Find the exact value of tan 285 deg + cos 75 deg + cot 60 deg

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The discussion focuses on calculating the exact value of the expression tan 285 degrees + cos 75 degrees + cot 60 degrees. Participants convert the angles to radians, resulting in tan 5π/12 + cos 5π/12 + cot π/3. There is a consensus that only the cotangent part has a known identity, while the other angles do not correspond to special values on the unit circle. The conversation highlights the challenge of finding exact values for non-special angles, particularly 5π/12. The thread concludes with a request for further assistance, indicating the urgency due to an upcoming test.
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the question is: find the exact value of tan 285 deg + cos 75 deg + cot 60 deg

i tried converting them to radians and got

tan 5pi / 12 + cos 5 pi / 12 + cot pi / 3

by "exact value", the question means fractions, not decimals. as far as i know, only the cot part has some special identity. am i missing something important? we have a long test tomorrow..

thanks in advance for any help. ^_^
 
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Use the fact that
\tan x=\frac{1}{\cot x}=\frac{\sin x}{\cos x}

Daniel.
 
that still wouldn't help because 5pi/12 has no special values (i.e. sin pi/6 = 1/2, sin pi/3 = sqrt3 / 2, etc.). it's not a special angle in the unit circle.. :(
 
\sin\frac{5\pi}{12}=\sin(\pi-\frac{\pi}{3}-\frac{\pi}{4})=\sin(\frac{2\pi}{3}-\frac{\pi}{4})

which involves "special angles"...

Daniel.
 
thanks a lot. :)
 

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