Cos(x) & Unit Circle - Radians

First notice the unit circle has a radius of 1.[br]Click and drag the slider for α. Note the size of α in degrees and in radians. (Although we wrote the word radians, it should NOT be written. There is no unit with radians.)[br]The ANGLE α is on the x-axis. The ANGLE α is the LENGTH OF THE ARC in the unit circle for the angle α in degrees. Read this sentence until you understand it. It is critical.[br]The x-coordinate of the point T , i.e. the base of the triangle is the value of the cosine function of the angle α.
Cos(x) & Unit Circle - Radians
Rounded to 3 decimal places, how much is α=[math]\frac{\pi}{4}[/math]? What is size of α in degrees? Which is on the x-axis of the function in the graph above?[br]Rounded to 1 decimal place, how much is α=[math]\frac{\pi}{2}[/math]? What is the size of α in degrees? Which is on the x-axis of the function in the graph above?[br]What is the height at the point when α=[math]\frac{\pi}{2}[/math]? So what is [math]\cos(\frac{\pi}{2})[/math]? Find this point on the graph of the function.[br]What is a decimal approximation for the coordinates of this point? Can you see that the scale of the graph is 1:1? [br](I use the points (0,1) and (1.5,0) as my approximation when drawing the first half cycle of cos(x). Can you see why?)

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