Given that,
A motorboat travels 165 kilometers in 3 hours going upstream and 510 kilometers in 6 hours going downstream
Therefore,
Upstream distance = 165 km
Upstream time = 3 hours
[tex]speed = \frac{distance}{time}\\\\speed = \frac{165}{3}\\\\speed = 55[/tex]
Thus upstream speed is 55 km per hour
Downstream distance = 510 km
Downstream time = 6 hours
[tex]speed = \frac{510}{6}\\\\speed = 85[/tex]
Thus downstream speed is 85 km per hour
If the speed of a boat in still water is u km/hr and the speed of the stream is v km/hr, then
Speed downstream = u + v km/hr
Speed upstream = u - v km/hr
Therefore,
u + v = 85 ----- eqn 1
u - v = 55 ----- eqn 2
Solve both
Add them
u + v + u - v = 85 + 55
2u = 140
u = 70
Substitute u = 70 in eqn 1
70 + v = 85
v = 85 - 70
v = 15
Thus rate of the boat in still water is 70 km/hr and rate of the current is 15 km/hr
