Question 21.7: Distributing Power to a City GOAL Understand transformers an...

(a) Determine the percentage of power lost in the line.
Substitute into Equation 21.23

I_{1}\,\Delta V_{1}=I_{2}\,\Delta V_{2}                    [21.23]

to find the current in the transmission line:

I_{2}={\frac{I_{1}\Delta V_{1}}{\Delta V_{2}}}={\frac{(1.00~\times~10^{2}\,\mathrm{A})(4.00~\times~10^{3}\,\mathrm{V})}{2.40~\times~10^{5}\,\mathrm{V}}}=1.67\,\mathrm{A}

Now use Equation 21.16

P_{\mathrm{av}}=I_{\mathrm{rms}}^{2}R                      [21.16]

to find the power lost in the transmission line:

(1)\ P_{\mathrm{lost}}=I_{2}^\mathrm{2}{R}=(1.67\,\mathrm{A})^{2}(30.0\,\Omega)=83.7\,\mathrm{W}

Calculate the power output of the generator:

P=I_{1}\,\Delta V_{1}=(1.00\times10^{2}\,A)(4.00\times10^{3}\,V)=4.00\times10^{5}\,\mathrm{W}

Finally, divide P_{\mathrm{lost}} by the power output and multiply by 100 to find the percentage of power lost:

% \mathrm{power\,lost}=\left(\frac{83.7\,\mathrm{W}}{4.00~\times~10^{5}\,\mathrm{W}}\right)\times\,100= 0.020 9 %

(b) What percentage of the original power would be lost in the transmission line if the voltage were not stepped up?
Replace the stepped-up current in Equation (1) by the original current of 1.00 × 10² A:

P_{\mathrm{lost}}=I^{2}R=(1.00\times10^{2}\,\mathrm{A})^{2}(30.0\,\Omega)\,=\,3.00\times10^{5}\,\mathrm{W}

Calculate the percentage loss, as before:

% {\mathrm{power~lost}}=\left({\frac{3.00~\times~10^{5}\,\mathrm{W}}{4.00~\times~10^{5}\,\mathrm{W}}}\right)\times100= 75 %

REMARKS This example illustrates the advantage of high-voltage transmission lines. At the city, a transformer at a substation steps the voltage back down to about 4 000 V, and this voltage is maintained across utility lines throughout the city. When the power is to be used at a home or business, a transformer on a utility pole near the establishment reduces the voltage to 240 V or 120 V.