Let I = α = ∫ 1 / 2 2 tan − 1 x 2 x 2 − 3 x + 2 d x I = \alpha = \int_{1/2}^2 \frac{\tan^{-1} x}{2x^2 - 3x + 2} dx I = α = ∫ 1/2 2 2 x 2 − 3 x + 2 t a n − 1 x d x
Substitute x = 1 / t x = 1/t x = 1/ t d x = − 1 / t 2 d t dx = -1/t^2 dt d x = − 1/ t 2 d t
I = ∫ 2 1 / 2 tan − 1 ( 1 / t ) 2 ( 1 / t ) 2 − 3 ( 1 / t ) + 2 ( − 1 t 2 ) d t = ∫ 1 / 2 2 cot − 1 t 2 − 3 t + 2 t 2 d t I = \int_2^{1/2} \frac{\tan^{-1}(1/t)}{2(1/t)^2 - 3(1/t) + 2} \left(-\frac{1}{t^2}\right) dt = \int_{1/2}^2 \frac{\cot^{-1} t}{2 - 3t + 2t^2} dt I = ∫ 2 1/2 2 ( 1/ t ) 2 − 3 ( 1/ t ) + 2 t a n − 1 ( 1/ t ) ( − t 2 1 ) d t = ∫ 1/2 2 2 − 3 t + 2 t 2 c o t − 1 t d t
Adding the two expressions for I I I
2 α = ∫ 1 / 2 2 tan − 1 x + cot − 1 x 2 x 2 − 3 x + 2 d x = ∫ 1 / 2 2 π / 2 2 x 2 − 3 x + 2 d x 2\alpha = \int_{1/2}^2 \frac{\tan^{-1} x + \cot^{-1} x}{2x^2 - 3x + 2} dx = \int_{1/2}^2 \frac{\pi/2}{2x^2 - 3x + 2} dx 2 α = ∫ 1/2 2 2 x 2 − 3 x + 2 t a n − 1 x + c o t − 1 x d x = ∫ 1/2 2 2 x 2 − 3 x + 2 π /2 d x
α = π 8 ∫ 1 / 2 2 1 ( x − 3 / 4 ) 2 + 7 / 16 d x = π 8 [ 4 7 tan − 1 ( 4 x − 3 7 ) ] 1 / 2 2 \alpha = \frac{\pi}{8} \int_{1/2}^2 \frac{1}{(x-3/4)^2 + 7/16} dx = \frac{\pi}{8} \left[ \frac{4}{\sqrt{7}} \tan^{-1} \left( \frac{4x-3}{\sqrt{7}} \right) \right]_{1/2}^2 α = 8 π ∫ 1/2 2 ( x − 3/4 ) 2 + 7/16 1 d x = 8 π [ 7 4 tan − 1 ( 7 4 x − 3 ) ] 1/2 2
α = π 2 7 [ tan − 1 ( 5 / 7 ) − tan − 1 ( − 1 / 7 ) ] = π 2 7 tan − 1 ( 6 / 7 1 − 5 / 7 ) = π 2 7 tan − 1 ( 3 7 ) \alpha = \frac{\pi}{2\sqrt{7}} [ \tan^{-1}(5/\sqrt{7}) - \tan^{-1}(-1/\sqrt{7}) ] = \frac{\pi}{2\sqrt{7}} \tan^{-1} \left( \frac{6/\sqrt{7}}{1-5/7} \right) = \frac{\pi}{2\sqrt{7}} \tan^{-1}(3\sqrt{7}) α = 2 7 π [ tan − 1 ( 5/ 7 ) − tan − 1 ( − 1/ 7 )] = 2 7 π tan − 1 ( 1 − 5/7 6/ 7 ) = 2 7 π tan − 1 ( 3 7 )
Then 2 α 7 π = tan − 1 ( 3 7 ) \frac{2\alpha\sqrt{7}}{\pi} = \tan^{-1}(3\sqrt{7}) π 2 α 7 = tan − 1 ( 3 7 )
so tan ( 2 α 7 π ) = 3 7 \tan \left( \frac{2\alpha \sqrt{7}}{\pi} \right) = 3\sqrt{7} tan ( π 2 α 7 ) = 3 7
7 tan ( 2 α 7 π ) = 7 ( 3 7 ) = 21 \sqrt{7} \tan \left( \frac{2\alpha \sqrt{7}}{\pi} \right) = \sqrt{7}(3\sqrt{7}) = 21 7 tan ( π 2 α 7 ) = 7 ( 3 7 ) = 21