Question:medium
Vertical displacement of a plank with a body of mass \(m\) on it is varying according to law
\[
y=\sin(\omega t)+\sqrt{3}\cos(\omega t).
\]
The minimum value of \(\omega\) for which the mass just breaks off from the plank and the moment it occurs is first after \(t=0\), are given by:
Vertical displacement of a plank with a body of mass \(m\) on it is varying according to law
\[
y=\sin(\omega t)+\sqrt{3}\cos(\omega t).
\]
The minimum value of \(\omega\) for which the mass just breaks off from the plank and the moment it occurs is first after \(t=0\), are given by:
Show Hint
Separation occurs when normal reaction becomes zero:
\[
a_{\text{down}}=g
\]
Find maximum downward acceleration.
Updated On: Mar 23, 2026
- \(\sqrt{\frac{g}{2}},\;\frac{\sqrt{2}\pi}{6}\)
- \(\sqrt{\frac{g}{3}},\;\frac{2\pi}{\sqrt{3}g}\)
- \(\sqrt{\frac{g}{2}},\;\frac{\pi}{3\sqrt{2}}\)
- \(\sqrt{2g},\;\frac{\sqrt{2}\pi}{3g}\)
Show Solution
The Correct Option is A
Solution and Explanation
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