Categorie: Tutti - triangles - angles - polygons - geometry

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Basic geometry and polygons

The text provides an overview of basic geometry concepts related to polygons and triangles. It details the properties and formulas for calculating the interior and exterior angles of polygons, such as pentagons, hexagons, and decagons.

Basic geometry and polygons

Basic geometry and polygons

Basic Geometry: Angles

Vertically opposite angles occurs when straight lines intersect
A=B (vert. opp. ∠s)
Adjacent angles on a straight line, Represented as (Adj. ∠s on a str. line)
180°= x + 3x + 2x (adj. ∠s on a str. line)
Corresponding angles
Interior angles represented as (int. ∠s, AB//CD)
This means that corresponding angles are equal ∠a=∠d Example (Corr . ∠s, PQ//RS) Alternate angles equal ∠d=∠h Example (Alt. ∠s PQ//RS) Interior angles supplementary ∠b+∠a=180°

This also consists of two pairs of parallel lines . a line QP will have to be drawn horizontally in between angle x in order to get two Z angles , where reflex of angle x = w+z ( Alt.∠s , AA//QP) ( Alt ∠s CC//QP)

Example of corresponding angle question where a=55° as alt. ∠s is applicable

Z angle can be applied to find the other of corresponding angle

Acute angle 0°
Perpendicular lines expressed as AB⊥PQ

Special Quadrilaterals

Rectangle
two diagonal equal in length, all sides 90°

rectangles consists of 4 isosceles triangles

Usable terms:Int. ∠ of rect.)

Trapezium
At least one pair of parallel sides, Angles in between parallel sides add up to 180°
rhombus
Two pairs of parallel lines , all 4 sides equal length

Consists of 2 equal isosceles triangles , angles between each two parallel lines are the same

kite
At least 2 pairs of adjacent sides

consists of two isosceles triangles , one smaller than the other

∠DEA=∠DEC(longer diagonal BD bisects ∠ADC) =25° ∠DEC°=90° ( diagonals of kite cut each other at right angles) ∠BAD=∠BCD(opp. ∠s of kite)

parallelogram
Two pairs of parallel lines , diagonals bisect each other , angles in between add up to 180°
square

Polygons!

N sides , int. angle of N-gon:(n - 2) × 180°
Problem involving regular polygons with unknown no. of sides Finding no. of sides using exterior angles of n-sided polygon Sum of ext. angles=360° Given size of each ext. angle: 24° n=360°/24°=15
Finding no. of sides in regular polygon if interior angle is given as°162° (n-2)x180°/n= 162° (n-2)x180°=162° x n 180n-162n=360 18n=360 n=20
Sum on int. angles in a decagon Decagon:10 sides Sum of int angles: (nx2)× 180°
Pentagon: 5 sides , 3 triangles formed Hexagon: 6 sides , 4 Triangles formed Heptagon: 7 sides , 5 triangles formed Octagon: 8 sides , 6 triangles formed Nonagon: 9 sides, Decagon: 10 sides
exterior angle of a polygon = 360 ÷ number of sides.
sum of interior angles Pentagon:540° Hexagon: 720° Heptagon: 900° Octagon: 1080° Nonagon: 1260° Decagon: 1440° Formula :int. angle=(n - 2) × 180°

Triangles

Appropriate labels to add in questions involving triangles: (ext. ∠ of △ ) (∠ sum of △) In questions involving exterior angle of triangle which are formed by parallel line and transversal: (Vert. Opp. ∠s) and (corr. ∠s, BC//DE still applies
x°+32°+47°=180°( ∠ sum of △)
scalene
0 equal sides
isosceles
At least 2 equal sides

Usable terms: (base ∠s of Isos △ABD

Acute, obtuse and right angles triangles
Right angle: One angle is 90°
Obtuse : One angle more than 90°
Acute: all angles lesser than 90°
Equilateral triangles
All angles are 60° , all sides equal length