1. Geometry Intro Jeopardy VocabularyCircles QuadrilateralsAngles Congruent Triangles 100 200 300 400 500 100 200 300 400 500 100 200 300 400 500 100 200 300 400 500 100 200 300 400 500 Final Jeopardy Challenge

2. Vocabulary 2 lines that intersect to form a 90 degree angle 100

3. Vocabulary 2 angles with the same measure or 2 lines with the same length (2 figures that have the exact same size and shape or 2 segments or angles that have the same measure) 200

4. Vocabulary Quadrilateral with Quadrilateral with 4 congruent sides 300

5. Vocabulary the sum of the lengths of the sides of a polygon 400

6. Vocabulary the reverse of a statement 500

7. Circles The circumference of a circle with radius 6 is… 100

8. Circles Find NT 200

9. Circles ∆MNP is circumscribed about circle Q. The perimeter of ∆MNP is 30, MR=4, and SN=6, find PT. 300

10. Circles In the figure, XZ = 12, UV = 8, and WY is a diameter. Find the length of a radius of the circle. 400

11. Circles Find the area of the shaded sector. 500

12. Quadrilaterals Find the value of x 100

13. Quadrilaterals If ACDF is a rectangle, what is m  AEC? 200

14. Quadrilaterals Find x and y 300

15. Quadrilaterals The diagonals of a ________________ bisect the opposite angles. 400

16. Quadrilaterals The diagonals of a __________________ are equal in length. 500

17. Angles DE is a diameter. Find the measure of angle DFE 100

18. Angles If 2 parallel lines are cut by a transversal, then … (3 answers) 200

19. Angles Angles a and e are an example of this. 300

20. Angles Find the value of x so that j and k are parallel 400

21. Angles Find the measure of angle 1 500

22. Congruent Triangles  DEF   ___ by ___ 100

23. ∆ ABC  ∆ ___ by ______ 200 Congruent Triangles

24. Name the 2   s and the property that shows them congruent. 300 Congruent Triangles

25. Two triangles are congruent if and only if… 400 Congruent Triangles

26. AC  BD, AD  BC, ∆ ADB  ∆ ________ Which conjecture supports the congruence statement? 500

27. Final Jeopardy ∆ABC is isosceles, the trisectors of  A meet the bisectors of  B &  C at points E & F. A perpendicular is dropped from D to a point on AB (point F). If m  BAC = 36  and AB = 5, how long is AF?