Unit 6, Lesson 7
A New Kind of Number
Integrated Math 2
7.1
Warm-up
Instructional Routines
NoneMaterials
NoneActivity Narrative
The goal of this activity is to prepare students for extending the real numbers to the complex numbers in the next few activities. The point of this activity is not for students to come up with an appropriate explanation for why is well-defined, but to grapple with the cognitive dissonance that many people experience when extending the positive integers to the integers.
Launch
Arrange students in groups of 2. Give a few minutes of quiet think time before asking students to share their responses with their partners. Follow with a whole-class discussion.
Activity
NoneJada was helping her cousin with his math homework. He was supposed to solve the equation . He said, “If I subtract 8 from both sides, I get . This doesn’t make sense. You can’t subtract a bigger number from a smaller number. If I have 5 grapes, I can’t eat 8 of them!”
What do you think Jada could say to her cousin to help him understand why can make sense?
Activity Synthesis
Select 1–2 groups to share their ideas about how to explain negative numbers and to discuss any interesting differences between explanations.
Display a number line showing only non-negative numbers, like the one shown here.
Tell students, “For a long time, people worked with only positive numbers. They didn’t think you could subtract a bigger number from a smaller number. But then people invented negative numbers. We can think of this as expanding the number line from just the positive half to include the negative half.” Display a number line showing both positive and negative numbers, like the one shown here.
“Even in situations where it might not make sense to have negative numbers, they can be useful. Consider a situation in which Jada and her cousin each have some grapes on a plate. Jada gives her cousin 5 grapes and he eats 8 of the ones he has. They now have the same number of grapes on their plates. How many could each person have had to start? Negative grapes do not make sense on their own, but in some situations it can be useful to work with them.
“Similarly, it can be useful to work with a new kind of number that is not on the number line. We are going to learn about those numbers today.”
7.3
Activity
Instructional Routines
MLR2: Collect and DisplayMaterials
NoneActivity Narrative
In this activity, students build the imaginary axis using what they know about the real number line. Students know that real numbers can be represented as horizontal arrows that start at 0 on the number line, and apply this same thinking to draw imaginary numbers using vertical arrows that start at 0.
Launch
Explain that sometimes we represent numbers on the real number line with arrows. Positive numbers are represented with arrows that point to the right, and negative numbers are represented with arrows that point to the left. The real number 1 is represented on the number line shown. Ask, “How would we represent -4 on the real number line?” (Draw an arrow starting at 0 and ending at -4.)
Activity
NoneStudent Lesson Summary
Sometimes people call the number line the real number line.
- A positive number times a positive number is always positive. So when we square a positive number, the result will always be positive.
- A negative number times a negative number is always positive. So when we square a negative number, the result will always be positive.
- 0 squared is 0.
So squaring a real number never results in a negative number. We can conclude that the equation does not have any real number solutions. In other words, none of the numbers on the real number line satisfy this equation.
Mathematicians invented a new number that is not on the real number line. This new number was invented as a solution to the equation . For now, let’s write it as and draw a point to represent this number. Although you cannot have of anything, it is still a useful number in the same way that you cannot have -3 of something, but it is useful to think about.
We place our new point one unit above 0.
This new number is a solution to the equation , so . If we draw a line that passes through 0 on the real number line and , we get the imaginary number line. The numbers on the imaginary number line are called the imaginary numbers.