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Swati can row her boat at a speed of 5 km/hr in still water. If it takes her 1 hour more to row the boat 5.25 km upstream than to return downstream, find the speed of the stream.
- a)5 km/hr
- b)2 km/hr
- c)3 km/hr
- d)4 km/hr
Correct answer is option 'B'. Can you explain this answer?
Most Upvoted Answer
Swati can row her boat at a speed of 5 km/hr in still water. If it tak...
Let the speed of the stream be x km/h
Speed of the boat in upstream = (5 - x)km/h
Speed of the boat in downstream = (5 + x)km/h
Time, say t1 (in hours), for going 5.25 km upstream = 5.25/5 - x
Time, say t2 (in hours), for returning 5.25 km downstream = 5.25/5 + x
Obviously t1 > t2
Therefore, according to the given condition of the problem,
t1 = t2 + 1
This gives x = 2, since we reject x = -25/2
Thus, the speed of the stream is 2 km/h.
Speed of the boat in upstream = (5 - x)km/h
Speed of the boat in downstream = (5 + x)km/h
Time, say t1 (in hours), for going 5.25 km upstream = 5.25/5 - x
Time, say t2 (in hours), for returning 5.25 km downstream = 5.25/5 + x
Obviously t1 > t2
Therefore, according to the given condition of the problem,
t1 = t2 + 1
This gives x = 2, since we reject x = -25/2
Thus, the speed of the stream is 2 km/h.
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Swati can row her boat at a speed of 5 km/hr in still water. If it tak...
To solve this problem, we need to use the concept of relative speed and the formula for time, speed, and distance. Let's break down the problem step by step.
Given:
- Swati can row her boat at a speed of 5 km/hr in still water.
- It takes her 1 hour more to row the boat 5.25 km upstream than to return downstream.
Let's assume the speed of the stream is 's' km/hr.
Finding the downstream speed:
When Swati rows downstream, her effective speed will be the sum of her rowing speed and the speed of the stream. So, her downstream speed will be (5 + s) km/hr.
Finding the upstream speed:
When Swati rows upstream, her effective speed will be the difference between her rowing speed and the speed of the stream. So, her upstream speed will be (5 - s) km/hr.
Using the formula for time, speed, and distance:
We know that time = distance/speed.
Let's calculate the time taken to row downstream:
Distance = 5.25 km
Speed = (5 + s) km/hr
Time taken downstream = Distance/Speed = 5.25/(5 + s) hr
Now, let's calculate the time taken to row upstream:
Distance = 5.25 km
Speed = (5 - s) km/hr
Time taken upstream = Distance/Speed = 5.25/(5 - s) hr
According to the given information, it takes 1 hour more to row upstream than to row downstream. So, we can write the equation:
Time taken upstream = Time taken downstream + 1
5.25/(5 - s) = 5.25/(5 + s) + 1
Simplifying the equation:
5.25(5 + s) = 5.25(5 - s) + (5 - s)(5 + s)
26.25 + 5.25s = 26.25 - 5.25s + 25 - s^2
10.5s = 25 - s^2
s^2 + 10.5s - 25 = 0
Using the quadratic formula:
s = (-b ± √(b^2 - 4ac))/2a
s = (-10.5 ± √(10.5^2 - 4(1)(-25)))/(2(1))
s = (-10.5 ± √(110.25 + 100))/2
s = (-10.5 ± √210.25)/2
s = (-10.5 ± 14.5)/2
Simplifying further:
s = (-10.5 + 14.5)/2 or s = (-10.5 - 14.5)/2
s = 4/2 or s = -25/2 (rejecting the negative value)
Therefore, the speed of the stream is 2 km/hr (option B).
Given:
- Swati can row her boat at a speed of 5 km/hr in still water.
- It takes her 1 hour more to row the boat 5.25 km upstream than to return downstream.
Let's assume the speed of the stream is 's' km/hr.
Finding the downstream speed:
When Swati rows downstream, her effective speed will be the sum of her rowing speed and the speed of the stream. So, her downstream speed will be (5 + s) km/hr.
Finding the upstream speed:
When Swati rows upstream, her effective speed will be the difference between her rowing speed and the speed of the stream. So, her upstream speed will be (5 - s) km/hr.
Using the formula for time, speed, and distance:
We know that time = distance/speed.
Let's calculate the time taken to row downstream:
Distance = 5.25 km
Speed = (5 + s) km/hr
Time taken downstream = Distance/Speed = 5.25/(5 + s) hr
Now, let's calculate the time taken to row upstream:
Distance = 5.25 km
Speed = (5 - s) km/hr
Time taken upstream = Distance/Speed = 5.25/(5 - s) hr
According to the given information, it takes 1 hour more to row upstream than to row downstream. So, we can write the equation:
Time taken upstream = Time taken downstream + 1
5.25/(5 - s) = 5.25/(5 + s) + 1
Simplifying the equation:
5.25(5 + s) = 5.25(5 - s) + (5 - s)(5 + s)
26.25 + 5.25s = 26.25 - 5.25s + 25 - s^2
10.5s = 25 - s^2
s^2 + 10.5s - 25 = 0
Using the quadratic formula:
s = (-b ± √(b^2 - 4ac))/2a
s = (-10.5 ± √(10.5^2 - 4(1)(-25)))/(2(1))
s = (-10.5 ± √(110.25 + 100))/2
s = (-10.5 ± √210.25)/2
s = (-10.5 ± 14.5)/2
Simplifying further:
s = (-10.5 + 14.5)/2 or s = (-10.5 - 14.5)/2
s = 4/2 or s = -25/2 (rejecting the negative value)
Therefore, the speed of the stream is 2 km/hr (option B).
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Swati can row her boat at a speed of 5 km/hr in still water. If it takes her 1 hour more to row the boat 5.25 km upstream than to return downstream, find the speed of the stream.a)5 km/hrb)2 km/hrc)3 km/hrd)4 km/hrCorrect answer is option 'B'. Can you explain this answer? for Class 10 2025 is part of Class 10 preparation. The Question and answers have been prepared according to the Class 10 exam syllabus. Information about Swati can row her boat at a speed of 5 km/hr in still water. If it takes her 1 hour more to row the boat 5.25 km upstream than to return downstream, find the speed of the stream.a)5 km/hrb)2 km/hrc)3 km/hrd)4 km/hrCorrect answer is option 'B'. Can you explain this answer? covers all topics & solutions for Class 10 2025 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for Swati can row her boat at a speed of 5 km/hr in still water. If it takes her 1 hour more to row the boat 5.25 km upstream than to return downstream, find the speed of the stream.a)5 km/hrb)2 km/hrc)3 km/hrd)4 km/hrCorrect answer is option 'B'. Can you explain this answer?.
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