Math, asked by natanidsa2965, 1 year ago

A moter boat whose speed in still water is 18km, h takes 1 hour more to go 24km upstream than to return
Downstream to the same spot. Find the speed of the stream.


Answers

Answered by hayanidaiman
4

Given, speed of the boat in still water = 18 km/hr.


Let the speed of the stream be x km/hr.


Speed of the boat upstream = Speed of boat in still water – Speed of the stream


∴ Speed of the boat upstream = ( 18 – x ) km/hr


Speed of the boat downstream = Speed of boat in still water + Speed of the stream


∴ Speed of the boat downstream = ( 18 + x ) km/hr


Time of upstream journey = Time for downstream journey + 1 hr




⇒ 48x = 324 – x2


⇒ x2 + 48x – 324 = 0




∴ x = 6 (Speed of the stream cannot be negative)


Thus, the speed of stream is 6 km/hr.


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Answered by Anonymous
0

Answer:

Let the speed of stream be x km / hr

For upstream = ( 18 - x ) km / hr

For downstream = ( 18 + x ) km / hr

A.T.Q.

24 / 18 - x - 24 / 18 + x = 1

48 x = 324 - x²

x² + 48 x - 324 = 0

( x + 54 ) ( x - 6 ) = 0

x = - 54 or x = 6

Since speed can't be negative .

Therefore , speed of the stream is 6 km / hr .

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