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#1 2012-03-21 08:11:01
- amberzak
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- Registered: 2012-03-16
- Posts: 80
Unit Circle Pythagorean Identities
I'm finishing my essay on the Unit Circle, and I just have a really quick question if someone could oblige.
The pythagorian identities in the unit circle state that, for example, cos^2 theta + sin^2 theta = 1. Does this work when you move all the way around the circle (for example, when the angle is 90 degrees, the triangle in the circle is just a line, so cos will be 0)
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#2 2012-03-21 12:18:39
- Bob
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- Registered: 2010-06-20
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Re: Unit Circle Pythagorean Identities
hi amberzak,
Yes, this identity is true for all theta (even beyond 360).
eg. If theta = 135, then sin theta = (root 2) / 2 and cos theta = minus (root 2) / 2
Then when you square these, the minus goes and you have 2 / 4 + 2 / 4 = 1 same as if theta = 45.
Since sine and cosine take the same values in the other quadrants if you ignore the minus signs this will happen for all theta.
Can write this out in a formal proof if you want.
Bob
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#3 2012-03-21 20:44:37
- amberzak
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- Registered: 2012-03-16
- Posts: 80
Re: Unit Circle Pythagorean Identities
No, thats perfect thanks. I wrote that it's always true and I just wanted to make sure what I wrote was accurate. Thanks
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