Boats and Streams
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QUANT QUIZ ON BOATS AND STREAMS Boats and Streams Let us know what is Downstream and what is Upstream. Because these concepts are the heart of Boats and Streams. Downstream : In water,the direction along the stream is called downstream. I mean, If a boat or a swimmer swims in the same direction as the stream, then it is called downstream. Obviously the boat or swimmer require less efforts to travel using downstream. Because the stream itself helps the objects to move. Remember, as the object moves along with the water, the stream helps the object. So, the down stream speed (DS) is DS = U+V where U is the speed of the object in the still (calm) water V is the speed of the water. Upstream : If the boat or the swimmer is swimming in the opposite direction in which the stream is passing is called upstream. In simple words, the direction against the stream is called upstream. Remember, as the object moves against the water pushes the object in opposite direction. So, the upstream speed (US) is US = U-V where U is the speed of the object in the still (calm) water V is the speed of the water. Important Formulas on Boats and Streams : Let us assume that the speed of the boat in still water is U km/hr and the speed of stream is V km/hr then, as mentioned above : Speed downstream = (u+v)km/hr Speed upstream = (u-v)km/hr èIf the speed downstream is a km/hr and the speed upstream is b km/hr then : Speed in still water = 1/2(a+b) km/hr Rate of stream = 1/2(a-b)km/hr
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Boats and Streams
Transcript of Boats and Streams
QUANT QUIZ ON BOATS AND STREAMS
Boats and Streams Let us know what is Downstream and what is Upstream. Because these concepts are the heart of Boats and Streams.
Downstream : In water,the direction along the stream is called downstream. I mean, If a boat or a swimmer swims in the same direction as the stream, then it is called downstream. Obviously the boat or swimmer require less efforts to travel using downstream. Because the stream itself helps the objects to move.
Remember, as the object moves along with the water, the stream helps the object. So, the down stream speed (DS) is DS = U+Vwhere U is the speed of the object in the still (calm) waterV is the speed of the water.
Upstream : If the boat or the swimmer is swimming in the opposite direction in which the stream is passing is called upstream. In simple words, the direction against the stream is called upstream.Remember, as the object moves against the water pushes the object in opposite direction. So, the upstream speed (US) isUS = U-Vwhere U is the speed of the object in the still (calm) waterV is the speed of the water.
Important Formulas on Boats and Streams :Let us assume that the speed of the boat in still water is U km/hr and the speed of stream is V km/hr then, as mentioned above :Speed downstream = (u+v)km/hrSpeed upstream = (u-v)km/hrèIf the speed downstream is a km/hr and the speed upstream is b km/hr then :Speed in still water = 1/2(a+b) km/hrRate of stream = 1/2(a-b)km/hr
SOME QUESTIONS ON BOATS AND STREAMS WITH SOLUTIONS: (1)A man can row upstream at 8kmph and downstream at 10kmph. Find the man's rate in still water and the rate of current.(2) A boat can travel with a speed of 12km/hr in still water . If the speed of the stream is 5km/hr , find the time taken by boat to go 68km downstream.(3) If a man rows at the rate of 5kmph in still water and his rate against the current is 3.5kmph, then man's rate along the current is ?(4) A boat covers a certain distance downstream in 1 hour, while it comes back in 3/2 hours. If the speed of the stream is 3kmph, what is the speed of the boaat in still water ?(5) A speed of a boat in still water is 10 km/hr. If it can travel 26km downstream and 14km upstream in the same time , the speed of the stream is ?(6)The speed of the boat in still water is 10km/hr and the rate of the current is 3 km/hr. The distance travelled downstream in 12 minutes is ?
(7)what is the speed of the boat in still water ?(i)The speed downstream of the boat is twice the speed upstream.(ii)The sum of the speeds of the boat , upstream and downstream is 12kmph8.A man can row upstream at 5kmph and downstream at 15kmph .The speed of the stream is ?(9)A boat takes a total time three hours to travel downstreams from P to Q and the upstream back from Q to P. what is the speed of boat in still water ?i)The speed of the river current is 1 km per hourii)The distance between P and Q is 4 km.(10) .A man takes twice long to row a distance against the stream as to row the same distance in favour of the stream .the ratio of the speed of the boat in still water is ?
ANSWERS WITH EXPLANATIONS1. Solution : Rate in still water = 1/2 (10+8)km/hr = 9km/hr
Rate of current = 1/2(10-8)km/hr =1km/hr
2. Solution Speed downstream = (12+5)km/hr = 17 km/hr Time taken to travel 68km downstream = 68/17hrs =4hrs
3. Solution: Let us consider the rate along the current be x kmph. Then, 1/2(x+3.5) = 5 or X= 6.5 Kmph
4. Solution Let the speed of the boat in still water be x kmph.Then speed downstream = (X+3)kmphSpeed upstraem = (x-3)kmphTherefore (X+3)*1 = (x-3)*3/22x+6=3x-9 => X= 15kmph
5. solution : let the speed of the stream be x km/hr. then,Speed downstream=(10+x)km/hr, speed upstream= (10-x)km/hr Therefore 26/(10+x)= 14/(10-x) 260-26x= 140+14x => 40x=120x=3km/hr
6. solution : Speed downstream =(10+3)kmph= 13kmph Distance travelled = 13*12/60 = 2.4 kmph
7. solution: Let the speed of the boat be x km/hr . Then i) Speed downstream = 2x km/hr ii)Says, the speed of the boat in still water = (1/2*12) = 6km /hr
8. Solution : Speed of the stream = 1/2 (15-5) = 5kmph
9. Solution : i) The speed of the current = 1km/hrii)PO =4km let the speed of the boat in still water be x km/hr 4/(x+1) +4/(x-1) =3
10. solution : Let man's upstream be xkmph . then . his rate downstream =3x km/hr (Speed in still water) : (Speed of stream ) = (2x+x/2) : (2x-x/2) =3x/2 : x/2 => 3:1
