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A spherical planet (density = rho) of radius R has a spherical cavity of radius R/3, as shown (a) A small body is released at point P. How much time would it take to reach the lower surface of the cavity ? (b) A small body of mass m is placed at a distance 2R above point P, on the dotted line extended upwards. What force does the planet exert on the body ? |
Answer» (a) Net E constant inside covity `E=(8)/(9)pi rho GR` So `(2R)/(3)=(1)/(2)at^(2)` `T = sqrt((2xx2xxR//3)/((4)/(3)piGP(2R)/(3)))=sqrt((3)/(2pi rho G))` (B) `m[(G.(4)/(3)piR^(3)P)/((3R)^(2))-(G.(4)/(3)pi((R )/(3))^(3)P)/(((7R)/(3))^(2))]=(184)/(1323)MGP pi R` |
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