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Roots and radical expressions
- 1. Simplifying Radicals Operations with Radicals
- 2. 2 2 2 2 2 2 1 1 2 4 3 9 4 16 5 25 6 36 = = = = = = 1 1 4 2 9 3 16 4 25 5 36 6 = = = = = = 2 2 2 2 2 2 7 49 8 64 9 81 10 100 11 121 12 144 = = = = = = 49 7 64 8 81 9 100 10 121 11 144 12 = = = = = =
- 3. 2 1) a a= b) a2 ba= × 3) a b b a =
- 4. Simplify: Step 1 Look for Perfect Squares (Try to use the largest perfect square possible.) Step 2 Simplify Perfect Squares Step 3 Multiply the numbers inside and outside the radical separately. 48 3 16 43 • • 4 3
- 5. Simplify: 48 4 12 34 2 2 3 • • • • 4 3
- 6. 2 a a= 2 x x= Any even power is a perfect square. 4 2 10 5 90 45 = = = x x x x x x The square root exponent is half of the original exponent.
- 7. Odd powers When you take the square root of an odd power, the result is always an even power and one variable left inside the radical. 5 2 11 5 91 45 = = = x x x x x x x x x
- 8. Simplifying using variables When you simplify an even power of a variable and the result is an odd power, use absolute value bars to make sure your answer is positive. 14 7 14 12 7 6 = = x x x y x y Even powers do not need absolute value.
- 9. Simplify: 3 16x Step 1 Pull out perfect squares Step 2 Simplify 16 2 x x x4 x• • 4x x
- 10. a ab b× = You can only multiply radicals by other radicals 8 3• Both under the radical CAN multiply 8 3• Not under the radical CANNOT multiply
- 11. 8 12•Simplify: Step 1 Are both radicals in simplest radical form? If not, Simplify Step 2 Multiply numbers IN FRONT of the radical Multiply numbers UNDER the radical Step 3 Put in Simplest Radical Form. 2 2 2 3• 2 2 32• 4 6
- 12. Simplify: ( ) 2 2 3 Step 1 Rewrite Step 2 Multiply IN FRONT of the radical Multiply UNDER the radical Step 3 Simplify ( )( )2 3 2 3 ( )( )2 3 2 3 4 9 4 3• 12
- 13. a b b a = No radicals (irrational numbers) may remain in the denominator. To remove them, use a process called rationalizing the denominator
- 14. 12 49 Simplify: 12 49 Step 1 Do I have a perfect square in the denominator? Step 2 Simplify both your numerator and your denominator 12 2 3= 49 7= 2 3 7
- 15. Simplify: Step 1 Do I have a perfect square in the denominator? Step 2 Can I reduce my fraction to get a perfect square in the denominator? Step 2 Simplify both your numerator and your denominator 75 12 75 12 75 12 3÷ 3÷ 25 45 2
- 16. Simplify: Step 1 Identify the radical in the denominator Step 2 Multiply denominator AND numerator by the radical in the denominator Step 3 Simplify 3 7 3 7 3 7 7• 7• 21 49 = 21 7
- 17. Review 2 4x x+ = Like Terms 6x We only add the numbers in front 2 2 2x x+ Not like terms. The Same is True with Radicals 2 3 4 3+ = 6 3 2 3 2 2+ Like Terms We only add the numbers in front CANNOT add Not like terms. CANNOT add
- 18. Step 1 Are both terms in simplest form? If not, simplify. Step 2 Are our radicals like terms? Step 3 Add or subtract the numbers in FRONT of the radical Keep the number on the UNDER the radical the SAME!!!SAME!!! 4 3 12− 4 3 2 3− 4 3 32− 2 3 Simplify:
- 19. ( )2 4 12+Simplify Step 1 Are all terms in simplest form? Step 2 Distribute Step 3 Multiply the #’s in front of the radical Multiply the #’s under the radical Step 4 Simplify and/or Combine like terms… IF WE CAN ( )2 4 2 3+ ( )( )2 4 4 2 ( )( )2 2 3+ ( )( )2 4 ( )( )2 2 3+ 62+
- 20. You can multiply two radical expressions using FOIL, the same way you do with binomials. Example: ( )( )2 5 3 3 5 (2)(3) (2)( 3 5) ( 5)(3) ( 5)( 3 5) 6 6 5 3 5 3 25 6 3 5 3(5) 9 3 5 + − + − + + − − + − − − − −
- 21. Conjugates are the sum and difference of the same two terms. Example: and When you multiply conjugates, no radicals are left. (The middle term cancels out, like in difference of two squares). ( )5 3+ ( )5 3−