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14. Calculate the time it takes to travel a distance of 672 km at a speed of 96 km/h. 15. A beetle travels at a speed of 0.09 m/s, it travels a distance of 1.08 m before it is caught in a jar. Calculate the time taken for the beetle to run. 16. Carlisle is a distance of 35 miles away from Lockerbie. If I travelled at a constant speed
Speed, time, and distance problems worksheets. Make customizable worksheets about constant (or average) speed, time, and distance for pre-algebra and algebra 1 courses (grades 6-9). Both PDF and html formats are available.
When solving these problems, use the relationship rate (speed or velocity) times time equals distance. [latex]r\cdot t=d[/latex] For example, suppose a person were to travel 30 km/h for 4 h. To find the total distance, multiply rate times time or (30km/h)(4h) = 120 km. The problems to be solved here will have a few more steps than described above.
DISTANCE, TIME, SPEED PRACTICE PROBLEMS YOU MUST SHOW YOUR WORK. You can use a calculator but you must show all of the steps involved in doing the problem. SPEED 1. If a car travels 400m in 20 seconds how fast is it going? 2. If you move 50 meters in 10 seconds, what is your speed? 3.
Set grade 6, grade 7, and grade 8 children an exciting challenge to solve exercises and compare speeds! These pdf tools focus on finding who (person) or which (object) is faster given the distance and time. Download the set. Conversion of Units of Speed.
Distance - Rate - Time Word Problems Date_____ Period____ 1) An aircraft carrier made a trip to Guam and back. The trip there took three hours and the trip back took four hours. It averaged 6 km/h on the return trip. Find the average speed of the trip there. 2) A passenger plane made a trip to Las Vegas and back.
Speed Distance Time – Formula. Speed, distance and time are all related by the formula, s = \dfrac {d} {t} where s is speed, d is distance, and t is time. You can rearrange this formula to find the other two, for example, if we multiply both sides by t and divide both sides by s, we get, t = \dfrac {d} {s}
