(D) The magnetic field at the center of a circular loop of radius $r_1$ carrying current $I$ is given by $B = \frac{\mu_0 I}{2 r_1}$.Since the rings a

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$\frac{\mu_0 \pi r_2^2}{2 r_1}$

(D) The magnetic field at the center of a circular loop of radius $r_1$ carrying current $I$ is given by $B = \frac{\mu_0 I}{2 r_1}$.Since the rings are concentric and coplanar,the magnetic field $B$ is uniform over the area of the smaller ring (radius $r_2$).The magnetic flux $\phi$ linked with the smaller ring is $\phi = B \times A_2$,where $A_2 = \pi r_2^2$ is the area of the smaller ring.$\phi = \left( \frac{\mu_0 I}{2 r_1} \right) \times \pi r_2^2 = \frac{\mu_0 \pi r_2^2}{2 r_1} I$.The mutual inductance $M$ is defined as $M = \frac{\phi}{I}$.Therefore,$M = \frac{\mu_0 \pi r_2^2}{2 r_1}$.

Class 12 Physics Electromagnetic Induction Mutual Induction

Medium

The planar concentric rings of metal wire having radii $r_1$ and $r_2$ (with $r_1 > r_2$) are placed in air. The current $I$ is flowing through the coil of larger radius. The mutual inductance between the coils is given by $(\mu_0 = \text{permeability of free space})$

MHT CET 2024 All MHT CET

A
$\frac{\mu_0 \pi (r_1 + r_2)^2}{2 r_2}$
B
$\frac{\mu_0 \pi (r_1 - r_2)^2}{2 r_1}$
C
$\frac{\mu_0 \pi r_1^2}{2 r_2}$
D
$\frac{\mu_0 \pi r_2^2}{2 r_1}$

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Electromagnetic Induction

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Two concentric circular coils,one of small radius $r_1$ and the other of large radius $r_2$,such that $r_1 \ll r_2$,are placed co-axially with their centres coinciding. The mutual inductance $M$ of the arrangement is proportional to . . . . . . .

MediumGUJCET 2026

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Two coils $P$ and $Q$ are separated by some distance. When a current of $3\, A$ flows through coil $P$,a magnetic flux of $10^{-3}\, Wb$ passes through $Q$. No current is passed through $Q$. When no current passes through $P$ and a current of $2\, A$ passes through $Q$,the flux through $P$ is:

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MediumMHT CET 2025

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Find the mutual inductance in the arrangement,when a small circular loop of wire of radius $R$ is placed inside a large square loop of wire of side $L$ $(L \gg R)$. The loops are coplanar and their centres coincide:

MediumJEE MAIN 2023

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$A$ pair of adjacent coils has a mutual inductance of $2 \text{H}$. If the current in one coil changes from $0 \text{A}$ to $30 \text{A}$ in $0.15 \text{s}$,what is the change of flux linkage with the other coil (in $\text{ Wb}$)?

MediumGUJCET 2025

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The planar concentric rings of metal wire having radii $r_1$ and $r_2$ (with $r_1 > r_2$) are placed in air. The current $I$ is flowing through the coil of larger radius. The mutual inductance between the coils is given by $(\mu_0 = \text{permeability of free space})$

Similar Questions

Two concentric circular coils,one of small radius $r_1$ and the other of large radius $r_2$,such that $r_1 \ll r_2$,are placed co-axially with their centres coinciding. The mutual inductance $M$ of the arrangement is proportional to . . . . . . .

Two coils $P$ and $Q$ are separated by some distance. When a current of $3\, A$ flows through coil $P$,a magnetic flux of $10^{-3}\, Wb$ passes through $Q$. No current is passed through $Q$. When no current passes through $P$ and a current of $2\, A$ passes through $Q$,the flux through $P$ is:

Find the mutual inductance in the arrangement,when a small circular loop of wire of radius $R$ is placed inside a large square loop of wire of side $L$ $(L \gg R)$. The loops are coplanar and their centres coincide:

$A$ pair of adjacent coils has a mutual inductance of $2 \text{H}$. If the current in one coil changes from $0 \text{A}$ to $30 \text{A}$ in $0.15 \text{s}$,what is the change of flux linkage with the other coil (in $\text{ Wb}$)?

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