Exponential Growth and Decay Formula Initial Starting Value

Exponential Growth and Decay Formula: Initial Starting Value # of times it grows or decays Growth/Decay Rate

Exponential Growth growth rate $10 is invested in a savings account where is grows 5% per year. What is the y –intercept? Would y = 10(1. 5)x be above or below this graph?

Exponential Decay decay rate 10 grams of a particular liquid decays at a rate of 75% per day.

Practice: Monthly benefits for Social Security in May 1992 were $23, 307 million. Since then, benefits have increased about 5. 4% per year. a) Write an exponential function to model the growth of monthly Social Security benefits paid each year. (use millions in your answer!) y = 23, 307(1+0. 054)x y = 23, 307(1. 054)x b) If benefits continue to grow at this rate, when will the monthly Social Security benefits reach $50, 000 million? 50, 000 = 23, 307(1. 054)x 1)Graph y = 23, 307(1. 054)x and y = 50, 000 2) Solve 2. 14527 = 1. 054 x through guess and check

In 1984, funds for the Emergency Food Assistance program were about $1, 075 million. Since 1984, this fund has decreased about 19% per year. a) Write an exponential function to model this situation. Y= 1, 075(1 - 0. 19)x y = 1, 075(0. 81)x There is 81% of the fund LEFT each year b) Estimate the funds available for the Emergency Food Assistance program this year. Y = 1075(0. 81)24 6. 839 million Or graph the equation and TRACE with x = 24