Question

Show that if a solid spherical ball rolls with an arbitrary horizontal velocity without slipping on a horizontal turntable that is rotating with a fixed rotational frequency, the ball undergoes circular motion with a frequency that is 2/7 the frequency of the turntable, independent of initial conditions.

Answer 1

If angular velocity of turntable = w ² R= position vector of ball obalt angular velocity of ball ho Ra Ball radices = R2 Ball's velocity in lab frame : P = (W x ²) + (w ball > R) - force on ball due to friction from turntable E = m dv - Dalso Z = dł 1. It - Rx² - Id to ball - det From ego “@ -RX w db)- I deco ball * dual = Rpm) 3 x By taking of derivative of eq" ® dx = ( x dx) + (altoail *R) = (x3) + Lle Rompex obf)* Re] Weing lexible e' - (.2) – (8.2) Å de = (x 3) - Romane de euro - Tm at at

For S 5 I= 2 m RP (for spherical shell) - 9 dỷ - 3 ả x for ball undergoes # circular motion - with frequency a the frequency of It 7 PA 1. turntable.

Please rate it up thanks :)