Lesson 3Position, Speed, and Direction

Let's use signed numbers to represent movement.

Learning Targets:

  • I can multiply a positive number with a negative number.
  • I can use rational numbers to represent speed and direction.

3.1 Distance, Rate, Time

  1. An airplane moves at a constant speed of 120 miles per hour for 3 hours. How far does it go?
  2. A train moves at constant speed and travels 6 miles in 4 minutes. What is its speed in miles per minute?
  3. A car moves at a constant speed of 50 miles per hour. How long does it take the car to go 200 miles?

3.2 Going Left, Going Right

A blank number line. The numbers negative 24 through 24, in increments of two, are indicated. There are tick marks midway between.
  1. After each move, record your location in the table. Then write an expression to represent the ending position that uses the starting position, the speed, and the time. The first row is done for you.
    starting
    position
    direction speed
    (units per
    second)
    time
    (seconds)
    ending
    position
    (units)
    expression  
    0 right 5 3 +15 0 + 5 \boldcdot 3
    0 left 4 6
    0 right 2 8
    0 right 6 2
    0 left 1.1 5
  2. How can you see the direction of movement in the expression?
  3. Using a starting position p , a speed s , and a time t , write two expressions for an ending position. One expression should show the result of moving right, and one expression should show the result of moving left.

3.3 Velocity

A traffic safety engineer was studying travel patterns along a highway. She set up a camera and recorded the speed and direction of cars and trucks that passed by the camera. Positions to the east of the camera are positive, and to the west are negative.

A number line with 3 evenly spaced tick marks. Starting with the first tick mark, the numbers negative 100, 0 and 100 are indicated. The leftmost side is labeled “west.” The rightmost side is labeled “east.”

Vehicles that are traveling towards the east have a positive velocity, and vehicles that are traveling towards the west have a negative velocity.

  1. Complete the table with the position of each vehicle if the vehicle is traveling at a constant speed for the indicated time period. Then write an equation.
    velocity
    (meters per
    second)
    time after
    passing the
    camera
    (seconds)
    ending
    position
    (meters)
    equation
    describing
    position
    +25 +10 +250 25 \boldcdot 10 = 250
    -20 +30
    +32 +40
    -35 +20
    +28 0
  2. If a car is traveling east when it passes the camera, will its position be positive or negative 60 seconds after it passes the camera? If we multiply two positive numbers, is the result positive or negative?
  3. If a car is traveling west when it passes the camera, will its position be positive or negative 60 seconds after it passes the camera? If we multiply a positive and a negative number, is the result positive or negative?

Are you ready for more?

In many contexts we can interpret negative rates as "rates in the opposite direction."  For example, a car that is traveling -35 miles per hour is traveling in the opposite direction of  a car that is traveling 40 miles per hour.

  1. What could it mean if we say that water is flowing at a rate of -5 gallons per minute? 
  2. Make up another situation with a negative rate, and explain what it could mean.

Lesson 3 Summary

We can use signed numbers to represent the position of an object along a line. We pick a point to be the reference point, and call it zero. Positions to the right of zero are positive. Positions to the left of zero are negative.

A number line with the numbers negative 10 through 10 indicated. A point is indicated at zero and is labeled "reference point." Another point is indicated at negative 4 and is labeled "4 units to the left of zero." A third point is indicated at 7 and is labeled "7 units to the right of zero."

When we combine speed with direction indicated by the sign of the number, it is called velocity. For example, if you are moving 5 meters per second to the right, then your velocity is +5 meters per second. If you are moving 5 meters per second to the left, then your velocity is -5 meters per second.

If you start at zero and move 5 meters per second for 10 seconds, you will be 5\boldcdot 10= 50 meters to the right of zero. In other words, 5\boldcdot 10 = 50 .

If you start at zero and move -5 meters per second for 10 seconds, you will be 5\boldcdot 10= 50 meters to the left of zero. In other words,

\text-5\boldcdot 10 = \text-50

In general, a negative number times a positive number is a negative number.

Lesson 3 Practice Problems

  1. A number line can represent positions that are north and south of a truck stop on a highway. Decide whether you want positive positions to be north or south of the truck stop. Then plot the following positions on a number line.

    1. The truck stop
    2. 5 miles north of the truck stop
    3. 3.5 miles south of the truck stop

    1. How could you distinguish between traveling west at 5 miles per hour and traveling east at 5 miles per hour without using the words “east” and “west”?
    2. Four people are cycling. They each start at the same point. (0 represents their starting point.) Plot their finish points after five seconds of cycling on a number line
      • Lin cycles at 5 meters per second
      • Diego cycles at -4 meters per second
      • Elena cycles at 3 meters per second
      • Noah cycles at -6 meters per second
  2. Find the value of each expression.

    16.2 + \text-8.4

    \frac25 - \frac35

    \text-9.2 + \text-7

    (\text-4\frac38) - (\text-1\frac14)

  3. A shopper bought a watermelon, a pack of napkins, and some paper plates. In his state, there is no tax on food. The tax rate on non-food items is 5%. The total for the three items he bought was $8.25 before tax, and he paid $0.19 in tax. How much did the watermelon cost?

  4. For each equation, write two more equations using the same numbers that express the same relationship in a different way.

    1. 3 + 2 = 5
    2. 7.1 + 3.4 = 10.5
    3. 15 - 8 = 7
    4. \frac32 + \frac95 = \frac{33}{10}
  5. Which graphs could not represent a proportional relationship? Explain how you decided.

    Four graphs of curves labeled A, B, C, and D in the xy coordinate plane with the origin labeled “O”. For each graph, the x axis has the numbers 0, 5, and 10 indicated. The y axis has the numbers 0 and 5.  In graph A, the curve is a line that begins at the origin and moves steadily upward and to the right.  In graph B, the curve begins at the origin and moves upward and to the right. It moves slowly in the beginning and then goes steeply upward. In graph C, the curve is a line that begins at the origin and moves slowly upward and to the right.  In graph D, the curve is a line that begins on the vertical axis and above the origin. It moves slowly upward and to the right.