If the average speed of a train is increased
by 10 km/hr, the time taken to travel a
certain distance is reduced by 36 minutes. If
the averagespeed is reduced by
15 km/hr, the train takes Ihr and 12 mins
more to travel the same distance. Calculate
the average speed of the train.
Answers
Step-by-step explanation:
The average speed of train is 90 km/h .
Step-by-step explanation:
Given as :
The distance cover by train = d km
Let The average speed of train = s km/h
Let The time taken to cover d distance = t h
According to question
The average speed of a train is increased by 10 km/hr , the time taken to travel a certain distance is reduced by 36 minutes.
∵ Distance = speed × time
i.e d = s t
Or, d = (s + 10) km/h × (t - \dfrac{36}{60}
60
36
) h
Or, st = (s + 10) × (t - 0.6)
Or st = st - 0.6 s + 10 t - 6
Or, 0.6 s - 10 t + 6 = 0 ..........1
Again
If the average speed is reduced by 15 km/hr, the train takes 1 hr and 12 mins more to travel the same distance.
So, Time = 1 h + 12 m = 1.2 h [∵ 60 min = 1 h]
∵ Distance = speed × time
Or, d = (s - 15) km/h × (t h + 72 m)
Or, st = (s - 15) km/h × (t + 1.2) h
Or, st = st + 1.2 s - 15 t - 18
Or, 1.2 s - 15 t - 18 = 0 ..........2
Form eq 1 and eq 2
(1.2 s - 15 t) - 2 × (0.6 s - 10 t) = 18 + 2 ×6
Or, (1.2 s - 1.2 s) + (20 t - 15 t) = 30
Or, 0 + 5 t = 30
∴ t = \dfrac{30}{5}
5
30
i.e t = 6 hours
So, Time taken by train = t = 6 hours
Put the value of t in eq 2
∵ 1.2 s - 15 t = 18
Or, 1.2 s - 15 × 6 = 18
or, 1.2 s = 18 + 90
Or, 1.2 s = 108
∴ s = \dfrac{108}{1.2}
1.2
108
i.e s = 90 km/h
So, The average speed of train = s = 90 km/h
Hence, The average speed of train is 90 km/h . Answer
Step-by-step explanation:
average speed of the train = 17.1 km/hr
