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I know they mean "rotate this way" and "rotate that way," respectively, but is there a standard name for "rotational direction?"

"omega" often measures the angle, but what variable name usually designates the direction of rotation?

(I'm naming variables for my program that will have to rotate things in a Cartesian plane)

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    With the winding number in various manifestations in math, positive is anti or counterclockwise, negative is clockwise. We may or may not have complex numbers to thank for this convention.2011-09-06
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    I'm with anon; usually one just uses positive angles for anticlockwise and negative angles for clockwise. This works for rotation matrices since $\cos$ is even ($\cos(-\omega)=\cos\,\omega$) and $\sin$ is odd ($\sin(-\omega)=-\sin\,\omega$).2011-09-06
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    Northern Hemisphere, or Southern?2011-09-06
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    you guys are right; I was able to code it just with positive and negative values of omega.2011-09-06
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    Gerry, Southern hemisphere, but we're actually on Venus, so it's like your Northern hemisphere.2011-09-06
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    FWIW: I wanted to give you additional marks for mentioning Venus. It rotates in the opposite direction as Earth, so the clever North/South play is really, very clever. Hip Hip.2011-09-06
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    Are you too young to remember analog clocks? That is the source.2011-09-06
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    @Ross Millikan: Actually, I'm pretty sure [it goes all the way back to sundials](http://en.wikipedia.org/wiki/Clockwise#Origin_of_the_term).2011-09-06

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May be you should read this.http://www.xamplified.com/positive-and-negative-angles/

*As per my understanding of "rotate this way" and "rotate that way" you are referring to terminal sides above and below the x-axis.When i first took trig this is what i was taught. *

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    Though it turns out my original question was made moot by not needing to create the unnamed variable in the first place, this answer most closely answers my moot question.2011-09-08
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As I've always understood it, the idea comes from the cross product and angular momentum. If we can agree on an 'up' direction (the positive z axis in a coordinate plane), then we say a rotation is positive if the direction of its angular momentum, as determined by the right hand rule, is upward (that is, has any positive z component). This does end up agreeing with the winding number argument - counterclockwise in the xy plane is positive.

As I type this, it makes me wonder - what if it's perpendicular to the z axis? Well, I don't know. I suppose I'm out of luck. But such strange times might call for strange measures, and we could actually describe the angular momentum vector to remove all doubt - or we could just change coordinates so that 'up' isn't quite how we thought of it before.

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    "or we could just change coordinates so that 'up' isn't quite how we thought of it before." - hence Gerry's comment. :D2011-09-06
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    In this case, the animations are on a Cartesian plane, so I don't have to worry about "exotic" (haha) rotations for anything other than within the plane.2011-09-08