Lesson 13

What do you notice? What do you wonder?

You find a brass bottle that looks really old. When you rub some dirt off of the bottle, a genie appears! The genie offers you a reward. You must choose one:

• $50,000; or
• A magical $1 coin. The coin will turn into two coins on the first day. The two coins will turn into four coins on the second day. The four coins will double to 8 coins on the third day. The genie explains the doubling will continue for 28 days.

1. The number of coins on the third day will be \(2 \boldcdot 2 \boldcdot 2\). Write an equivalent expression using exponents.
2. What do \(2^5\) and \(2^6\) represent in this situation? Evaluate \(2^5\) and \(2^6\) without a calculator.
3. How many days would it take for the number of magical coins to exceed $50,000?
4. Will the value of the magical coins exceed a million dollars within the 28 days? Explain or show your reasoning.

Explore the applet. (Why do you think it stops?)

1. Here are some expressions. All but one of them equals 16. Find the one that is not equal to 16 and explain how you know.

   \(2^3\boldcdot 2\)

   \(4^2\)

   \(\frac{2^5}{2}\)

   \(8^2\)

2. Write three expressions containing exponents so that each expression equals 81.

When we write an expression like \(2^n\), we call \(n\) the exponent.

If \(n\) is a positive whole number, it tells how many factors of 2 we should multiply to find the value of the expression. For example, \(2^1=2\), and \(2^5=2 \boldcdot 2 \boldcdot 2 \boldcdot 2 \boldcdot 2\).

There are different ways to say \(2^5\). We can say “two raised to the power of five” or “two to the fifth power” or just “two to the fifth.”