Determine the general solution of the given differential equation. y(4) + y''' = sin 3t

Determine the general solution of the given differential equation. y(4) − y = 2t + cos...

Determine the general solution of the given differential equation. y(4) − y = 2t + cos t

Use the method of variation of parameters to determine the general solution of the given differential...

Use the method of variation of parameters to determine the general solution of the given differential equation. y′′′−y′=3t Use C1, C2, C3, ... for the constants of integration.

Find the general solution of the differential equation y′′+9y=11sec2(3t), 0<t<π6.

Find the general solution of the differential equation y′′+9y=11sec2(3t), 0<t<π6.

Find the general solution of the differential equation: y ' − 5y = te^3t Use lower...

Find the general solution of the differential equation: y ' − 5y = te^3t Use lower case c for the constant in your answer.

Find the general solution to the differential equation y′′+ 2y′= 3 + 4 sin 2t.(Hint: Variation...

Find the general solution to the differential equation y′′+ 2y′= 3 + 4 sin 2t.(Hint: Variation of parameters requires integration by parts, so undetermined coefficientsis recommended—however, be careful.)

Find the general solution of the given differential equation. y'' − y' − 2y = −8t...

Find the general solution of the given differential equation. y'' − y' − 2y = −8t + 6t2 y(t) =

use the method of variation of parameters to determine the general solution of the given differential...

use the method of variation of parameters to determine the general solution of the given differential equation. y(4)+2y''+y=sin t answer: c1cos(t)+c2sin(t)+c3t*cos(t)+c4t*sin(t)-1/8t2sin(t) I can't get past finding the Wronskian, not to mention w1,w2,w3, and w4. The matrix seems way to complicated when I cross multiply using the determinant method. Is there an easier way?

Find the general solution of the given differential equation (x+!) dy/dx + (x+2)y = 2xe^-x y...

Find the general solution of the given differential equation (x+!) dy/dx + (x+2)y = 2xe^-x y = ______ Determine whether there are any transient terms in the general solution.

Find the general solution of the given differential equation. y'' + 12y' + 85y = 0...

Find the general solution of the given differential equation. y'' + 12y' + 85y = 0 y(t) =

Find the general solution of the given higher order differential equation y^(4) + 4y^(3) − 4y^(2)...

Find the general solution of the given higher order differential equation y^(4) + 4y^(3) − 4y^(2) − 16y^(1) = 0 Derivatives of Y not power