if a point in theinterior of an angle isequidistant from thesides of the angle,then it is on thebisector of the angle.if a point is onthe bisector ofan angle, then itis equidistantfrom the sidesof the angle.inscribedcircle.midsegmentmedianFree!incirclethe point ofconcurrency oftheperpendicularbisectors of atriangle.centroidtheoremthe centroid of atriangle is located2/3 of the distancefrom each vertexto the midpoint ofthe opposite side.the point ofintersectionof concurrentlines.three or morelines thatintersect atthe samepoint.the intersection(or point ofconcurrency) ofthe lines thatcontain thealtitudes.incenterthe circle thatcontains thethree verticesof a triangle.the circumcenterof a triangle isequidistant fromthe vertices of thetriangle.trianglemidsegmenttheoremaltitudecentroidtheintersectionof threemedians of atriangle.inscribedanglebisectortheoremcenterof thecircle.a segment whoseendpoints are avertex of a triangleand the midpointof the oppositeside.circumcenterorthocentera perpendicularsegment from avertex to theline containingthe oppositeside.point ofconcurrencyconverse ofthe anglebisectortheorema circle thatcontains all thevertices of apolygon on thecircumfrence ofthe circle.the anglebisectors of atriangle intersectat a point that isequidistant fromthe sides of thetriangle.incentertheoreman angle whosevertex is on acircle andwhose sidescontain chordsof the circle.circumscribedconcurrentcircumcentertheoremthe segments joiningthe midpoints of twosides of a triangle isparallel to the thirdside, and its length ishalf the length of thatside.circumcirclea line segmentthat connectsthe midpointsof two sides ofa triangle.if a point in theinterior of an angle isequidistant from thesides of the angle,then it is on thebisector of the angle.if a point is onthe bisector ofan angle, then itis equidistantfrom the sidesof the angle.inscribedcircle.midsegmentmedianFree!incirclethe point ofconcurrency oftheperpendicularbisectors of atriangle.centroidtheoremthe centroid of atriangle is located2/3 of the distancefrom each vertexto the midpoint ofthe opposite side.the point ofintersectionof concurrentlines.three or morelines thatintersect atthe samepoint.the intersection(or point ofconcurrency) ofthe lines thatcontain thealtitudes.incenterthe circle thatcontains thethree verticesof a triangle.the circumcenterof a triangle isequidistant fromthe vertices of thetriangle.trianglemidsegmenttheoremaltitudecentroidtheintersectionof threemedians of atriangle.inscribedanglebisectortheoremcenterof thecircle.a segment whoseendpoints are avertex of a triangleand the midpointof the oppositeside.circumcenterorthocentera perpendicularsegment from avertex to theline containingthe oppositeside.point ofconcurrencyconverse ofthe anglebisectortheorema circle thatcontains all thevertices of apolygon on thecircumfrence ofthe circle.the anglebisectors of atriangle intersectat a point that isequidistant fromthe sides of thetriangle.incentertheoreman angle whosevertex is on acircle andwhose sidescontain chordsof the circle.circumscribedconcurrentcircumcentertheoremthe segments joiningthe midpoints of twosides of a triangle isparallel to the thirdside, and its length ishalf the length of thatside.circumcirclea line segmentthat connectsthe midpointsof two sides ofa triangle.

Geometry Module 8 - Call List

(Print) Use this randomly generated list as your call list when playing the game. There is no need to say the BINGO column name. Place some kind of mark (like an X, a checkmark, a dot, tally mark, etc) on each cell as you announce it, to keep track. You can also cut out each item, place them in a bag and pull words from the bag.


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  1. if a point in the interior of an angle is equidistant from the sides of the angle, then it is on the bisector of the angle.
  2. if a point is on the bisector of an angle, then it is equidistant from the sides of the angle.
  3. inscribed circle.
  4. midsegment
  5. median
  6. Free!
  7. incircle
  8. the point of concurrency of the perpendicular bisectors of a triangle.
  9. centroid theorem
  10. the centroid of a triangle is located 2/3 of the distance from each vertex to the midpoint of the opposite side.
  11. the point of intersection of concurrent lines.
  12. three or more lines that intersect at the same point.
  13. the intersection (or point of concurrency) of the lines that contain the altitudes.
  14. incenter
  15. the circle that contains the three vertices of a triangle.
  16. the circumcenter of a triangle is equidistant from the vertices of the triangle.
  17. triangle midsegment theorem
  18. altitude
  19. centroid
  20. the intersection of three medians of a triangle.
  21. inscribed
  22. angle bisector theorem
  23. center of the circle.
  24. a segment whose endpoints are a vertex of a triangle and the midpoint of the opposite side.
  25. circumcenter
  26. orthocenter
  27. a perpendicular segment from a vertex to the line containing the opposite side.
  28. point of concurrency
  29. converse of the angle bisector theorem
  30. a circle that contains all the vertices of a polygon on the circumfrence of the circle.
  31. the angle bisectors of a triangle intersect at a point that is equidistant from the sides of the triangle.
  32. incenter theorem
  33. an angle whose vertex is on a circle and whose sides contain chords of the circle.
  34. circumscribed
  35. concurrent
  36. circumcenter theorem
  37. the segments joining the midpoints of two sides of a triangle is parallel to the third side, and its length is half the length of that side.
  38. circumcircle
  39. a line segment that connects the midpoints of two sides of a triangle.