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Trig identity (1 Viewer)

dasicmankev

New Member
Joined
Oct 23, 2009
Messages
21
Gender
Male
HSC
2010
Hey, I just can't seem to prove this identity:

[1 + cosec^2 (A) tan^2 (C)] [1 + cot^2 (A) sin^2 (C)]
______________________ = ___________________

[1 + cosec^2 (B) tan^2 (C)] [1 + cot^2 (B) sin^2 (C)]

It'll be of great help if someone could solve this. Thanks.
 

AmieLea

Member
Joined
Feb 9, 2010
Messages
86
Gender
Female
HSC
2010
try the substitutions:

cosec^2(a)=1+cot^2(a)
and
tan^2(a)=sec^2(a)-1

i've tried and it looks like it's going to work, but i just haven't quite got there yet

tell us if it works, or if you figured it out. i love this kind of stuff, but this one has me stumped lol. i'l keep trying
 

dasicmankev

New Member
Joined
Oct 23, 2009
Messages
21
Gender
Male
HSC
2010
Thanks guys I got it.

LHS = 1 + cosec^2 (A) tan^2 (C)
______________________

1 + cosec^2 (B) tan^2(C)


= 1 + [1 + cot^2 (A)] tan^2 (C)
_________________________

1 + [1 + cot^2 (B)] tan^2 (C)


= 1 + tan^2 (C) + cot^2 (A) tan^2 (C)
_______________________________

1 + tan^2 (C) + cot^2 (B) tan^2 (C)


= sec^2 (C) + cot^2 (A) tan^2 (C)
_____________________________

sec^2 (C) + cot^2 (B) tan^2 (C)


= cos^2 (C) sec^2 (C) + cot^2 (A) sin^2 (C)
____________________________________

cos^2 (C) sec^2 (C) + cot^2 (B) sin^2 (C)


= 1 + cot^2 (A) sin^2 (C)
____________________

1 + cot^2 (B) sin^2 (C)

= RHS
 

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