This document discusses geometry concepts related to shapes and sizes. It covers polygons, triangles, and their various parts and classifications. The document is divided into lessons that define polygons and regular polygons, differentiate between convex and non-convex shapes, identify the basic and secondary parts of triangles, and classify triangles based on sides and angles. Multiple choice questions are provided throughout to test the reader's understanding.
This learner's module discusses about the Six Trigonometric Ratios. It also teaches about the definition and characteristics of each of the Six Trigonometric Ratio.
This learner's module discusses about the Six Trigonometric Ratios. It also teaches about the definition and characteristics of each of the Six Trigonometric Ratio.
By this end of the presentation you will be able to:
Identify and model points, lines, and planes.
Identify collinear and coplanar points.
Identify non collinear and non coplanar points.
What is the missing reason in the proof Given with diagonal .docxalanfhall8953
What is the missing reason in the proof?
Given: with diagonal
Prove:
Statements
Reasons
1.
1. Definition of parallelogram
2.
2. Alternate Interior Angles Theorem
3.
3. Definition of parallelogram
4.
4. Alternate Interior Angles Theorem
5.
5. ?
6.
6. ASA
A. Reflexive Property of Congruence
B. Alternate Interior Angles Theorem
C. ASA
D. Definition of parallelogram
Find the values of a and b. The diagram is not to scale.
A.
B.
C.
D.
Complete this statement: A polygon with all sides the same length is said to be ____.
A. regular
B. equilateral
C. equiangular
D. convex
Which statement is true?
A. All squares are rectangles.
B. All quadrilaterals are rectangles.
C. All parallelograms are rectangles.
D. All rectangles are squares.
What is LM?
A. 176
B. 98
C. 88
D. 32
Which description does NOT guarantee that a trapezoid is isosceles?
A. congruent bases
B. congruent legs
C. both pairs of base angles congruent
D. congruent diagonals
Which description does NOT guarantee that a quadrilateral is a square?
A. has all sides congruent and all angles congruent
B. is a parallelogram with perpendicular diagonals
C. has all right angles and has all sides congruent
D. is both a rectangle and a rhombus
Which statement can you use to conclude that quadrilateral XYZW is a parallelogram?
A.
B.
C.
D.
and Find
The diagram is not to scale.
A. 60
B. 10
C. 110
D. 20
WXYZ is a parallelogram. Name an angle congruent to
A.
B.
C.
D.
The Polygon Angle-Sum Theorem states: The sum of the measures of the angles of an n-gon is ____.
A.
B.
C.
D.
Which Venn diagram is NOT correct?
A.
B.
C.
D.
Classify the figure in as many ways as possible.
A. rectangle, square, quadrilateral, parallelogram, rhombus
B. rectangle, square, parallelogram
C. rhombus, quadrilateral, square
D. square, rectangle, quadrilateral
In the rhombus, Angle 1 = 140. What are Angles 2 and 3?
The diagram is not to scale.
A. Angle 2 = 40 and Angle 3 = 70
B. Angle 2 = 140 and Angle 3 = 70
C. Angle 2 = 40 and Angle 3 = 20
D. Angle 2 = 140 and Angle 3 = 20
Use less than, equal to, or greater than to complete this statement: The sum of the measures of the exterior angles of a regular 9-gon, one at each vertex, is ____ the sum of the measures of the exterior angles of a regular 6-gon, one at each vertex.
A. cannot tell
B. less than
C. greater than
D. equal to
Lucinda wants to build a square sandbox, but she has no way of measuring angles. Explain how she can make sure that the sandbox is square by only measuring length.
A. Arrange four equal-length sides so the diagonals bisect each other.
B. Arrange four equal-length sides so the diagonals are equal lengths also.
C. Make each diagonal the same length as four equal-length sides.
D. Not possible; Lucinda has to be able to measure a right angle.
Whi.
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1. Module 2
GEOMETRY OF SHAPE and SIZE
What this module is about
There are different shapes around us. Everywhere you look, you see
varied geometric figures. Many of these figures are called polygons. This
module will help you be on familiar terms with them. You will also learn to
distinguish types of triangles; knowledge of which will help you communicate
ideas about real life situations.
What you are expected to learn
This module is designed to
1. illustrate different kinds of polygons and identify the parts of a regular
polygon;
2. differentiate convex and non-convex polygons;
3. illustrate a triangle, its basic and secondary parts and
4. classify triangles according to angles and sides.
How much do you know
Select the correct answer for each question:
1. Which of the following is a polygon?
a. b. c. d.
2. A pentagon is a polygon with
a. 4 b. 5 c. 6 d. 7 sides
3. One of the following is NOT a convex polygon. Which one is it?
a. b. c. d.
2. 2
4. In ∆ABC, AB, AC and BC are called
a. sides b. interior angles c. vertices d. exterior angles
5. Using the figure at the right, BD is a /an B
a. median b. altitude
c. ∠ bisector d. ⊥ bisector
A D C
6. In ∆DEF, m∠E = 120. ∆DEF is
a. acute b. right c. obtuse d. equilateral triangle
7. It is a triangle with all sides congruent
a. scalene b. isosceles c. obtuse d. equilateral
8. The figure below is a regular hexagon. ∠COD is a / an
a. inscribed angle b. central angle
c. obtuse angle d. interior angle C O
9. The longest side in a right triangle is known as D
a. leg b. hypotenuse c. vertex d. base
10. In isosceles triangle ABC, AB = BC. AB and BC are called
a. bases b. vertices c. hypotenuse d. legs
11. A polygon with no given number of sides can be named as
a. dodecagon b. undecagon c. n-gon d. gon
12. The sides of a polygon is made up of
a. segments b. rays c. lines d. planes
13. A line segment from a vertex of a triangle to the midpoint of the opposite
side.
a. altitude b. perpendicular bisector c. median d. angle bisector
14. A right triangle with congruent legs is
a. equilateral b. isosceles c. scalene d. isosceles right triangle
3. 3
15. An equilateral triangle is also isosceles. The statement is
a. always true b. sometimes true c. never true d. can’t be determined
What you will do
Lesson 1
Different Kinds of Polygons and the Parts of a Regular Polygon
The word polygon is from 2 Greek words poly (many) and gon (sides).
The following are polygons:
Each of the figures above is closed, made up of segments and the
segments or sides intersect only at their endpoints.
A polygon is a closed figure made up of segments that intersect at their
endpoints and no two consecutive segments are collinear. Each line segment is
a side of the polygon and each endpoint is a vertex.
The following are NOT polygons:
The figure is made up of segments but it is not closed
The figure is closed but not entirely made up of segments
Curved portion
The figure is closed but it is curved
4. 4
The figure is closed, made up of segments but 2 sides
intersect at another segment.
The intersection should be at the endpoints only.
Look at the figures below. Can you identify the parts/portion that are
polygons?
Polygons have special names depending on their number of sides.
Name of polygon Number of sides
Triangle 3
Quadrilateral 4
Pentagon 5
Hexagon 6
Heptagon 7
Octagon 8
Nonagon 9
Decagon 10
Examples:
Triangle Quadrilateral Pentagon
Hexagon Heptagon Octagon
Nonagon Decagon
5. 5
11 – gon 24 - gon
Polygons with more than 10 sides are often referred to as 11-gon, 12-gon,
13-gon and so on. When the number of sides is not given, the polygon is simply
called n-gon.
Drawing Tip: To draw a polygon easily,
Step 1: Lightly sketch a circle.
Step 2: Place the points you need on the circle.
Step 3: Then connect the points to form your polygon.
Step 4: Erase the circle.
. . . .
. . . .
. . . .
. . . .
Step 1 Step 2 Step 3 Step 4
Regular Polygons:
Polygons with equal sides and equal angles are called regular polygons.
Study the following illustrations:
I II
Equal sides equal sides
and = angles not equal angles
60
0
60
0
III IV
equal angles equal sides
not = sides equal angles
6. 6
Figures I and IV are regular polygons. A regular polygon has the following
parts:
A B
Vertex angle
F o C
Exterior angle
central angle
E D G
ABCDEF is a regular polygon. All sides are equal and all angles have the
same measure.
Vertex Angle
A vertex angle is an angle formed by the intersection of two sides of the
polygon. ∠B is a vertex angle. ∠C is also a vertex angle. Can you name 4
more vertex angles? They are ∠D, ∠E, ∠F, and ∠G.
Central Angle
∠COD is a central angle because the center of the polygon is also the
vertex of the angle. Name some more central angles. There are more than 6.
When you name them, be sure that the middle letter is O.
Exterior Angle
If you extend one side of the polygon, you form an exterior angle. In the
above figure, ∠CDG is an exterior angle. Let’s have some more exterior angles:
1 4 5 8
2 3 6 7
Lesson 2
Differentiate convex and non-convex polygons
Polygons are also classified as convex and non-convex. Let’s find out
how they differ by studying these examples:
7. 7
Convex Polygons:
Non-Convex Polygons:
A polygon is convex if a segment joining any two interior points lies
completely within the polygon.
within outside
convex non-convex
Try this out
A. Which of the following is a polygon?
1 2 3 4 5 6 7
B. Tell whether the polygon is convex or non-convex:
___________ ___________ ___________ ___________ _________
___________ ___________ ___________ ___________ _______
8. 8
C. Name the polygon:
1 2 3 4 5 6 7 8
D. If possible, draw a polygon that fits each description
1. A regular quadrilateral.
2. A non-convex pentagon
3. An equilateral octagon.
4. An equilateral nonagon.
5. A convex 15-gon
Let’s summarize
1. A polygon is a closed figure made up of segments that intersect at their
endpoints and no two consecutive segments are collinear.
2. Each line segment is a side of the polygon and each endpoint is a vertex.
3. Polygons are named based on the number of their sides
4. Polygons with equal sides and equal angles are called regular polygons.
5. A polygon is convex if a segment joining any two interior points lies
completely within the polygon.
Lesson 3
A Triangle. Its Basic and Secondary Parts
You have learned that the triangle is the simplest polygon because it has
the least number of sides.
But how do we name triangles? Triangles are named by using the letters
at their vertices. Starting from any vertex, go clockwise or counterclockwise.
9. 9
Examples:
A
Clockwise naming of triangle
C B
Triangle ABC is the same as ∆BCA, ∆CAB.
A
Counterclockwise
C B
∆ACB = ∆CBA = ∆BAC.
The basic parts of a triangle are sides, vertices and angles.
1. The sides of ∆ABC are AB, BC, and AC.
A
Side AC side AB
C B
Side BC
2. The vertices are the endpoints A, B, and C.
A
vertex A
vertex C vertex B
C B
3. The angles. Can you name the 3 angles of the figure below?
10. 10
They are ∠ABC, ∠BCA, and ∠CAB.
A
∠CAB
C B
∠ACB ∠CBA
Name Triangle I and II in different ways and then complete the table below.
P
I II
Q S
R
Name Sides Vertices Angles
Triangle I ∆QPR,__,__ QP,__,__ Q,__.__ ∠PQR,__,__
Triangle II ∆PSR,__,__ PS,__,__ P,__,__ ∠PSR,__,__
Secondary parts of a triangle
a. Median
A median is a segment whose endpoints are a vertex of a triangle and the
midpoint of the opposite side. (A midpoint divides a segment into two equal
segments).
P P P
S T
Q V R Q R Q R
PV is a median of ∆PQR. V is the midpoint of QR.
QS is a median of ∆PQR. S is the midpoint of PR.
RT is a median of ∆ PQR. T is the midpoint of PQ.
11. 11
b. Altitude
An altitude is a segment from a vertex of the triangle perpendicular to the
opposite side or to the line containing the opposite side. (Perpendicular means
the two segments form a right angle).
X U X
Y
U Y V X V U V Y
In all the figures above, XY is an altitude.
c. Angle Bisector
M
C C
M C M
MC bisects angle M in all the triangles above. MC is called angle bisector.
You will notice that a triangle has 3 medians, 3 altitudes and 3 angle
bisectors.
If the triangle is equilateral, the median is the same as the angle bisector
and altitude. See the figure below:
C
J K
L
12. 12
Lesson 4
Classification of triangles according to sides and angles
Triangles are classified by their sides into 3 categories:
1. Scalene – all sides have different lengths
2. Isosceles – 2 sides have the same length
3. Equilateral – all 3 sides have the same length
10
7
8
scalene ∆ isosceles ∆ equilateral ∆
Triangles are classified by their angles into 3 categories:
1. Acute ∆ - all 3 angles are acute
2. Right ∆ - one angle is right
3. Obtuse ∆ - one angle is obtuse
All angles are acute
Acute ∆
600
600
600
An acute triangle is equiangular if all 3 angles have the same measure.
Right angle
Right ∆
13. 13
Obtuse angle
Obtuse ∆
Parts of special triangles:
Triangle MON is an isosceles triangle.
M
Vertex angle
leg
base angle
O N
Base
Legs – the congruent sides
Base – the third side
Vertex angle – the angle opposite the base
Base angles – the angles at the base
Triangle ACB is a right triangle
A
Hypotenuse
legs
C B
Hypotenuse – the longest side; the side opposite the right angle
Legs – the sides forming right angle
Try this out
A. Using the figure at the right, identify the following.
A
1. AB, AC, BC
2. C, B, A
3. AE F D
4. BD
5. CF
B C
E
14. 14
B. Match each triangle with all words that describe it:
a. scalene b. isosceles c. equilateral
d. acute e. right f. obtuse g. equiangular
(1) (2) (3)
600
6 1000
8
600
600
500
300
9
(4) (5)
C. Tell if each statement is true or false. Draw a figure to justify your answer.
1. A triangle can be isosceles and acute.
2. A triangle can have two obtuse angles.
3. A triangle can be obtuse and scalene.
4. A right triangle can be equilateral.
5. A triangle can be right and isosceles.
6. A triangle can have two right angles.
7. A triangle can have at most 3 acute angles.
8. A triangle can have at least one (1) acute angle.
9. An equilateral triangle is also an acute triangle.
10. An equiangular triangle can never be a right triangle.
Tessellations
A tessellation is a design in which congruent copies of a figure are arranged
to fill the plane in such a way that no figures overlap and there are no gaps.
15. 15
Examples:
Try to make a tessellation for each figure below. Which figure could not
be used for tessellation?
You can also combine figures to make a tessellation:
To make an original pattern for a tessellation, start with a parallelogram. Make
congruent changes on one or both pairs of sides:
16. 16
Let’s summarize
1. The basic parts of a triangle are sides, angles and vertices while the
secondary parts are median, altitude and angle bisector.
2. A median is a segment whose endpoints are a vertex of a triangle and the
midpoint of the opposite side.
3. An altitude is a segment from a vertex of the triangle perpendicular to the
opposite side or to the line containing the opposite side.
4. Triangles are classified according to sides and angles.
a. Scalene – all sides have different lengths
b. Isosceles – 2 sides have the same length
c. Equilateral – all 3 sides have the same length
d. Acute ∆ - all 3 angles are acute
e. Right ∆ - one angle is right
f. Obtuse ∆ - one angle is obtuse
What have you learned
Select the correct answer for each question:
1. Which of the following is a polygon?
a b c d
2. A heptagon is a polygon with
a. 4 b. 5 c. 6 d. 7 sides
3. One of the following is NOT a convex polygon. Which one is it?
a b c d
4. In ∆ABC, A, C and B are called
a. sides b. interior angles c. vertices d. exterior angles
17. 17
5. Using the figure at the right, BD is a /an B
a. median b. altitude
c. ∠ bisector d. ⊥ bisector A D C
6. In ∆DEF, m∠E = 90. ∆DEF is
a. acute b. right c. obtuse d. equilateral triangle
7. It is a triangle with all angles congruent
a. scalene b. isosceles c. obtuse d. equiangular
8. ∠CBA is a
B A
a. inscribed angle b. central angle C O
c. obtuse angle d. vertex angle
D
9. The longest side in a right triangle is known as
a. leg b. hypotenuse c. vertex d. base
10. In isosceles triangle ABC, AB = BC. AB and BC are called
a. bases b. vertices c. hypotenuse d. legs
11. A polygon with no given number of sides can be named as
a. dodecagon b. undecagon c. n-gon d. gon
12. The sides of a polygon is made up of
a. segments b. rays c. lines d. planes
13. A line segment from a vertex of a triangle to the midpoint of the opposite
side.
a. altitude b. perpendicular bisector c. median d. angle bisector
14. A right triangle with congruent legs is
a. equilateral b. isosceles c. scalene d. isosceles right triangle
15. An isosceles triangle is also equilateral. The statement is
a. always true b. sometimes true c. never true d. can’t be determined
18. 18
Answer Key
How much do you know
1. C
2. B
3. A
4. A
5. B
6. C
7. D
8. B
9. B
10. D
11. C
12. A
13. C
14. D
15.A
Try this out
Lesson 2
A.
1. Polygon
2. not
3. not
4. not
5. Polygon
6. Polygon
7. not
B.
1. non-convex
2. convex
3. non-convex
4. convex
5. non-convex
6. non-convex
7. non-convex
8. convex
9. convex
10.non-convex
19. 19
C.
1. Nonagon
2. Heptagon
3. Quadrilateral
4. Octagon
5. Heptagon
6. Pentagon
7. Hexagon
8. Quadrilateral
D.
1. Draw a square
2. Any 5-sided polygon that is not convex
3.
4. – 5. Refer to the drawing tip
Try this out
Lesson 4
A.
1. Sides
2. Vertex / vertices
3. altitude
4. angle bisector
5. median
B.
1. isosceles right triangle
2. scalene right triangle
3. isosceles acute triangle
4. equilateral / equiangular
5. scalene obtuse triangle
C.
1. true
2. false
20. 20
3. true
4. false
5. true
6. false
7. true
8. false
9. true
10. true
What have you learned
1. B
2. D
3. C
4. C
5. B
6. B
7. D
8. D
9. B
10. D
11. C
12. A
13. C
14. D
15. C