A boat takes 2 hours to go 60km down the stream and it returns in 5 hours.
Find the speed of boat in still water and the speed of the stream.
Answers
Answer:
Solution
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Let’s assume the speed of the boat in still water be x km/hr
And the speed of the stream =y km/hr
So, the speed of the boat in downstream =(x+y) km/hr
The speed of the boat in upstream =(x−y) km/hr
We know that,
Distance=Speed×Time
Now, according to the given conditions in the problem, we have
40=(x+y)×2
⇒x+y=20 … (i)
And,
40=(x−y)×4
⇒x−y=10 … (ii)
Adding (i) and (ii), we have
2x=30
⇒x=15
On substituting the value of x in equation (i), we have
15+y=20
⇒y=20−15
⇒y=5
Therefore,
Speed of the boat in still water =15 km/hr and
Speed of the stream =5 km/hr.
Step-by-step explanation:
Answer:
speed of boat in down stream = 30km/hr
speed of boat in up stream = 12km/hr
average speed of boat = (30+12)/2=21km/hr
speed of stream= 30-12=18km/hr