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20 Nov 2019
Two conductors exist in the x-y plane; the conductors are infinitely long in the z direction. One of the conductors is formed bv the +x axis, and exists between x = 2 cm and x = 20 cm as shown. The second conductor is a plane rotated from the +x axis by 30 degrees as shown, and exists between r = 2 cm and r = 20 cm. where r is the cylindrical coordinate. An electric field E =phi 90/ pi r V/m exists in the free space region between the two conductors. Show that the electric field satisfies the equations of electrostatics in free space (differential form).
Two conductors exist in the x-y plane; the conductors are infinitely long in the z direction. One of the conductors is formed bv the +x axis, and exists between x = 2 cm and x = 20 cm as shown. The second conductor is a plane rotated from the +x axis by 30 degrees as shown, and exists between r = 2 cm and r = 20 cm. where r is the cylindrical coordinate. An electric field E =phi 90/ pi r V/m exists in the free space region between the two conductors. Show that the electric field satisfies the equations of electrostatics in free space (differential form).
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