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Question
Prove that `1/(1 + tan^2 A) + 1/(1 + cot^2 A) = 1`.
Theorem
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Solution
Given: A angle A (any real angle)
To Prove: `1/(1 + tan^2 A) + 1/(1 + cot^2 A) = 1`
Proof [Step-wise]:
1. Write tan and cot in terms of sin and cos:
`tan A = sin A/cos A`
`cot A = cos A/sin A`
2. Evaluate the first term:
`1/(1 + tan^2 A) = 1/(1 + (sin^2 A/cos^2 A))`
= `1/((cos^2 A + sin^2 A)/cos^2 A)`
= `(cos^2 A)/(sin^2 A + cos^2 A)`
= cos2 A
3. Evaluate the second term similarly:
`1/(1 + cot^2 A) = 1/(1 + (cos^2 A/sin^2 A))`
= `1/((sin^2 A + cos^2 A)/sin^2 A)`
= `(sin^2 A)/(sin^2 A + cos^2 A)`
= sin2 A
4. Add the two results:
`1/(1 + tan^2 A) + 1/(1 + cot^2 A) = cos^2 A + sin^2 A = 1`, using the Pythagorean identity sin2 A + cos2 A = 1.
Hence, `1/(1 + tan^2 A) + 1/(1 + cot^2 A) = 1`, as required.
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