Autotransformer Output and Copper Saving



Working of Autotransformer

The connection diagram of an ideal step-down autotransformer is shown in the figure. In which the winding ab is the primary winding having N1 turns and the winding bc is the secondary winding having N2 turns. Here, the current I1 is the input primary current and the current I2 is the output secondary current or load current.

Working of Autotransformer1

Now, the number of turns in the 'ac' portion of the winding is N1 – N2 turns and the voltage across this portion is V1 – V2. The current in the common portion (winding 'bc') of the winding is I2 – I1.

Consider the equivalent circuit of the autotransformer as shown in the figure. From this equivalent circuit, we get,

Working of Autotransformer2

$$\mathrm{\frac{V_{2}}{V_{1} \: - \: V_{2}} \: = \: \frac{N_{2}}{N_{1} \: - \: N_{2}}}$$

$$\mathrm{\Rightarrow \: N_{1}V_{2} \: - \: N_{2}V_{2} \: = \: N_{2}V_{1}\: - \: N_{2}V_{2}}$$

$$\mathrm{\Rightarrow \: N_{1}V_{2} \: = \: N_{2}V_{1}}$$

$$\mathrm{\Rightarrow \: \frac{V_{2}}{V_{1}} \: = \: \frac{N_{2}}{N_{1}} \: = \: a_{A} \: \dotso \: (1)}$$

The equation (1) is known as the voltage transformation ratio of autotransformer.

Also, from the equivalent circuit of the autotransformer, we have,

$$\mathrm{(V_{1}\: - \:V_{2})I_{1} \: = \: V_{2}(I_{2} \: - \: I_{1})}$$

$$\mathrm{\Rightarrow \: V_{1}I_{1} \: - \: V_{2}I_{1} \: = \: V_{2}I_{2}\: - \:V_{2}I_{1}}$$

$$\mathrm{\Rightarrow \: V_{1}I_{1} \: = \: V_{2}I_{2}}$$

$$\mathrm{\Rightarrow \: \frac{V_{2}}{V_{1}} \: = \: \frac{I_{1}}{I_{2}} \: \dotso \: (2)}$$

From the eqns. (1) and (2), we get,

$$\mathrm{\frac{V_{2}}{V_{1}} \: = \: \frac{N_{2}}{N_{1}} \: = \: \frac{I_{1}}{I_{2}} \: = \: a_{A} \: \dotso \: (3)}$$

As the given autotransformer is ideal one, hence,

$$\mathrm{V_{1}I_{1}\:=\:V_{2}I_{2} \: \dotso \: (4)}$$

$$\mathrm{\Rightarrow \: \text{ Input apparent power = Output apparent power}}$$

Output of an Autotransformer

As the primary and secondary winding of an autotransformer are connected magnetically as well as electrically. Therefore, the power from primary side is transferred to secondary side magnetically (inductively) as well as conductively.

Here,

$$\mathrm{\text{Output apparent power} \: = \: V_{2}I_{2}}$$

$$\mathrm{\text{Power transferred inductively }\: = \:V_{2}(I_{2}\: - \: I_{1})}$$

$$\mathrm{\because \: I_{1}\:=\:a_{A}I_{2}}$$

$$\mathrm{\therefore \: \text{Power transferred inductively } \: = \: V_{2}(I_{2} \: - \:a_{A}I_{2}) \: = \: V_{2}I_{2}(1\: - \:a_{A})}$$

Since,

$$\mathrm{V_{1}I_{1}\:=\:V_{2}I_{2}}$$

Therefore,

$$\mathrm{\text{Power transferred inductively} \: = \: V_{1}I_{1}(1 \: - \: a_{A}) \: = \: Input \: \times \: (1\: - \: a_{A}) \: \dotso \: (5)}$$

The equation (5) gives the amount of power that is transferred magnetically from primary to secondary.

Now, the power transferred conductively is given by,

$$\mathrm{\text{Power transferred conductively} \: = \: \text{ (Input power} ) \: - \: \text{(Power transferred inductively)}}$$

$$\mathrm{\Rightarrow\: \text{Power transferred conductively } \: = \: (Input) \: - \: [Input \: \times \: (1 \: - \: a_{A})]}$$

$$\mathrm{= \: Input \: \times \: (1\: - \:(1\: - \:a_{A}))}$$

$$\mathrm{\text{Power transferred conductively } \: = \: Input \: \times \: a_{A} \: \dotso \: (6)}$$

The equation (6) gives the amount of power that is transferred electrically from primary to secondary.

Saving of Conductor Material (Copper) in Transformer

For the same ratings, i.e., same output and same transformation ratio, an autotransformer needs less conductor material (copper) as compared to an ordinary 2-winding transformer. The figure shows a two winding transformer (left) and an autotransformer (right), both are of same ratings.

Saving of Conductor Material in Transformer

The length of the copper wire required in a winding is directly proportional to number of turns in the winding and the cross-sectional area of the wire is directly proportional to the current rating. Therefore, the volume and hence the weight of the copper material required in the winding is directly proportional to the product of the current and the number of turns in the winding i.e.

$$\mathrm{\text{Weight of copper material required } \: \varpropto \: Current \: \times \: \text{Number of turns}}$$

For the 2-winding transformer −

$$\mathrm{\text{Weight of copper required } \: \varpropto \: (I_{1}N_{1} \: + \: I_{2}N_{2})}$$

For the autotransformer −

$$\mathrm{\text{Weight of copper required in section ac} \: \varpropto \: I_{1}(N_{1} \: - \: N_{2})}$$

$$\mathrm{\text{Weight of copper required in section bc} \: \varpropto \: (I_{2} \: - \: I_{1})N_{2}}$$

Therefore,

$$\mathrm{\text{Total Weight of copper required} \: \varpropto [I_{1}(N_{1} \: - \: N_{2}) \: + \: (I_{2} \: - I_{1})N_{2}]}$$

Now, comparing the weight of copper required by the autotransformer and the 2-winding transformer, we get,

$$\mathrm{\frac{W_{a}}{Wo} \: = \: \frac{[I_{1}(N_{1} \: - \: N_{2}) \: + \: (I_{2} \: - \: I_{1})N_{2}]}{(I_{1}N_{1} \: + \: I_{2}N_{2})}}$$

Here,

Wa − Weight of cu required in autotransformer

Wo − Weight of cu required in 2 - winding transformer

$$\mathrm{\Rightarrow \: \frac{W_{a}}{W_{o}} \: = \: \frac{I_{1}N_{1} \: - \: I_{1}N_{2} \: + \: I_{2}N_{2} \: - I_{1}N_{2}}{I_{1}N_{1} \: + \: I_{2}N_{2}} \: = \: \frac{I_{1}N_{1} \: + \: I_{2}N_{2} \: - \: 2I_{1}N_{2}}{I_{1}N_{1} \: + \: I_{2}N_{2}}}$$

$$\mathrm{\Rightarrow \: \frac{W_{a}}{W_{o}} \: = \: 1 \: - \: \frac{2I_{1}N_{2}}{I_{1}N_{1} \: + \: I_{2}N_{2}}}$$

$$\mathrm{\because \: I_{2}N_{2} \: = \: I_{1}N_{1}}$$

$$\mathrm{\Rightarrow \: \frac{W_{a}}{W_{o}} \: = \: 1 \: - \: \frac{2I_{1}N_{2}}{2I_{1}N_{1}} \: = \: 1 \: - \: \frac{N_{2}}{N_{1}} \: = \: (1 \: - \: a_{A})}$$

Therefore, the weight of copper material required in an autotransformer is

$$\mathrm{W_{a} \: = \: (1 \: - \: a_{A}) \: - \: W_{o} \: \dotso \: (7)}$$

Thus, the saving of copper material in an autotransformer as compared to a 2-winding transformer is given by,

$$\mathrm{\text{Saving of copper material } \: = \: W_{o} \: - \: W_{a} \: = \: W_{o} \: - \: (1 \: - \: a_{A})W_{o}}$$

$$\mathrm{\Rightarrow \: \text{Saving of copper material } \: = \: a_{A} \: \times \: W_{o} \: \dotso \: (8)}$$

The eq. (8) gives the value of saving of copper material in an autotransformer. It is clear that the value of aA of autotransformer is nearer to 1, the greater is the saving of copper material.

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