Suppose a student carrying a flu virus returns to an isolated college campus of 600 students. If it is assumed that the rate at which the virus spreads is jointly proportional to number of students infected and number of students not infected, set up the differential equation (don't solve) to determine the number of students after t days if it is further observed after 1 days, 10 students are infected.
Suppose a student carrying a flu virus returns to an isolated college campus of 600 students. If it is assumed that the rate at which the virus spreads is jointly proportional to number of students i...
2(6pts). Suppose a student carrying a flu virus returns to an isolated college campus of 1000 students. If it is assumed that the rate at which the virus spreads is directly proportional not only the number 1 of infected students but also to the number of students not infected, determine the number of infected students after 6 days. Only, after 3 days it is observed that 100 students are infected. sol.
A student carrying a flu virus returns to an isolated boarding school that has 2000 students. If the speed of people infected with respect to time is directly proportional to the number of students infected, as well as the number of students not infected . It is known that after 5 days there were already 60 infected people. a) Select the parametric function that is obtained by solving the differential equation: We were unable to transcribe this imagea. P-1 2000...
6. A single sick student returns to a campus of 2500 students (day 0). The rate at which the virus spreads is proportional to the number of infected students squared. If we know that there are 25 infected students after four days, how many will be infected after 10 days? 6. A single sick student returns to a campus of 2500 students (day 0). The rate at which the virus spreads is proportional to the number of infected students squared....