2) Consider a cylindrical distribution of charge whose base coincides with the plane z 0 and axis on the z-axis. The cylindrical surface has a length L with radius p and has a uniform charge distribution e, c/m² on its surface. Aim: To determine the electric field intensity at a distance P(0, 0, h) A. Draw the figure B. The electric field intensity on the z-axis of a ring of charge for the figure shown below is:

ANSWER C D and E only

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2) Consider a cylindrical distribution of charge whose base coincides with the plane z = 0 and axis on the z-axis. The cylindrical surface has a length L with radius p and has a uniform charge distribution p, c/m² on its surface. Aim: To determine the electric field intensity at a distance P(0, 0, h) A. Draw the figure B. The electric field intensity on the z-axis of a ring of charge for the figure shown below is: E 3/2 2 + °3; (0, 0, z) Now, if you take a strip on the cylindrical surface in a form of a ring, a distance z from the origin with a differential height of dz, what is then the differential expression of electric field intensity (dE ) at point P? Show the diagram for the extracted differential strip. C. What is the expression of your d p, ? E dE D. To find at point P, integrate in (B) from z = 0 to z = L. What is ? E. What is E at h 0? At h= L/2 and at h= L?