here