Problems on trains" is a fascinating topic frequently encountered in competitive exams, particularly in quantitative aptitude sections. These Problems on Trains Questions revolve around determining various aspects of trains, such as speed, distance, time taken, and relative movement. Formulas and concepts in this area often involve relative speed, the length of the train, crossing a stationary object, overtaking another train, etc. Understanding these formulas is crucial for swiftly solving problems involving train-related scenarios, making it an essential skill for aspirants preparing for competitive exams. Mastery of these concepts empowers candidates to efficiently handle questions that test their logical reasoning, mathematical aptitude, and time management skills.
This Problems on Trains for Competitive Exams article aims to provide a concise yet comprehensive overview of the fundamental formulas, strategies, and problem-solving techniques necessary to effectively tackle "problems on trains" in competitive exams.
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Q : Train A moving at speed 72 kmph crosses train B moving at 3/4th speed of train A in the same direction in 1 min and 26 seconds. The length of train A is 25/18th of the length of train B. What is the difference between the lengths of two trains?
(A) 70 m
(B) 85 m
(C) 110 m
(D) 60 m
(E) 90m
Two trains of lengths 100 m and 140 m respectively are running in opposite directions on parallel tracks. If their speed is 29 km/hour and 43 km/hour respectively. In what time will they cross each other?
(A) 14seconds
(B) 10 seconds
(C) 20 seconds
(D) 16 seconds
(E) 12 seconds
The speed of train A and train B is 93 km/hr and 51 km/hr, respectively. When both the trains are running in the opposite direction, they cross each other in 18 seconds. The length of train B is half of the length of train A. If train A crosses a bridge in 42 seconds, then find the length of the bridge.
(A) 610 m
(B) 480 m
(C) 605 m
(D) 240 m
(E) 485 m
A train of length 287 m, running at 80 km/h, crosses another train moving in the opposite direction at 37 km/h in 18 seconds. What is the length of the other train?
(A) 300 m
(B) 298 m
(C) 289 m
(D) 285 m
A 480 m long train takes 16 seconds to pass a pole. How long will it take to pass a platform that is 900 m long?
(A) 47 seconds
(B) 45 seconds
(C) 46 seconds
(D) 48 seconds
The speed of two trains are in the ratio 6 : 7. If the second train covers 364 km in 4 hours, then what is the speed of the first train?
(A) 72
(B) 58
(C) 78
(D) 25
A train covers 400 m distance in 24 sec. Its speed is-
(A) 30 kmph
(B) 5 kmph
(C) 60 kmph
(D) 45 kmph
A train 270 meters long is running at a speed of 36 km per hour then it will cross a bridge of length 180 meters in :
(A) 40 sec
(B) 45 sec
(C) 50 sec
(D) 35 sec
According to the question the total distance will be (270+180)=450 meter
the speed of train will be in 10 m/sec
so that we knew that D=Speed Χ Time
450=10ΧTime
then Time will be 45 sec
A train crosses a platform in 30 seconds travelling with a speed of 60 km / h. If the length of the train be 200 metres, then the length ( in metres ) of the platform is
(A) 400
(B) 300
(C) 200
(D) 500
A train moves at a speed of 35 km/h for the first 2 hours and at a speed of 50 km/h for the next 4 hours. Find the average speed of the train during the entire journey.
(A) 47 km/h
(B) 50 km/h
(C) 45 km/h
(D) 35 km/h
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