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A circular ring of radius R with uniform...

A circular ring of radius R with uniform positive charge density `lambda` per unit length is located in the y z plane with its center at the origin O. A particle of mass m and positive charge q is projected from that point `p( - sqrt(3) R, 0,0)` on the negative x - axis directly toward O, with initial speed V. Find the smallest (nonzero) value of the speed such that the particle does not return to P ?

Text Solution

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`V_(x)=(kq)/(sqrt(R^(2)+x^(2)))=(kq)/(sqrt(R^(2)+(sqrt(3)R)^(2)))=(kq)/(2R)`
P.E. of charge q at `P(sqrt3,0,0)` is `U_(P)=Vq=(kq^(2))/(2R)`
P.E. of charge q at the centre of ring
`U_(0)=V_(0)q=(kq^(2))/(R)`
In order that the charged particle does not return to P, it must just cross the centre O and thereafter it will be repelled on the other side
Applying energy conservation principle
`(KE)_(p)+U_(P)=U_(0)`
`implies (1)/(2)mv^(2)+(kq^(2))/(2R)=(kq^(2))/(R)impliesV=sqrt((kq^(2))/(mR))=sqrt((q^(2))/(4piepsilon_(0)mR))`
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