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Please solve this and only answer with image
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Please solve this and only answer with image

Please solve this and only answer with image-example-1
User FabianCook
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\cot^4 A - \cot^2 A = 1\\\\\cot^4 A = 1 + \cot^2 A\\\\(\cos^4 A)/(\sin^4 A) = 1 + (\cos^2 A)/(\sin^2 A)\\\\(\cos^4 A)/(\sin^4 A) = (\sin^2 A)/(\sin^2 A)+(\cos^2 A)/(\sin^2 A)\\\\(\cos^4 A)/(\sin^4 A) = (\sin^2 A+\cos^2 A)/(\sin^2 A)\\\\(\cos^4 A)/(\sin^4 A) = (1)/(\sin^2 A)\\\\\cos^4 A = (\sin^4 A)/(\sin^2 A)\\\\\cos^4 A = \sin^2 A\\\\

This then means,


\cos^4 A + \cos^2 A = 1\\\\\sin^2 A + \cos^2 A = 1\\\\

which is the pythagorean trig identity. This concludes the proof.

Therefore, if
\cot^4 A - \cot^2 A = 1, then
\cos^4 A + \cos^2 A = 1

User Gabriel Belini
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