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Question
Find the value of tan–1x – cot–1x, if `(tan^-1x)^2 - (cot^-1x)^2 = (5π)/8`.
Sum
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Solution
Given, `(tan^-1x)^2 - (cot^-1x)^2 = (5π)/8`
⇒ `[tan^-1x - cot^-1x] [tan^-1x + cot^-1x] = (5π)/8`
⇒ `(tan^-1x - cot^-1x) π/2 = (5π)/8` ...`[∵ tan^-1x + cot^-1x = π/2]`
⇒ `tan^-1x - cot^-1x = (5π)/8 xx 2/π`
⇒ `tan^-1x - cot^-1x = 5/4`
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