If you substitute the expressions for ω₁ and ω₂ into Equation 9.1 and use the trigonometric identities cos(a+b) = cos(a)cos(b) - sin(a)sin(b) and cos(a-b) = cos(a)cos(b) + sin(a)sin(b), you can derive Equation 9.4.

How does equation 9.4 differ from the equation of a simple harmonic oscillator? (see attached image)

Group of answer choices

A. The amplitude, A_mod, is twice the amplitude of the simple harmonic oscillator, A.

B. The amplitude is time dependent

C. The oscillatory behavior is a function of the amplitude, A instead of the period, T.

D. It does not differ from a simple harmonic oscillator.

Transcribed Image Text:

V = 1 + 2 = A cos (w1 t) + A cos (wz t) ---- Equation 9.1 %3D 1 Wbeat 2 W1 = Way + - w2 = Wav Wbeat 1 1 V = A cOS Wav Wbeat + A CoS Wav Wbeat + = A [{cos (Way t) cos Wpeat t sin (way t) sin Wbeat 2 1 {cos (wav t) cos Wbeat t + sin (way t) sin Wbeat t}| V = 2 A cos (wav t) cos Wbeat 2 - (금 1 Wbeat 2 Amod (t) = 2 A cos = Amod (t) cos (Wav t) Equation 9.4 -----