FC: Merry Christmas Geometry Edition | Armando Fuentes Period 1 Ms. Van Os (Rm 506)
1: Table of Contents | Page 1: Parallel Lines Page 2: Two Congruent Objects Page 3: Vertical Angles Page 4: Perpendicular Lines Page 5: Intersecting Lines Page 6: Supplementary Angles Page 7: Different Proportions Page 8: Adjacent Page 9: Similarity Page 10: Two Dimensional Page 11: Surface Area Page 12: Pythagoras Page 13: Diameter Page 14: Three Dimensional Page 15: Volume
2: Parallel Lines | Def: Lines in the same plane that do not intersect. The guy on the skis would not be going straight.
3: Two Congruent Objects | Def: Having the same size and shape. The sled would be hard to steer.
4: Vertical Angles | Def. Nonadjacent angles formed by two intersecting lines. They wanted to make a snow angel.
5: Perpendicular Lines | Def: Intersecting to form 90 degree angles. The signs would not be straight.
6: Intersecting Lines | Def:Two or more lines that meet at a point. | To make the tree decoration look better.
7: Supplementary Angles | Def. Two angles whose measures have a sum of 180 degrees. The tree would only have straight branches.
8: Different Proportions | Def: Same shape, different size. The snowman needs to have different size snow balls so it will stay up.
9: Adjacent | Def: Two angles in the same plane with a common vertex and a common side, but no common interior points.
10: Similarity | Def: Two figures are similar if they have the same shape but not necessarily th same size.
11: Two Dimensional | Def: Having only two dimensions, especially length and width.
12: Surface Area | Def: The total area of all faces and curved surfaces of a three-dimensional figure.
13: Pythagoras | Def: A Greek philosopher who created the pythagorean theorem.
14: Diameter | Def: A segment that has endpoints on the circle and that passes through the center of the circle.
15: Three Dimensional | Def: Length, width, and height (depth).
16: Volume | The number of nonoverlapping unit cubes of a given size that will exactly fill the interior of a three-dimensional figure.