solve the following two elctromag problems Dirac in 1931. Dirac showed that if any magnetic monopoles exist in the universe, then all electric charge in the universe must be quantized (now known a...
Dirac in 1931. Dirac showed that if any magnetic monopoles exist in the universe, then all electric charge in the universe must be quantized (now known as the "Dirac quantization condition") electric charge is, in fact, quantized, which is consistent with (but does not prove) the existence of . (4 points) Write all four of Maxwell's equations if magnetic monopoles exist. . (6 points) If a monopole sits at the origin, its magnetic field would be written B/2), where g is the "magnetic charge" (analogous to e for electric charge). In spherical coordinates, we can find the only non-vanishing component of the vector potential is Аф-g(1-cos ф), where A* is defined as A dFE As do. According to quantum mechanics (take my word on this), the quantity must be equal to unity. Use this requirement to determine the charge quantization condition. What is the minimum allowed magnetic charge?
Dirac in 1931. Dirac showed that if any magnetic monopoles exist in the universe, then all electric charge in the universe must be quantized (now known as the "Dirac quantization condition") electric charge is, in fact, quantized, which is consistent with (but does not prove) the existence of . (4 points) Write all four of Maxwell's equations if magnetic monopoles exist. . (6 points) If a monopole sits at the origin, its magnetic field would be written B/2), where g is the "magnetic charge" (analogous to e for electric charge). In spherical coordinates, we can find the only non-vanishing component of the vector potential is Аф-g(1-cos ф), where A* is defined as A dFE As do. According to quantum mechanics (take my word on this), the quantity must be equal to unity. Use this requirement to determine the charge quantization condition. What is the minimum allowed magnetic charge?