Geometry Final Review Crossword Puzzle

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Across
  1. 3. This transformation maintains the distance and angle measures.
  2. 4. If the angles in a linear pair are equal, then their sides are _____.
  3. 6. Two angles are _____ _____ iff the sides of one angle are opposite rays to the sides of the other.
  4. 8. It is important to remember that when using the ASA or SAS postulates, you must use the _____ side for ASA and angle for SAS.
  5. 9. If angle 1 and angle 2 have a sum of 90 degrees, then angle 1 is a _____ of angle 2 and vice versa.
  6. 11. b is the geometric mean between a and c if a/b = b/c
  7. 13. In a plane, two points equidistant from a line segment's endpoint determine the _____ _____ of that line segment.
  8. 18. In a triangle, the point in which the medians are concurrent
  9. 20. These are used to visualize how conditional statements relate to each other.
  10. 24. the angle bisectors of a triangle can be described as this.
  11. 25. If two angles of one triangle are equal to two angles of another triangle, you can't prove congruence but you can prove this.
  12. 27. In a circle, this is the region bounded by an arc of the circle and two radii, extending to the endpoints of that arc.
  13. 28. A figure has this type of rotation symmetry if the smallest angle through which it can be turned to look exactly the same is 360 degrees/6.
  14. 29. According to this theorem, if a line parallel to one side of a triangle intersects the other two sides, it divides the sides in the same ratio. According to the corollary of this theorem, we can also know that in the figure, AD/AB = AE/AC and DB/AB = EC/AC
  15. 32. Vertical angles are always _____ to each other.
Down
  1. 1. Two angles form a _____ _____ iff they have a common side and their sides are opposite rays
  2. 2. In a triangle, this is the point in which the lines containing its altitudes are concurrent.
  3. 5. A figure has this with respect to a point iff it coincides with its rotation image through less than 360 degrees about the point.
  4. 7. Three of these type of points determine a plane.
  5. 9. You can prove that two triangles are _____ if two angles and one of their opposite sides are equal to the corresponding parts of another triangle.
  6. 10. You can describe lines as _____ if you have equal alternate interior angles, supplementary interior angles on the same side of a transversal, two lines perpendicular to a third line (in a plane), or equal corresponding angles.
  7. 12. This theorem states that three cevians, AY, BZ, and CX, of triangle ABC (where X,Y, and Z are points on the triangle's sides) are concurrent iff AX/XB * BY/YC * CZ/ZA = 1.
  8. 14. This theorem states that if two angles are supplementary to the same third angle, them they are equal.
  9. 15. According to this theorem, if given, A-B-C, then, AB + BC = AC.
  10. 16. The angles in a linear pair are _____, that is, their sum is 180 degrees.
  11. 17. A/An _____ angle of a triangle is equal to the sum of the remote interior angles.
  12. 18. By interchanging the hypothesis and conclusion of a conditional statement (changing a-->b to b-->a), you form its _____.
  13. 19. Euclid described this as, "that which has no part."
  14. 21. The _____ of a parallelogram bisect each other.
  15. 22. To find the area of a parallelogram one would find the product of any base and its corresponding one of these.
  16. 23. This is parallel to the third side of a triangle and half as long as it too.
  17. 24. Every regular polygon and all triangles can be described as this, that is there is a circle that contains all of the shape's vertices.
  18. 26. In a regular polygon, this is a perpendicular line segment from its center to one of its sides.
  19. 30. The _____ area of a sphere is 4 pi * the square of its radius
  20. 31. This is the point in a pyramid where the lateral edges meet.