An exponent is a shorthand notation for repeated multiplication.

1. Exponents exponent base An exponent is a shorthand notation for repeated multiplication. 3 • 3 • 3 • 3 • 3 3 is a factor 5 times Using an exponent, this product can be written as

2. Exponential Notation exponent base This is called exponential notation. The exponent, 5, indicates how many times the base, 3, is a factor. Read as “three to the fifth power” or “the fifth power of three.” 3 • 3 • 3 • 3 • 3 3 is a factor 5 times

3. Reading Exponential Notation 4 = 41 is read as “four to the first power.” 4  4 = 42 is read as “four to the second power” or “four squared.”

4. Reading Exponential Notation 4  4  4 = 43 is read as “four to the third power” or “four cubed.” 4  4  4  4 = 44 is read as “four to the fourth power.”

5. Helpful Hint Usually, an exponent of 1 is not written, so when no exponent appears, we assume that the exponent is 1. For example, 2 = 21 and 7 = 71.

6. Examples Write the following numbers as a product of primes using exponents. 7056 3240

7. Evaluating Exponential Expressions To evaluate an exponential expression, we write the expression as a product and then find the value of the product. 35 = 3 • 3 • 3 • 3 • 3 = 243

8. Helpful Hint An exponent applies only to its base. For example, 4 • 23 means 4 • 2 • 2 • 2. Don’t forget that 24 is not 2 • 4. 24 means repeated multiplication of the same factor. 24 = 2• 2 • 2 • 2 = 16, whereas 2 • 4 = 8

9. Examples Simplify the following exponential expressions by evaluating.