Speed of the east bound cyclist is 12 mph and the speed of west bound cyclist is 15 mph.
Solution:
Let us assume that x is speed of slower eastbound cyclist
So, x+3 will be the speed of faster westbound cyclist
We know that distance is the product of speed and time. That is,
[tex]\text{Distance}=\text{Speed}\times\text{Time}[/tex]
West-bound DATA:
Rate of speed = x+3 mph ; Time = 6 hrs ; distance = 6(x+3) = 6x+18 miles
East-bound DATA:
Rate of speed = x mph ; time = 6 hrs. ; distance = 6x miles
On solving,
Distance apart = 162
[tex]\Rightarrow6x+18+6x = 162[/tex]
[tex]\Rightarrow12x=162-18[/tex]
[tex]\Rightarrow x=\frac{144}{12}\rightarrow x=12[/tex]
So, the rate of speed of the east bound cyclist is 12 mph and the rate of speed of the west bound cyclist will be [tex]x+3=12+3=15 \text{ mph}[/tex]
