Based on data from the U.S. Census Bureau, the annual per captia internet usage in the United States may be modeled by the differential equation:
dI/dt=0.002882I(232.2-I)
where I is the per capita internet usage in hours and t is the number of years since the end of 1995. A differential equation is an equation that contains a function and at least one of its derivatives. The U.S. Census Bureau also found that in 1999 the annual per capita internet usage was 90 hours.
A) The solution to this differential equation is I(t)=a logistic function. Find this logistic function.
B) Show that the logistic function you found satisfies the differential equation above.
C) Explain the real-world meaning of the constants in the differential equation above including their units.
D) Explain the significance of the horizontal asymptotes of your logistic function.
dI/dt=0.002882I(232.2-I)
where I is the per capita internet usage in hours and t is the number of years since the end of 1995. A differential equation is an equation that contains a function and at least one of its derivatives. The U.S. Census Bureau also found that in 1999 the annual per capita internet usage was 90 hours.
A) The solution to this differential equation is I(t)=a logistic function. Find this logistic function.
B) Show that the logistic function you found satisfies the differential equation above.
C) Explain the real-world meaning of the constants in the differential equation above including their units.
D) Explain the significance of the horizontal asymptotes of your logistic function.
