Inverse trig question (1 Viewer)

Chris100

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Prove that 2tan-12= Pi - cos-13/5

Use the fact that tan(pi-x)=-tan x
 

Chris100

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Asianese, I got tan(2tan-12)=-tan(pi-cos-13/5)
I don't know what to do next
 

Chris100

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Nvm , above is wrong, I used the 4th quadrant.
This is where I'm at right now: tan(2tan-12)=-tan(pi-cos-1-3/5)
 

xRyusenka

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Tan both sides so you are able to use the the given identity to evaluate the RHS.
Hint for LHS: let tan-12 = a. So, tan(2a) = ?
 

Chris100

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I can't tan the right hand side because it's out of the -pi/2 to pi/2 domain since we're dealing with inverse trig. Pi minus cos-1 3/5 is out of that domain
I'm probably spewing nonsense here though
 

Chris100

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Lol nvm just got it thanks for the help guys.
Just to confirm though, in these sort of questions, do I not have to follow the traditional proof style of LHS=......=RHS?
 
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Lol nvm just got it thanks for the help guys.
Just to confirm though, in these sort of questions, do I not have to follow the traditional proof style of LHS=......=RHS?
You dont have to but you must never work both sides simultaneously and end with 0=0 or something. You can do tan(lhs)=.... And then separately, tan(rhs)=.......=tan(lhs) and since lhs and rhs are acute, lhs=rhs
 

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