WARM UP

1. WARM UP 4 POWER OF A PRODUCTSimplify the expression. (3x)4 (-5x)3 (xy)6 (8xy)2

2. WARM UP 3 POWER OF A PRODUCT Simplify the expression. (3x)4 (-5x)3 (xy)6 (8xy)2

3. WARM UP 2 POWER OF A PRODUCT Simplify the expression. (3x)4 (-5x)3 (xy)6 (8xy)2

4. WARM UP 1 POWER OF A PRODUCT Simplify the expression. (3x)4 (-5x)3 (xy)6 (8xy)2

5. WARM UP 0 POWER OF A PRODUCT Simplify the expression. (3x)4 (-5x)3 (xy)6 (8xy)2

6. 9.3 Simplifying Radicals Goal Simplify radical expressions Key Words Radical Simplest form of a radical expression Product property of radicals Quotient property of radicals

7. 9.3 Simplifying Radicals The simplest form of a radical expression is an expression that has no perfect square factors other than 1 in the radicand, no fractions in the radicand, and no radicals in the denominator of a fraction. Properties of radicals can be used to simplify expression that contain radicals.

8. 9.3 Simplifying Radicals

9. 9.3 Simplifying Radicals

10. 9.3 Simplifying Radicals EXAMPLE 2 Simplify with the Quotient Property Simplify Factor using perfect squares Divide out common factors Use quotient property Simplify

11. 9.3 Simplifying Radicals EXAMPLE 3 Rationalize the Denominator Simplify Factor using perfect squares Divide out common factors Use quotient property Simplify

12. 9.3 Simplifying Radicals EXAMPLES