Answer:
Current = 8696 A
Fraction of power lost = [tex]\dfrac{80}{529}[/tex] = 0.151
Explanation:
Electric power is given by
[tex]P=IV[/tex]
where I is the current and V is the voltage.
[tex]I=\dfrac{P}{V}[/tex]
Using values from the question,
[tex]I=\dfrac{1000\times10^6 \text{ W}}{115\times10^3\text{ V}} = 8696 \text{ A}[/tex]
The power loss is given by
[tex]P_\text{loss} = I^2R[/tex]
where R is the resistance of the wire. From the question, the wire has a resistance of [tex]0.050\Omega[/tex] per km. Since resistance is proportional to length, the resistance of the wire is
[tex]R = 0.050\times40 = 2\Omega[/tex]
Hence,
[tex]P_\text{loss} = \left(\dfrac{200000}{23}\right)^2\times2[/tex]
The fraction lost = [tex]\dfrac{P_\text{loss}}{P}=\left(\dfrac{200000}{23}\right)^2\times2\div (1000\times10^6)=\dfrac{80}{529}=0.151[/tex]
