y'' + 2y' = 4sin(2t)

Find the area of the region enclosed by the curve x = 8cos(t) − 4sin(2t), y...

Find the area of the region enclosed by the curve x = 8cos(t) − 4sin(2t), y = 5sin(t) with 0 ≤ t ≤ 2 π

Use Laplace transform to solve IVP 2y”+2y’+y=2t , y(0)=1 , y’(0)=-1

Use Laplace transform to solve IVP 2y”+2y’+y=2t , y(0)=1 , y’(0)=-1

y'-2y = 8sin(2t) , y(0) = -4 Use Laplace Transform

y'-2y = 8sin(2t) , y(0) = -4 Use Laplace Transform

y"-3y''''+2y= te^2t, y(0)=1, y''(0)=4 solve

y"-3y''''+2y= te^2t, y(0)=1, y''(0)=4 solve

Find the general solution using Variation of Parameters. y''-y'-2y=2e^(2t)

Find the general solution using Variation of Parameters. y''-y'-2y=2e^(2t)

Use the Laplace transform to solve: y’’ + 2y’ + y = e^(2t); y(0) = 0,...

Use the Laplace transform to solve: y’’ + 2y’ + y = e^(2t); y(0) = 0, y’(0) = 0.

Differential equation for y'=2y-t+g(y) that has a solution y(t)=e^(2t)

Differential equation for y'=2y-t+g(y) that has a solution y(t)=e^(2t)

y''-2y'-3y=15te^2t y(0)=2 y'(0)=0 find the solution

y''-2y'-3y=15te^2t y(0)=2 y'(0)=0 find the solution

Find the solution of ?″+2?′=40sin(2?)+16cos(2?)y″+2y′=40sin⁡(2t)+16cos⁡(2t) with ?(0)=1y(0)=1 and ?′(0)=5.y′(0)=5. y = ?

Find the solution of ?″+2?′=40sin(2?)+16cos(2?)y″+2y′=40sin⁡(2t)+16cos⁡(2t) with ?(0)=1y(0)=1 and ?′(0)=5.y′(0)=5. y = ?

Find the solution of the initial value problem y′′+2y′+5y=16e^−tcos(2t), y(0)=6, y′(0)=0

Find the solution of the initial value problem y′′+2y′+5y=16e^−tcos(2t), y(0)=6, y′(0)=0