Solve the initial value problems . 3. d2ydx2=1-5x;y'0=2, y0=4                                &n

Solve the initial value problems . 3. (d^2 y)/(dx^2 )=1-5x;y^' (0)=2,y(0)=4

Solve the initial value problems . 3. (d^2 y)/(dx^2 )=1-5x;y^' (0)=2,y(0)=4

solve the following initial value problem y(3)+y'' = 5x + 8e-x, y(0)=1, y'(0)=0, y''(0)=1

solve the following initial value problem y(3)+y'' = 5x + 8e-x, y(0)=1, y'(0)=0, y''(0)=1

Solve the Initial Value Problem: ?x′ = 2y−x y′ = 5x−y Initial Conditions: x(0)=2 y(0)=1

Solve the Initial Value Problem: ?x′ = 2y−x y′ = 5x−y Initial Conditions: x(0)=2 y(0)=1

Solve the following initial value problem, showing all work. Verify the solution you obtain. y''-2y'+y=0;   y0=1,...

Solve the following initial value problem, showing all work. Verify the solution you obtain. y''-2y'+y=0;   y0=1, y'0=-2.

solve the initial value problems y" - 2y' + y = 2x^(2) - 8x + 4,...

solve the initial value problems y" - 2y' + y = 2x^(2) - 8x + 4, y(0) = 0.3, y'(0) = 0.3

Solve the following initial value problems a) x′ = -y y′ = x x(0) = 1...

Solve the following initial value problems a) x′ = -y y′ = x x(0) = 1 y(0) = 1 b) x′ = y y′= -x    x(0) = 1 y(0) = 1

solve the following initial value problem x' = 2xy y' = y -2t +1 x(0) =...

solve the following initial value problem x' = 2xy y' = y -2t +1 x(0) = x0 y(0) = y0

Solve the following initial value problem. y'''-4y''+5y'=100e^5x;y''(0)=-34,y'(0)=-6,y(0)=7

Solve the following initial value problem. y'''-4y''+5y'=100e^5x;y''(0)=-34,y'(0)=-6,y(0)=7

Solve the initial value problems. 1) x (dy/dx)+ 2y = −sinx/x , y(π) = 0. 2)...

Solve the initial value problems. 1) x (dy/dx)+ 2y = −sinx/x , y(π) = 0. 2) 3y”−y=0 , y(0)=0,y’(0)=1.Use the power series method for this one . And then solve it using the characteristic method Note that 3y” refers to it being second order differential and y’ first

Solve the given initial-value problem. y'' + 49y = 0,  y(0) = 3,  y'(0) = −4

Solve the given initial-value problem. y'' + 49y = 0,  y(0) = 3,  y'(0) = −4