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Question
Find the value of the following:
`tan^(-1) (tan (7pi)/6)`
Sum
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Solution
We know that tan–1 (tan x) = x if `x ∈ (-pi/2, pi/2)`, which is the principal value branch of tan –1x.
Here, `(7pi)/6 ∉ (-pi/2, pi/2)`.
Now, `tan^(-1) (tan (7pi)/6)` can be written as:
`tan^(-1) (tan (7pi)/6) = tan^(-1) [tan(2pi - (5pi)/6)]` ...[tan(2π – x) = – tan x]
= `tan^(-1) [-tan ((5pi)/6)]`
= `tan^(-1) [tan (-(5pi)/6)]`
= `tan^(-1) [tan(pi - (5pi)/6)]`
= `tan^(-1) [tan(pi/6)]`, where `pi/6 ∈ (-pi/2, pi/2)`
∴ `tan^(-1) (tan (7pi)/6)`
= `tan^(-1) (tan pi/6)`
= `pi/6`
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