the following problem is of a two-mass system. I have 2 questions
1. find the transfer function from input F2 to output x1
2. for the transfer function found, determine the sensitivity to variation in parameter B12
note: i already found the differential eqns of motion for t>0
Firstly, find the differential equations by applying laws of dynamic equilibrium. Subsequently, take the laplace transforms and express the equations in terms of X1(s) and F2(s). And finally, divide X1(s) by F2(s).
the following problem is of a two-mass system. I have 2 questions 1. find the transfer...
For the system shown in Fig. 1, solve the following problems. (a) Find the transfer function, G(s)X2 (s)/F(s) (b) Does the system oscillate with a unit step input (f (t))? Explain the reason (c) Decide if the system(x2 (t)) is stable with a unit step input (f (t))? Explain the reason 1. 320) 8 kg 2 N/m 4N-s/m 2N-s/m Fig. 1 2. There are two suspensions for a car as shown in Fig. 2 (a) Find the equations of each...
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Doing a system dynamics problem I have found a transfer function to be 1/(2s+4). Can you show me how to get the transient, steady state as well as the homogenous, particular solutions? Each pair added should be equivalent but my answers are not agreeing. By taking inverse laplace I found v(t)= (1/2)(e^-2t) which I believe is the transient and Steady state = 0. Based on the initial condition v(0)=0, v,homogenous should equal zero. The input is a unit impulse (A=1) so...
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