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Circle Theorems

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Title: Circle Theorems Author: David Millward Last modified by: Colleen Young Created Date: 4/15/2006 4:51:42 PM Document presentation format: On-screen Show (4:3) – PowerPoint PPT presentation

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Title: Circle Theorems


1
Circle Theorems
2
A Circle features.
Circumference
the distance from the centre of the circle to
any point on the circumference
the distance around the Circle its PERIMETER
the distance across the circle, passing through
the centre of the circle
3
A Circle features.
Major Segment
Minor Segment
a line joining two points on the circumference.
part of the circumference of a circle
a line which touches the circumference at one
point only From Italian tangere, to touch
chord divides circle into two segments
4
Properties of circles
  • When angles, triangles and quadrilaterals are
    constructed in a circle, the angles have certain
    properties
  • We are going to look at 4 such properties before
    trying out some questions together

5
An ANGLE on a chord
An angle that sits on a chord does not change
as the APEX moves around the circumference
We say Angles subtended by a chord in the same
segment are equal
Alternatively Angles subtended by an arc in the
same segment are equal
as long as it stays in the same segment
From now on, we will only consider the CHORD, not
the ARC
6
Typical examples
Find angles a and b
Very often, the exam tries to confuse you by
drawing in the chords
Angle a 44º
YOU have to see the Angles on the same chord for
yourself
Angle b 28º
7
Angle at the centre
A
Consider the two angles which stand on this same
chord
It is half the angle at the centre
Chord
We say If two angles stand on the same chord,
then the angle at the centre is twice the angle
at the circumference
8
Angle at the centre
Its still true when we move The apex, A, around
the circumference
As long as it stays in the same segment
Of course, the reflex angle at the centre is
twice the angle at circumference too!!
We say If two angles stand on the same chord,
then the angle at the centre is twice the angle
at the circumference
9
Angle at Centre
A Special Case
When the angle stands on the diameter, what is
the size of angle a?
The diameter is a straight line so the angle at
the centre is 180
Angle a 90
We say The angle in a semi-circle is a Right
Angle
10
A Cyclic Quadrilateral
is a Quadrilateral whose vertices lie on the
circumference of a circle
Opposite angles in a Cyclic Quadrilateral Add up
to 180
They are supplementary
We say Opposite angles in a cyclic
quadrilateral add up to 180
11
Questions
12
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13
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15
Could you define a rule for this situation?
16
Tangents
  • When a tangent to a circle is drawn, the angles
    inside outside the circle have several
    properties.

17
1. Tangent Radius
A tangent is perpendicular to the radius of a
circle
18
2. Two tangents from a point outside circle
Tangents are equal
PA PB
PO bisects angle APB
90
ltAPO ltBPO
ltPAO ltPBO 90
90
AO BO (Radii)
The two Triangles APO and BPO are Congruent
19
3 Alternate Segment Theorem
Alternate Segment
The angle between a tangent and a chord is equal
to any Angle in the alternate segment
Angle in Alternate Segment
Angle between tangent chord
We say The angle between a tangent and a chord
is equal to any Angle in the alternate
(opposite) segment
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