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Karnataka Board PUCPUC Science Class 11

A Box Weighing 2000 N is to Be Slowly Slid Through 20 M on a Straight Track with Friction Coefficient 0⋅2 with the Box.

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Question

A box weighing 2000 N is to be slowly slid through 20 m on a straight track with friction coefficient 0⋅2 with the box. (a) Find the work done by the person pulling the box with a chain at an angle θ with the horizontal. (b) Find the work when the person has chosen a value of θ, which ensures him the minimum magnitude of the force. 

Sum
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Solution

Given: \[\text{ Weight = 2000 N, s = 20 m }, \mu = 0.2\]

The free-body diagram for the box is shown below:
(a) From the figure,
 
\[R + P \sin \theta - 2000 = 0 . . . (i)\]
 
\[P \cos \theta - 0 . 2 R = 0 . . . (ii)\]
 
From (i) and (ii),
 
\[P \cos \theta - 0 . 2 \left( 2000 - P \sin \theta \right) = 0\]
 
\[P \left( \cos \theta + 0 . 2 \sin \theta \right) = 400\]
 
\[P = \frac{400}{\cos \theta + 0 . 2 \sin \theta} . . . (iii)\]
 
So, work done by the person,
 
\[W = PS \cos \theta\]
 
\[ = \frac{8000 \cos \theta}{\cos \theta + 0.2 \sin \theta}\]
 
\[ = \frac{8000}{1 + 0 . 2 \tan \theta}\]
 
\[ = \frac{40000}{5 + \tan \theta} . . . (iv)\]
 
(b) For minimum magnitude of force from equation (iii),
 
\[\frac{d}{dk} \left( \cos \theta + 0 . 2 \sin \theta \right) = 0\]
 
\[ \Rightarrow \tan \theta = 0.2\]
 
Putting the value in equation (iv),
 
\[W = \frac{40000}{\left( 5 + \tan \theta \right)}\]
 
\[ = \frac{40000}{5 + 0.2} \approx 7692 J\]
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Chapter 8: Work and Energy - Exercise [Page 133]

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HC Verma Concepts of Physics Volume 1 and 2 [English]
Chapter 8 Work and Energy
Exercise | Q 11 | Page 133

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