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A finite line of charge with linear charge density A 3.35 x10 Clm, and length L-0.654...
A finite line of charge with linear charge densityA-3.35 x 106 C/m, and length L-0.940 m is located along the x axis (from x = 0 to x = L). A point charge of q =-7.10 x 10° C is located at the point xo 1.56 m, yo -3.25 m. Find the electric field (magnitude and direction as measured from the +x axis) at the point P which is located along the x axis at Xp 10.3 m. The Coulomb...
Potential of a Finite RodA finite rod of length L has total charge q, distributed uniformly along its length. The rod lies on the x-axis and is centered at the origin. Thus one endpoint is located at (-L/2,0), and the other is located at (L/2,0). Define the electric potential to be zero at an infinite distance away from the rod. Throughout this problem, you may use the constant k in place of the expression .a) What is VA, the electric potential...
A finite line of positive charge(with linear density lambda) is centered at the origin along on the x-axis from Beginning with dE and integrating the electric field E at a point h on the y-axis is given by:
A disk of radius R = 7.52 cm, is centered at the origin and lies along the y–z plane. The disk has a surface charge density σ = 3.11 × 10-6 C/m2. Evaluate the electric field produced by this disk along the x axis at point P = (1.55 m, 0.00 m). The Coulomb force constant k = 1/(4π ε0) = 8.99 × 109 N·m2/C2.
A disk of radius R = 9.54 cm, is centered at the origin and lies along the y–z plane. The disk has a surface charge density σ = 4.07 × 10-6 C/m2. Evaluate the electric field produced by this disk along the x axis at point P = (1.01 m, 0.00 m). The Coulomb force constant k = 1/(4π ε0) = 8.99 × 109 N·m2/C2.
The figure below shows a finite line charge with linear charge density of λ and total length L. The point P shown is a distance s away from its end. Please calculate a formula for the electric field at point P, in terms of λ, L and s. Then use the following values to find it numerically. λ = +7 μC/m, L = 4 m, s = 3 m P = _____ N/C î + _____ N/C j The figure...
to find the electric field along a line bisecting a finite length assuming that the charge distribution is points) To find the electric field along aline bisecting a finite length assuming that the charge distribution the contributions the field is -A for -a <x<o and for o ex<a, we integrate to from all the charge in the wire. We assume that the wire lies along the x-axis a 2 /(z 5.635 10-8 C/m, a 0.22m, ask E(y 1.00m).
A straight rod of length L = 21.60 cm, carries a uniform charge density, A = 1.95 Times 10^-6 C/m. The rod is located along the y-axis from y_1 = 0.00 to y_2 = L Find the expression for the electric field along the y-axis, E_y, at a point P, What is the magnitude of the electric field at y_0 = 50.00 cm?
LC-5 A line of length L with constant linear charge density +2(C/m) lies on the x axis. A point P lies on the perpendicular bisector of the line (the y axis). a) Show the details of the symmetry argument (pick dq's and show their dE's) to explain which of the two components (x or y) of the net field at point P are equal to zero due to the entire line of charge. Use the figure in your explanation. Explicitly...
A thin rod of length L lies along the x-axis. It has a uniform linear charge distribution λ0. a) What is the value of the electric potential at a given point x located to the right of the rod? Take V=0 at infinity.b) What is the strength of the electric field at the point x?