Other polygons
There are many other polygons, some of which are given in the table below.
Sides |
Name |
5 |
pentagon |
6 |
hexagon |
7 |
heptagon |
8 |
octagon |
10 |
decagon |
15 |
pentadecagon |
Table of some polygons and their number of sides.
Angles of regular polygons
You can calculate the size of the interior angle of a regular polygon by using:
where
is the number of sides and
is any angle.
Areas of polygons
- Area of triangle:
base
perpendicular height
- Area of trapezium:
(sum of
(parallel) sides)
perpendicular height
- Area of parallelogram and rhombus: base
perpendicular height
- Area of rectangle: length
breadth
- Area of square: length of side
length of side
- Area of circle:
x radius
Polygons
- For each case below, say whether the statement is true or false. For false statements, give a counter-example to prove it:
- All squares are rectangles
- All rectangles are squares
- All pentagons are similar
- All equilateral triangles are similar
- All pentagons are congruent
- All equilateral triangles are congruent
- Find the areas of each of the given figures - remember area is measured in square units (cm
, m
, mm
).
Summary
- Make sure you know what: quadrilaterals, vertices, sides, angles, parallel lines, perpendicular lines,diagonals, bisectors and transversals mean.
- Similarities and differences between quadrilaterals
- Properties of triangles and quadrilaterals
- Congruency of triangles
- Classification of angles into acute, right, obtuse, straight, reflex or revolution
- Theorem of Pythagoras which is used to calculate the lengths of sides of a right-angled triangle
- Angles:
- Acute angle: An angle 0 and 90
- Right angle: An angle measuring 90
- Obtuse angle: An angle 90 and 180
- Straight angle: An angle measuring 180◦
- Reflex angle: An angle 180 and 360
- Revolution: An angle measuring 360
- Angle properties and names
- Equilateral, isoceles, right-angled, scalene triangles
- Triangles angles = 180
- Congruent and similar triangles
- Pythagoras
- Trapezium, parm, rectangle, square, rhombus, kite and properties
- Areas of particular figures
Exercises
- Find all the pairs of parallel lines in the following figures, giving reasons in each case.
-
-
-
- Find angles
,
,
and
in each case, giving reasons.
-
-
-
- Which of the following claims are true? Give a counter-example for those that are incorrect.
- All equilateral triangles are similar.
- All regular quadrilaterals are similar.
- In any
with
we have
.
- All right-angled isosceles triangles with perimeter 10 cm are congruent.
- All rectangles with the same area are similar.
- Say which of the following pairs of triangles are congruent with reasons.
-
-
-
-
- For each pair of figures state whether they are similar or not. Give reasons.
Challenge problem
- Using the figure below, show that the sum of the three angles in a triangle is 180
. Line
is parallel to
.