What is the velocity of a beam of electrons that goes undeflected when passing through perpendicular electric and magnetic fields of magnitude 8100 v/m and 6.0×10?3 t , respectively?
F = qE + qV × B where force F, electric field E, velocity V, and magnetic field B are vectors and the × operator is the vector cross product. If the electron remains undeflected, then F = 0 and E = -V × B which means that |V| = |E| / |B| and the vectors must have the proper geometrical relationship. I therefore get |V| = 8.8e3 / 3.7e-3 = 2.4e6 m/sec Acceleration a = V²/r, where r is the radius of curvature. a = F/m, where m is the mass of an electron, so qVB/m = V²/r. Solving for r yields r = mV/qB = 9.11e-31 kg * 2.37e6 m/sec / (1.60e-19 coul * 3.7e-3 T) = 3.65e-3 m
