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Example 1. A train leaves a station at 9:00 AM and travels with a constant speed of 90 km/h. Another train leaves the same station 10 minutes later, traveling to the same direction at the speed of 100 km/h. At what time will the second train reach the first? We will be using the formula d = vt extensively in these problems. Let’s build a chart.
Question 6: Calculate the distance travelled by each of the following. (a) A car drives at a speed of 60mph for 30 minutes. (b) A taxi travels for 30 minutes at a speed of 28 mph. (c) A car travels at a speed of 44mph for 15 minutes. (d) A lorry drives at a speed of 51mph for 20 minutes.
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
18.2 Calculating Speed, Distance and Time In this section we extend the ideas of speed to calculating distances and times, using the following formulae: Speed = Distance Time Distance =Speed Time× Time = Distance Speed Example 1 Jane drives at an average speed of 45 mph on a journey of 135 miles. How long does the journey take? Solution Time ...
Worksheet # 1: Solve the Distance (d), Rate(r)/Speed and Time(t) Problems. Remember to read the problems carefully and set up a diagram or chart to help you set up the equations. Remember to use the right formula:
Speed and Distance. Speed is the distance you are travelling, divided by the length of time that it takes you to get there. Speed = Similarly, we can rearrange this equation as. Distance = Speed x Time . and . Time = Example. This chart describes the distance between four towns.
Explore our pdf speed, distance, and time worksheets and determine the unknown measure given the other two measures using the appropriate formulas.