Train A traveling at 63 kmph can cross a platform 199.5 m long in 21 seconds. How much would train A take to completely cross (from the moment they meet ) train B, 157 m long and traveling at 54 kmph in opposite direction which train A is traveling? (in seconds)

  • 116
  • 218
  • 312
  • 410
Answer:- 1
Explanation:-

Solution:
Speed of train A = 63 kmph = (63×518)m/sec = 17.5 m/secSpeed of train B = 54 kmph = (54×518)m/sec = 15 m/secIf the length of train A be x metre,thenSpeed of train A = Length of train + length of platformTime taken in crossing 17.5=x+199.52117.5×21=x+199.5367.5=x+199.5x=367.5199.5168metresRelative speed = ( Speed train A + Speed train B) = (17.5 + 15) m/sec = 32.5 m/secRequired time =  Length of train A + Length of train BRelative speed =(168+15732.5)seconds=10seconds

Post your Comments

Your comments will be displayed only after manual approval.

", "dateCreated": "7/24/2019 10:09:12 AM", "author": { "@type": "Person", "name": "Nitin Sir" } }, "suggestedAnswer": { "@type": "Answer", "text": "
Solution:
Speed of train A = 63 kmph = (63×518)m/sec = 17.5 m/secSpeed of train B = 54 kmph = (54×518)m/sec = 15 m/secIf the length of train A be x metre,thenSpeed of train A = Length of train + length of platformTime taken in crossing 17.5=x+199.52117.5×21=x+199.5367.5=x+199.5x=367.5199.5168metresRelative speed = ( Speed train A + Speed train B) = (17.5 + 15) m/sec = 32.5 m/secRequired time =  Length of train A + Length of train BRelative speed =(168+15732.5)seconds=10seconds
", "dateCreated": "7/24/2019 10:09:12 AM" } }
Test
Classes
E-Book