Parallel plate capacitor (air): C₀ = ε₀A/d

With dielectric: C = κC₀ = ε₀ε_rA/d

ε_r = dielectric constant (κ).

Series: 1/C_eq = 1/C₁ + 1/C₂ + ...
Same charge on each, voltage divides.

Parallel: C_eq = C₁ + C₂ + ...
Same voltage, charge distributes.

Dielectric constant κ = C/C₀

When dielectric inserted:
• Battery connected: V constant, Q increases, C increases, E unchanged (E = V/d).
• Isolated capacitor: Q constant, V decreases, C increases, E decreases (E = E₀/κ).

Charging: q(t) = CV(1 – e^–t/RC), i(t) = (V/R)e^–t/RC

Discharging: q(t) = Q₀e^–t/RC, i(t) = –(Q₀/RC)e^–t/RC

Time constant τ = RC (time to charge to 63% or discharge to 37%).

💡 NEET TIPS & SHORTCUTS

• For parallel plate capacitor, C ∝ A/d ∝ κ.
• When dielectric is inserted in an isolated capacitor, energy decreases; with battery, energy increases.
• In series combination, the smallest capacitor gets the largest voltage.
• Time constant τ determines how fast capacitor charges/discharges.

⚠️ COMMON MISTAKES

• Using C = Q/V without considering that V is potential difference, not EMF.
• Applying series formula for parallel combination and vice versa.
• Forgetting that dielectric constant changes capacitance but not charge if isolated.
• Confusing charging and discharging equations.

C = Q/V

Parallel plate (air): C = ε₀A/d

With dielectric: C = κε₀A/d

Energy: U = ½CV² = ½Q²/C

Series: 1/C_eq = Σ(1/C)

Parallel: C_eq = ΣC

RC time constant: τ = RC