Chapter 2 Electrostatic Potential and Capacitance | class 12th | quick revision notes physics
Ch-2 Electrostatic Potential and Capacitance Class 12 Physics Hand ritten Notes By Ashish Anand Sir
Electrostatic Potential and Capacitance Notes Class 12 Physics Chapter 2
→ The S.I. unit of electric potential and a potential difference is volt.
→ 1 V = 1 J C-1.
→ Electric potential due to a + ve source charge is + ve and – ve due to a – ve charge.
→ The change in potential per unit distance is called a potential gradient.
→ The electric potential at a point on the equatorial line of an electric dipole is zero.
→ Potential is the same at every point of the equipotential surface.
→ The electric potential of the earth is arbitrarily assumed to be zero.
→ Electric potential is a scalar quantity.
→ The electric potential inside the charged conductor is the same as that on its surface. This is true irrespective of the shape of the conductor.
→ The surface of a charged conductor is equipotential irrespective of its shape.
→ The potential of a conductor varies directly as the charge on it. i.e., V ∝ lA
→ Potential varies inversely as the area of the charged conductor i.e.
→ S.I. unit of capacitance is Farad (F).
→ The aspherical capacitor consists of two concentric spheres.
→ A cylindrical capacitor consists of two co-axial cylinders.
→ Series combination is useful when a single capacitor is not able to tolerate a high potential drop.
→ Work done in moving a test charge around a closed path is always zero.
→ The equivalent capacitance of series combination of n capacitors each of capacitance C is
Cs = Cn
→ Cs is lesser than the least capacitance in the series combination.
→ The parallel combination is useful when we require large capacitance and a large charge is accumulated on the combination.
→ If two charged conductors are connected to each other, then energy is lost due to sharing of charges, unless initially, both the conductors are at the same potentials.
→ The capacitance of the capacitor increases with the dielectric constant of the medium between the plates.
→ The charge on each capacitor remains the same but the potential difference is different when the capacitors are connected in series.
→ P. D. across each capacitor remains the same but the charge stored across each is different during the parallel combination of capacitors.
→ P.E. of the electric dipole is minimum when θ = 0 and maximum when θ = 180°
→ θ = 0° corresponds to the position of stable equilibrium and θ = π to the position of unstable equilibrium.
→ The energy supplied by a battery to a capacitor is CE2 but energy stored
in the capacitor is 12 CE2.
→ A suitable material for use as a dielectric in a capacitor must have a high dielectric constant and high dielectric strength.
→ Van-de Graaf generator works on the principle of electrostatic. induction and action of sharp points on a charged conductor.
→ The potential difference between the two points is said to be 1 V if 1 J of work is done in moving 1 C test charge from one point to the another.
→ The electric potential at a point in E→: It is defined as the amount of work done in moving a unit + ve test charge front infinity to that point.
→ Electric potential energy: It is defined as the amount of work is done in bringing the charges constituting a system from infinity to their respective locations.
→ 1 Farad: The capacitance of a capacitor is said to be 1 Farad if 1 C charge given to it raises its potential by 1 V
→ Dielectric: It is defined as an insulator that doesn’t conduct electricity but the induced charges are produced on its faces when placed in a uniform electric field.
→ Dielectric Constant: It is defined as the ratio of the capacitance of the capacitor with a medium between the plates to its capacitance with air between the plates
→ Polarisation: It is defined as the induced dipole moment per unit volume of the dielectric slab.
→ The energy density of the parallel plate capacitor is defined as the energy per unit volume of the capacitor.
→ Electrical Capacitance: It is defined as the ability of the conductor to store electric charge.
Important Formulae
→ Electric potential at a point A is
VA = W∞Aq0
→ V = 14πε0.qr
→ Electric field is related to potential gradient as:
E = – dVdr
→Electric potential at point on the axial line of an electric dipole is:
V = 14πε0⋅qr2
→ Electric P.E. of a system of point charges is given
υ = 14πε0∑ni=1∑nj=1j≠iqiajrij
→ V due to a charged circular ring on its axis is given by:
V = 14πε0⋅q(R2+r2)1/2
→ V at the centre of ring of radius R is given by
V = 14πε0⋅qR
→ The work done in moviag a test large from one point A to another point B having positions vectors rA→ and rA→ respectively w.r.t. q is given by
WAB = 14πε0⋅q⋅(1rB−1rA)
→ Line integral of electric field between points A and B is given by.
∫AB E→ dl→ = 14πε0⋅q(1rA−1rB)
→ Electric potential energy of an electric dipole is
U = – p→. E→
→ Capacitance of the capacitor is given by
C = qV
→ P.E. of a charged capacitor is:
U = 12 qV = 12 CV2 = q22C
→ C of a parallel plate capacitor with air between the plates is:
C0 = ε0⋅Ad
C0 = ε0KAd
→ C of a parallel plate capacitor with a dielectric medium between the plates is:
C = CmC0=E0E
→ Common potential as
V = C1V1+C2V2C1+C2
→ loss of electrical energy = 12(C1C2C1+C2)(V1−V2)
→ Energy supplied by battery is CE2 and energy stored in the capacitor is 12 CE2.
→ The equivalent capacitance of series combination of three capacitor is given by
1Cs=1C1+1C2+1C3
→ The equivalent capacitance of parallel grouping of three capacitors is
Cp = C1 + C2 + C3
→ Capacitance of spherical capacitor is
C = 4πε0 abb−a
a, b are radii of inner and outer spheres.
→ Capacitance of a cylindrical capacitor is given by:
C = 2πε0loge(ba)
when b, a are radii of outer and inner cylinder.
→ Capacitance of a capacitor in presence of conducting slab between the plates is .
C = C01−td = ∞ if t = d.
→Capacitances of a capacitor with a dielectric medium between the plates is given by
C = C0[1−td(1−1R)]
C = K C0 If t = d
→ Reduced value of electric field in a dielectric slab is given by
E = E0 – Pε0
where P = σp = induced charge density.
→ Capacitance of an isolated sphere is given by
C = 4πε0 r .
C = 4πε0 Kr