Solved: PHYSICS Question for NEET

NEET PHYSICSMedium

The equation of a simple harmonic wave is given by $y=3\sin\frac{\pi}{2}(50t-x)$ where $x$ and $y$ are in meters and $t$ is in seconds. The ratio of maximum particle velocity to the wave velocity is:

$2\pi$

$\frac{3}{2}\pi$

$3\pi$

$\frac{2}{3}\pi$

Step-by-Step Solution

Identify the Given Wave Equation: The equation is $y = 3\sin\frac{\pi}{2}(50t - x)$ , which can be rewritten as $y = 3\sin(25\pi t - \frac{\pi}{2}x)$ .
Compare with the Standard Wave Equation: The standard progressive wave equation is $y = A\sin(\omega t - kx)$ . By comparing, we get:

Amplitude, $A = 3 \text{ m}$
Angular frequency, $\omega = 25\pi \text{ rad/s}$
Wave number, $k = \frac{\pi}{2} \text{ m}^{-1}$

Calculate Maximum Particle Velocity ( $v_{\max}$ ): The maximum particle velocity is given by $v_{\max} = A\omega = 3 \times 25\pi = 75\pi \text{ m/s}$ .
Calculate Wave Velocity ( $v$ ): The wave velocity is given by $v = \frac{\omega}{k} = \frac{25\pi}{\pi/2} = 50 \text{ m/s}$ .
Find the Ratio: The ratio of maximum particle velocity to the wave velocity is: $\frac{v_{\max}}{v} = \frac{75\pi}{50} = \frac{3}{2}\pi$ (Alternatively, this ratio can be directly found as $Ak = 3 \times \frac{\pi}{2} = \frac{3}{2}\pi$ ).

Practice Mode Available

Master this Topic on Sushrut

Join thousands of students and practice with AI-generated mock tests.

Get Started