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page 4 of 7
1. Angles and Lines
2. Intersecting Angles
3. Triangles
4. Circles
5. Perimeters & Areas
6. Solids
7. Coordinate Geometry
Circles
The diameter,
d, of a circle is twice the radius, r.
Its circumference is 
d or 2r
( = 3.14 or 22/7- which is approximately 3.14).
A central angle has its vertex at the center of
a circle, and its measure equals the measure of the arc it intercepts
(in degrees). For example, if 
AOB
= 60
,
Circumference = 2
then the measure of arc AB is
60, or 60/360 = 1/6 of the circle's circumference.
An inscribed angle has its vertex on the circle
itself, and its measure is 1/2 of the measure of the arc it intercepts:
A line that just touches a circle is called a tangent. It is perpendicular to the radius drawn to the point of touching.
ABC is a right triangle if CB is the diameter. A triangle inscribed in a circle is a right triangle if one of its sides is a diameter. Obviously,
Example 1
What arc length is intercepted by an inscribed angle of 42
Solution
The 42arc length = 84/360 x 24
factor out the 12s in 84 and 360, factor 24 into 6 and 4, and convert
(7 x 12)/(30 x 12) x (6 x 4) 22/7 = 88/5 = 17.6
Example 2
A triangle is inscribed in a circle with shorter sides 6 and 8 units long. If the longer side is a diameter, find the length of the diameter.
Solution
A triangle so inscribed (with one side a diameter) is a right triangle. Consequently,d
= 6
