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7 October, 13:08

A cosmic ray electron moves at 7.65 ✕ 106 m/s perpendicular to the Earth's magnetic field at an altitude where field strength is 1.10 ✕ 10-5 T. What is the radius (in m) of the circular path the electron follows?

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Answers (2)
  1. 7 October, 15:29
    0
    Force of a magnetic field, Fm = q * v * B

    Centipetal force, Fa = (M * v^2) / r

    Therefore, Fm = Fa

    q * v * B = (M * v^2) / r

    r = (m * v) / (q * B)

    Where,

    r = radius

    m = mass of electron

    = 9.1 * 10^-31 kg

    q = electron charge

    = 1.602 * 10^-19 C

    B = magnetic field

    = 1.10 ✕ 10^-5 T

    v = velocity

    = 7.65*10^6 m/s

    r = (9.1 * 10^-31) * (7.65 * 10^6) / (1.6 * 10^-19) * (1.10 * 10^-5)

    = 3.95 m
  2. 7 October, 16:48
    0
    Radius = 3.96m

    Explanation:

    In a cyclotron motion, the radius of a charged particle path in a magnetic feild is given by:

    r = mv/qB

    Where r = radius

    m = mass of particle = 9.1*10^-31kg

    q = charged electron = 1.6*10^-19C

    B = magnetic feid = 7.65*10^6T

    V = velocity = 7.65*10^6

    r = (9.1*10^-31) * (7.65*10^6) / (1.6*10^-19) (1.10 * 10^-5)

    r = (6.9615*10^-24) / (1.76 * 10^-24)

    r = 3.96m
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