Given the LDE : 2y''' - 5y'' + y' - 6x y = 1 + x...

Solve the given initial-value problem. 5y'' + y' = −6x, y(0) = 0, y'(0) = −25...

Solve the given initial-value problem. 5y'' + y' = −6x, y(0) = 0, y'(0) = −25 The answer I got is 155-155e^(-1/5)x-3x^2-30x

solve non-homogeneous de y" - y' - 2y = 6x + 5 -2e^x by finding- the...

solve non-homogeneous de y" - y' - 2y = 6x + 5 -2e^x by finding- the solution yh(x) to the equivalent homogeneous de the particular solution yp(x) using undetermined coefficients the general solution y(x) = yh(x) + yp(x) of the de

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 IVP: x^2y'' - 5xy' + 5y = 0, y(1) = 3, y'(1) =...

solve the following IVP: x^2y'' - 5xy' + 5y = 0, y(1) = 3, y'(1) = -5

Solve the following system of equations by graphing. y=-1/2 x -5 6x-2y=24

Solve the following system of equations by graphing. y=-1/2 x -5 6x-2y=24

Consider the differential equation x^2y′′ − 3xy′ − 5y = 0. Note that this is not...

Consider the differential equation x^2y′′ − 3xy′ − 5y = 0. Note that this is not a constant coefficient differential equation, but it is linear. The theory of linear differential equations states that the dimension of the space of all homogeneous solutions equals the order of the differential equation, so that a fundamental solution set for this equation should have two linearly fundamental solutions. • Assume that y = x^r is a solution. Find the resulting characteristic equation for r....

Solve the given differential equation by undetermined coefficients. y'' − 2y' + y = (6x −...

Solve the given differential equation by undetermined coefficients. y'' − 2y' + y = (6x − 2)e^x

Solve the initial value problem x′=x+y y′= 6x+ 2y+et, x(0) = 0, y(0) = 0.

Solve the initial value problem x′=x+y y′= 6x+ 2y+et, x(0) = 0, y(0) = 0.

Use Laplace transforms to solve the given initial value problem. y"-2y'+5y=1+t y(0)=0 y’(0)=4

Use Laplace transforms to solve the given initial value problem. y"-2y'+5y=1+t y(0)=0 y’(0)=4

For each of the following equations, find the general solution (perferably using imaginary numbers): y′′ −2y′...

For each of the following equations, find the general solution (perferably using imaginary numbers): y′′ −2y′ −3y=3e2t; y′′ +2y′ =3+sin(2t); x2y′′ +7xy′ +5y=x; x2y′′ +xy′ +4y=sin(lnx)+sin(2lnx); y′′ +y=tcost.