Schering Bridge

Schering Bridge

• There are various methods for the measurement of capacitance and di-electric loss.
• Schering Bridge method is very important and popular method to determine these terms. 
• In this method imperfect capacitor can be compared with a perfect capacitor. (C₂ is compared with C₁).
• The imperfect capacitor is represented by its equivalent loss free capacitor C in series with a resistance r, this is shown in part ‘b’ of the following Figure.
• Earthing as shown safeguards the operator at high voltage testing

We can write different impedances as

Z₁ = – j / ωC₁

Z₂ = r – j / ωC₂

Z₃ = R₃

Z₄ = 1 / (1/ R₄)
+ jωC₄ R₄ = R₄ / 1 + jωC₄
R₄

Now for balance (indicate by the
detector)

∴  Z₁.
Z₃ = Z₂. Z₄

Or –jR₃ / ωC₁
= [r – j / ωC₂] [R₄ / 1 + jωC₄ R₄]

Or –jR₃ / ωC₁
(1 + ωC₄ R₄) = R₄ (r – j / ωC₂)

Separating the real and imaginary parts we get

C₂ = C₁ (R₄ / R₃) and

r = R₃ (C₄ / C₁)

∴ tan 𝛿 = r / Xc = r 1 / ωC₂ = ω rC₂

… Putting the value of r and from above Equation uvieron

_{Dissipation (loss) factor =} ω rC₂ = ωC₄ R₄ = power factor

• _{Though Schering-bridge method is accurate, there are some shortcomings in it. The errors are due to temperature rise and aging.}
• _{These are eliminated by use of current comparator bridges.}