A motor boat whose speed is 18km/h in still water takes 1 hour more to go 24km upstream than to return downstream to the same spot. Find the speed of the stream.
Answers
Answer:
Step-by-step explanation:
Let the speed of the stream be x km/hr.
Given: Time taken for going upstream is one hour more than the time taken for going downstream. So, tup=tdown+1 ----------(A)
Distance upstream = Distance downstream = 24 km
Speed of the boat going upstream, vup=18−x
Speed of the boat going downstream, vdown=18+x
Time taken going upstream, tup=Distance upstreamSpeed upstream =2418−x
tup=2418−x -------- (1)
Time taken going downstream, tdown=Distance downstreamSpeed downstream =2418+x
or tdown=2418+x --------- (2)
Using equation (1), (2) and (A):
2418−x=2418+x+1
24(18+x)=24(18−x)+(18+x)(18−x)
24∗18+24x=24∗18−24x+182−x2
x2+48x−182=0
x2+54x−6x−324=0
(x+54)(x−6)=0
x =6 (Rejecting negative value of x)
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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 .