The maximum velocity of a simple harmonic motion represented by `y="sin"(100t+(pi)/(6))` is given by

To find the maximum velocity of the simple harmonic motion represented by the equation \( y = 3 \sin(100t + \frac{\pi}{6}) \), we can follow these steps: ### Step 1: Identify the parameters from the equation The general form of the equation for simple harmonic motion (SHM) is: \[ y = A \sin(\omega t + \phi) \] where: - \( A \) is the amplitude, - \( \omega \) is the angular frequency, - \( \phi \) is the phase constant. From the given equation \( y = 3 \sin(100t + \frac{\pi}{6}) \): - The amplitude \( A = 3 \), - The angular frequency \( \omega = 100 \). ### Step 2: Use the formula for maximum velocity The maximum velocity \( V_{\text{max}} \) in simple harmonic motion is given by the formula: \[ V_{\text{max}} = A \omega \] ### Step 3: Substitute the values into the formula Now, substituting the values of \( A \) and \( \omega \) into the formula: \[ V_{\text{max}} = 3 \times 100 \] ### Step 4: Calculate the maximum velocity Calculating the above expression: \[ V_{\text{max}} = 300 \] ### Conclusion Thus, the maximum velocity of the simple harmonic motion is \( 300 \) units.