A small ball of mass 100 g is attached to a light and inextensible string of length 50 cm. The string is tied to a support O and the mass m released from point A which is a' a horizontal distance of 30cm from the support. Calculate the speed of the ball is its lowest point of the trajectory.

A small ball of mass 100 g is attached to a light and inextensible str

1.	A small ball of mass 100 g is attached to a light and inextensible string of length 50 cm. The string is tied to a support O and the mass m released from point A which is a' a horizontal distance of 30cm from the support. Calculate the speed of the ball is its lowest point of the trajectory.
Answer» Solution :`mgxx0.4=(1)/(2)MV^(2)` `V=2sqrt(2)m//s` (from conservation of mechanical energy just before the string BECOMES taut during the APPLICATION of impulse, VELOCITY along perpendicular to the string remain same. So after impulse velocity of the ball equal to `(6sqrt(2))/(5)m//s` again from conservation of mechanical energy `(1)/(2)m((6sqrt(2))/(5))^(2)+mg(0.1)=(1)/(2)mv_(f)^(2)` Now velocity at the bottommost point `v_("final")=2.2m//s`

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A small ball of mass 100 g is attached to a light and inextensible string of length 50 cm. The string is tied to a support O and the mass m released from point A which is a' a horizontal distance of 30cm from the support. Calculate the speed of the ball is its lowest point of the trajectory.

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