Answer:
radius of circular path becomes doubled
Explanation:
As the charged particle is moving in a magnetic field then it experiences a centripetal force.
So, the magnetic force is balanced by the centripetal force
[tex]q\times v\times B = \frac{mv^{2}}{R}[/tex]
where, m be the mass of charged particle, q be the charge and v be the velocity, B be the magnetic field, R be the radius of circular path.
[tex]R = \frac{mv}}{qB}[/tex]
Here we observe that the radius of the path is directly proportional to the velocity of the charged particle.
R ∝ v ..... (1)
let the new radius be R' as the velocity is doubled
R' ∝ 2 v ..... (2)
Divide equation (2) by equation (1) we get
R' = 2 R
Thus, the radius of circular path becomes doubled.
