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Lecture 22’. We didn’t do very well. I’m particularly disturbed by problem 2 so I want to look at that one in some detail. If we have time I’ll look at three and four as well. Find the steady state horizontal motion of a 1 kg mass attached to a vertical wall
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I’m particularly disturbed by problem 2 so I want to look at that one in some detail If we have time I’ll look at three and four as well
Find the steady state horizontal motion of a 1 kg mass attached to a vertical wall by a 16 N/m spring and a 1 Ns/m damper if the wall oscillates in the horizontal direction at a frequency of 4 rad/sec with a peak to peak amplitude of 2 mm
Find the steady state horizontal motion of a 1 kg mass attached to a vertical wall by a 16 N/m spring and a 1 Ns/m damper if the wall oscillates in the horizontal direction at a frequency of 4 rad/sec with a peak to peak amplitude of 2 mm No homogeneous solution No need to think about finding natural frequencies No need to do anything about exp(st)
Find the steady state horizontal motion of a 1 kg mass attached to a vertical wall by a 16 N/m spring and a 1 Ns/m damper if the wall oscillates in the horizontal direction at a frequency of 4 rad/sec with a peak to peak amplitude of 2 mm gravity is irrelevant
Find the steady state horizontal motion of a 1 kg mass attached to a vertical wall by a 16 N/m spring and a 1 Ns/m damper if the wall oscillates in the horizontal direction at a frequency of 4 rad/sec with a peak to peak amplitude of 2 mm Numbers for when we get to the analysis
Find the steady state horizontal motion of a 1 kg mass attached to a vertical wall by a 16 N/m spring and a 1 Ns/m damper if the wall oscillates in the horizontal direction at a frequency of 4 rad/sec with a peak to peak amplitude of 2 mm It’s attached to the world in such a way that the horizontal motion is possible
Find the steady state horizontal motion of a 1 kg mass attached to a vertical wall by a 16 N/m spring and a 1 Ns/m damper if the wall oscillates in the horizontal direction at a frequency of 4 rad/sec with a peak to peak amplitude of 2 mm There is no external forcing This is a “ground motion” problem
Find the steady state horizontal motion of a 1 kg mass attached to a vertical wall by a 16 N/m spring and a 1 Ns/m damper if the wall oscillates in the horizontal direction at a frequency of 4 rad/sec with a peak to peak amplitude of 2 mm wf= 4 yW = 1 sin(4 t) OR yW = 1 cos(4 t) or anything else that is harmonic with frequency 4
Draw a picture m c k yW = sin(4t)
Now we need equations of motion and it doesn’t matter how you find them I think FBD is easier for this problem, but I’ll do both
The Lagrangian which we can see is the same thing, as it must be
The Lagrangian What people missed
So how do we solve the problem?? Let’s look at the sine choice (one person did cosine and got it pretty much right)
I’d also like to take a look at problem 3 the only 2DOF problem
Find the general homogeneous solution for the motion of two carts, one of mass 1.5 kg and the other of 3 kg mass if they are connected by a 100 N/m spring. The carts are free to roll on the ground.
Find the general homogeneous solution for the motion of two carts, one of mass 1.5 kg and the other of 3 kg mass if they are connected by a 100 N/m spring. The carts are free to roll on the ground. No particular solution we are going to have to do the exp(st) procedure
Find the general homogeneous solution for the motion of two carts, one of mass 1.5 kg and the other of 3 kg mass if they are connected by a 100 N/m spring. The carts are free to roll on the ground. Almost certainly two degrees of freedom
Find the general homogeneous solution for the motion of two carts, one of mass 1.5 kg and the other of 3 kg mass if they are connected by a 100 N/m spring. The carts are free to roll on the ground. Data
Find the general homogeneous solution for the motion of two carts, one of mass 1.5 kg and the other of 3 kg mass if they are connected by a 100 N/m spring. The carts are free to roll on the ground. If there is a zero frequency you are going to need to use it
Draw a picture y1 y2 k m1 m2
dots become s and we can go to a matrix form
The modal vectors for this come from the “eigenvectors” For s = 0
For s = 10j So the general solution is
Find the motion of a 1 m long inverted simple pendulum with a 0.5 kg bob if the bob is connected to a fixed vertical wall by a 54.905 N/m spring k. Suppose the system to start from rest with an initial angle of 5° from the vertical. Suppose that the small angle approximation is valid.
Find the motion of a 1 m long inverted simple pendulum with a 0.5 kg bob if the bob is connected to a fixed vertical wall by a 54.905 N/m spring k. Suppose the system to start from rest with an initial angle of 5° from the vertical. Suppose that the small angle approximation is valid. means upsidedown means the rod is massless
Find the motion of a 1 m long inverted simple pendulum with a 0.5 kg bob if the bob is connected to a fixed vertical wall by a 54.905 N/m spring k. Suppose the system to start from rest with an initial angle of 5° from the vertical. Suppose that the small angle approximation is valid. one object, one degree of freedom
Find the motion of a 1 m long inverted simple pendulum with a 0.5 kg bob if the bob is connected to a fixed vertical wall by a 54.905 N/m spring k. Suppose the system to start from rest with an initial angle of 5° from the vertical. Suppose that the small angle approximation is valid. initial condition on velocity is zero
Find the motion of a 1 m long inverted simple pendulum with a 0.5 kg bob if the bob is connected to a fixed vertical wall by a 54.905 N/m spring k. Suppose the system to start from rest with an initial angle of 5° from the vertical. Suppose that the small angle approximation is valid. means that you can linearize the equations and is a hint that the angle might be the best variable
The rest of the information is just data, so it’s time to draw a picture k m1 (y1, z1) q1 z y
Again I like the Lagrangian method constraints Don’t linearize here unless you are very clever
Linearize Natural frequency
