Solve the given differential equation
Suppose a student carrying a flu virus return to an isolated college campus of 1000 students. If it is assumed that the rate at which the virus spreads is proportional to not infected. Determine the number of infected students after 6 days if it is further observed that after 4 days, x(4) = 50.
Find the general solution of
Find the general solution using variation of parameter for
Solve the differential equation
Solve the given initial value problem using Euler’s method
Solve the following initial value problem by using Green’s Function.
Apply Range – Kutta method with h = 0.1 to determine an Approximation to the given initial value problem at x = 1.