A cylinder of radius R is rolling with velocity of centre of mass v=ωR2 towards right. Keeping the centre of the cylinder as the origin, Find the coordinates of the point with zero net velocity.
Let point p which has net zero velocity be at an angle θ as shown, and at a distance r from the centre.
Now →vp,0=→vp−→v0
⇒ Velocity of p with respect to ground,→vp=→vp,0+→v0
⇒→vp=(−ωrsinθ+V)^i+ωrcosθ^j
=0(zero net velocity)
⇒ωrcosθ=0⇒θ=90∘, and v=ωrsinθ,
⇒but v=ωR2∴r=R2
⇒coordinates of p are(0,−R2)