PART II 1. In which situation will the rumor spread faster? A. Use the growth constant to determine in which situation the rumor spreads faster in the long run. Situation #2 Circle one: Situation #1 Using Desmos.com, graph each function on the same coordinate system using a suitable domain b. and range. Sketch the results below. c. Looking at the two graphs, how do you know in which situation the rumor spreads faster? 2. When will the two situations give the same number of people who have heard the rumor? a. Find graphically the moment in time where both situations will give the same number of people that have heard the rumor. Label this time as ( = T. Put this on the graph above. b. From the graph, find the value of N(T): N(T) = c. Verify that both situations give the same number of people when t = T by plugging the value of T in both models (equations). T into Situation #1 Model T into Situation #2 Model