Answer:
D) 9.4 V, 0.38 A
1) Voltage in the secondary coil: 9.4 V
The transformer equation states that:
[tex]\frac{V_p}{N_p}=\frac{V_s}{N_s}[/tex]
where
Vp = 120 V is the voltage in the primary coil
Np = 1400 is the number of turns in the primary coil
Vs = ? is the voltage in the secondary coil
Ns = 110 is the number of turns in the secondary coil
Solving the formula for Vs, we find
[tex]V_s = N_s \frac{V_p}{N_p}=(110)\frac{120 V}{1400}=9.4 V[/tex]
2) Current in the secondary coil: 0.38 A
A transformer is considered to be 100% efficient: it means that there is no loss of power, so the power in input is equal to the power in output
[tex]P_i = P_o\\V_p I_p = V_s I_s[/tex]
where
Vp = 120 V is the voltage in the primary coil
[tex]I_p = 3.0\cdot 10^{-2} A[/tex] is the current in the primary coil
Vs = 9.4 V is the voltage in the secondary coil
[tex]I_s[/tex] is the current in the secondary coil
Solving the equation for [tex]I_s[/tex],
[tex]I_s = \frac{V_p I_p}{V_s}=\frac{(120 V)(3.0\cdot 10^{-2}A)}{9.4 V}=0.38 A[/tex]
