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Date: 9-2-2017
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Trigonometric functions of any angle
Unit circle. Counting of angles in a unit circle.
Negative and positive angles. Quarters of a unit circle.
Sine and cosine lines. Sine. Cosine. Signs of sine and
cosine in different quarters of a unit circle. Tangent
and cotangent lines. Tangent. Cotangent. Signs of
tangent and cotangent in different quarters of a unit
circle. Secant and cosecant.
To build all trigonometry, laws of which would be valid for any angles ( not only for acute angles, but also for obtuse, positive and negative angles), it is necessary to consider so called a unit circle, that is a circle with a radius, equal to 1 ( Fig.3 ).
Let draw two diameters: a horizontal AA’ and a vertical BB’. We count angles off a point A (starting point). Negative angles are counted in a clockwise, positive in an opposite direction. A movable radius OC forms angle α with an immovable radius OA. It can be placed in the 1-st quarter ( COA ), in the 2-nd quarter ( DOA ), in the 3-rd quarter ( EOA ) or in the 4-th quarter ( FOA ). Considering OA and OB as positive directions and OA’ and OB’ as negative ones, we determine trigonometric functions of angles as follows.
A sine line of an angle