A) At\[{{P}_{4}}\]
B) At\[{{P}_{1}}\]
C) At\[{{P}_{2}}\]
D) At\[{{P}_{3}}\]
Correct Answer: A
Solution :
Key Idea: Angular momentum is conserved. From law of conservation of angular momentum, we have \[J=I\omega =\]constant where, \[I\] is moment of inertia and \[\omega \] is angular velocity. Also, \[I=M{{R}^{2}}\]and\[\omega =\frac{v}{R}\] \[\therefore \] \[v\propto \frac{1}{R}\] At \[{{P}_{4}}\] the value of \[R\] is minimum, hence the velocity is maximum or kinetic energy will be maximum.You need to login to perform this action.
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