solve diff equation: y''-y = 2sint- 3e^-t + 4t

solve diff equation: y'' - 2y' + y = (e^t)/t

solve diff equation: y'' - 2y' + y = (e^t)/t

y''-y=2sint-3e^{-t}+4t

y''-y=2sint-3e^{-t}+4t

Find the general solution of the equation: y" + 4y = t^2 + 3e^t salisfying y(0)...

Find the general solution of the equation: y" + 4y = t^2 + 3e^t salisfying y(0) = 1 and y'(0) = 0

Solve the di↵erential equation (t)dy/dt + 2y = 4t^2-3t + 4 subject to the initial condition...

Solve the di↵erential equation (t)dy/dt + 2y = 4t^2-3t + 4 subject to the initial condition y(1) = 3.

y'+y cos t = y^2 te^ sint Solve the equation

y'+y cos t = y^2 te^ sint Solve the equation

find the general solution of the differential equation: y' + 2y = te^−4t. Use lower case...

find the general solution of the differential equation: y' + 2y = te^−4t. Use lower case c for the constant in your answer. y(t) = _________________

Differential Equations (a) Write the function x(t)=−2cos(4t)+5sin(4t)x(t)=−2cos(4t)+5sin(4t) in the form x(t)=Acos(ωt−ϕ)x(t)=Acos⁡(ωt−ϕ). x(t)=   (b) Write the function...

Differential Equations (a) Write the function x(t)=−2cos(4t)+5sin(4t)x(t)=−2cos(4t)+5sin(4t) in the form x(t)=Acos(ωt−ϕ)x(t)=Acos⁡(ωt−ϕ). x(t)=   (b) Write the function x(t)=2cos(4t)+5sin(4t)x(t)=2cos(4t)+5sin(4t) in the form x(t)=Acos(ωt−ϕ)x(t)=Acos⁡(ωt−ϕ). x(t)=   (c) Write x(t)=e−3t(−2cos(4t)+5sin(4t))x(t)=e−3t(−2cos(4t)+5sin(4t)) in the form y(t)=Aeαtcos(ωt−ϕ)y(t)=Aeαtcos⁡(ωt−ϕ). x(t)=

Solve the equation y''−5y' + 4y = f(t) with f(t) = 1 (0 ≤ t ≤...

Solve the equation y''−5y' + 4y = f(t) with f(t) = 1 (0 ≤ t ≤ 5), f(t) = 0 (t > 5). and y(0) = 0 ,y'(0) = 1

solve the initial value problem: 2x-3e^(3x)y-e^(3x)y'=0 y(0)=2

solve the initial value problem: 2x-3e^(3x)y-e^(3x)y'=0 y(0)=2

Solve the Euler Equation t^2(y'')-5ty'+9y=0, t>0

Solve the Euler Equation t^2(y'')-5ty'+9y=0, t>0