Find the solution to the boundary value problem: d2y/dt2−4dy/dt+3y=0,   y(0)=7,y(1)=8 y=

Using Taylor series expansion method; find a series solution of the initial value problem (x2+1)d2y/dx2+xdy/dx+2xy=0 y(0)=2...

Using Taylor series expansion method; find a series solution of the initial value problem (x2+1)d2y/dx2+xdy/dx+2xy=0 y(0)=2 y'(0)=1

find the boundary- value problem y’’ + 2y = 4x, y(0) = 0, y(1) + y’(1)...

find the boundary- value problem y’’ + 2y = 4x, y(0) = 0, y(1) + y’(1) = 0

A nontrivial solution of the boundary value problem y′′ + 9y = 0; y′(0) = 0,...

A nontrivial solution of the boundary value problem y′′ + 9y = 0; y′(0) = 0, y′(π) = 0 is:

solve the given initial value problem dx/dt=7x+y x(0)=1 dt/dt=-6x+2y y(0)=0 the solution is x(t)= and y(t)=

solve the given initial value problem dx/dt=7x+y x(0)=1 dt/dt=-6x+2y y(0)=0 the solution is x(t)= and y(t)=

Find the solution of the given initial value problem: 3y′′′+72y′−480y=0 y(0)=10, y′(0)=34, y′′(0)=−248

Find the solution of the given initial value problem: 3y′′′+72y′−480y=0 y(0)=10, y′(0)=34, y′′(0)=−248

Solve the given initial-value problem. (d2y) /dθ2 + y = 0,    y(π/3) = 0,    y'(π/3) = 8

Solve the given initial-value problem. (d2y) /dθ2 + y = 0,    y(π/3) = 0,    y'(π/3) = 8

Consider the boundary value problem y''(t) + y(t) = f(t) , y(0) = 0 and  y(π/2) =...

Consider the boundary value problem y''(t) + y(t) = f(t) , y(0) = 0 and  y(π/2) = 0. Find the solution to the boundary value problem

Find the solution of the given initial value problem. ty′+3y=t2−t+5, y(1)=5, t>0

Find the solution of the given initial value problem. ty′+3y=t2−t+5, y(1)=5, t>0

Solve the initial value problem 8(t+1)dy/dt - 6y = 12t for t > -1 with y(0)...

Solve the initial value problem 8(t+1)dy/dt - 6y = 12t for t > -1 with y(0) = 7 7 =

Find the general solution of the system dx/dt = 2x + 3y dy/dt = 5y Determine...

Find the general solution of the system dx/dt = 2x + 3y dy/dt = 5y Determine the initial conditions x(0) and y(0) such that the solutions x(t) and y(t) generates a straight line solution. That is y(t) = Ax(t) for some constant A.