There is a circular track of length 440 m. Three persons A, B and C are standing at different points on the track and ready to start the race. A and B are standing
diametrically opposite to each other while C is exactly mid way
between A and B such that A, C and B are standing in that order. The race started at 10:00 a.m.
The speeds of A, B and C are 5 m/s, 10 m/s, and 8 m/s respectively.
15. At what time would B and C meet for the second time, if all the three of them run in the clockwise direction?
a) 10:06:25 a.m.
how is that B has to travel 35/4 rounds?
in solution it is given that B has to travel 35/4 rounds so that he meet c for the second time for which he will take 35/4*44 seconds
long method I know