Derive Coulombs law from Gauss law in electrostatics.
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To derive Coulomb’s Law from gauss law or to find the intensity of electric field due to a point charge +q at any point in space using Gauss’s law ,draw a Gaussian sphere of radius r at the centre of which charge +q is located (Try to make the figure yourself).
All the points on this surface are equivalent and according to the symmetric consideration the electric field E has the same magnitude at every point on the surface of the sphere and it is radially outward in direction.Therefore, for a area element dS around any point P on the Gaussian surface both E and dS are directed radially outward,that is ,the angle between E and dS is zero.Therefore,
The flux passing through the area element dS ,that is,
d φ =E.dS= EdS cos 00=EdS
Hence, the total flux through the entire Gaussian sphere is obtained as,
Φ=∫EdS
Or φ=E∫dS
But ∫dS is the total surface area of the sphere and is equal to 4πr2,that is,
Φ=E(4πr2) (1)
But according to Gauss’s law for electrostatics
Φ=q/ε0 (2)
Where q is the charge enclosed within the closed surface
By comparing equation (1) and (2) ,we get
E(4πr2)=q/ε0
Or E=q/4πε0r2 (3)
The equation (3) is the expression for the magnitude of the intensity of electric field E at a point,distant r from the point charge +q.
In vector form, E=1/4πε0 q/r2 =1/4πε0qr/r3
In a second point charge q0be placed at the point at which the magnitude of E is computed ,then the magnitude of the force acting on the second charge q0would be
F=q0E
By substituting value of E from equation (3),we get
F=qoq/4πε0r2 (4)
The equation (4) represents the Coulomb’s Law and it is derived from gauss law.