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प्रश्न
Write Maxwell’s equation and give its physical significance.
उत्तर
The Maxwell’s equation and their physical significances are :
1. Maxwell’s first equation is ∇. D = ρ
Integrating this over an arbitrary volume V we get
∫v ∇.D dV = ∫v ρ dV.
But from Gauss Theorem, we get
∫s D.dS = ∫v ρ dV = q
Here, q is the net charge contained in volume V. S is the surface bounding volume V. Therefore,
Maxwell’s first equation signifies that:
The total electric displacement through the surface enclosing a volume is equal to the total charge within the volume.
2. Maxwell’s second equations is ∇.B = 0
Integrating this over an arbitrary volume V, we get
∫v ∇.B = 0.
Using Gauss divergence theorem to change volume integral into surface integral, we get
∫s B.dS = 0.
Maxwell’s second equation signifies that:
The total outward flux of magnetic induction B through any closed surface S is equal to zero.
3. Maxwell’s third equation is ∇ x E = `((- ∂B)/(∂t))` . dS
Converting the surface integral of left hand side into line integral by Stoke’s theorem, we get
`Φc E. dI = - (∫s ∂B)/(∂t). dS.`
Maxwell’s third equation signifies that:
The electromotive force (e.m.f. e = ∫C E.dI) around a closed path is equal to negative rate of change of magnetic flux linked with the path (since magnetic flux Φ = ∫s B.dS).
4. Maxwell’s fourth equation is
`∇ x H = J + (∂D)/(∂t)`
Taking surface integral over surface S bounded by curve C, we obtain
∫s ∇ x H. dS = ∫s (J + ∂D/∂t) dS
Using Stoke’s theorem to convert surface integral on L.H.S. of above equation into line integral, we get
`Φc H.dI = ∫s (J + (∂D)/(∂t)).dS`
Maxwell’s fourth equation signifies that:
The magneto motive force (m.m.f. = Φc H. dI) around a closed path is equal to the conduction current plus displacement current through any surface bounded by the path.
