I noticed that translating radians to degrees and vice versa is like translating a percentage to a whole number and vice versa. For example, to get 60 percent of 345 you do the following

``````60 * 345/100
``````

to convert 60 degrees to radians you do

``````60 * 3.14/180
``````

There is a pattern there BUT... we use 100 to compare percentages to a number. So, why do we use 180 degrees instead of 360 degrees to compare degrees to radians?

%100 percent = a whole number 360 degrees represents a whole circle

using 180 degrees is like using 50% instead of 100%

I hope I am making some sense. Can anyone answer? Thanks

-
I have to say that I disagree with people who are saying this is not programming related. In non-programming terms, you say 360 degrees = 2pi radians. In computer programs, you perform a micro-optimization by dividing both sides by two because you've got a handy constant for pi. –  Paul Tomblin Jan 4 '10 at 2:38
Nothing is stopping you from using 360 in your formula. `60 * 2 * 3.14 / 360` 360 degrees = 2pi radians. –  Drew Dormann Jan 4 '10 at 2:39
In fact, some languages define the degree to radian constant –  Mitch Wheat Jan 4 '10 at 2:39
This was absolutely a programmers question. If I was reading a regular math book, I probably wouldn't of been on here asking the question now. But now I realize that flash uses 180 clockwise, -180 clock wise. obviously real life, we don't measure distance in negative direction. only programming does this. therefore its %100 programming question. thanks for the responses –  numerical25 Jan 4 '10 at 6:08
The value of pi itself comes from how many diameters (not radii) can fit into the circumference, where diameter is two radii in a straight line. –  Arthur Kalliokoski Feb 4 '10 at 18:58

The reason you use 180 degrees instead of 360 is that there are `2*pi` radians in a circle, not `pi`. Thus you divide both 360 and `2*pi` by 2 and get `pi` and `180`.

-
-1 for polluting your answer with commentary on the merit of the question. –  Eric Jan 4 '10 at 16:43

In Mathematica, I use the handy predefined `Degree` constant for conversions, which is defined as `Pi/180` or `2 * Pi/360`.

The reason there are `2 * Pi` radians in a circle is that the size of an angle in radians is the length of the arc of a circle with radius 1 that subtends it. The circumference of a circle with radius 1 is `2 * Pi`. In addition to providing a clear geometrical interpretation, using radians also makes a number of other relations much more convenient; cosine is the derivative of sine, and as a result the Maclaurin series for sines and cosines are much simpler than they would be for angles expressed in degrees.

-

`360` degrees = `2 * Pi` radians

`1` degree = `Pi / 180` radians

-

I guess your question is, why there 360 degrees in a circle (or 180 in a semicircle), and why not some other more tenable number like 100.

The answer to that is the origin of degree. If you'd like to use a round figure, check out the gradian unit of angles.

PS: SO is for programming questions only. This is not programming related.

-
Actually, the reason this question boggles me is because I was reading on physics of animation for flash animation. I appreciate the responses. But if I was reading anything that wasnt computer related, I probably would of known it is suitable to use 360. But Now I understand now. how flash does its rotation is 180 clockwise, and -180 back around to 0, thus giving the reason to use 180. –  numerical25 Jan 4 '10 at 5:49