use variation of parameter solve DE y"+y'-y=x initial conditions y(0)=0 y'(0)=0

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

Use method of variation of parameter: y''+y=csc(x)

Use method of variation of parameter: y''+y=csc(x)

Use the Laplace transform to solve the following, given the initial conditions: y^'' +5y^'+4y = 0...

Use the Laplace transform to solve the following, given the initial conditions: y^'' +5y^'+4y = 0 y(0)=1,y^' (0)=0.

Solve the DE (x^2)y' + xy = (x^3)(y^2) , subject to y(0) = -0.15

Solve the DE (x^2)y' + xy = (x^3)(y^2) , subject to y(0) = -0.15

Solve the IVP: , y(0)=3. 2) Solve the DE: . y' = xy^2/ (x^2 +1)

Solve the IVP: , y(0)=3. 2) Solve the DE: . y' = xy^2/ (x^2 +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)= ?

Solve the DE: x^2y''-(x^2+2x)y^2+(x+2)y=0, x > 0 if you know that y=x is a solution of...

Solve the DE: x^2y''-(x^2+2x)y^2+(x+2)y=0, x > 0 if you know that y=x is a solution of this equation.

In this problem, y = c1ex + c2e−x is a two-parameter family of solutions of the...

In this problem, y = c1ex + c2e−x is a two-parameter family of solutions of the second-order DE y'' − y = 0. Find a solution of the second-order IVP consisting of this differential equation and the given initial conditions. y(−1) = 7,    y'(−1) = −7

Solve differential equation by using variation of parameter method y^''+y= cosx/sinx

Solve differential equation by using variation of parameter method y^''+y= cosx/sinx

Solve the non-homogeneous DE: y'' + 2 y' = et+ 3 using variation of parameters.

Solve the non-homogeneous DE: y'' + 2 y' = et+ 3 using variation of parameters.