Transformer example problem: Difference between revisions

Problem:

An ideal transformer with a 300 turn primary connected to a 480 V, 60 Hz supply line is to output 120 V from the secondary. If a 100 Ω resistor is connected across the secondary, determine: A) How many turns the secondary must have. B) The current through the resistor, C)The current drawn through the primary.

Solution:

Part A:

The ratio of primary voltage to secondary voltage is directly proportional to the ratio of number of turns on the primary to number of turns on the secondary: ${\displaystyle \frac{V_1}{V_2}=\frac{N_1}{N_2}}$

Where ${\displaystyle V_1=}$Voltage across primary, ${\displaystyle V_2=}$Voltage across secondary, ${\displaystyle N_1=}$ Number of turns in primary, ${\displaystyle N_2=}$ Number of turns in secondary

$$\begin{gathered} {\displaystyle \frac{480 \\ volts}{120 \\ volts}=\frac{300turns}{N_2}} \end{gathered}$$

$$\begin{gathered} {\displaystyle N_2=\frac{300\cdot 120}{480}\Rightarrow N_2=75 \\ turns} \end{gathered}$$

Part B:

The voltage across the secondary is given in the problem statement as 120 volts. Using ohms law, ${\displaystyle V=i\cdot R}$, we can solve for the current.
${\displaystyle i_2=\frac{V_2}{R_L}}$
Where ${\displaystyle i_2=}$ Current through secondary, ${\displaystyle V_2=}$Voltage across secondary, ${\displaystyle R_L=}$ Load Resistor (R_L = 100 Ω)

$$\begin{gathered} {\displaystyle i_2=\frac{120 \\ volts}{100 \\ \mathrm{\Omega }}\Rightarrow i_2=1.2 \\ A} \end{gathered}$$

Part C: