© 2008 Pearson Addison-Wesley. All rights reserved 9-1-1 Chapter 1 Section 9-1 Points, Lines,...
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Transcript of © 2008 Pearson Addison-Wesley. All rights reserved 9-1-1 Chapter 1 Section 9-1 Points, Lines,...
![Page 1: © 2008 Pearson Addison-Wesley. All rights reserved 9-1-1 Chapter 1 Section 9-1 Points, Lines, Planes, and Angles.](https://reader036.fdocuments.in/reader036/viewer/2022062422/56649edb5503460f94beb707/html5/thumbnails/1.jpg)
© 2008 Pearson Addison-Wesley. All rights reserved
9-1-1
Chapter 1
Section 9-1Points, Lines, Planes, and Angles
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9-1-2
Points, Lines, Planes, and Angles
• The Geometry of Euclid
• Points, Lines, and Planes
• Angles
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9-1-3
The Geometry of Euclid
A point has
A line has
A plane is
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9-1-4
Points, Lines, and Planes
A
DE
l
A capital letter usually represents a point. A line may named by two capital letters representing points that lie on the line or by a single letter such as l. A plane may be named by three capital letters representing points that lie in the plane or by a letter of the Greek alphabet such as , , or .
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9-1-5
Half-Line, Ray, and Line Segment
A point divides a line into two half-lines, one on each side of the point.
A __________ is a half-line including an initial point.
A _____________ includes two endpoints.
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9-1-6
Half-Line, Ray, and Line Segment
Name Figure Symbol
Line AB or BA
Half-line AB
Half-line BA
Ray AB
Ray BA
Segment AB or segment BA
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9-1-7
Parallel and Intersecting Lines
Parallel lines lie in the same plane and never meet.
Two distinct intersecting lines meet at a point.
Skew lines do not lie in the same plane and do not meet.
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9-1-8
Parallel and Intersecting Planes
Parallel planes never meet.
Two distinct intersecting planes meet and form a straight line.
Parallel Intersecting
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9-1-9
Angles
An angle is the union of two rays that have a common endpoint. An angle can be named with the letter marking its vertex, and also with three letters: - the first letter names a point on the side; the second names the vertex; the third names a point on the other side.
ABC,B
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9-1-10
Angles
Angles are measured by the amount of rotation. 360° is the amount of rotation of a ray back onto itself.
45°90°
10°
150°360°
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9-1-11
Angles
Angles are classified and named with reference to their degree measure.
Measure Name
Between 0° and 90°
90°
Greater than 90° but less than 180°
180°
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9-1-12
Protractor
A tool called a protractor can be used to measure angles.
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9-1-13
Intersecting Lines
When two lines intersect to form right angles they are called perpendicular.
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9-1-14
Vertical Angles
In the figure below the pairare called vertical angles.are also vertical angles.
A
CB
D
E
and ABC DBE and DBA EBC
Vertical angles have equal measures.
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9-1-15
Example: Finding Angle Measure
Find the measure of each marked angle below.
(3x + 10)° (5x – 10)°
Solution
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9-1-16
Complementary and Supplementary Angles
If the sum of the measures of two acute angles is 90°, the angles are said to be _________________, and each is called the ________________ of the other. For example, 50° and 40° are complementary angles
If the sum of the measures of two angles is 180°, the angles are said to be _________________, and each is called the ____________ of the other. For example, 50° and 130° are supplementary angles
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9-1-17
Example: Finding Angle Measure
Find the measure of each marked angle below.
(2x + 45)° (x – 15)°
Solution
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9-1-18
Angles Formed When Parallel Lines are Crossed by a Transversal
1 2
3 4
5 6
7 8
The 8 angles formed will be discussed on the next few slides.
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9-1-19
Angles Formed When Parallel Lines are Crossed by a Transversal
1
5 4
8
(also 3 and 6)
(also 2 and 7)
Name
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9-1-20
Angles Formed When Parallel Lines are Crossed by a Transversal
Interior angles on same side of transversal
Corresponding angles
Angle measures are equal.
Angle measures add to 180°.
46
2
6
(also 3 and 5)
(also 1 and 5, 3 and 7, 4 and 8)
Name
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9-1-21
Example: Finding Angle Measure
Find the measure of each marked angle below.
(x + 70)°(3x – 80)°
Solution