Laws of Motion - Result Question 53

53. A block of mass $10 kg$ is in contact against the inner wall of a hollow cylindrical drum of radius $1 m$. The coefficient of friction between the block and the inner wall of the cylinder is 0.1 . The minimum angular velocity needed for the cylinder to keep the block stationary when the cylinder is vertical and rotating about its axis, will be : $(g=10 m / s^{2})$

[2019]

(a) $\sqrt{10} rad / s$

(b) $\frac{10}{2 \pi} rad / s$

(c) $10 rad / s$

(d) $10 \pi rad / s$

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Answer:

Correct Answer: 53. (c)

Solution:

  1. (c) Given mass of block, $m=10 kg$; radius of cylindrical drum, $r=1 m$; coefficient of friction between the block and the inner wall of the cylinder $\mu=0.1$;

Minimum angular velocity $\omega _{\min }$

For equilibrium of the block limiting friction

$f_L \geq mg$

$\Rightarrow \mu N \geq mg$

$\Rightarrow \mu r \omega^{2} \geq mg$

Hrere, $N=mr \omega^{2}$

or, $m \geq \sqrt{\frac{g}{r \mu}}$

or, $\omega _{\min }=\sqrt{\frac{g}{r \mu}}$

$\therefore \omega _{\min }=\sqrt{\frac{10}{0.1 \times 1}}=10 rad / s$



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