Aptitude - Problems on Trains
Exercise : Problems on Trains - General Questions
- Problems on Trains - Formulas
- Problems on Trains - General Questions
- Problems on Trains - Data Sufficiency 1
- Problems on Trains - Data Sufficiency 2
- Problems on Trains - Data Sufficiency 3
26.
Two trains are running at 40 km/hr and 20 km/hr respectively in the same direction. Fast train completely passes a man sitting in the slower train in 5 seconds. What is the length of the fast train?
Answer: Option
Explanation:
Relative speed = (40 - 20) km/hr = | ![]() |
20 x | 5 | ![]() |
m/sec = | ![]() |
50 | ![]() |
m/sec. |
18 | 9 |
![]() |
![]() |
50 | x 5 | ![]() |
m = | 250 | m = 27 | 7 | m. |
9 | 9 | 9 |
27.
A train overtakes two persons who are walking in the same direction in which the train is going, at the rate of 2 kmph and 4 kmph and passes them completely in 9 and 10 seconds respectively. The length of the train is:
Answer: Option
Explanation:
2 kmph = | ![]() |
2 x | 5 | ![]() |
m/sec = | 5 | m/sec. |
18 | 9 |
4 kmph = | ![]() |
4 x | 5 | ![]() |
m/sec = | 10 | m/sec. |
18 | 9 |
Let the length of the train be x metres and its speed by y m/sec.
Then, | ![]() |
x | ![]() |
= 9 and | ![]() |
x | ![]() |
= 10. |
|
|
9y - 5 = x and 10(9y - 10) = 9x
9y - x = 5 and 90y - 9x = 100.
On solving, we get: x = 50.
Length of the train is 50 m.
28.
A train overtakes two persons walking along a railway track. The first one walks at 4.5 km/hr. The other one walks at 5.4 km/hr. The train needs 8.4 and 8.5 seconds respectively to overtake them. What is the speed of the train if both the persons are walking in the same direction as the train?
Answer: Option
Explanation:
4.5 km/hr = | ![]() |
4.5 x | 5 | ![]() |
m/sec = | 5 | m/sec = 1.25 m/sec, and |
18 | 4 |
5.4 km/hr = | ![]() |
5.4 x | 5 | ![]() |
m/sec = | 3 | m/sec = 1.5 m/sec. |
18 | 2 |
Let the speed of the train be x m/sec.
Then, (x - 1.25) x 8.4 = (x - 1.5) x 8.5
8.4x - 10.5 = 8.5x - 12.75
0.1x = 2.25
x = 22.5
![]() |
![]() |
22.5 x | 18 | ![]() |
km/hr = 81 km/hr. |
5 |
29.
A train travelling at 48 kmph completely crosses another train having half its length and travelling in opposite direction at 42 kmph, in 12 seconds. It also passes a railway platform in 45 seconds. The length of the platform is
Answer: Option
Explanation:
Let the length of the first train be x metres.
Then, the length of the second train is | ![]() |
x | ![]() |
metres. |
2 |
Relative speed = (48 + 42) kmph = | ![]() |
90 x | 5 | ![]() |
m/sec = 25 m/sec. |
18 |
![]() |
[x + (x/2)] | = 12 or | 3x | = 300 or x = 200. |
25 | 2 |
Length of first train = 200 m.
Let the length of platform be y metres.
Speed of the first train = | ![]() |
48 x | 5 | ![]() |
m/sec = | 40 | m/sec. |
18 | 3 |
![]() |
3 | = 45 |
40 |
600 + 3y = 1800
y = 400 m.
30.
Two stations A and B are 110 km apart on a straight line. One train starts from A at 7 a.m. and travels towards B at 20 kmph. Another train starts from B at 8 a.m. and travels towards A at a speed of 25 kmph. At what time will they meet?
Answer: Option
Explanation:
Suppose they meet x hours after 7 a.m.
Distance covered by A in x hours = 20x km.
Distance covered by B in (x - 1) hours = 25(x - 1) km.
20x + 25(x - 1) = 110
45x = 135
x = 3.
So, they meet at 10 a.m.
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