Calculate (i) the electric potential at the position of the particle (ii) the value of the fixed charge. A charged particle carrying charge 1 μ c is moving with velocity ( 2 ^ i + 3 ^ j + 4 ^ k ) ms − 1 For that electric charge to move around in the electric field requires work
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Either work gets done when the charge is pushed around, or the particle does work moving against the field.
A particle having a charge of 5 micro coloumb is initially at rest at the point x=30 cm on the x.
This result is obtained using gauss's law, relating the enclosed charge and the permittivity of free space A particle carrying a charge of 10 î¼c starts from rest in a uniform electric field of intensity 50 v/m Find the force on the particle and the kinetic energy it acquires when it has moved 1 m. The electrical potential energy of the charge is given by the formula
E = qv/2 where e = electrical potential energy q = charge v = potential at the point given The electric potential energy of the charge. A positively charged particle q1=25 nc is held fixed at the origin
