This theorem states that the total electric flux through any closed surface surrounding a charge, is equal to the net positive charge enclosed by that surface.
Suppose the charges Q1, Q2_ _ _ _Qi, _ _ _ Qn are enclosed by a surface, then the theorem may be expressed mathematically by surface integral as
Explanation:
For explaining the Gauss’s theorem, it is better to go through an example for proper understanding.
Let Q be the charge at the center of a sphere and the flux emanated from the charge is normal to the surface. Now, this theorem states that the total flux emanated from the charge will be equal to Q coulombs and this can be proved mathematically also. But what about when the charge is not placed at the center but at any other point other than the center (as shown in the figure).
At that time, the flux lines are not normal to the surface surrounding the charge, then this flux is resolved into two components which are perpendicular to each other, the horizontal one is the sinθ component and the vertical one is the cosθ component. Now when the sum of these components is taken for all the charges, then the net result is equal to the total charge of the system which proves Gauss’s theorem.
Proof:
Let us consider a point charge Q located in a homogeneous isotropic medium of permittivity ε. 
The electric field intensity at any point at a distance r from the charge is
The flex density is given as,
Now from the figure the flux through area dS
Now, dScosθ is the projection of dS is normal to the radius vector. By definition of a solid angle
Now, we know that the solid angle subtended by any closed surface is 4π steradians, so the total electric flux through the entire surface is
This is the integral form of Gauss’s theorem. And hence this theorem is proved.