![SOLVED: Green 's functions Find an explicit expression for the Green's function for the critically dampedl harmonic oscillator: Hence solve the problem "+281 + 8'r = f(t) with r(t) i(t) = 0 SOLVED: Green 's functions Find an explicit expression for the Green's function for the critically dampedl harmonic oscillator: Hence solve the problem "+281 + 8'r = f(t) with r(t) i(t) = 0](https://cdn.numerade.com/ask_images/10d76a0e49cf45ebb3f457bd8b284b5d.jpg)
SOLVED: Green 's functions Find an explicit expression for the Green's function for the critically dampedl harmonic oscillator: Hence solve the problem "+281 + 8'r = f(t) with r(t) i(t) = 0
![SOLVED: 2 Green Function of the Damped Harmonic Oscillator in the Time-Domain (20 pts) We have seen that the response of the DHO to an impulse at t = T can be SOLVED: 2 Green Function of the Damped Harmonic Oscillator in the Time-Domain (20 pts) We have seen that the response of the DHO to an impulse at t = T can be](https://cdn.numerade.com/ask_images/9be4ce12849840f0a9510a93590f97ae.jpg)
SOLVED: 2 Green Function of the Damped Harmonic Oscillator in the Time-Domain (20 pts) We have seen that the response of the DHO to an impulse at t = T can be
![Classical Mechanics, Lecture 5: Harmonic Oscillator. Damped & Driven Oscillators. Greens Functions. - YouTube Classical Mechanics, Lecture 5: Harmonic Oscillator. Damped & Driven Oscillators. Greens Functions. - YouTube](https://i.ytimg.com/vi/3WCtYgCiwkI/maxresdefault.jpg)
Classical Mechanics, Lecture 5: Harmonic Oscillator. Damped & Driven Oscillators. Greens Functions. - YouTube
![homework and exercises - Green's Function Method for a Spring and mass system - Physics Stack Exchange homework and exercises - Green's Function Method for a Spring and mass system - Physics Stack Exchange](https://i.stack.imgur.com/hTTEk.png)
homework and exercises - Green's Function Method for a Spring and mass system - Physics Stack Exchange
![SOLVED: Problem 6 Use the Green's function from problem 4 to determine the damped harmonic = oscillator'5 response to a constant force. #+24 + 2y = 2 y(t) = 0 sin COS SOLVED: Problem 6 Use the Green's function from problem 4 to determine the damped harmonic = oscillator'5 response to a constant force. #+24 + 2y = 2 y(t) = 0 sin COS](https://cdn.numerade.com/ask_images/5b8c477c5921448e8a840c09d355a9d9.jpg)