(D) The motion of the rod $AB$ can be described as a pure rotation about the Instantaneous Center of Rotation $(ICR)$.For a rod sliding between two pe

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(D) The motion of the rod $AB$ can be described as a pure rotation about the Instantaneous Center of Rotation $(ICR)$.For a rod sliding between two perpendicular walls,the velocity of end $A$ is vertical and the velocity of end $B$ is horizontal.The perpendicular lines drawn from the velocity vectors at $A$ and $B$ intersect at point $D$.Therefore,point $D$ is the $ICR$ of the rod at this instant.The kinetic energy of a body in pure rotation about an axis passing through the $ICR$ is given by $K = \frac{1}{2} I_{ICR} \omega^2$.Since the $ICR$ is at point $D$,the kinetic energy is $\frac{1}{2} I_D \omega^2$.

Class 11 Physics System of Particles and Rotational Motion Toppling and Instantaneous Axis of Rotation

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$A$ thin rod $AB$ is sliding between two fixed right-angled surfaces. At some instant,its angular velocity is $\omega$. If $I_X$ represents the moment of inertia of the rod about an axis perpendicular to the plane and passing through the point $X$ ($A, B, C,$ or $D$),the kinetic energy of the rod is:

A
$\frac{1}{2} I_A \omega^2$
B
$\frac{1}{2} I_B \omega^2$
C
$\frac{1}{2} I_C \omega^2$
D
$\frac{1}{2} I_D \omega^2$

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System of Particles and Rotational Motion

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Toppling and Instantaneous Axis of Rotation

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Two points $A$ and $B$ on a rigid body are moving as shown in the figure. The angular velocity of the body is:

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There is a rod of length $l$. The velocities of its two ends are $v_1$ and $v_2$ in opposite directions normal to the rod. The distance of the instantaneous axis of rotation from $v_1$ is:

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$A$ ladder of length $L$ is slipping with its ends against a vertical wall and a horizontal floor. At a certain moment,the speed of the end in contact with the horizontal floor is $v$ and the ladder makes an angle $\alpha = 30^o$ with the horizontal. Then the speed of the ladder's center must be

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