crazy fore geometry

17
CRAZY FORE GEOMETRY Mackenzie Beneteau 7 th Hour January 4, 2012

Upload: nika

Post on 20-Feb-2016

24 views

Category:

Documents


0 download

DESCRIPTION

CRAZY FORE GEOMETRY . Mackenzie Beneteau 7 th Hour January 4, 2012. Table of Contents. Parallel Lines……………………………………….Page 1 Two Congruent Objects……………………….Page 2 Vertical Angles…………………………………….Page 3 Perpendicular Lines……………………………..Page 4 Intersecting Lines…………………………………Page 5 - PowerPoint PPT Presentation

TRANSCRIPT

Page 1: CRAZY  FORE GEOMETRY

CRAZY FORE

GEOMETRY Mackenzie Beneteau

7th HourJanuary 4, 2012

Page 2: CRAZY  FORE GEOMETRY

Table of Contents

Parallel Lines……………………………………….Page 1Two Congruent Objects……………………….Page 2

Vertical Angles…………………………………….Page 3Perpendicular Lines……………………………..Page 4

Intersecting Lines…………………………………Page 5Supplementary Angles…………………………Page 6Corresponding Angles………………………....Page 7

Adjacent………………………………………………Page 8Obtuse Angle……………………………………….Page 9Regular Polygon…………………………………..Page 10Vertex Angle………………………………………..Page 11Isosceles Triangle…………………………………Page 12Right Triangle………………………………………Page 13Hypotenuse…………………………………………Page 14Pythagoras………………………………………….Page 15

Page 3: CRAZY  FORE GEOMETRY

If the lines were not parallel, the golfer would have an incorrect posture and not be able to approach the ball correct

Def: two or more coplanar lines that have no points in common or

are identical 

Parallel Lines

Page 4: CRAZY  FORE GEOMETRY

2 Congruent Objects

If the 2 triangles were not congruent then the golfers swing would be wrong and the ball would not go the correct wayDef: two figures where one is the image of the other under a

reflection or composite of reflections

Page 5: CRAZY  FORE GEOMETRY

Vertical AnglesThe person that made the vertical angles the way they did is to show how the golf clubs cross

Def: 2 angles that share a common vertex and whose sides form 2 lines

Page 6: CRAZY  FORE GEOMETRY

Perpendicular Lines

Def: 2 angles that share a common vertex and whose sides form 2 lines

The alignment sticks are to tell the golfer where to place their feet & where to place the ball for a correct posture. The consequences if the two sticks were not crossed the way that they are, the golfer would have an incorrect foot posture

Page 7: CRAZY  FORE GEOMETRY

Intersecting Lines

Def: Lines that have one and only one point in common are known as intersecting lines.

There’s not really an importance on why the lines are intersecting, the lines just show that the black squares of the flag make intersecting lines.

Page 8: CRAZY  FORE GEOMETRY

Supplementary Angles

Def: 2 angles whose measures, when added together, equal 180 degrees

If the angle was not supplementary, the golfer would not be in a full backswing.

Page 9: CRAZY  FORE GEOMETRY

Corresponding Angles

Def: any pair of angles in similar locations

with respect to a transversal

If the angles were not corresponding, then the golf cart would not be proportional

Page 10: CRAZY  FORE GEOMETRY

Adjacent

Def: 2 nonstraight and nonzero angles that have a common side in the interior of the angle formed by the noncommon sides

Page 11: CRAZY  FORE GEOMETRY

Obtuse Angles

Def: an angle whose measure is greater than 90 but less than 180 degrees

Page 12: CRAZY  FORE GEOMETRY

Regular Polygon

Def: a convex polygon whose angles and sides are all congruent

Page 13: CRAZY  FORE GEOMETRY

Vertex Angle

the angle formed by the equilateral sides of an isosceles triangle

Page 14: CRAZY  FORE GEOMETRY

Isosceles Triangle

A triangle with two sides of equal length

Page 15: CRAZY  FORE GEOMETRY

Right Triangle

A triangle that has a 90 degree angle

Page 16: CRAZY  FORE GEOMETRY

Hypotenuse

 the side opposite the right angle in a right triangle

Page 17: CRAZY  FORE GEOMETRY

Pythagoras

A(2) + B (2) = C (2)A

B

C

512