Study of Spring-Mass Systems

Example 7. Equal Masses, Unequal spring constants. Find the general solution to the system of D. E.'s and plot the solution curves.

[Graphics:Images/SpringMassMod_gr_245.gif]

Solution 7.

[Graphics:../Images/SpringMassMod_gr_247.gif]

Put the D.E.'s in operator form and eliminate y to obtain a fourth order D.E. for x, and find the roots of its characteristic equation.

[Graphics:../Images/SpringMassMod_gr_249.gif]

The roots are pure complex, , and the natural frequencies , respectively. The general solution is formed as follows.

[Graphics:../Images/SpringMassMod_gr_253.gif]

Aside. The eigenfrequencies can be obtained by taking the square root of the eigenvalues of the matrix .

It is useful to look at the two natural modes of oscillation of the spring mass system and they exhibit the natural frequencies , respectively.

[Graphics:../Images/SpringMassMod_gr_259.gif]

We can verify these solutions.

[Graphics:../Images/SpringMassMod_gr_261.gif]

[Graphics:../Images/SpringMassMod_gr_263.gif]

Plot the functions and . In this mode of oscillation the masses are moving in opposite directions.

[Graphics:../Images/SpringMassMod_gr_267.gif]

[Graphics:../Images/SpringMassMod_gr_268.gif]

Plot the functions and . In this mode of oscillation the masses are moving in the same directions.

[Graphics:../Images/SpringMassMod_gr_272.gif]

[Graphics:../Images/SpringMassMod_gr_273.gif]

Assume that the equilibrium position along the horizontal axis is 2 and 6. The two masses move in the same direction with the frequency ,
as seen in the next graph, where time is along the vertical axis.

[Graphics:../Images/SpringMassMod_gr_276.gif]

[Graphics:../Images/SpringMassMod_gr_277.gif]

Assume that the equilibrium position along the horizontal axis is 2 and 6. The two masses move in opposite directions with the frequency ,
as seen in the next graph, where time is along the vertical axis.

[Graphics:../Images/SpringMassMod_gr_280.gif]

[Graphics:../Images/SpringMassMod_gr_281.gif]