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Simplifying Radicals

Simplifying Radicals. Perfect Squares. 64. 225. 1. 81. 256. 4. 100. 289. 9. 121. 16. 324. 144. 25. 361. 169. 400. 36. 196. 49. Simplify. = 2. = 4. = 5. This is a piece of cake!. = 10. = 12. Perfect Square Factor * Other Factor. Simplify. =. =. =. =.

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Simplifying Radicals

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  1. Simplifying Radicals

  2. Perfect Squares 64 225 1 81 256 4 100 289 9 121 16 324 144 25 361 169 400 36 196 49

  3. Simplify = 2 = 4 = 5 This is a piece of cake! = 10 = 12

  4. Perfect Square Factor * Other Factor Simplify = = = = LEAVE IN RADICAL FORM = = = = = =

  5. Perfect Square Factor * Other Factor Simplify = = = = LEAVE IN RADICAL FORM = = = = = =

  6. Combining Radicals + To combine radicals: combine the coefficients of like radicals

  7. Simplify each expression

  8. Simplify each expression: Simplify each radical first and then combine.

  9. Simplify each expression: Simplify each radical first and then combine.

  10. Perfect Square Factor * Other Factor Simplify = = = = LEAVE IN RADICAL FORM = = = = = =

  11. Simplify each expression

  12. Simplify each expression

  13. Multiplying Radicals * To multiply radicals: multiply the coefficients and then multiply the radicands and then simplify the remaining radicals.

  14. Multiply and then simplify

  15. Dividing Radicals To divide radicals: divide the coefficients, divide the radicands if possible, and rationalize the denominator so that no radical remains in the denominator

  16. That was easy!

  17. This cannot be divided which leaves the radical in the denominator. We do not leave radicals in the denominator. So we need to rationalize by multiplying the fraction by something so we can eliminate the radical in the denominator. 42 cannot be simplified, so we are finished.

  18. This can be divided which leaves the radical in the denominator. We do not leave radicals in the denominator. So we need to rationalize by multiplying the fraction by something so we can eliminate the radical in the denominator.

  19. This cannot be divided which leaves the radical in the denominator. We do not leave radicals in the denominator. So we need to rationalize by multiplying the fraction by something so we can eliminate the radical in the denominator. Reduce the fraction.

  20. Simplify = X = Y3 = P2X3Y = 2X2Y = 5C4D10

  21. Simplify = = = =

  22. = = ? = =

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