# Tan() Returns Wrong Value

I am trying to calculate angle between three points and I need to use the Tangent function `tan()`. The weird thing is that VBA return wrong value.

for example:

tan(209) = 0.554309051

but in VBA:

tan(209) = -.696695985548265

My friend told me about something called "Normalize". but I didn't understand what he's talking about and how to do it. Why is this happening?

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degrees v.s. radians? –  Marc B Aug 24 '11 at 18:38
@Marc B: no, checked it ;-) wolframalpha.com/input/?i=tan%28209%29&a=TrigRD_R –  loki2302 Aug 24 '11 at 18:41
Thats how I call tan > MsgBox Math.Tan((A(2) - B(2)) / (B(1) - A(1))) –  Ron Aug 24 '11 at 19:01

According to this VBA uses radians. Convert degrees into radians , ( degrees * 2 * pi) / 360

``````tan((209 * 2 * 3.14)/360)
``````
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It works but still I dont understand how u figured it out. the reference u gave explain nothing to me... –  Ron Aug 24 '11 at 19:03
I knew that tangent give me the angle in radian and inorder to get in in degrees I need to multiple by 180/pi. but I still dont get why my Real-Life calculator give me the right value and using the tan() function of vba gives me the wrong value –  Ron Aug 24 '11 at 20:03
@Ron: Most likely your calculator is set to calculate with degree instead of radians. Check your calculator options. –  Spoike Aug 25 '11 at 5:57
I can't believe nobody else is pointing out the following: Tangent does not give an angle in radians! Arctangent does! This physicist is outraged. –  Jean-François Corbett Aug 26 '11 at 6:31

(not addressing if using TAN is correct or not):

Perhaps your cell is formated in some special way and it's changing the value. In Excel 2007, both the worksheet funcion and VBA return -11.8641847236695 for tan(209). That's different from what you have above.

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In addition to confusing radians and degrees, I think you may be confusing tangent and arctangent.

In a comment, you say you call `Tan` like this: `Math.Tan((A(2) - B(2)) / (B(1) - A(1)))`. That is a very atypical way to be supplying an angle argument to a tangent! And in another comment, you imply that you expect this to give you an angle (EDIT: or "radians"). But tangent won't give you an angle or "radians"!

I can't believe nobody else is pointing this out. This physicist is outraged.

Based on this, I believe that what you really want is arctangent, i.e. `Math.Atn((A(2) - B(2)) / (B(1) - A(1)))`. That will give you an angle (in radians) when supplied the length ratio of the opposite to adjacent sides.

Of course, the above is largely speculative, because I don't know what you really are trying to accomplish, but from what I can tease out of the bits of implicit information sprinkled across your question and comments, that is indeed what I would put my money on.

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I know that tangle doesnt give the angle, it gives radians. in order to get the angle I need to multiple the tangent by 180/pi. –  Ron Aug 24 '11 at 20:33
OMG No!! Tangent does not give radians! And multiplying it by 180°/π will not give an angle! (save in very exceptional applications) I urge you to study the definition of tangent. And I'd bet my keyboard and mouse that what you really need is arctangent, the reciprocal of tangent. –  Jean-François Corbett Aug 25 '11 at 5:59