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Trig

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Submitted By project13
Words 2647
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th
Trying trig
Everything you need to Know
By: Noah Gregory

subject Page
Radians & Degree Measure 3
Unite Circle 4
Right Triangle Trig 5-7 trig functions of any angle 8-10 graphs 11-15 using fundamental trig identities 16-17 verifying trig identities 18-20 solving trig equations 21-23 sum & difference formulas 24 law of sines 25-27 laws of cosines 28-29 vectors 30-31
Definitions 32-33

Radians & Degree Measure
Converting radians to degrees:
To convert radians to degrees, we make use of the fact that p radians equals one half circle, or 180º.
[pic]
This means that if we divide radians by p, the answer is the number of half circles. Multiplying this by 180º will tell us the answer in degrees.
So, to convert radians to degrees, multiply by 180/p, like this: [pic]

To convert degrees to radians, first find the number of half circles in the answer by dividing by 180º. But each half circle equals p radians, so multiply the number of half circles by p.

Example 1 (p= Pie) 10º in radians would be 18 Radians.

First put your degree over 1

R= 10°/1 (p/180°)

Next multiply & divide & you will get
18p
------------------------------
Example 2
1.4 Radians would be 80.2°

put your radian over 1

D= 1.4/1 (180°/p)

Next multiply & divide & you will get
80.2 °

Unite Circle

[pic]

Right Triangle Trig evaluating 45°right triangles
In an isosceles right triangle the sides are in the ratio 1:1:[pic]
In an isosceles right triangle, the equal sides make the right angle. They are in the ratio 1 : 1. To find the ratio number of the hypotenuse h, we have, according to the Pythagorean theorem, h² = 1² + 1² = 2.
Therefore,
h = [pic]
And therefore the

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