A conductor wire extends from 0 to infinity on the z-axis and passes through a 5 A current. The wire of the conductor B is a circle with a radius r = 2 at the center (3,4,0) point and in the yz plane. Find the total force of wire A on wire B.
Since there is no current in the circular wire, so there is no charge movement in the wire B resulting in zero force on wire B due to magnetic field of wire A
A conductor wire extends from 0 to infinity on the z-axis and passes through a 5 A current. The wire of the conductor B is a circle with a radius r = 2 at the center (3,4,0) point and in the yz plane....
(1 point) [DL:2/5] A cylindrical conductor of radius R = 0.85 m is centred on the z-axis. The current density in the conductor is given in cylindrical coordinates: J = 16e (1-p/R)a, A/m? 'a, A/m² Find the total current passing through the plane z = 0. 146.8/e
. In the figure, two long and straight conductors are parallel to the z-axis and carry currents of 1 -20.0A and 1 15.0 A in opposite directions. Conductor 1 passes through (0, 0) while conductor 2 passes through 3.00 m, 0). (a) Find the location of the point where the net magnetic field due to the conductors is zero. (b) Suppose a third parallel conductor carrying a current of I,-10.0 A (same direction as Is) is placed where it passes...
Consider a Coaxial cable. The center conductor has radius a and its axis coincides with the z axis( region 1, with permeability u1). The outer conductor has inner radius b, outer radius c (where c>b) and its axis also coincide with the z axis( region 3, with permeability u3). The space between the two conductors has permeability u2 (region 2). the center conductor is carrying a DC current . Find the magnetic flux density in all region. Also plot B...
6. Imagine the r-axis is an infinitely long heavy wire of uniform density. The gravitational force it exerts on a unit mass placed at a point (w, z) (0,0) in the plane is given by where c is a positive constant. Taking c = 1, find by direct calculation of the line integral (that is, by using a parameterisation of the path C) the work done by the gravitational field in moving a unit mass along each of the following...
A circular loop of wire with a radius of 15 cm lies in the yz plane and carries a current of 1.9 A, clockwise when viewed from a point on the positive x axis. The magnitude and direction of its magnetic dipole moment are: Select one: a. 1343.03 A m^2, -x direction b. 0.13 A m^2, +x direction c. 1343.03 A m^2, +x direction d. 0.13 A m^2, -x direction e. 0.13 A m^2, +z direction
A circular loop of wire with a radius of 15 cm lies in the yz plane and carries a current of 1.9 A, clockwise when viewed from a point on the positive x axis. The magnitude and direction of its magnetic dipole moment are: Select one: O a. 0.13 A m^2, +x direction o b. 1343.03 A m^2, +x direction c. 1343.03 A m^2 - direction O d. 0.13 A m^2. - direction O e. 0.13 A m^2, +z direction
A circular loop of wire with a radius of 15 cm lies in the yz plane and carries a current of 1.9 A, clockwise when viewed from a point on the positive x axis. The magnitude and direction of its magnetic dipole moment are: Select one a. 1343.03 A m^2, +x direction b. 0.13 A m-2, -x direction c. 0.13 Am 2, +x direction d. 1343.03 A m^2, -x direction e. 0.13 A m^2, +z direction
Two infinitely long wires run parallel to the z axis. One wire passes through the point (x,y) = (h/2, 0) and carries a current of I A] in the z direction. The other wire passes through the point (x.y)- (-h/2,0) and carries a current-I [A] in the z direction. Calculate the magnetic field vector H(xy) [A/m] at any point in space. Express the answer in rectangular coordinates. Hint: Use superposition together with Ampere's law. Also, you might want to review...
A circular loop of wire with a radius of 15 cm lies in the yz plane and carries a current of 1.9 A, clockwise when viewed from a point on the positive x axis. The magnitude and direction of its magnetic dipole moment are: Select one: O a 0.13 A m'2, +z direction O b. 0.13 A m2, .x direction O 0.13 A m2, *x direction O d. 1343.03 A m'2, +x direction O . 1343.03 A m2, -x direction
2. A magnetic field B Bêz in a certain space. A circular conducting loop of radius 5 cm and total resistance 1.512 originally lies on the sy-plane with its center at the origin. (a) If a counterclockwise current I = 0.045 A is induced on the loop, find dB. (10%) (b) Forget about part (a). Now set B = 0.05T, and at time t = 0 the loop starts to rotate about the 3-axis at a angular rate w=0.057 rad/sec....