A rectangular loop of wire with sides H = 24 cm and W = 74 cm carries current I
ID: 1602031 • Letter: A
Question
A rectangular loop of wire with sides H = 24 cm and W = 74 cm carries current I2 = 0.165 A. An infinite straight wire, located a distance L = 22 cm from segment ad of the loop as shown, carries current I1 = 0.768 A in the positive y-direction.
1)
What is Fad,x, the x-component of the force exerted by the infinite wire on segment ad of the loop?
N
2)
What is Fbc,x, the x-component of the force exerted by the infinite wire on segment bc of the loop?.
N
3)
What is Fnet,y, the y-component of the net force exerted by the infinite wire on the loop?
N
4)
Another infinite straight wire, aligned with the y-axis is now added at a distance 2L = 44 cm from segment bc of the loop as shown. A current, I3, flows in this wire. The loop now experiences a net force of zero.
What is the direction of I3?
along the positive y-direction
along the negative y-direction
Your submissions:
B
Submitted:
Sunday, March 26 at 3:40 PM
Feedback:
Your answer is correct! The current I1 produces a net force on the loop in the positive x-direction. For the current I3 to produce a net force on the loop that cancels the force from I1, it must be directed in the negative y-direction to create a magnetic field in the region of the loop that is directed in the negative z-direction.
5)
What is the magnitude of I3?
A
I, W C 1 L! 1Explanation / Answer
Q1.
direction of current in ad of the loop and and the infinite wire are in different direction.
so force is repulsive in nature.
hence force is along +ve x axis.
force magnitude=mu*I1*I2*length of ad/(2*pi*distance)
=4*pi*10^(-7)*0.768*0.165/(2*pi*0.22)
=1.152*10^(-7) N
Q2.
direction of current in bc and the infinite wire is along the same direction
hence force is attractive in nature
force magnitude=mu*I1*I2*length of bc/(2*pi*distance)
=4*pi*10^(-7)*0.768*0.165/(2*pi*(0.22+0.74))
=2.64*10^(-8) N
as force is along -ve x axis,
answer=-2.64*10^(-8) N
Q3.
total force is along x axis.
so Fnet,y=0
Q4.
as I3 is closer to segment bc, force magnitude on bc would be greater as compared to force magnitude on ad.
due to the I1, force is along +ve x axis.
in order to make total force to be zero,
I3 be such that force due to I3 on the segment bc is along -ve x axis.
so force is repulsive in nature.
hence current I3 and current in bc are along different direction.
so I3 will be in downward direction
correct answer: along negative y direction
Q5.
total force along -ve x axis due to I3
=force on segment bc - force on segment ad
=(mu*I3*I2*H/(2*pi*2*L)) - (mu*I3*I2*H/(2*pi*(2*L+W))
=(4*pi*10^(-7)*I3*0.165*0.24/(2*pi))*((1/0.44)-(1/1.18))
=1.1288*10^(-8)*I3
this force magnitude should be equal to total force magnitude due to I1.
hence 1.1288*10^(-8)*I3=1.152*10^(-7)-2.64*10^(-8)
==>I3=7.8667 A
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