Self-Inductance of Long Solenoid - CSIR NET LIFE SCIENCE COACHING | NTA NET LIFE SCIENCE

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December 25, 2025
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Q.37 Which of the following statements is/are CORRECT regarding self-inductance of a long
solenoid having cross sectional area (𝐴𝐴), length (𝑙𝑙) and having 𝑛𝑛 turns per unit length filled
with material of relative permeability 𝜇𝜇𝑟𝑟 ?
(A) It depends on the geometry of solenoid.
(B) It does not depend on geometry of solenoid.
(C) It depends on cross sectional area of solenoid.
(D) It depends on relative permeability of the medium.

Self-inductance of a long solenoid depends directly on its cross-sectional area $A$ , length $l$ , number of turns per unit length $n$ , and the relative permeability $μ_{r}$ of the core material, as derived from the standard formula $L = μ_{0} μ_{r} n^{2} A l$ . Options (A), (C), and (D) are correct, while (B) is incorrect.

Option Analysis

Option (A): It depends on the geometry of solenoid.
Geometry includes $A$ and $l$ , both appearing in the formula $L = μ_{0} μ_{r} n^{2} A l$ , confirming dependence.

Option (B): It does not depend on geometry of solenoid.
This contradicts the formula, where $A$ and $l$ explicitly factor in, so incorrect.

Option (C): It depends on cross sectional area of solenoid.
$L \propto A$ , directly proportional to cross-sectional area.

Option (D): It depends on relative permeability of the medium.
$L \propto μ_{r}$ , as the magnetic field $B = μ_{0} μ_{r} n I$ incorporates $μ_{r}$ .

Derivation

Magnetic field inside: $B = μ_{0} μ_{r} n I$ .
Flux per turn: $ϕ = B A = μ_{0} μ_{r} n I A$ .
Total turns $N = n l$ , total flux linkage: $Φ = Nϕ = μ_{0} μ_{r} n^{2} A l I$ .
Self-inductance: $L = Φ/ I = μ_{0} μ_{r} n^{2} A l$ .

The self-inductance of long solenoid is a key concept in electromagnetic induction, crucial for competitive exams like CSIR NET Physics. For a solenoid with cross sectional area A, length l, n turns per unit length, and core of relative permeability μ_r, the inductance $L = μ_{0} μ_{r} n^{2} A l$ reveals its dependencies.

Factors Affecting Inductance

Geometry Impact: Proportional to $A$ (larger area traps more flux) and $l$ (via $N = n l$ ), confirming dependence on solenoid shape.
Core Material Role: $μ_{r} > 1$ (e.g., iron) boosts $B$ and thus $L$ .
No Current Dependence: $L$ is independent of current $I$ .

Practical Applications

Solenoids in transformers and inductors optimize $L$ by maximizing $A$ , $n$ , $μ_{r}$ , and minimizing $l$ .

This analysis resolves MCQs on self-inductance of long solenoid geometry and $μ_{r}$ .

Option Analysis

Derivation

Factors Affecting Inductance

Practical Applications

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