Consider a system of three charges q/3,q/3 and –(2q)/3 placed at points A, B and C, respectively, asshown in the figure. Take O to be the centre of the circle of radius R and angle CAB = 60^@ :-

Consider a system of three charges q/3,q/3 and –(2q)/3 placed at poi

1.	Consider a system of three charges q/3,q/3 and –(2q)/3 placed at points A, B and C, respectively, asshown in the figure. Take O to be the centre of the circle of radius R and angle CAB = 60^@ :-
Answer» The electric FIELD at point O is`q/(8piepsilon_0R^2)` directed along the neagtive x-axis The POTENTIAL energy of the system is zero The magnitude of the force between the charges at C and B is `q^2/(54piepsilon_0R^2)` The potential at point O is `q/(12piepsilon_0R^2)` SOLUTION :Electric field at point O is vector sum of electric field due to all three point charges individually . `vecE.=vecE_A+vecE_B+vecE_C` and `vecE_A=-vecE_B` So `vecE.=vecE_C` `=(2q//3)/(4piepsilon_0R^2)` along `vecOC` `=q/(6piepsilon_0^2 R^2)` along `vecOC` `=-q/(6piepsilon_0R^2) HATI` From geometry , we can find that `angleABC=30^@` and `angleACB=90^@` So, AB=2R , AC=R , BC=`sqrt3R` Total potential energy of the system is, `U=1/(4piepsilon_0)[(q//3xxq//3)/(2R) -(q//3xx2q//3)/R-(q//3xx2q//3)/(sqrt3R)]ne0` `F=(q//3xx2q//3)/(4piepsilon_0xx(sqrt3R)^2)` `=q^2/(54piepsilon_0R^2)` Potential at point O is , `V=(q//3+q//3-2q//3)/(4piepsilon_0R)=0`

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Consider a system of three charges q/3,q/3 and –(2q)/3 placed at points A, B and C, respectively, asshown in the figure. Take O to be the centre of the circle of radius R and angle CAB = 60^@ :-

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