Given: A truck enters a highway driving 60 mph.
A car enters the highway at the same place 13 minutes later and drives 75 mph in the same direction.
Let the truck covers 'x' m distance in time 't' hour the car will take [t -(13 /60)] hour to cover the same distance 'x'
Concept: Distance = Speed × Time
For Truck: Distance (x) = 60 mph × t ---------------(i)
For Car: Distance (x) = 75 mph × [t -(13 /60)] ------------(ii)
From equations (i) and (ii)
75 mph × [t -(13 /60)] = 60 mph × t
or, 75 mph × t -75×(13 /60) = 60 mph × t
or, 75 mph × t - 60 mph × t = 75×(13 /60)
or, 15 mph × t = 75×(13 /60)
or, t = 75×13 / (15×60) h
or, t ≈ 1.08 h = 64.999 minutes
Therefore, the car will cover the same distance in 64.999 - 13 = 51.999 minutes ≈ 52 minutes
Hence, the car will pass the truck after 52 minutes after its starting the race.
