Examsnet
Unconfined exams practice
Home
Exams
Banking Entrance Exams
CUET Exam Papers
Defence Exams
Engineering Exams
Finance Entrance Exams
GATE Exam Practice
Insurance Exams
International Exams
JEE Exams
LAW Entrance Exams
MBA Entrance Exams
MCA Entrance Exams
Medical Entrance Exams
Other Entrance Exams
Police Exams
Public Service Commission (PSC)
RRB Entrance Exams
SSC Exams
State Govt Exams
Subjectwise Practice
Teacher Exams
SET Exams(State Eligibility Test)
UPSC Entrance Exams
Aptitude
Algebra and Higher Mathematics
Arithmetic
Commercial Mathematics
Data Based Mathematics
Geometry and Mensuration
Number System and Numeracy
Problem Solving
Board Exams
Andhra
Bihar
CBSE
Gujarat
Haryana
ICSE
Jammu and Kashmir
Karnataka
Kerala
Madhya Pradesh
Maharashtra
Odisha
Tamil Nadu
Telangana
Uttar Pradesh
English
Competitive English
Certifications
Technical
Cloud Tech Certifications
Security Tech Certifications
Management
IT Infrastructure
More
About
Careers
Contact Us
Our Apps
Privacy
Test Index
JEE Advanced 2020 Full Test 7 Paper 2
Show Para
Hide Para
Share question:
© examsnet.com
Question : 13
Total: 54
A circular loop of radius
R
is bent along a diameter and given a shape as shown in the figure. One of the semicircles (KNM) lies in the
x
−
z
plane and the other one
(
K
L
M
)
in the
y
−
z
plane with their centres at the origin. Current I is flowing through each of the semi circles as shown in figure. A particle of charge
q
is released at the origin with a velocity
→
v
=
v
0
∧
i
Find the magnitude of instantaneous force
→
F
on the particle if
µ
0
q
v
0
l
=
8
R
.
Assume that space is gravity free.
Your Answer:
Validate
Solution:
Magnetic field
(
→
B
)
at the origin
=
Magnetic field due to semicircle
K
L
M
+
magnetic field due to other semicircle KNM.
Therefore,
→
B
=
µ
0
I
4
R
(
−
∧
i
)
+
µ
0
I
4
R
(
∧
j
)
⇒
→
B
=
µ
0
I
4
R
∧
i
+
µ
0
I
4
R
∧
j
=
µ
0
I
4
R
(
−
∧
i
+
∧
j
)
[
→
B
due to a circular current carrying loop is
µ
0
I
2
R
∴
For semicircle it is half ]
Therefore, magnetic force acting on the particle.
→
F
=
q
(
→
v
×
→
B
)
=
q
{
(
−
v
0
∧
i
)
×
(
−
∧
i
+
∧
j
)
×
µ
0
I
4
R
}
=
−
µ
0
q
v
0
I
4
R
∧
k
∴
|
→
F
|
=
µ
0
q
v
0
I
4
R
=
8
R
4
R
=
2
units
© examsnet.com
Go to Question:
1
2
3
4
5
6
7
8
9
10
11
12
13
14
15
16
17
18
19
20
21
22
23
24
25
26
27
28
29
30
31
32
33
34
35
36
37
38
39
40
41
42
43
44
45
46
47
48
49
50
51
52
53
54
Prev Question
Next Question