abvegto Posted August 14, 2012 Posted August 14, 2012 (edited) ...Consider a planet which moves from A to B in a small time dT...under polar co- ordinate system let the radius vector be r vector from the origin o. that is OA = Ob = rvector angle AOX = y angle BOX = y+dy therefore change in angle is dy now let the planet move from A to B in small time dT....let it cover a distance dSvector ...here dA ( the area covered by the planet in time dT) = 1/2 rvector x dSvector dividing by dT .... dA/dT = 1/2 rvector x dS/dT ..... dA/dT =1/2 rvector x vvector multiplying and dividing by 'm'.. the mass of the planet .... dA/dT = 1/2m (r x mv) .... dA/dT = 1/2m (r x p)............. 1 differentiating 1 again with T we get ..... d2A/dT2 = 1/2m [ (dr/dt x p) x (r x dp/dt)] ......d2A/dT2 = 1/2 m {[ v x (mv)] x [(r x f)]} ....................= 1/2 m (r x f).........2 but since the gravitational force is an example for a central force therefore force acts along the direction of r...that is sin theta = 0 therefore r x f = 0 therefore 2 becomes ....d2A/dT2 = 0 => dA /dT = CONSTANT hence the second law is proved MY QUESTION IS....IN MY EXAM I WROTE THIS PROOF AND I GOT 0 MARKS!..I CANT UNDERSTAND WHERE DID I GO WRONG... OF COURSE THE BOOKISH PROOF IS DEFFERENT....CAN U GUYS PLEASE PIN POINT MY MISTAKE?... and sorry for my english... Edited August 14, 2012 by abvegto
Mellinia Posted August 26, 2012 Posted August 26, 2012 (edited) now let the planet move from A to B in small time dT....let it cover a distance dSvector ...here dA ( the area covered by the planet in time dT) = 1/2 rvector x dSvector why is the dA = 1/2 rvector X dSvector? shouldn't it be dA = 1/2 rvector X (dy)^2? doesn't dS=rvectordy? Edited August 26, 2012 by Mellinia
Mellinia Posted August 27, 2012 Posted August 27, 2012 why is the dA = 1/2 rvector X dSvector? shouldn't it be dA = 1/2 rvector X (dy)^2? doesn't dS=rvectordy? sorry, it should have been dA = 1/2( rvector)^2 (dy) instead
abvegto Posted September 9, 2012 Author Posted September 9, 2012 becoz ds vector = r dy (like s = r x) so i have the freedom of using either 'rx' (r dy) or 's'(ds) since they represent one and the same thing...
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