A Ferry Traveled 1 6 Of The Distance . Find the speed of the train in fraction of the distance per hr (speed = dist/time) = = of the distance per hr The speed, s, of the car is distance travelled divided by time taken or (d/6 miles)/(3/5 hours) = (d/6)*(5/3) miles per hour = 5d/18 miles per hour.
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3/7 * 7/3 hours = 1/6 * 7/3 distance. At this rate, what fraction of the Correct answer to the question a ferry traveled 1/6 of the distance between two ports in 3/7.
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Find the speed of the train in fraction of the distance per hr (speed = dist/time) = = of the distance per hr Mathematically, it can be written as distance is traveled in 3/7 hours. A ferry traveled \dfrac16 6 1 start fraction, 1, divided by, 6, end fraction of the distance between two ports in \dfrac37 7 3 start fraction, 3, divided by, 7, end fraction hour. Speed = (1/6) / (3/7) speed = 7/18.
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Let x be the distance between two ports. Correct answer to the question a ferry traveled 1/6 of the distance between two ports in 3/7. Since the distances traveled in both cases are the same, we get the equation: The speed, s, of the car is distance travelled divided by time taken or (d/6 miles)/(3/5 hours) = (d/6)*(5/3) miles per.
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Let the distance betwen the cities be d miles. Then, the distance it will travel for an hour is calculated through the procedure below. If the person is traveling at a constant speed of 3 miles per hour, we can find the distance traveled by multiplying the speed by the amount of time they are walking. Speed = (1/6) /.
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The distance a vehicle travels can be calculated as follows: 50 × 6 = 300. Correct answer to the question a ferry traveled \dfrac16 6 1 start fraction, 1, divided by, 6, end fraction of the distance between two ports in \dfrac37 7 3 start fraction, 3, divided by, 7, end fraction hour. The ferry travels at a constant rate..
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Then, the distance it will travel for an hour is calculated through the procedure below. Start fraction, 1, divided by, 6, end fraction of the distance between two ports in \dfrac37. The ferry travels at a constant rate. For finding distance in one hour, divide both sides by 7/3 so that 3/7 would be cancelled out: Correct answer to the.
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A train traveled 1/5 of the distance between two cities in three quarters of an hour at this rate what fraction of the distance between the two cities can the train travel in one hour: The ferry travels at the same rate. So, the person traveled 6 miles in 2 hours. Speed = (1/6) / (3/7) speed = 7/18. Since.
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For finding distance in one hour, divide both sides by 7/3 so that 3/7 would be cancelled out: 3/7 * 7/3 hours = 1/6 * 7/3 distance. 1 hour = 7/18 of the distance between two ports. The speed, s, of the car is distance travelled divided by time taken or (d/6 miles)/(3/5 hours) = (d/6)*(5/3) miles per hour =.
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The speed, s, of the car is distance travelled divided by time taken or (d/6 miles)/(3/5 hours) = (d/6)*(5/3) miles per hour = 5d/18 miles per hour. Distance = speed * time. Therefore, after an hour, the ferry. The ferry travels at a constant rate. At this rate, what fraction of the distance between the.
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Correct answer to the question a ferry traveled 1/6 of the distance between two ports in 3/7. 1 hour = 7/18 of the distance between two ports. The fraction of distance traveled by ferry in one hour is 7/18 or 0.389 of the distance between the ports. The ferry travels at a constant rate. For example, if a train travels.
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The ferry travels at a constant rate. Start fraction, 1, divided by, 6, end fraction of the distance between two ports in \dfrac37. The ferry travels at a constant rate. Mathematically, it can be written as distance is traveled in 3/7 hours. Let the distance betwen the cities be d miles.
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Correct answer to the question a ferry traveled \dfrac16 6 1 start fraction, 1, divided by, 6, end fraction of the distance between two ports in \dfrac37 7 3 start fraction, 3, divided by, 7, end fraction hour. So, the distance traveled in 1 hour will be, At this rate, what fraction of the distance between the two ports can.
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A ferry traveled 1/6 of the distance between 2 ports in 3/7 hour. The fraction of distance traveled by ferry in one hour is 7/18 or 0.389 of the distance between the ports. Start fraction, 1, divided by, 6, end fraction of the distance between two ports in \dfrac37. 3/7 * 7/3 hours = 1/6 * 7/3 distance. As a.
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First, we determine the speed of the ferry by dividing the distance by the time it took to cover that certain distance. 3/7 * 7/3 hours = 1/6 * 7/3 distance. Start fraction, 1, divided by, 6, end fraction of the distance between two ports in \dfrac37. So, the person traveled 6 miles in 2 hours. A train traveled 1/5.
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50 × 6 = 300. So, the distance traveled in 1 hour will be, Correct answer to the question a ferry traveled \dfrac16 6 1 start fraction, 1, divided by, 6, end fraction of the distance between two ports in \dfrac37 7 3 start fraction, 3, divided by, 7, end fraction hour. For example, if a train travels 40 miles.
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Speed = (1/6) / (3/7) speed = 7/18. The distance a vehicle travels can be calculated as follows: Start fraction, 1, divided by, 6, end fraction of the distance between two ports in \dfrac37. A ferry traveled 1/6 of the distance between 2 ports in 3/7 hour. So, the person traveled 6 miles in 2 hours.
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Correct answer to the question a ferry traveled 1/6 of the distance between two ports in 3/7. 1 hour = 7/18 of the distance between two ports. Therefore, after an hour, the ferry. The ferry travels at a constant rate. A ferry traveled \dfrac16 6 1 start fraction, 1, divided by, 6, end fraction of the distance between two ports.
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Correct answer to the question a ferry traveled 1/6 of the distance between two ports in 3/7. The ferry travels at a constant rate. The ferry travels at the same rate. Therefore, after an hour, the ferry. Start fraction, 1, divided by, 6, end fraction of the distance between two ports in \dfrac37.
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The ferry travels at a constant rate. At this rate, what fraction of the distance between the. First, we determine the speed of the ferry by dividing the distance by the time it took to cover that certain distance. Write a program that asks the user for the speed of a vehicle (in miles per hour) and how many hours.
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The program should then use a loop to. Therefore, after an hour, the ferry. So, the person traveled 6 miles in 2 hours. At this rate, what fraction of the distance between the two ports can the ferry travel in one hour? A train traveled 1/5 of the distance between two cities in three quarters of an hour at this.
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The ferry travels at a constant rate. Therefore, after an hour, the ferry. A ferry travels 1/6 of the distance x in 3/7 hours. 50 × 6 = 300. As a fraction of the distance between the cities this is (5d/18)/d or just 5/18.
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Therefore, after an hour, the ferry. A ferry traveled 1/6 of the distance between 2 ports in 3/7 hour. The program should then use a loop to. The ferry travels at a constant rate. Since the distances traveled in both cases are the same, we get the equation:
