More playing around with trig identities.
An introduction to trigonometric functions: sine, cosine, and tangent.
Another example of figuring out the sine, cosine, and tangent of an angle in a right triangle.
What a radian is. Converting radians to degrees and vice versa.
Using Trigonometric functions to solve the sides of a right triangle.
A couple of more examples of using Trig functions to solve the sides of a triangle.
Using the unit circle to extend the SOH CAH TOA definition of the basic trigonometric functions.
Using the unit circle to define the sine, cosine, and tangent functions.
Using the unit circle definition of the sine function to make a graph of it.
Analyzing the amplitude and periods of the sine and cosine functions.
Determining the equations of trig functions by inspecting their graphs.
Determining the amplitude and period of sine and cosine functions.
Proof of the trig identity sin(a+b) = (cos a)(sin b) + (sin a)(cos b).
Proof of the trig identity: cos(a+b) = (cos a)(cos b)-(sin a)(sin b).
Continuation of the playing around with trig identities.
The first part of a problem when the captain of a ship goes off track.
The second part of the problem of the off-track ship captain.
Introduction to the law of cosines to solve for a side of a triangle when 2 sides and an angle are known.
Trigonometry problems dealing with the height of two people on a ferris wheel.
Part 2 of the ferris wheel problems. Graph of h(t)=9-8cos(18t).
Understanding the arctan or inverse tangent function.
Understanding the inverse cosine or arccos function.
Revisiting the proofs of some trigonometry identities.