(a) Show that x(t) given in part (a) of Problem 39 can be written in the form (b) If we define ( ), show that when is small an approximate solution is When is small, the frequency 2p of the impressed force is close to the frequency 2 of free vibrations When this occurs, the motion is as indicated i...

In the given problem we are asked to demonstrate how the expression for xt given in Problem 39 can be transformed into another form and to then use th ...

(a) Show that x(t) given in part (a) of Problem 39 can be written in the form...

Question:

(a) Show that x(t) given in part (a) of Problem 39 can be written in the form

-2Fo w? - y? x(t) sin n극(y-a)t sin(y + o). %3D + w)t.

(b) If we define ε = ½(γ – ω), show that when ε is small an approximate solution is

When ε is small, the frequency γ/2p of the impressed force is close to the frequency ω/2σ of free vibrations. When this occurs, the motion is as indicated in Figure 5.1.22. Oscillations of this kind are called beats and are due to the fact that the frequency of sin t is quite small in comparison to the frequency of sin γt. The dashed curves, or envelope of the graph of x(t), are obtained from the graphs of ±(F₀/2εγ) sin εt. Use a graphing utility with various values of F₀, ε, and γ to verify the graph in Figure 5.1.22.

Figure 5.1.22.