1. Radicals

2. Table of Contents  Slides 3-13: Perfect Squares  Slides 15-19: Rules  Slides 20-22: Simplifying Radicals  Slide 23: Product Property  Slides 24-31: Examples and Practice Problems  Slides 32-35: Perfect Cubes  Slides 36-40: N th Roots  Slides 41-48: Examples and Practice Problems  Slides 49-53: Solving Equations Audio/Video and Interactive Sites  Slide 14: Gizmos  Slide 19: Gizmo  Slide 24: Gizmo  Slide 27: Gizmo  Slide 48: Interactive

3. What are Perfect Squares? 1 1 = 1 2 2 = 4 3 3 = 9 4 4 = 16 5 5 = 25 6 6 = 36 49, 64, 81, 100, 121, 144,... and so on….

4. Since,. Finding the square root of a number and squaring a number are inverse operations. To find the square root of a number n, you must find a number whose square is n. For example, is 7, since 7 2 = 49. Likewise, (–7) 2 = 49, so –7 is also a square root of 49. We would write the final answer as: The symbol,, is called a radical sign. An expression written with a radical sign is called a radical expression. The expression written under the radical sign is called the radicand.

5. NOTE: Every positive real number has two real number square roots. The number 0 has just one square root, 0 itself. Negative numbers do not have real number square roots. When evaluating we choose the positive value of a called the principal root. Evaluate Notice, since we are evaluating, we only use the positive answer.

6. For any real numbers a and b, if a 2 = b, then a is a square root of b. Just like adding and subtracting are inverse operations, finding the square root of a number and squaring a number are inverse operations. Just like adding and subtracting are inverse operations, finding the square root of a number and squaring a number are inverse operations.

7. 2 2 2 x 2 = 4 Perfect Square The square root of 4 is... 2

8. 3 x 3 = 9 3 3 Perfect Square The square root of 9 is... 3

9. 4 x 4 = 16 4 4 Perfect Square 4 The square root of 16 is...

10. 5 5 5 x 5 = 25 Perfect Square Can you guess what the square root of 25 is?

11. 5 The square root of 25 is...

12. This is great, But…. Do you really want to draw blocks for a problem like… probably not! If you are given a problem like this: Find Are you going to have fun getting this answer by drawing 2025 blocks? Probably not!!!!!!

13. It is easier to memorize the perfect squares up to a certain point. The following should be memorized. You will see them time and time again. xx2x2 xx2x2 0010100 1111121 2412144 3913169 41614196 52515225 63616256 74920400 86425625 981502500

14. Gizmo: Ordering and Approximating Square Roots

15. Quick Facts about Radicals

16. To name the negative square root of a, we say To indicate both square roots, use the plus/minus sign which indicates positive or negative.

17. Simplifying Radicals

18. Negative numbers do not have real number square roots. No Real Solution

19. = b This symbol represents the principal square root of a. The principal square root of a non-negative number is its nonnegative square root. Gizmo: Square Roots

20. Simplifying Radicals Divide the number under the radical. If all numbers are not prime, continue dividing. Divide the number under the radical. If all numbers are not prime, continue dividing. Find pairs, for a square root, under the radical and pull them out. Multiply the items you pulled out by anything in front of the radical sign. Multiply anything left under the radical. Multiply the items you pulled out by anything in front of the radical sign. Multiply anything left under the radical. It is done!

21. Evaluate the following: To solve: Find all factors Pull out pairs (using one number to represent the pair. Multiply if needed)

22. Find all real roots:

23. To find the roots, you will need to simplify radial expressions in which the radicand is not a perfect square using the Product Property of Square Roots. Not all numbers are perfect squares

24. THIS IS WHERE KNOWING THE PERFECT SQUARES IS VITAL xx2x2 xx2x2 0010100 1111121 2412144 3913169 41614196 52515225 63616256 74920400 86425625 981502500 Gizmo: Simplifying Radicals

25. Examples: A.Simplify StepsExplanation

26. B. Simplify StepsExplanation

27. The general rule for reducing the radicand is to remove any perfect powers. We are only considering square roots here, so what we are looking for is any factor that is a perfect square. In the following examples we will assume that x is positive. Gizmo: Simplifying Radicals

28. Examples: A. Evaluate B. Evaluate

29. Examples: C. Evaluate D. Evaluate

30. Examples: E. Unless otherwise stated, when simplifying expressions using variables, we must use absolute value signs. when n is even. *All the sets of “3” have been grouped. They are cubes! NOTE: No absolute value signs are needed when finding cube roots, because a real number has just one cube root. The cube root of a positive number is positive. The cube root of a negative number is negative.

31. Evaluate the following: No real roots

32. What are Cubes? 1 3 = 1 x 1 x 1 = 1 2 3 = 2 x 2 x 2 = 8 3 3 = 3 x 3 x 3 = 27 4 3 = 4 x 4 x 4 = 64 5 3 = 5 x 5 x 5 = 125 and so on and on and on…..

33. 12 34 56 78 Cubes

34. 2 2 2 2 x 2 x 2 = 8

35. 3 x 3 x 3 = 27 3 3 3

36. N th Roots When there is no index number, n, it is understood to be a 2 or square root. For example: = principal square root of x. Not every radical is a square root. If there is an index number n other than the number 2, then you have a root other than a square root.

37. Since 3 2 = 9. we call 3 the square root of 9. Since 3 3 =27 we call 3 the cube root of 27. Since 3 4 = 81, we call 3 the fourth root of 81. N th Roots

38. More Explanation of Roots This leads us to the definition of the n th root of a number. If a n = b then a is the n th root b notated as,.

39. N th Roots Since (-)(-) = + and (+)(+) = +, then all positive real numbers have two square roots. Remember in our Real Number System the is not defined. However we can find the cube root of negative numbers since (-)(-)(-) = a negative and (+)(+)(+) = a positive. Therefore, cube roots only have one root.

40. Nth Roots Type of NumberNumber of Real nth Roots when n is even Number of Real nth Roots when n is odd. +21 011 -None1

41. Nth Roots of Variables Lets use a table to see the pattern when simplifying nth roots of variables. *Note: In the first row above, the absolute value of x yields the principal root in the event that x is negative.

42. Examples: A.Find all real cube roots of -125, 64, 0 and 9. B.Find all real fourth roots of 16, 625, -1 and 0. As previously stated when a number has two real roots, the positive root is called the principal root and the Radical indicates the principal root. Therefore when asked to find the nth root of a number we always choose the principal root.

43. F. Write each factor as a cube. Write as the cube of a product. Simplify. Absolute Value signs are NOT needed here because the index, n, is odd.

44. Application/Critical Thinking A.The formula for the volume of a sphere is. Find the radius, to the nearest hundredth, of a sphere with a volume of. B.A student visiting the Sears Tower Skydeck is 1353 feet above the ground. Find the distance the student can see to the horizon. Use the formula to the approximate the distance d in miles to the horizon when h is the height of the viewer’s eyes above the ground in feet. Round to the nearest mile. C.A square garden plot has an area of. a. Find the length of each side in simplest radical form. b. Calculate the length of each side to the nearest tenth of a foot.

45. Application Solutions: A.B. C.

46. Evaluate the following: To solve: Find all factors Pull out set’s that contain the same number of terms as the root (using one number to represent the set of 4. Multiply if needed)

47. Evaluate the following: No real roots

48. Practice Problems and Answers