chapter 9. lesson 9-1 introduction to geometry: points, lines, and planes
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Chapter 9
Lesson 9-1
Introduction to Geometry: Points, Lines, and Planes
Sample Name Symbol Description
∙A Point Point A A location in space. It has no size.
LineABBA
or n
A series of points that extends in opposite directions without end. A lowercase letter can name a line.
PlaneABCD or
M
A flat surface with no thickness. It contains many lines and extends without end in the directions of all its lines.
Line Segment
or segment
PQQP
A part of a line. It has two endpoints. PQ represents the length of PQ.
Ray CRA part of a line. It has exactly one endpoint. Name its endpoint first.
M
A B
CD
P
Q
C
R
Intersecting, Parallel, and Skew Lines
• Two lines that lie in the same plane and do not intersect are parallel. Use the symbol ║to indicate “is parallel to”.
• Two lines intersect if they have exactly one point in common.
• Skew lines are lines that do not lie in the same plane.
AB ║ PQ
EF intersects BF
AB and DE are skew
Parts of an Angle
• An angle is formed by two rays with a common endpoint.
• The rays are the sides of the angle.
• The common endpoint is the vertex.
B
A
C
●
●
Angle
Endpoint or Vertex
Ray
Classifying Angles
• An acute angle is less than 90○
.
• A right angle is 90○.
• An obtuse angle is greater than 90○
and less than 180○.
• A straight angle is equal to 180○
. Straight Angle
Obtuse Angle
Right Angle
Acute Angle
Lesson 9-2
Angle Relationships
and Parallel Lines
Adjacent and Vertical Angles
• Adjacent angles share a vertex and a side but no points in their interiors.
• Vertical angles are formed by two intersecting lines and are opposite each other.
Common Side
1
2
34
Angles 1 & 2 are vertical angles.
Angles 3 & 4 are vertical angles.
Angle Relationships
• If the sum of the measures of two angles is 90○, the angles are complementary.
• If the sum of the measures of two angles is 180○, the angles are supplementary.
Complementary Angles
Supplementary Angles
Relating Angles and Parallel Lines
A line that intersects two other lines in different points is a transversal.
When a transversal intersects two parellel lines, corresponding and alternate interior angles are congruent.
Alternate interior angles are in the interior of a pair of lines and on opposite sides of the transversal. d and e are alternate interior angles.
Corresponding angles lie on the same side of the transversal and in corresponding positions. d and h are corresponding angles.
Lesson 9-3
Classifying Polygons
Classifying Triangles• A triangle is a polygon with three
sides.
Acute triangle three acute sides
Right triangle one right angle
Obtuse triangle one obtuse angle
Equilateral triangle three congruent sides
Isosceles triangle at least two congruent sides
Scalene triangle no congruent sides
Classifying Quadrilaterals
Trapezoid exactly one pair of
parallel sides
Quadrilateral four
sides
Parallelogram both pairs of
opposite sides parallel
Rhombus four congruent
sides
Square four 90○ angles and
four congruent sides
Rectangle four 90○ angles
Classifying Quadrilaterals Cont.
• All parallelograms have opposite sides parallel.
• Parallelograms include rectangles, rhombuses, and squares.
• Quadrilaterals that have four right angles include the rectangles and squares.
Regular Polygons• A regular polygon has all sides
congruent and all angles congruent.• The formula for the perimeter of a
regular polygon is P = number of sides the length of the sides.
Triangle
Square
Pentagon
Hexagon
Quadrilaterals and Their Properties
Quadrilateral Quest: Do You Know Their Properties?
Lesson 9-5
Congruence
Congruent Triangles
• Congruent figures have the same size and shape, and their corresponding parts have equal measures.
• Triangles are congruent when all corresponding sides and interior angles are congruent.
• You use corresponding parts of triangles to identify congruent triangles.
Congruent Triangles
Side-Side-Side (SSS) If three sides of one triangle are congruent to three sides of a second
triangle, the two triangles are congruent.
Angle-Side-Angle (ASA) If two angles and the included side of one triangle are congruent to two angles and the included side of another triangle, the
triangles are congruent.
Side-Angle-Side (SAS) If two sides and the included angle are
congruent to two sides and the included angle of a second triangle, the two
triangles are congruent.
Congruent figures have the same size and shape, and their corresponding
parts have equal measures.
Lesson 9-6
Circles
Circle
Radius is a segment that has one endpoint at the center and the other point on the circle.
Circumference is the distance around the circle.
Diameter is a chord that passes through the center of a circle.
Chord is a segment whose endpoints are on the circle.
Circumference of a Circle
• The circumference of a circle is π times the diameter.
C = π d C = 2 π r
6 ft
C = π d Write the formula
C ≈ (3.14)6 Replace π with 3.14
and d with 6
= 18.84 Simplify
Making a Circle Graph• To make a circle graph, you find the measure of
each central angle.
• A central angle is an angle whose vertex is the center of a circle.
• There are 360○ in a circle.
• Use proportions to find the measures of the central angles.
20 = _r 25 = _r_
100 360 100 360
r = 72 ○
r = 90 ○
• Use a compass to draw a circle.
•Draw the central angles with a protractor.
•Label each section.
•Add a title and necessary information.
Lesson 9-7
Constructions
Construction Vocabulary
Perpendicular lines, segments, or rays intersect to form right angles.
A segment bisector is a line, segment, or ray that divides a segment into two congruent segments.
A perpendicular bisector is a line, segment, or ray that is perpendicular to the segment it bisects.
Construction Vocabulary Cont.
An angle bisector is a ray that divides an angle into two congruent angles.
Steps for Constructing a(n) . . .
Congruent SegmentPearson Prentice Hall Mathematics VideoCongruent AnglePearson Prentice Hall Mathematics VideoPerpendicular BisectorPearson Prentice Hall Mathematics VideoAngle BisectorPearson Prentice Hall Mathematics Video
Lesson 9-8
Translations
Translation Vocabulary• You perform a translation by sliding, flipping, or turning an
object.
• A transformation is a change of position or size of a figure.
• A translation is a transformation that moves points the same distance and in the same direction.
• The figure you get after a transformation is called the image.
• Use prime notation (A1) to name the image of a point.
Example of a SlideExample of a Flip
Example of a Turn
Examples of Translations
Pearson Prentice Hall Mathematics Video
Translating a Figure
Writing a Rule to Describe a Translation
Pearson Prentice Hall Mathematics Video
Symmetry and Reflections
Lesson 9-9
Symmetry• A figure has reflectional symmetry when
one half is a mirror image of the other half.• A line of symmetry divides a figure with
reflectional symmetry into two congruent halves.
Reflections• A reflection is a
transformation that flips a figure over a line of reflection.
• The reflected figure, or image, is congruent to the original figure.
• Together, an image and its reflection have line symmetry, the line of reflection being the line of symmetry.
Graphing Reflections of a Shape
Pearson Prentice Hall Mathematics Video
Rotations
Lesson 9-10
Rotations
• A rotation is a transformation that turns a figure about a fixed point called the center of rotation.
• The angle measure of the rotation is the angle of rotation.
Rotational Symmetry
• A figure has rotational symmetry if you can rotate it 360
○, or less, so
that its image matches the original figure.
• The angle (or its measure) through which the figure rotates is the angle of rotation.
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