A student pilot was required to fly to an airport and then return as part of his flight training. The average speed to the airport was 120 km/h, and the average speed returning was 150 km/h. If the total flight time was 3 hours, calculate the distance between the two airports.
- 270 km
-
200 km
- 360 km
- 450 km
The correct answer is: B
Explanation
Speed = \(\frac{Distance}{Time}\)
β Time = \(\frac{Distance}{Time}\)
Let D = distance between the two airports
β΄ Time taken to get to the airport = \(\frac{D}{120}\) and Time taken to return =\( \frac{D}{150}\)
Since total time of flight= 3hours,
β \(\frac{D}{120} + \frac{D}{150}\) = 3
β \(\frac{15D + 12D}{1800}\) = 3
β \(\frac{27D}{1800}\) = 3
β \(\frac{3D}{200} = \frac{3}{1}\)
β 3D = 200 x 3
β΄ D =\(\frac{ 200\times3}{3}\)= 200km
There is an explanation video available .