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# Tag Archives: distance

## Counting Speed 2

Q: Jeff drives at the speed of 50 km/h from destination A to B. Jackson, who departs 30 minutes after Jeff, drives at the speed of 70 km/h from destination A to B. Both Jeff and Jackson reach destination B at the same time. What is the distance between destination A and destination B?

A: At first glance, the students may question whether there is an answer. Although the speed and the time are given, the time is not the time taken to travel from destination A to destination B.

No worry. The distance travelled is the same for Jeff and Jackson and we can use this information to solve the question. Please note that the unit for time is minute, converting to hour, it is 0.5 hour.

Let’s take t = time take for Jeff to reach destination B.

The distance travelled for Jeff = speed x time

= 50 x t

The distance travelled for Jackson = speed x time

= 70 x (t – 0.5)

The distance travelled is the same,

50t = 70 (t – 0.5)

Solving the above equation,

50t = 70t – 35

t = 35 ÷ 20

= 1.75 h

From the speed triangle, distance (travelled by Jeff) = speed x time

Distance = 50 x 1.75

= 87.5 km

The speed triangle

The distance from destination A to destination B is the same. Thus, the distance travelled by Jeff and Jackson should be the same.

Distance (travelled by Jackson) = speed x time,

Distance = 70 x 1.25

= 87.5 km

Note:

1. Look for all the necessary information in the question and use all of them.

2. Speed is a simple concept. Thus, questions about speed are normally combined with other concepts, for example, circles. Other than the speed formula and the unit conversion, the students must be prepared to use other concepts to solve speed questions.

## Counting Speed 1

After the students learn time and length, the next concept they learn in Higher Primary school is speed. The length is equivalent to the distance travelled.

The formula is

Speed = Distance ÷ Time

To help the students to remember the formula, a speed triangle is taught, as below.

The speed triangle

Taking the example from Counting Length, if I cycle to school at the speed of 15 km/h, how much time do I need to reach school?

From the speed triangle, time = distance ÷ speed

From the figure below, the distance between my house and the school is 180 m.

Please take note that the unit for speed is km/h and the unit for distance is m. Thus, the first step is to convert the two different units to the same unit.

1 km = 1000 m

15 km = 15 000 m

With speed = 15000 m/h and distance = 180 m,

Time = (180 ÷ 15000) h

= 0.012 h

= 0.72 min

= 43.2 sec

Distance

Speed is a simple concept, once the students remember the speed triangle (and the speed formula) and familiar with unit conversion, the answer is somewhere near 🙂

In our daily lives, we travel by cars and public transport. Use the speed concept in daily life and maybe the student can manage time better too. Enjoy your learning experience!

Note:

1. In Secondary school, the students will learn the term “velocity” in Physics, which is speed with a direction.

2. (a) Take note of the unit used. For distance, common units are km and m. For time, common units are hour, minute and second. The units used for distance and time determine the unit for speed.

(b) Be fluent with unit conversion for distance and time.