Charge is distributed uniformly throughout the volume of an infinitely long cylinder of radius R = 4.00×10-2 m. The charge density is 6.00×10-2 C/ m3. What is the electric field at r =8.00×10-2 m?
Charge is distributed uniformly throughout the volume of an infinitely long cylinder of radius R =...
Charge is distributed uniformly throughout the volume of an infinitely long cylinder of radius R = 2.00×10-2 m. The charge density is 3.00×10-2 C/ m3. What is the electric field at r = 1.00×10-2 m? What is the electric field at r = 4.00×10-2 m?
mall portion of an infinitely long cylinder is shown. The radius of the cylinder is R = 4 m and the charge is uniformly distributed throughout the cylinder with a volume charge density of ρ = 0.6 nC/m^3. Gauss's law to find the magnitude of the electric field at a distance r 18 m from the center of the cylinder as shown. Your answer should be in units of N/C. Use Submit Answer Tries /2
(20 pts) A thick, infinitely long cylinder, with radius R is uniformly charged with volume charge density p. Using Gauss's Law, find the electric field for (a) r < R, and (b) r > R. P R
Charge Q is distributed uniformly throughout the volume of an insulating sphere of radius R = 4.00 cm. At a distance of r = 8.00 cm from the center of the sphere, the electric field due to the charge distribution has magnitude 640 N/C . a. What is the volume charge density for the sphere? Express your answer to two significant figures and include the appropriate units. b. What is the magnitude of the electric field at a distance...
Suppose a positive charge is uniformly distributed throughout the volume of a long glass cylinder of radius R and a charge per volume of p (greek letter row). Derive an expression for the electric field inside and outside the cylinder.
2. Let's consider a long solid cylinder with radius R that has positive charge uniformly distributed throughout it, with charge per unit volume a) Find the electric field inside the cylinder at a distance r from the axis in terms of ?. b) Find the electric field at a point outside the cylinder in terms of the charge per unit length ? . c) Com pare the answers to parts (a) and (b) for r = R.
(1) Consider a very long uniformly charged cylinder with volume charge density p and radius R (we can consider the cylinder as infinitely long). Use Gauss's law to find the electric field produced inside and outside the cylinder. Check that the electric field that you calculate inside and outside the cylinder takes the same value at a distance R from the symmetry axis of the cylinder (on the surface of the cylinder) .
An infinitely long insulating cylinder of radius R has a volume charge density that varies with the radius as p po (a-where po a and b are positive constants and ris the distance from the axis of the cylinder. Use Gauss's law to determine the magnitude of the electric field at radial distances (a) r< R and (b)r>R
An infinitely long insulating cylinder of radius R has a volume charge density that varies with the radius as given by the following expression where po. a, and bare positive constants and ris the distance from the axis of the cylinder Use Gauss's law to determine the magnitude of the electric field at r R. (Use the following as necessary: E0. Po. a, b, r, and R 2πεο 2.03b c) c) 2. R 3.b e) Po
Consider an infinitely long cylinder with a volume charge density of p(rho) and radius a. Determine the electric field inside the cylinder at r=b (where ba).)>