Question

Find the value of `tan^-1 (tan  (2pi)/3)`

Answer 1

We know that `(2pi)/3 ∉ [(-pi)/2, pi/2]`

∴ `tan^-1(tan  (2pi)/3) = tan^-1[tan(pi - pi/3)]`

= `tan^-1(- tan  pi/3)`

= `- tan^-1(tan  pi/3)`  ......`[because tan^-1(- x) = - tan^-1x]`

= `- pi/3 ∈  [-pi/2, pi/2]`

Hence, `tan^-1 (tan  (2pi)/3) = (-pi)/3`.