solve the wave problem ytt(x,t) = 100yxx(x,t) 0<x<1 0<t y(0,t) = y(1,t) = 0 0<t y(x,0)...

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)=

Solve the following inhomogeneous wave problem for a vibrating string of length 1 (0 ≤ x...

Solve the following inhomogeneous wave problem for a vibrating string of length 1 (0 ≤ x ≤ 1): ∂^2u/ ∂t^2 = 1/2 * ∂^2u/∂x^2 − x. The initial conditions are u(x, 0) = cos(πx/2) + 1/3x^3 & ∂u/∂t (x, 0) = 0 boundary conditions are ∂u/∂x(0, t) = 0  & u(1, t) = 1/3.

Solve the initial value problem: y''−2y'+y=e^t/(1+t^2), y(0) = 1, y'(0) = 0.

Solve the initial value problem: y''−2y'+y=e^t/(1+t^2), y(0) = 1, y'(0) = 0.

Solve the initial value problem 3y'(t)y''(t)=16y(t) , y(0)=1, y'(0)=2

Solve the initial value problem 3y'(t)y''(t)=16y(t) , y(0)=1, y'(0)=2

Solve the initial value problem x′=−3x−y, y′= 13x+y, x(0) = 0, y(0) = 1.

Solve the initial value problem x′=−3x−y, y′= 13x+y, x(0) = 0, y(0) = 1.

solve the initial value problem y' y" - t = 0 y(1) = 2 y'(1) =1

solve the initial value problem y' y" - t = 0 y(1) = 2 y'(1) =1

For 2y' = -tan(t)(y^2-1) find general solution (solve for y(t)) and solve initial value problem y(0)...

For 2y' = -tan(t)(y^2-1) find general solution (solve for y(t)) and solve initial value problem y(0) = -1/3

Solve the initial value problem t^(13) (dy/dt) +2t^(12) y =t^25 with t>0 and y(1)=0 (y'-e^-t+4)/y=-4, y(0)=-1

Solve the initial value problem t^(13) (dy/dt) +2t^(12) y =t^25 with t>0 and y(1)=0 (y'-e^-t+4)/y=-4, y(0)=-1

2. Solve the initial-value problem: y′′′ + 4y′ = t, y(0) = y′(0) = 0, y′′(0)...

2. Solve the initial-value problem: y′′′ + 4y′ = t, y(0) = y′(0) = 0, y′′(0) = 1.

Use Laplace transforms to solve the following initial value problem x'+2y'+x=0, x'-y'+y=0, x(0)=0, y(0)=289 the particular...

Use Laplace transforms to solve the following initial value problem x'+2y'+x=0, x'-y'+y=0, x(0)=0, y(0)=289 the particular solution is x(t)=? and y(t)= ?