# Lesson 2

Multiplying Powers of Ten

Let’s explore patterns with exponents when we multiply powers of 10.

### 2.1: 100, 1, or $\frac{1}{100}$?

Clare said she sees 100.

Tyler says he sees 1.

Mai says she sees $$\frac{1}{100}$$.

Who do you agree with?

### 2.2: Picture a Power of 10

In the diagram, the medium rectangle is made up of 10 small squares. The large square is made up of 10 medium rectangles.

1. How could you represent the large square as a power of 10?
2. If each small square represents $$10^2$$, then what does the medium rectangle represent? The large square?
3. If the medium rectangle represents $$10^5$$, then what does the large square represent? The small square?
4. If the large square represents $$10^{100}$$, then what does the medium rectangle represent? The small square?

### 2.3: Multiplying Powers of Ten

1. Complete the table to explore patterns in the exponents when multiplying powers of 10. You may skip a single box in the table, but if you do, be prepared to explain why you skipped it.
expression expanded single power of 10
$$10^2 \boldcdot 10^3$$ $$(10 \boldcdot 10)(10\boldcdot 10 \boldcdot 10)$$ $$10^5$$
$$10^4 \boldcdot 10^3$$
$$10^4 \boldcdot 10^4$$
$$(10 \boldcdot 10 \boldcdot 10)(10 \boldcdot 10 \boldcdot 10 \boldcdot 10 \boldcdot 10)$$
$$10^{18} \boldcdot 10^{23}$$
2. If you chose to skip one entry in the table, which entry did you skip? Why?
1. Use the patterns you found in the table to rewrite $$10^n \boldcdot 10^m$$ as an equivalent expression with a single exponent, like $$10^{\boxed{\phantom{3}}}$$.
2. Use your rule to write $$10^4 \boldcdot 10^0$$ with a single exponent.  What does this tell you about the value of $$10^0$$?
1. The state of Georgia has roughly $$10^7$$ human residents. Each human has roughly $$10^{13}$$ bacteria cells in his or her digestive tract. How many bacteria cells are there in the digestive tracts of all the humans in Georgia?

There are four ways to make $$10^4$$ by multiplying powers of 10 with smaller, positive exponents.

$$\displaystyle 10^1 \boldcdot 10^1 \boldcdot 10^1 \boldcdot 10^1$$

$$\displaystyle 10^1 \boldcdot 10^1 \boldcdot 10^2$$

$$\displaystyle 10^1 \boldcdot 10^3$$

$$\displaystyle 10^2 \boldcdot 10^2$$

(This list is complete if you don't pay attention to the order you write them in. For example, we are only counting $$10^1 \boldcdot 10^3$$ and $$10^3 \boldcdot 10^1$$ once.)

1. How many ways are there to make $$10^6$$ by multiplying smaller powers of 10 together?
2. How about $$10^7$$? $$10^8$$?

### Summary

In this lesson, we developed a rule for multiplying powers of 10: multiplying powers of 10 corresponds to adding the exponents together. To see this, multiply $$10^5$$ and $$10^2$$. We know that $$10^5$$ has five factors that are 10 and $$10^2$$ has two factors that are 10. That means that $$10^5 \boldcdot 10^2$$ has 7 factors that are 10. $$\displaystyle 10^5 \boldcdot 10^2 =(10 \boldcdot 10 \boldcdot 10 \boldcdot 10 \boldcdot 10) \boldcdot (10 \boldcdot 10)= 10^7.$$This will work for other powers of 10 too. So $$10^{14} \boldcdot 10^{47} = 10^{61}$$.

This rule makes it easier to understand and work with expressions that have exponents.