If x = y,and y = z,then x = zA part of a line thatstarts from onepoint and extendsin one direction foran infinite amountof timePart of aline thathas 2endpointsIf two lines are cut bya transversal and theconsecutive exteriorangles aresupplementary, thenthe two lines areparallelPlaneA mark thatmodels/indicatesan exactposition andlocation in aspaceSubstitutionProp/POEAny ray, segment, orline that intersects asegmentat its midpoint. Itdivides a segmentinto two equal partsat its midpointAlternateExteriorAnglesConverseSlopeFormulaIf a=b,thenac=bc√(x2−x1)^2+(y2−y1)^2Two or more linesthatgo in the samedirectionsstaying thesame distance apart.In addition,they never intersectIdentityPropertyof DivisionParallelPostulateSlopes ofPerpendicularLinesTheoremDivision ofsomething intotwo equal orcongruent partsby a bisector(x1+x2/2,y1+y2/2)If the correspondinganglesformed by two linesand a transversalare congruent, thenthe lines are parallel.If two lines areperpendicularto the sameline, then theyare parallelCoordinatePlaneIf a = b, b =a; you canflip the sidesof anequation.AlternateInteriorAnglesTheoremWhen two parallellines are cut by atransversal resultingin correspondingangles making themcongruentIf x = y,and y = z,then x = zA part of a line thatstarts from onepoint and extendsin one direction foran infinite amountof timePart of aline thathas 2endpointsIf two lines are cut bya transversal and theconsecutive exteriorangles aresupplementary, thenthe two lines areparallelPlaneA mark thatmodels/indicatesan exactposition andlocation in aspaceSubstitutionProp/POEAny ray, segment, orline that intersects asegmentat its midpoint. Itdivides a segmentinto two equal partsat its midpointAlternateExteriorAnglesConverseSlopeFormulaIf a=b,thenac=bc√(x2−x1)^2+(y2−y1)^2Two or more linesthatgo in the samedirectionsstaying thesame distance apart.In addition,they never intersectIdentityPropertyof DivisionParallelPostulateSlopes ofPerpendicularLinesTheoremDivision ofsomething intotwo equal orcongruent partsby a bisector(x1+x2/2,y1+y2/2)If the correspondinganglesformed by two linesand a transversalare congruent, thenthe lines are parallel.If two lines areperpendicularto the sameline, then theyare parallelCoordinatePlaneIf a = b, b =a; you canflip the sidesof anequation.AlternateInteriorAnglesTheoremWhen two parallellines are cut by atransversal resultingin correspondingangles making themcongruent

Geometry Bingo - 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 x = y, and y = z, then x = z
  2. A part of a line that starts from one point and extends in one direction for an infinite amount of time
  3. Part of a line that has 2 endpoints
  4. If two lines are cut by a transversal and the consecutive exterior angles are supplementary, then the two lines are parallel
  5. Plane
  6. A mark that models/indicates an exact position and location in a space
  7. Substitution Prop/POE
  8. Any ray, segment, or line that intersects a segment at its midpoint. It divides a segment into two equal parts at its midpoint
  9. Alternate Exterior Angles Converse
  10. Slope Formula
  11. If a=b, then ac=bc
  12. √(x2−x1)^2+(y2−y1)^2
  13. Two or more lines that go in the same directions staying the same distance apart. In addition, they never intersect
  14. Identity Property of Division
  15. Parallel Postulate
  16. Slopes of Perpendicular Lines Theorem
  17. Division of something into two equal or congruent parts by a bisector
  18. (x1+x2/2, y1+y2/2)
  19. If the corresponding angles formed by two lines and a transversal are congruent, then the lines are parallel.
  20. If two lines are perpendicular to the same line, then they are parallel
  21. Coordinate Plane
  22. If a = b, b = a; you can flip the sides of an equation.
  23. Alternate Interior Angles Theorem
  24. When two parallel lines are cut by a transversal resulting in corresponding angles making them congruent