A boat goes 30km upstream and 44km downstream in 10 hours. In 13 hour it can go 40km upstream and 55km downstream. Determine the speed of the stream and that of the boat in still water.
Answers
Answer:
Step-by-step explanation:
let, up stream = x kmph
& rate downstream = y kmph
Then 30/x + 44/y = 10
and 40/x + 55/y = 13
On solving we get x = 5 and y = 11
So, rate upstream = 5 km/hr and rate downstream = 11 km/hr
Rate of current = 1/2(11-5) km/hr = 3 km/hr
Rate in still water = 1/2(11+5) km/hr = 8 km/hr
Answer:
Speed of stream = 3 km / hr.
Speed of boat in still water = 8 km / hr.
Step-by-step explanation:
Let the speed of the boat in still water be a km / hr and stream be b km / hr
For upstream = a - b
For downstream = a + b
We know :
Speed = Distance / Time
Case 1 .
10 = 30 / a - b + 44 / a + b
Let 1 / a - b = x and 1 / a + b = y
30 x + 44 y = 10 ... ( i )
Case 2 .
13 = 40 / a - b + 55 / a + b
40 x + 55 y = 13 ... ( i )
Multiply by 4 in ( i ) and by 3 in ( ii )
120 x + 176 y = 40
120 x = 40 - 176 y ... ( iii )
120 x + 165 y = 39
120 = 39 - 165 y ... ( iv )
From ( iii ) and ( iv )
40 - 176 y = 39 - 165 y
11 y = 1
y = 1 / 11
120 x = 40 - 176 y
120 x = 40 - 176 / 11
x = 1 / 5
Now :
1 / a - b = 1 / 5
a - b = 5
a = 5 + b ... ( v )
1 / a + b = 1 / 11
a + b = 11
a = 11 - b ... ( vi )
From ( v ) and ( vi )
11 - b = 5 + b
2 b = 6
b = 3
a = 5 + b
a = 5 + 3
a = 8
Hence we get answer.