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Geometry Project

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Geometry Project - Page Text Content

BC: The End

FC: Geometry | Nicole Mullins 2nd period Dec. 1. 2011

1: Table Of Content Pg 2-3.............................Def Line, Ray, & Point Pg 4-5.........................Angles & their measures Pg 6-7......................Angle & segment bisectors Pg 8-9................. Comp, Sup, & vertical angles Pg 10-11..............Parallel lines & transversal's Pg 12-13......................................Perpendicular Lines Pg 14-15.......................Triangles & their angle measures Pg 16-17...............Pythagorean theorem & the distance formula Pg 18-19...............................Def. Of congruent Triangles Pg 20-21.............................................Polygons

2: Points, Lines, and Planes Finding and describing patterns Sketching Intersections

3: Collinear Points are points that lie on the same line Obtuse Angle Has a measure between 90 degrees and 180 degerees Postulate is a statement thats is accepted without further justification

5: Angle Consists of two rays that have the same component. | Right An angle that has a measure of 90 degrees. | Obtuse An angle that is from 90 degrees to 130 degrees. | Acute an angle that is between 0 degrees and less than 90 degrees

7: segment bisector is a segment, ray, line, or plane that intersects a segment at its midpoint. | angle bisector is a ray that divides an angle into two congruent angles

9: Vertical Angles if they are not adjacent and their sides are formed by two intersecting sides. | Complementary Angles if the sum of their measures is 90 each angle is the complement of the other. | Supplementary Angles if the sum of their measures is 180 each angle is the supplement of the other.

10: Parallel Lines | Vertical Angles

11: Parallel Lines They are in the same plane but they never touch. | Same-side Interior Angles if they lie between the two lines on the same side of the transversal. | Alt. Interior Angles if they lie between the two lines on the opposite sides of the transversal. | Alt. Exterior Angles if they lie outside the two lines on the opposite sides of the transversal

12: Perpendicular Lines They Intersect to form a right triangle. | Sign for perpendicular

14: Equilateral Triangle: 3 congruent sides Isosceles Triangle: has two congruent sides Scalene triangle: has no congruent sides Acute triangle: has three acute angles right triangle: has one right angle Obtuse triangle: has one obtuse angle

16: Pythagorean theorem States that hypotenuse of a right triangle is equal to the sum of the square to the other two sides

17: Distance Formula Is used to find the distance between two points

19: HL Hypotenuse Leg If the hypotenuse and the leg of a right triangle are congruent then they are congruent to a second right triangle | SSS when there are 3 congruent sides on the same plane. | ASA Angle Side Angle Has two congruent angles and a congruent side in between on the same line | AAS Angle Angle Side it is when their are two congruent angles and a side anywhere on the same plane | SAS Side Angle Side two congruent sides and one angle in between | Congruent triangles triangles that have the same shape and size

20: square has four congruent sides and four right angles | parallelogram a quadrilateral with two pairs of parallel lines

21: polygons Is a plane that is formed by three or more segments called sides. | rhombus quadrilateral with four congruent sides | rectangles quadrilateral with four right angles

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• By: Nicole M.
• Joined: over 6 years ago
• Published Mixbooks: 1
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