1. Warm Up
Evaluate each expression for the given values of the variables.
1. x3y2 for x = –1 and y = 10
for x = 4 and y = (–7)
Write each number as a power of the given base.
–100
3. 64; base 4 43
4. –27; base (–3)
(–3)3

2. Base x
Exponent
Remember! 4

3. Objectives Evaluate expressions containing zero and integer exponents.
Simplify expressions containing zero and integer exponents.

4. You have seen positive exponents
You have seen positive exponents. Recall that to simplify 32, use 3 as a factor 2 times: 32 = 3  3 = 9.
But what does it mean for an exponent to be negative or 0? You can use a table and look for a pattern to figure it out.
Power
Value 55 54 53 52 51 50
5–1
5–2
3125
625
125 25 5
 5
 5
 5
 5

5. When the exponent decreases by one, the value of the power is divided by 5. Continue the pattern of dividing by 5.

6. Base x
Exponent
Remember! 4

7. 2–4 is read “2 to the negative fourth power.”
Reading Math

8. WORDS
NUMBERS
ALGEBRA
Zero exponent – Any nonzero number raised to the ______ exponent is _____.
Negative exponent - nonzero number raised to a negative exponent is equal to _______ divided by that _____________ raised to the opposite (_____________) exponent.

10. Notice the phrase “nonzero number” in the previous table
Notice the phrase “nonzero number” in the previous table. This is because 00 and 0 raised to a negative power are both undefined. For example, if you use the pattern given above the table with a base of 0 instead of 5, you would get 0º = . Also 0–6 would be = . Since division by 0 is undefined, neither value exists.

11. Example 1: Application
One cup is 2–4 gallons. Simplify this expression.
gal is equal to

12. Check It Out! Example 1
A sand fly may have a wingspan up to 5–3 m. Simplify this expression.
5-3 m is equal to

13. Example 2: Zero and Negative Exponents
Simplify.
A. 4–3
B. 70
Any nonzero number raised to the zero power is 1.
7º = 1
C. (–5)–4
D. –5–4

14. In (–3)–4, the base is negative because the negative sign is inside the parentheses. In –3–4 the base (3) is positive.
Caution

15. Check It Out! Example 2
Simplify.
a. 10–4
b. (–2)–4
c. (–2)–5
d. –2–5

16. Example 3A: Evaluating Expressions with Zero and Negative Exponents
Evaluate the expression for the given value of the variables.
x–2 for x = 4
Substitute 4 for x.
Use the definition

17. Example 3B: Evaluating Expressions with Zero and Negative Exponents
Simplify the expression for the given values of the variables.
–2a0b-4 for a = 5 and b = –3
Substitute 5 for a and –3 for b.
Evaluate expressions with exponents.
Write the power in the denominator as a product.
Simplify the denominator.
Simplify.

18. Check It Out! Example 3a
Evaluate the expression for the given value of the variable.
p–3 for p = 4
Substitute 4 for p.
Simplify exponent.
Write the power in the denominator as a product.
Simplify the denominator.

19. Check It Out! Example 3b
Evaluate the expression for the given values of the variables.
for a = –2 and b = 6
Substitute –2 for a and 6 for b.
Simplify expressions with exponents.
Write the power in the denominator as a product.
Simplify the denominator. 2
Simplify.

20. What if you have an expression with a negative exponent in a denominator, such as ?
Definition of a negative exponent.
Substitute –8 for n.
Simplify the exponent on the right side.
An expression that contains negative or zero exponents is not considered to be simplified. Expressions should be rewritten with only positive exponents.
So if a base with a negative exponent is in a denominator, it is equivalent to the same base with the opposite (positive) exponent in the numerator.

21. Example 4: Simplifying Expressions with Zero and Negative Numbers
A. 7w–4

22. Example 4: Simplifying Expressions with Zero and Negative NumbersC.
and

23. Check It Out! Example 4
Simplify.
a. 2r0m–3
rº = 1 and b. c.