A Motorboat Travels Upstream . First, lets write some equations from the given information using the general equation d=rt: The return trip takes 4 hours going downstream.
Can a Trolling Motor Go Upstream? Anchor Travel from anchor.travel
Let the speed of the boat when it is in still water be x km/h. Solve this system of equations by elimination. A motorboat travels 156 kilometers in 6 hours going upstream.
Can a Trolling Motor Go Upstream? Anchor Travel
V = 16 mph the speed of the boat in still water. T = the time of the travel downstream. It travels 330mi going downstream in the same amount of time. *** let c=speed of river
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It travels 264 miles going downstream in the same amount of time. Difference between timings = 1 hr. D = 200 mi the distance traveled in each direction. Find the speed of the boat in still water in k m / h. T + 1 = the time of the travel upstream.
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Time of upstream journey = time of downstream journey + 1 hr. What is the speed of the stream? Find the speed of the current of the river, if the speed of the motorboat in still water is 10 km/hour. Distance = rate × time Find the velocity of the river.
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It can travel 2 1 k m upstream and return in 5 hours. Y = the speed of the stream. C = the rate of the current. A motorboat travels 258mi in 6 hours going upstream. B + s = 55;
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Y = the speed of the stream. Find the velocity of the river. A person in a motorboat travels 1000m upstream, at which time a log is seen floating by. It can also travel 21 km upstream and return in 5 hours. Solve this system of equations by elimination.
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B + s = 55; T + 1 = the time of the travel upstream. The return trip takes 4 hours going downstream. Find the speed of the current of the river, if the speed of the motorboat in still water is 10 km/hour. Distance = rate × time
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The return trip upstream (against the current) takes. A motorboat takes 5 hours to travel 200km going upstream. D = 58 miles the distance traveled in one direction. A motorboat travels 378mi in 7 hours going upstream and440mi…. Find the speed of the boat in still water in k m / h.
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It travels 330mi going downstream in the same amount of time. Downstream is b + s. Add the two equations together: Find the speed of the current of the river, if the speed of the motorboat in still water is 10 km/hour. Let the speed of the boat when it is in still water be x km/h.
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What is the rate of the boat in still water and what is the rate of the current? A motorboat travels 217 km in 7 hours going upstream. Y = the speed of the stream. What's the rate of the boat in still water and what is the rate of the current. Simplify first by dividing each equation by 6:
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Find the speed of the current of the river, if the speed of the motorboat in still water is 10 km/hour. What is the rate of the boat in still water and what is the rate of the current? Rate * time = distance. Y = the speed of the stream. A small motorboat travels 12mph in still water.
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Calculate the speed of the boat when it is in still water in km/h. It travels 264 miles going downstream in the same amount of time. What is the rate of the boat in still water and what is the rate of the current? A motorboat travels 258mi in 6 hours going upstream. Difference between timings = 1 hr.
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Find the speed of the boat in still water in k m / h. A woman can row upstream at 16 km/hr and downstream at 26 km/hr. Time of upstream journey = time of downstream journey + 1 hr. Speed of current = v distance traveled = 1000 m time = 1 hour First, lets write some equations from the.
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Rate * time = distance. It travels 413km going downstream in the same amount of time. The return trip upstream (against the current) takes. Speed of current = v distance traveled = 1000 m time = 1 hour H 8 x 5 ?
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*** let c=speed of river Answer provided by our tutors. A motorboat takes 5 hours to travel 200km going upstream. Difference between timings = 1 hr. D = 200 mi the distance traveled in each direction.
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D2 = (b + c)*t T2 = 4 hr the time of the travel downstream. 8 10 11 12 13 14 15 16 17 18 19 20 son a motorboat travels 180 miles in 6 hours going upstream. A motorboat traveled 35 km upstream on a river and then up an adjacent stream for 18 km, spending 8 hours on.
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Solving for x we get: What is the speed of the stream? V = the rate of the boat in still water. The return trip takes 4 hours going downstream. T2 = 4 hr the time of the travel downstream.
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What is the rate of the boat in still water and what is the rate of the current? V = 16 mph the speed of the boat in still water. R(8/3 + t) = 17 ⇒ rt + 8/3r = 17 C = the current of the stream. Distance between the places is 3 2 km.
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A small motorboat travels 12mph in still water. It travels 264 miles going downstream in the same amount of time. H 8 x 5 ? What is the rate of the boat in still water and what is the rate of the current? It can also travel 21 km upstream and return in 5 hours.
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A motorboat travels 258mi in 6 hours going upstream. C = the rate of the current. It can travel 2 1 k m upstream and return in 5 hours. The person continues to travel upstream for 60.0min at the same speed and then returns downstream to the starting point, where the same log is seen again. It can also travel.
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The person continues to travel upstream for 60.0min at the same speed and then returns downstream to the starting point, where the same log is seen again. T1 = 5 hr the time of the travel upstream. Let the speed of the boat when it is in still water be x km/h. Speed of the boat in upstream = (2.
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A motorboat traveled 35 km upstream on a river and then up an adjacent stream for 18 km, spending 8 hours on the entire trip. Let the speed of the current be x mi/hr. A motorboat takes 5 hours to travel 200km going upstream. Add the two equations together: Speed of the boat in upstream = (2 4 − x).
