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S.O.L.R.E.V.I.E.W - Geometry SOLs in Review

Review of conditional statements, parallel lines and angles, proving congruent triangles, and angles of regular polygons. Includes formulas and methods for solving geometry problems.

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S.O.L.R.E.V.I.E.W - Geometry SOLs in Review

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  1. S O L R E V I E W THE GEOMETRY SOLs ( in review ) Use the arrow keys  to move forward or backward.

  2. S O L R E V I E W Conditional Statements “ If p then q. ” Converse: Inverse: Contrapositive: The Law of Syllogism =

  3. S O L R E V I E W Conditional Statements “ If p then q. ” Converse: “ If q then p. ” Inverse: Contrapositive: The Law of Syllogism =

  4. S O L R E V I E W Conditional Statements “ If p then q. ” Converse: “ If q then p. ” Inverse: “ If - p then - q. ” Contrapositive: The Law of Syllogism =

  5. S O L R E V I E W Conditional Statements “ If p then q. ” Converse: “ If q then p. ” Inverse: “ If - p then - q. ” Contrapositive: “ If - q then - p. ” The Law of Syllogism =

  6. S O L R E V I E W Conditional Statements “ If p then q. ” Converse: “ If q then p. ” Inverse: “ If - p then - q. ” Contrapositive: “ If - q then - p. ” The Law of Syllogism The Transitive Property =

  7. S O L R E V I E W for two points (X1 , Y1 ) and ( X2 , Y2 ) Formulas: Slope= Midpoint= Distance=

  8. S O L R E V I E W for two points (X1 , Y1 ) and ( X2 , Y2 ) Formulas: Slope= Midpoint= Distance=

  9. S O L R E V I E W for two points (X1 , Y1 ) and ( X2 , Y2 ) Formulas: Slope= Midpoint= Distance=

  10. S O L R E V I E W for two points (X1 , Y1 ) and ( X2 , Y2 ) Formulas: Slope= Midpoint= Distance=

  11. Parallel Lines and Angles S O L R E V I E W

  12. Parallel Lines and Angles S O L R E V I E W Corresponding Angles are . . .

  13. Parallel Lines and Angles S O L R E V I E W Corresponding Angles are . . .

  14. Parallel Lines and Angles S O L R E V I E W Corresponding Angles are . . . Name them !

  15. Parallel Lines and Angles S O L R E V I E W Corresponding Angles are . . . Name them !

  16. Parallel Lines and Angles S O L R E V I E W Alternate Interior Angles are . . .

  17. Parallel Lines and Angles S O L R E V I E W Alternate Interior Angles are . . .

  18. Parallel Lines and Angles S O L R E V I E W Alternate Interior Angles are . . . Name them !

  19. Parallel Lines and Angles S O L R E V I E W Alternate Interior Angles are . . . Name them !

  20. Parallel Lines and Angles S O L R E V I E W Consecutive Interior Angles are . . .

  21. Parallel Lines and Angles S O L R E V I E W Consecutive Interior Angles are . . . Supplementary

  22. Parallel Lines and Angles S O L R E V I E W Consecutive Interior Angles are . . . Supplementary Name them !

  23. Parallel Lines and Angles S O L R E V I E W Consecutive Interior Angles are . . . Supplementary Name them !

  24. S O L R E V I E W Proving ∆s Congruent

  25. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABD ∆CDB SSS SAS ASA AAS HL

  26. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABD ∆CDB SSS SAS ASA AAS HL

  27. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABD ∆CDB SSS SAS ASA AAS HL the reflexive side

  28. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABD ∆CDB SSS SAS ASA AAS HL

  29. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABD ∆CDB SSS SAS ASA AAS HL

  30. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABD ∆CDB SSS SAS ASA AAS HL alt. int. angles /reflexive side

  31. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABD ∆CDB SSS SAS ASA AAS HL

  32. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABD ∆CDB SSS SAS ASA AAS HL

  33. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABD ∆CDB SSS SAS ASA AAS HL the reflexive side

  34. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABC ∆DEC SSS SAS ASA AAS HL

  35. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABC ∆DEC SSS SAS ASA AAS HL

  36. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABC ∆DEC SSS SAS ASA AAS HL vertical angles

  37. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABD ∆CDB SSS SAS ASA AAS HL

  38. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABD ∆CDB SSS SAS ASA AAS HL

  39. Proving ∆s Congruent S O L R E V I E W Choose a Method to Prove: ∆ABD ∆CDB SSS SAS ASA AAS HL alt. int. angles /reflexive side

  40. Angles of Regular Polygons S O L R E V I E W ?

  41. Angles of Regular Polygons S O L R E V I E W ?

  42. Angles of Regular Polygons S O L R E V I E W ? 360˚ The answer for all polygons

  43. Angles of Regular Polygons S O L R E V I E W ?

  44. Angles of Regular Polygons S O L R E V I E W ? 360˚ 360˚ n 6

  45. Angles of Regular Polygons S O L R E V I E W ? 60˚

  46. Angles of Regular Polygons S O L R E V I E W ? 60˚ + ? = 180˚ (Linear Pair of Angles) 60˚

  47. Angles of Regular Polygons S O L R E V I E W ? 120˚

  48. Angles of Regular Polygons S O L R E V I E W ? (6)(120˚) 120˚ (n)(120˚)

  49. Angles of Regular Polygons S O L R E V I E W (6)(120˚) 120˚ (n)(120˚)

  50. Similar Triangles S O L R E V I E W

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