Magnetic field at the center of a wire, B = oI/2R
The magnitude of the magnetic field due to the second wire is same
as B, but the direction is perpendicular to the first.
So the net field at the center, Bn = oI/2R
+
oI/2R
Magnitude of the net magnetic field, |Bn|
= oI/2R x SQRT[1
+ 1]
= oI/2R x
SQRT[2]
= (4 x 10-7 x
1.5) / (2 x 3.4 x 10-2)] x SQRT[2]
= 3.92 x 10-5 T
Please answer the following Chapter 21, Problem 57 Two circular loops of wire, each containing a...
Two circular loops of wire, each containing a single turn, have the same radius of 4.6 cm and a common center. The planes of the loops are perpendicular. Each carries a current of 2.0 A. What is the magnitude of the net magnetic field at the common center?
Two circular loops of wire, each containing a single turn, have the same radius of 3.90 cm and a common center. The planes of the loops are perpendicular. Each carries a current of 2.00 A. What is the magnitude of the net magnetic field at the common center?
Please show all steps and box final answer. Thank you. Chapter 29, Problem 016 In the figure, two concentric circular loops of wire carrying current in the same direction lie in the same plane. Loop 1 has radius 1.20 cm and carries 3.50 mA. Loop 2 has radius 2.80 cm and carries 5.60 mA. Loop 2 is to be rotated about a diameter while the net magnetic field B set up by the two loops at their common center is...
Two identical circular thin-wire loops carry the same current I=10.4 A and are positioned "parallel" to each other as illustrated in the figure below. The planes of the loops are perpendicular to the line connecting their centers O1 and O2. The radius of the loops a=1.18 cm and the distance between the loop planes b=0.944 cm. What is the magnitude B1 of the magnetic field at point O1?: B1= _____ G. What is the magnitude B2 of the magnetic field...
Two identical circular thin-wire loops carry the same current I=6.5 A and are positioned "parallel" to each other as illustrated in the figure below. The planes of the loops are perpendicular to the line connecting their centers O1 and O2. The radius of the loops a=0.46 cm and the distance between the loop planes b=0.575 cm. What is the magnitude B1 of the magnetic field at point O1?: B1= ______ G. What is the magnitude B2 of the magnetic field...
Two identical circular thin-wire loops carry the same current I=5.33 A and are positioned "parallel" to each other as illustrated in the figure below. The planes of the loops are perpendicular to the line connecting their centers 01 and 02. The radius of the loops a=1.1 cm and the distance between the loop planes b=2.31 cm. 0-6 What is the magnitude B1 of the magnetic field at point 012: B2- G. What is the magnitude By of the magnetic field...
1. A solenoid containing 245 circular loops of wire has a radius of 0.0384 m and a length of 0.0560 m. What is the magnitude of the magnetic field at the center of the solenoid if a current of 0.0348 A passes through it?
Please solve and explain how its done. Two identical circular thin-wire loops carry the same current I=7.8 A and are positioned "parallel to each other as illustrated in the figure below. The planes of the loops are perpendicular to the line connecting their centers 01 and 02. The radius of the loops a=0.9 cm and the distance between the loop planes b=1.53 cm. 0:0 G. What is the magnitude B1 of the magnetic field at point 01?: B1= What is...
Two circular current-carrying loops of wire are shown in the drawing. The inner loop has a radius of R0 and carries a current I0, while the outer loop has a radius of 2R0 and carries a current of 4I0. The currents are in opposite directions. If R0 = 0.20 m and I0 = 2.3 A, determine the magnitude and direction of the net magnetic field at the center of the two loops.
Chapter 30, Problem 008 A uniform magnetic field is perpendicular to the plane of a Circular loop of diameter 15 cm formed from wire of diameter 34 mm and resistivity of 1.71 x 10 of the magnetic field change to induce a 13 A current in the loop? m. At what rate must the magnitude Number the tolerance / Click If you would like to Show Work for this question: Open Show Work