Polygons: Shapes with Many Angles
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Polygons
The word
‘
poly
gon
’ is a
Greek word.
Poly
Poly
means
many
and
gon
gon
means
angles.
Polygons
Polygons
•
The word polygon means
“many angles”
•
A two dimensional object
•
A closed figure
More about Polygons
•
Made up of three or more
straight line segments
•
There are exactly two sides
that meet at a vertex
•
The sides do not cross each
other
Polygons
Examples of Polygons
Polygons
These are not Polygons
Polygons
Terminology
Side: One of the line segments
that make up a polygon.
Vertex: Point where two sides
meet.
Polygons
Vertex
Side
Polygons
•
Interior angle: An angle
formed by two adjacent sides
inside the polygon.
•
Exterior angle: An angle
formed by two adjacent sides
outside the polygon.
Polygons
Interior angle
Polygons
Let us recapitulate
Polygons
Types of Polygons
•
Equiangular Polygon: a polygon
in which all of the angles are
equal
•
Equilateral Polygon: a polygon
in which all of the sides are the
same length
Polygons
•
Regular Polygon: a polygon
where all the angles are
equal and all of the sides
are the same length. They
are both equilateral and
equiangular
Polygons
Examples of Regular Polygons
Polygons
A
convex
polygon: A polygon whose each
of the interior angle measures less than
180
°
.
If one or more than one angle in a polygon
measures more than 180
°
then it is known
as
concave
polygon. (
Think: concave has a
"cave" in it
)
Polygons
IN
TERIOR ANGLES
OF A POLYGON
Polygons
Let us find the connection
between the number of sides,
number of diagonals and the
number of triangles of a polygon.
Polygons
Quadrilateral
Pentagon
180
o
180
o
180
o
180
o
180
o
2 x 180
o
= 360
o
3
4 sides
5 sides
Hexagon
6 sides
4 x 180
o
= 720
o
4
Heptagon/Septagon
7 sides
180
o
180
o
180
o
180
o
5 x 180
o
= 900
o
2 diagonals
3 diagonals
4 diagonals
Polygons
Polygons
Polygons
Polygons
Polygons
Polygons
Polygons
Polygons
Septagon/Heptagon
Decagon
Hendecagon
7 sides
10 sides
11 sides
9 sides
Nonagon
Sum of Int. Angles 900
o
Interior Angle 128.6
o
Sum 1260
o
I.A. 140
o
Sum 1440
o
I.A. 144
o
Sum 1620
o
I.A. 147.3
o
Calculate the
Sum of Interior Angles
and
each interior angle
of each of
these regular polygons.
1
2
4
3
Polygons
2 x 180
o
= 360
o
360 – 245 =
115
o
3 x 180
o
= 540
o
540 – 395 =
145
o
Find the unknown angles below.
Diagrams
not
drawn
accurately.
4 x 180
o
= 720
o
720 – 603 =
117
o
5 x 180
o
= 900
o
900 – 776 =
124
o
Polygons
EXTERIOR ANGLES
OF A POLYGON
Polygons
An exterior angle of a regular polygon is
formed by extending one side of the polygon.
Angle CDY is an exterior angle to angle CDE
Exterior Angle + Interior Angle of a regular polygon =180
0
Polygons
1
2
0
0
1
2
0
0
1
2
0
0
6
0
0
6
0
0
6
0
0
Polygons
1
2
0
0
1
2
0
0
1
2
0
0
Polygons
Polygons
3
6
0
0
Polygons
60
0
60
0
60
0
60
0
60
0
60
0
Polygons
60
0
60
0
60
0
60
0
60
0
60
0
Polygons
60
0
60
0
60
0
60
0
60
0
60
0
Polygons
Polygons
1
2
3
4
5
6
3
6
0
0
Polygons
9
0
0
9
0
0
9
0
0
9
0
0
Polygons
9
0
0
9
0
0
9
0
0
9
0
0
Polygons
Polygons
1
2
3
4
3
6
0
0
Polygons
No matter what type of
polygon we have, the sum
of the exterior angles is
ALWAYS equal to 360º.
Sum of exterior angles =
360º
Polygons
In a regular polygon with ‘n’ sides
Sum of interior angles = (n -2) x 180
0
i.e. 2(n – 2) x right angles
Exterior Angle + Interior Angle =180
0
Each exterior angle = 360
0
/n
No. of sides = 360
0
/exterior angle
Polygons
Let us explore few more problems
•
Find the measure of each interior angle of a polygon
with 9 sides.
•
Ans : 140
0
•
Find the measure of each exterior angle of a regular
decagon.
•
Ans : 36
0
•
How many sides are there in a regular polygon if
each interior angle measures 165
0
?
•
Ans : 24 sides
•
Is it possible to have a regular polygon with an
exterior angle equal to 40
0
?
•
Ans : Yes
Polygons
Polygons DG
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Explore the world of polygons, two-dimensional closed figures composed of straight line segments. Learn about their characteristics, types like equiangular and equilateral polygons, and examples of regular polygons.
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Presentation Transcript
Polygons The word polygon is a Greek word. Poly means many and gon means angles.
Polygons The word polygon means many angles A two dimensional object A closed figure Polygons
More about Polygons Made up of three or more straight line segments There are exactly two sides that meet at a vertex The sides do not cross each other Polygons
Examples of Polygons Polygons
These are not Polygons Polygons
Terminology Side: One of the line segments that make up a polygon. Vertex: Point where two sides meet. Polygons
Vertex Side Polygons
Interior angle: An angle formed by two adjacent sides inside the polygon. Exterior angle: An angle formed by two adjacent sides outside the polygon. Polygons
Exterior angle Interior angle Polygons
Let us recapitulate Exterior angle Vertex Side Diagonal Interior angle Polygons
Types of Polygons Equiangular Polygon: a polygon in which all of the angles are equal Equilateral Polygon: a polygon in which all of the sides are the same length Polygons
Regular Polygon: a polygon where all the angles are equal and all of the sides are the same length. They are both equilateral and equiangular Polygons
Examples of Regular Polygons Polygons
A convex polygon: A polygon whose each of the interior angle measures less than 180 . If one or more than one angle in a polygon measures more than 180 then it is known as concave polygon. (Think: concave has a "cave" in it) Polygons
IN TERIOR ANGLES OF A POLYGON Polygons
Let us find the connection between the number of sides, number of diagonals and the number of triangles of a polygon. Polygons
180o 180o 180o 180o 180o 4 sides Quadrilateral 5 sides Pentagon 3 x 180 2 x 180o = 360o 2 o = 540 o 3 1 diagonal 2 diagonals 180o 180o 180o 180o 180o 180o 180o 180o 180o 6 sides Hexagon Heptagon/Septagon 7 sides 4 x 180o = 720o 4 5 x 180o = 900o 5 3 diagonals 4 diagonals Polygons
Regular Polygon No. of sides No. of diagonals No. of Sum of the interior angles Each interior angle 0 0/3 0 Triangle 3 0 1 180 180 = 60 Polygons
Regular Polygon No. of sides No. of diagonals No. of Sum of the interior angles Each interior angle 0 0/3 0 Triangle 3 0 1 180 180 = 60 0 0/4 0 Quadrilateral 4 1 2 2 x180 = 360 360 = 90 0 Polygons
Regular Polygon No. of sides No. of diagonals No. of Sum of the interior angles Each interior angle 0 0/3 0 Triangle 3 0 1 180 180 = 60 0 0/4 0 Quadrilateral 4 1 2 2 x180 = 360 360 = 90 0 0 0/5 Pentagon 5 2 3 3 x180 = 540 540 = 108 0 0 Polygons
Regular Polygon No. of sides No. of diagonals No. of Sum of the interior angles Each interior angle 0 0/3 0 Triangle 3 0 1 180 180 = 60 0 0/4 0 Quadrilateral 4 1 2 2 x180 = 360 360 = 90 0 0 0/5 Pentagon 5 2 3 3 x180 = 540 540 = 108 0 0 0 0/6 Hexagon 6 3 4 4 x180 = 720 720 = 120 0 0 Polygons
Regular Polygon No. of sides No. of diagonals No. of Sum of the interior angles Each interior angle 0 0/3 0 Triangle 3 0 1 180 180 = 60 0 0/4 0 Quadrilateral 4 1 2 2 x180 = 360 360 = 90 0 0 0/5 Pentagon 5 2 3 3 x180 = 540 540 = 108 0 0 0 0/6 Hexagon 6 3 4 4 x180 = 720 720 = 120 0 0 0 0/7 Heptagon 7 4 5 5 x180 = 900 900 = 128.3 0 0 Polygons
Regular Polygon No. of sides No. of diagonals No. of Sum of the interior angles Each interior angle 0 0/3 0 Triangle 3 0 1 180 180 = 60 360 = 90 0 0/4 0 Quadrilateral 4 1 2 2 x180 = 360 0 0 0/5 Pentagon 5 2 3 3 x180 = 540 540 = 108 0 0 0 0/6 Hexagon 6 3 4 4 x180 = 720 720 = 120 0 0 0 0/7 Heptagon 7 4 5 5 x180 = 900 900 = 128.3 0 0 n sided polygon n Association with no. of sides Association with no. of sides Association with no. of triangles Association with sum of interior angles Polygons
Regular Polygon No. of sides No. of diagonals No. of Sum of the interior angles Each interior angle 0 0/3 0 Triangle 3 0 1 180 180 = 60 0 0/4 0 Quadrilateral 4 1 2 2 x180 = 360 360 = 90 0 0 0/5 Pentagon 5 2 3 3 x180 = 540 540 = 108 0 0 0 0/6 Hexagon 6 3 4 4 x180 = 720 720 = 120 0 0 0 0/7 Heptagon 7 4 5 5 x180 = 900 900 = 128.3 0 0 n sided polygon n n - 3 n - 2 (n - 2) x180 (n - 2) x180 0 0 / n Polygons
1 Calculate the Sum of Interior Angles and each interior angle of each of these regular polygons. 7 sides Septagon/Heptagon Sum of Int. Angles 900o Interior Angle 128.6o 2 3 4 9 sides 10 sides 11 sides Nonagon Sum 1260o I.A. 140o Decagon Sum 1440o I.A. 144o Hendecagon Sum 1620o I.A. 147.3o Polygons
Diagrams not drawn accurately. Find the unknown angles below. x 100o 75o 95o w 115o 75o 70o 110o 2 x 180o = 360o 360 245 = 115o 3 x 180o = 540o 540 395 = 145o 125o 125o z 100o 140o 138o 105o 121o 138o 117o y 133o 137o 4 x 180o = 720o 720 603 = 117o 5 x 180o = 900o 900 776 = 124o Polygons
EXTERIOR ANGLES OF A POLYGON Polygons
An exterior angle of a regular polygon is formed by extending one side of the polygon. Angle CDY is an exterior angle to angle CDE B A C F 1 2 E D Y 0 Exterior Angle + Interior Angle of a regular polygon =180 Polygons
1200 600 1200 600 600 1200 Polygons
1200 1200 1200 Polygons
1200 1200 1200 Polygons
3600 Polygons
600 600 600 600 600 600 Polygons
600 600 600 600 600 600 Polygons
3 4 600 600 2 600 600 5 600 600 1 6 Polygons
3 4 600 600 2 600 600 5 600 600 1 6 Polygons
3 4 2 3600 5 1 6 Polygons
900 900 900 900 Polygons
900 900 900 900 Polygons
900 900 900 900 Polygons
2 3 3600 1 4 Polygons
No matter what type of polygon we have, the sum of the exterior angles is ALWAYS equal to 360 . Sum of exterior angles = 360 Polygons
In a regular polygon with n sides 0 Sum of interior angles = (n -2) x 180 i.e. 2(n 2) x right angles Exterior Angle + Interior Angle =180 0 0/n Each exterior angle = 360 0/exterior angle No. of sides = 360 Polygons
Let us explore few more problems Find the measure of each interior angle of a polygon with 9 sides. Ans : 140 Find the measure of each exterior angle of a regular decagon. Ans : 36 How many sides are there in a regular polygon if each interior angle measures 165 Ans : 24 sides Is it possible to have a regular polygon with an exterior angle equal to 40 Ans : Yes 0 0 0? 0 ? Polygons
Thank You Polygons DG
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