Chapter 3.3, Problem 56E

During the 1980s the controversial economist Arthur Laffer promoted the idea that tax increases tend to a reduction in government revenue. Called supply-side economies, the theory uses functions such as

$f(x)=\frac{80x-8000}{x-110}.30\le x\le 100.$

This function models the government tax revenue, f(x). in tens of billions of dollars, in terms of the tax rate, x. The graph of the function is shown. It illustrates tax revenue decreasing quite dramatically as the tax rate increases. At a tax rate of (gasp) 100%. the government takes all our money and no one has an incentive to work. With no income earned, zero dollars in tax revenue is generated.

Use function f andits graph to solve Exercise 55-56

a. find and interpret f(40). identify the solution as a point on the graph of the function.

b. Rewrite the Function by Using long division to perform

$(80x-8000)÷(x-110).$

Then use this new form of the function to find f(40). Do you obtain the same answer as you did in part (a)? c Is f a polynomial function? Explain your answer.