MATHEMATICS Form 1 Topic 6

An angle – is a measure of an amount of turn. For instance, a complete turn has an angle of 360º

There are several types of angles including:- acute, right, complementary, obtuse, supplementary and reflex angle

The angles formed by crossing lines includes vertically opposite angles, alternate angle and corresponding angles

The angles on the opposite sides of the crossing lines are equal

Consider a line segment crossing two parallel line segments. This line is called a transversal

The angles within the parallel line segments on the opposite sides of the transversal are equal

They are also called Z – angles

The angles on the same side of the transversal and on the same side of the parallel lines are equal.They are called corresponding angles and sometimes called F – angles

There are also three other pairs of corresponding angles in the diagram above.When showing that two angles are equal you must give reason whether they are vertically opposite, or alternate or corresponding angles.

Perpendicular Bisector to a Line Segment is shown below

Angle of 60°

Parallel lines can be shown as below:

Different types of angles are shown below.

Apolygonis a plane figure whose sides are three or more coplanar segments that intersect only at their endpoints. Consecutive sides cannot be collinear and no more than two sides can meet at any one vertex.

Apolygonal regionis defined as a polygon and its interior.

A triangle – is a polygon with three sides.The sides connect the points called vertices

A right – angled triangle – has one angle equal to 90º

An isosceles triangle – has two equal sides and two equal angles

An equilateral triangle – has three equal sides and all angles equal

NOTE:A triangle with all sides different and all angles different is called scalene triangle

A triangle with vertices A, B and C is denoted as

A triangle has two kinds of angles

Interior angle – is an angle inside the triangle.The sum of interior angles of a triangle is

Example, consider the triangle below

Exterior angle – is an angle outside the triangle.Consider the triangle below

A quadrilateral – is a polygon with four sides.Examples of quadrilaterals are a square, a rectangle, a rhombus, a parallelogram, a kite and a trapezium

A square – has equal sides and all angles are 90º

A rectangle – has two pairs of opposite sides equal and all angles are 90º

A rhombus – has all sides equal.Opposite angles are also equal

A parallelogram – has two pairs of opposite sides equal.Opposite angles are also equal

A kite – has two pairs of adjacent sides equal.One pair of opposite angles are also equal

A trapezium – has one pair of opposite sides pair

Any quadrilateral is made up of two triangles. Consider the below quadrilateral.

Sum of angles of quadrilateral = 2 ×180º = 360º

To make a circle: Draw a curve that is “radius” away from a central point.

And so:All points are the same distance from the center.

You can draw it yourself:Put a pin in a board, put a loop of string around it, and insert a pencil into the loop. Keep the string stretched and draw the circle!

The radius of the circle is a straight line drawn from the center to the boundary line or the circumference. The plural of the word radius is radii.

The diameter is the line crossing the circle and passing through the center. It is the twice of the length of the radius.

The circumference of a circle is the boundary line or the perimeter of the circle.

An arc is a part of the circumference between two points or a continuous piece of a circle. The shorter arc between and is called the minor arc. The longer arc between and is called the major arc.

The chord is a straight line joining two points on the circumference points of a circle. The diameter is a special kind of the chord passing through the center.

Asemi-circleis an arc which is half of thecircumference.

A tangent is a straight line which touches the circle. It does not cut the circumference. The point at which it touches, is called the point of contact.