Examples:

1. 6.2 – Simplified Form for Radicals Product Rule for Square Roots Examples:

2. 6.2 – Simplified Form for Radicals Quotient Rule for Square Roots Examples:

3. 6.2 – Simplified Form for Radicals

4. 6.2 – Simplified Form for Radicals Rationalizing the Denominator Radical expressions, at times, are easier to work with if the denominator does not contain a radical. The process to clear the denominator of all radicals is referred to as rationalizing the denominator

5. 6.2 – Simplified Form for Radicals Examples:

6. 6.2 – Simplified Form for Radicals Examples:

7. 6.2 – Simplified Form for Radicals Theorem: If “a” is a real number, then . Examples:

8. 6.3 - Addition and Subtraction of Radical Expressions Review and Examples:

9. 6.3 - Addition and Subtraction of Radical Expressions Simplifying Radicals Prior to Adding or Subtracting

10. 6.3 - Addition and Subtraction of Radical Expressions Simplifying Radicals Prior to Adding or Subtracting

11. 6.3 - Addition and Subtraction of Radical Expressions Simplifying Radicals Prior to Adding or Subtracting

12. 6.3 - Addition and Subtraction of Radical Expressions Examples:

13. 6.3 - Addition and Subtraction of Radical Expressions Examples:

14. 6.3 - Addition and Subtraction of Radical Expressions A Challenging Example

15. 6.4 –Multiplication and Division of Radical Expressions Examples:

16. 6.4 –Multiplication and Division of Radical Expressions Examples:

17. 6.4 –Multiplication and Division of Radical Expressions Examples:

18. 6.4 –Multiplication and Division of Radical Expressions Review: (x + 3)(x – 3)  x2 – 3x + 3x – 9  x2 – 9

19. 6.4 –Multiplication and Division of Radical Expressions If the denominator contains a radical and it is not a monomial term, then the use of a conjugate is required in order to rationalize the denominator. conjugate

20. 6.4 –Multiplication and Division of Radical Expressions Example:

21. 6.4 –Multiplication and Division of Radical Expressions Example: