Question

The population of a certain state (in thousands) from 1990 (t = 0) to 2000 (t= 10) is modeled by the polynomial p(t) = -0.376+ 108t + 7066. a. Determine the average growth rate from 1990 to 2000. b. What was the growth rate for this state in 1994 (t = 4) and 2000 (t = 10)? c. Use a graphing utility to graph p' for Osts 10. What does this graph tell you about population growth in this state during the period of time from 1990 to 2000? thousand people / year. a. The average growth rate from 1990 to 2000 is (Type an integer or a decimal.) thousand people / year. b. The growth rate for this state in 1994 (t = 4) was (Type an integer or a decimal.) The growth rate for this state in 2000 (t = 10) was thousand people / year. (Type an integer or a decimal.) c. Graph p' for Osts 10. Choose the correct graph below. OA. OB. OC. OD. 1204 1204T - 12010 12010- 12011 120fp TILL 1057 100TH 1057 IN 60-IH 90+ 80+ 90+T6 10 T 10 What does this graph tell you about population growth in this state during the period of time from 1990 to 2000?

Answer 1

Plan: -0.3742+ 10 05 + 7066 2000 (+=70) 1990 (H=0) to rate from a) Determine the auerage Determine the auerage growth 1990 to pood 7 PC10)- PCO) (10-0) = (-0.37x10 +100x10+70°66)- ( 7066) - to * - 37 +1080 =17043] average growth Rate = 104.3 10 b) growth Rate Pl(t)= -0.74 t +108 at 1994 (+=4) p'(d)= 408-0-7444 = 405.04 thousand at t= 10 (2000) p'(x)= 408-0-74410 = [400-6 thousands

c) pllda 700- 0.744 P'lt) e (01100) y 10,100.6) Opation A is correct