The following charges are located inside a metallic container on unknown shape: -4.10 ?C, -5.10 ?C, 65.0 ?C, and 58.0 ?C. Calculate the net electric flux, in Nm2/C, through the container.
he total of the electric flux out of a closed surface is equal to the charge enclosed divided by thepermittivity.
Total Charge Enclosed = (- 4.10 - 5.10 + 65.0 + 58.0)*10-6 C = 113.8*10-6 C
Total Flux = (113.8*10-6)/(8.85*10-12) = 12.859*106 Nm2/C
The following charges are located inside a metallic container on unknown shape: -4.10 ?C, -5.10 ?C,...
A charge Q is located inside a rectangular box. The electric flux through each of the six surfaces of the box is: Ф1 = +4340 Nm2/C, Ф2 = +4200 Nm2/C, Φ3 Nm2/C, Φ4 =-3280 Nm2/C, Φ5 =-4020 Nm2/C, and Φ6 =-5620 Nm2/C. what is Q? +5360 Number Units
A charge Q is located inside a sphere, 2.5 cm from its center. If the electric flux through the sphere due to this charge is 0.78 Nm2/C, what is the magnitude of charge Q?
Two test charges are located in the x – y plane. If qı = -4.10 nC and is located at x = 0.00 m, y= 0.720 m and the second test charge has magnitude of q2 = 4.00 nC and is located at x = 1.30 m, y=0.500 m, calculate the x and y components, Ex and Ey, of the electric field, Ē, in component form at the origin, (0,0). Ez = | N/C N/C
QUESTION 6 A closed surface with dimensions a=b=0.4 m and c=0.6 m is located as shown in the figure. If the electric field is non-uniform and given by: E = [(5.00+ 2.00x2){ – 2.509 – 2.50] N/C, where x is in meters. Calculate the Net electric flux leaving the closed surface. Y E X = a Z х +b O a. 0.269 Nm2/C O b.2.131 Nm2/C O c. 2.669 Nm2/C O d. -0.269 Nm2/C -2.131 Nm2/C O e.
Three point charges are located near a spherical Gaussian
surface of radius 12.5 cm. One charge (+3Q =11.4 μC) is inside the
sphere, and the others (charge +Q =3.8 μC) are a distance
4.16666666666667 cm outside the surface.
What is the total (net) electric flux through the Gaussian
surface?
8) A charge of 1.32 × 10° C is located inside a sphere of diameter 0.55m . situated 1.66 cm from its center. What is the electric flux through the sphere due to this charge? (co 8.85% 10-12 C2/N
Three charges are located in the x-y plane. A charge of +1.2*10^-8 C located at the point (0,0), another charge of -1.2*10^-8 C located at the point (1 cm,1 cm) and the third charge of +3*10^-8 C located at (1 cm,0). Determine the total electric flux through a Gaussian sphere centered at the origin with a radius of 10.0 cm. Please explain how the answer is 3388.2 (Nm^2/C)
and : No charur inside but there are charges outside the closed (TLC) Distinguishing between and : No producing an electric field. A cubie Gaussian surface with a side has two horizontal faces and is in a uniform electrie field of 30 N/C which is directed vertically upward. (1) Find the net electric flux through the cube. (Hint: If there are equal numbers of field lines going into and out of a CLOSED surface, the net flux through the surface...
1. Two point charges, q, and q are fixed in position. a is located at (0, d). qg is located at (0,-d). The value of q, is known, and it is positive. The value of q, is unknown. The value of d is known, and it is positive. Also fixed in position is a uniformly charged line segment of length d. This segment is parallel to the x-axis and its left end is located at (d/2.-d). The total electric field...
19. A particle with charge Q = 5.00 μC is located at the center ube of edge L 0.100 m. In addition, six other iden- tical charged particles having q -1.00 μC are positioned of a c symmetrically around Q as shown in Figure P23.19. Deter- mine the electric flux through one face of the cube. 4% Figure P23.19 Problems 19 and 20 19a) What is the net charge inside the cube?1 b) What is the flux through the whole...