Final answer:
In simple harmonic motion, the maximum velocity amplitude is equal to the product of the displacement amplitude and the angular frequency, represented by the equation |Vmax| = Aω.
Step-by-step explanation:
The relation between velocity amplitude ‘v’, the displacement amplitude ‘A’, and the angular frequency ‘ω’ in simple harmonic motion (SHM) is given by |Vmax| = Aω. This equation shows that velocity amplitude (also known as the maximum velocity) is the product of the displacement amplitude and the angular frequency. The displacement amplitude represents the maximum displacement of the object from its equilibrium position during the SHM, while the angular frequency is a measure of how often the motion repeats itself per unit time. It is important to note that the velocity is at a maximum when the displacement is zero (i.e., when the object passes through the equilibrium position).