Difference between revisions of "TADM2E 1.31"
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* each station is open 12hr a day, has 6 places for taking fuel, each fueling takes about 6 min | * each station is open 12hr a day, has 6 places for taking fuel, each fueling takes about 6 min | ||
| − | Amount of cars using given gas station daily: | + | Amount of cars using given gas station daily: <math>6 * 12 * \frac{60}{6} = 6 * 120 = 720 </math> |
| − | Gas station (at least in Europe) are used always used, so: | + | Gas station (at least in Europe) are used always used, so: <math>\frac{300 000 000}{720} \approx 333 000</math> gas stations. |
Revision as of 18:23, 11 September 2014
assumptions: aprox 400000 cars each car needs to refuel once a week each gas station is open 10 hours a day and refuels 10 cars an hour There are enough stations to refuel all cars once per week
Calculation: cars that can be fueled by 1 station in 1 week 10*10*7=700 number of gas stations (rounded up): ceil(400000/700)=572
A slightly different approach:
- aprox 300 mln cars in US (1 car per each citizen).
- each station is open 12hr a day, has 6 places for taking fuel, each fueling takes about 6 min
Amount of cars using given gas station daily: $ 6 * 12 * \frac{60}{6} = 6 * 120 = 720 $
Gas station (at least in Europe) are used always used, so: $ \frac{300 000 000}{720} \approx 333 000 $ gas stations.
