Lesson 8Changing Temperatures

Let's add signed numbers.

Learning Targets:

  • I can use a number line to add positive and negative numbers.

8.1 Which One Doesn’t Belong: Arrows

Which pair of arrows doesn't belong?

  1. a number line
  2. a number line
  3. a number line
  4. a number line

8.2 Warmer and Colder

  1. Complete the table and draw a number line diagram for each situation.

    start ( ^\circ\text{C} ) change ( ^\circ\text{C} final ( ^\circ \text{C} ) addition equation
    a +40 10 degrees warmer +50 40 + 10 = 50
    b +40 5 degrees colder
    c +40 30 degrees colder
    d +40 40 degrees colder
    e +40 50 degrees colder
    1. A blank number line
    2. A blank number line
    3. A blank number line
    4. A blank number line
    5. A blank number line
  2. Complete the table and draw a number line diagram for each situation.

    start ( ^\circ\text{C} ) change ( ^\circ\text{C} ) final ( ^\circ\text{C} ) addition equation
    a -20 30 degrees warmer
    b -20 35 degrees warmer
    c -20 15 degrees warmer
    d -20 15 degrees colder
    1. A blank number line
    2. A blank number line
    3. A blank number line
    4. A blank number line

Are you ready for more?

a number line

For the numbers a and b represented in the figure, which expression is equal to |a+b| ?

|a|+|b|

|a|-|b|

|b|-|a|

8.3 Winter Temperatures

  1. One winter day, the temperature in Houston is 8^\circ Celsius. Find the temperatures in these other cities. Explain or show your reasoning.
    1. In Orlando, it is 10^\circ warmer than it is in Houston.
    2. In Salt Lake City, it is 8^\circ colder than it is in Houston.
    3. In Minneapolis, it is 20^\circ colder than it is in Houston.
  2. In Fairbanks, it is 10^\circ colder than it is in Minneapolis. What is the temperature in Fairbanks?
  3. Use the thermometer applet to verify your answers and explore your own scenarios.

Lesson 8 Summary

If it is 42^\circ outside and the temperature increases by 7^\circ , then we can add the initial temperature and the change in temperature to find the final temperature.

42 + 7 = 49

If the temperature decreases by  7^\circ , we can either subtract 42-7 to find the final temperature, or we can think of the change as  \text-7^\circ . Again, we can add to find the final temperature.

42 + (\text-7) = 35

In general, we can represent a change in temperature with a positive number if it increases and a negative number if it decreases. Then we can find the final temperature by adding the initial temperature and the change. If it is 3^\circ and the temperature decreases by 7^\circ , then we can add to find the final temperature.

3+ (\text-7) = \text-4

We can represent signed numbers with arrows on a number line. We can represent positive numbers with arrows that start at 0 and points to the right. For example, this arrow represents +10 because it is 10 units long and it points to the right.

A number line with the numbers negative 10 through 10 indicated. An arrow starts at 0, points to the left, and ends at negative 4.There is a solid dot indicated at 4.

We can represent negative numbers with arrows that start at 0 and point to the left. For example, this arrow represents -4 because it is 4 units long and it points to the left.

A number line with the numbers negative 10 through 10 indicated. An arrow starts at 0, points to the left, and ends at negative 4.There is a solid dot indicated at 4.

To represent addition, we put the arrows “tip to tail.” So this diagram represents 3+5 :

A number line with the numbers negative 10 through 10 indicated. An arrow starts at 0, points to the right, and ends at 3. A second arrow starts at 3, points to the right, and ends at 8. there is a solid dot indicated at 8.

And this represents 3 + (\text-5) :

A number line with the numbers negative 10 through 10 indicated. An arrow starts at 0, points to the right, and ends at three. A second arrow starts at 3, points to the left, and ends at negative 2. There is a solid dot indicated at negative

Lesson 8 Practice Problems

    1. The temperature is -2 ^\circ \text{C} . If the temperature rises by 15 ^\circ \text{C} , what is the new temperature?
    2. At midnight the temperature is -6 ^\circ \text{C} . At midday the temperature is 9 ^\circ \text{C} . By how much did the temperature rise?
  1. Complete each statement with a number that makes the statement true.

    1. _____ < 7^\circ \text{C}
    2. _____ < \text- 3^\circ \text{C}
    3. \text- 0.8^\circ \text{C} < _____ < \text- 0.1^\circ \text{C}
    4. _____ > \text- 2^\circ \text{C}
  2. Draw a diagram to represent each of these situations. Then write an addition expression that represents the final temperature.

    1. The temperature was 80 ^\circ \text{F} and then fell  20 ^\circ \text{F} .
    2. The temperature was \text-13 ^\circ \text{F} and then rose 9 ^\circ \text{F} .
    3. The temperature was \text-5 ^\circ \text{F} and then fell  8 ^\circ \text{F} .