A transformer working on a 240v AC supplies a voltage of 8v to an electric bell in the circuit. The number of turn in primary coil is 4800. Calculate the number of turns in the secondary coil.
Answers
solution :-
transformer takes high-voltage electricity with a small current and changes it into low-voltage electricity with a large current, or vice versa. That is, step up or step down the voltage in a circuit. A step-up transformer turns low-voltage electricity into high-voltage electricity while dropping the current. A step-down transformer changes high-voltage electricity into low-voltage electricity.
If we change the number of turns in the coils we change the induced emf. This allows us to change (transform) the voltage from the primary to the secondary coil.
The Turns Rule is:
NpNs=VpVs
Where,
Ns = number of turns on the secondary coil
Np = number of turns on the primary coil
Vs = voltage across the secondary coil
Vp = voltage across the primary coil
So if number of turns on the secondary coil is lesser than on the primary coil, the output voltage will be lesser than the input voltage. This is called a step down transformer.
Hence, The number of turns in the secondary coil as per the given question can be obtained as follows:
Let input voltage be 240V and the output voltage be 8V. Let 4800 be the number of turns of primary coil and x be the number of turns of secondary coil.
NpNs=VpVs
That is,
4800x=2408
x=4800×2408 = 160 turns
Therefore, the number of turns of secondary coil is 160 turns.