Laplace Transforms: Coupled Springs

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Jaymin Joseph

Part 1: Laplace Transform

Problem Statement: (Equations typed out in mathcad and uploaded as images)

This is a system of two masses connected by two springs with spring constants k1 and k2. This system is shown below. Fbd.JPG

From the FBD, the equations of motion can be determined to be as follows:

2.jpg

To solve the system let K1=6 k2=4, m1=1, m2=1 and x1(0)=0, x1'(0)=1 x2(0)=0, x2'(0)=-2

3.jpg

4.jpg


Part 2: Inverse Laplace Transform

5.jpg


Part 3: Initial-Value & Final-Value Theorem

By definition, the Initial-Value Theorem is,

and the Final-Value Theorem is,


Applying this to the system i get the following.

6.jpg

Part 4: Bode Plot


Part 5:Magnitude Frequency Response



Part 6: Convolution

the definition of convolution of two functions is,

applying the definition of convolution to this system we get:

7.jpg