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Proving tan(x)=-tan(-x)
By Hal 2001 (P3046) on Thursday, November 30, 2000 - 07:27 pm:

Hello all,

How do you go about showing that tan(x) = -tan(-x)
Can you show it using a unit circle, by drawing a tangent to the circle at right angles to the radius??

By Dan Goodman (Dfmg2) on Thursday, November 30, 2000 - 08:58 pm:

Well, tan(x)=sin(x)/cos(x), so I would have thought the easiest way to do it would be to say tan(-x)=sin(-x)/cos(-x)=(-sin(x))/cos(x)=-tan(x). Are you happy with sin(-x)=-sin(x) and cos(-x)=cos(x)?

By Kerwin Hui (Kwkh2) on Friday, December 1, 2000 - 12:03 pm:

Another method is as follows(provided, of course, cosq¹0):

Draw a line through origin making an angle q with the x-axis. Extend this line to meet the line x=1. The y-coordinate is now tan q.

Similarly, draw another line through origin making an angle -q with the x-axis. Extend this line to meet the line x=1.

It is then quite obvious from geometry that tan q=-tan -q.

Kerwin

By Hal 2001 (P3046) on Friday, December 1, 2000 - 01:49 pm:

Dan, yes, I agree that cos(x)=cos(-x) {reflection in the y axis, right?} sin(-x)=-sin(x) {is this a reflection in the y axis then reflected in x axis, is 180deg turn, right?} Your method is neat and simple. Thanks.

Kerwin, your method is sort of using the 4 quadrants, is that right? This is what I tried to describe in the original post. I tried to describe it using a circle. But the words did not come out properly. I like both methods.

Thanks Nrich Team!
Hal2001