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Geometric Basics
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Points Points do not have actual size. How to Sketch: Using dots
How to label: Use capital letters Never name two points with the same letter in the same sketch. A B A
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Lines B C n A Extend indefinitely and have no thickness or width.
How to sketch : using arrows at both ends. How to name: 2 ways (1) small script letter line n (2) any two points on the line Never name a line using three points n A B C
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Collinear Points Lie on the same line. (The line does not have to be visible). A B C Non collinear C A Collinear B
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Planes Flat surface that extends indefinitely in all directions.
How to sketch: Use a parallelogram (four sided figure) How to name: 2 ways (1) Capital script letter Plane M (2) Any 3 non collinear points in the plane Plane: ABC/ ACB / BAC / BCA / CAB / CBA A M B C Horizontal Plane Vertical Plane Other
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Different planes in a figure:
B Plane ABCD Plane EFGH Plane BCGF Plane ADHE Plane ABFE Plane CDHG Etc. D C E F H G
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Other planes in the same figure:
Any three non collinear points determine a plane! Plane AFGD Plane ACGE Plane ACH Plane AGF Plane BDG Etc.
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Coplanar Objects Coplanar objects (points, lines, etc.) lie on the same plane. The plane does not have to be visible. Are the following points coplanar? A, B, C ? Yes A, B, C, F ? No H, G, F, E ? Yes E, H, C, B ? Yes A, G, F ? Yes C, B, F, H ? No
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Segment Definition: Part of a line that consists of two points called the endpoints and all points between them. How to sketch: How to name: AB (without a symbol) means the length of the segment or the distance between points A and B.
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Congruent Segments Congruent segments can be marked with dashes.
Definition: Segments with equal lengths. (congruent symbol: ) Congruent segments can be marked with dashes.
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Ray Definition: RA : RA and all points Y such that
A is between R and Y. How to sketch: How to name: ( the symbol RA is read as “ray RA” )
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Opposite Rays Definition:
If A is between X and Y, AX and AY are opposite rays. ( Opposite rays must have the same “endpoint” ) opposite rays not opposite rays
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Intersection of Figures
The intersection of two figures is the set of points that are common in both figures. The intersection of two lines is a point. m P n Line m and line n intersect at point P.
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3 Possibilities of Intersection of a Line and a Plane
(1) Line passes through plane – intersection is a point. (2) Line lies on the plane - intersection is a line. (3) Line is parallel to the plane - no common points.
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Intersection of Two Planes is a Line.
B P A R Plane P and Plane R intersect at the line
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Segment Bisectors Definition:
Any segment, line or plane that divides a segment into two congruent parts is called segment bisector.
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Between AX + XB = AB AX + XB > AB
Definition: X is between A and B if AX + XB = AB. AX + XB = AB AX + XB > AB
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The Segment Addition Postulate
If C is between A and B, then AC + CB = AB. Example: If AC = x , CB = 2x and AB = 12, then, find x, AC and CB. 2x x 12 Step 1: Draw a figure Step 2: Label fig. with given info. AC + CB = AB x x = 12 3x = 12 x = 4 Step 3: Write an equation x = 4 AC = 4 CB = 8 Step 4: Solve and find all the answers
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You Try It! Complete Practice Problems and check your answers with one another.
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