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)

Answer:- 1

Explanation:-

Solution:

\begin{aligned} Speed of train A \\ =  63 kmph \\ = (\frac{63 \times 5}{18}) m/sec \\ =  17 .5 m/sec \\ Speed of train B \\ =  54 kmph \\ = (\frac{54 \times 5}{18}) m/sec  =  15 m/sec \\ If the length of train A be x metre, \\ then \\ Speed of train A \\ = \frac{Length of train  +  length of platform}{Time taken in crossing} \\ \Rightarrow 17.5 = \frac{x + 199.5}{21} \\ \Rightarrow 17.5 \times 21 = x + 199.5 \\ \Rightarrow 367.5 = x + 199.5 \\ \Rightarrow x = 367.5 - 199.5 \\ \Rightarrow 168 metres \\ Relative speed \\ =  ( Speed train A +  Speed train B) \\ =  (17 .5 + 15)  m/sec \\ =  32 .5 m/sec \\ Required time \\ = \frac{Length of train A +   Length of train B}{Relative speed} \\ = (\frac{168 + 157}{32.5}) seconds \\ = 10 seconds \end{aligned}

$\eqalign{ & {\text{Speed of train A}} \cr & {\text{ = 63 kmph}} \cr & {\text{ = }}\left( {\frac{{63 \times 5}}{{18}}} \right){\text{m/sec}} \cr & {\text{ = 17}}{\text{.5 m/sec}} \cr & {\text{Speed of train B}} \cr & {\text{ = 54 kmph}} \cr & {\text{ = }}\left( {\frac{{54 \times 5}}{{18}}} \right){\text{m/sec = 15 m/sec}} \cr & {\text{If the length of train A be }}x{\text{ metre,}} \cr & {\text{then}} \cr & {\text{Speed of train A}} \cr & {\text{ = }}\frac{{{\text{Length of train + length of platform}}}}{{{\text{Time taken in crossing}}}}{\text{ }} \cr & \Rightarrow 17.5 = \frac{{x + 199.5}}{{21}} \cr & \Rightarrow 17.5 \times 21 = x + 199.5 \cr & \Rightarrow 367.5 = x + 199.5 \cr & \Rightarrow x = 367.5 - 199.5 \cr & \Rightarrow 168\,{\text{metres}} \cr & {\text{Relative speed}} \cr & {\text{ = ( Speed train A + Speed train B)}} \cr & {\text{ = (17}}{\text{.5 + 15) m/sec}} \cr & {\text{ = 32}}{\text{.5 m/sec}} \cr & {\text{Required time}} \cr & {\text{ = }}\frac{{{\text{ Length of train A + Length of train B}}}}{{{\text{Relative speed }}}} \cr & = \left( {\frac{{168 + 157}}{{32.5}}} \right){\text{seconds}} \cr & = 10\,{\text{seconds}} \cr}$