A man can swim in still water at 4.5 kmph, but takes twice as long to swim upstream than downstream. The speed of the stream is-
Answers
Answer:
1/2 km/hr
Step-by-step explanation:
Speed in upstream = Distance / Time = 3 x 60/20 = 9 km/hr. Rate of current = (10-9)/2 = 1/2 km/hr
hope it helps :)
A man can swim in still water at 4.5 km/h but takes twice as long to swim upstream than downstream.
We have to find the speed of the stream.
What are upstream and downstream ?
upstream : it means, an object is going opposite to the flow of a river.
downstream : it means, an object is going along the flow of a river.
for understanding, if we assume x is speed of object in still water and y is speed of stream then
speed of object in upstream = (x - y)
speed of object in downstream = (x +y)
here, the speed of a man in still water , x = 4.5 km/h
let the speed of stream is y km/h.
so speed of the man in upstream = (4.5 - y) km/h
speed of the man in downstream = (4.5 + y) km/h
we know, speed = distance/time
it is clear that, if distance remains constant, speed of a particle will be inversely proportional to time.
i.e., speed ∝ 1/time
A/C to question, he takes twice as long to swim upstream as downstream.
∴
⇒
⇒ 2(4.5 - y) = (4.5 + y)
⇒ 9 - 2y = 4.5 + y
⇒ 3y = 4.5
⇒ y = 1.5
Therefore the speed of the stream is 1.5 km/h.