How to solve this integral? int (sec^2(x))/((4+tan^2(x))^2)dx

Frankie Burnett

Frankie Burnett

Answered question

2022-11-04

Evaluating sec 2 ( x ) ( 4 + tan 2 ( x ) ) 2 d x

Answer & Explanation

reinmelk3iu

reinmelk3iu

Beginner2022-11-05Added 21 answers

If you want to check your answer, just differentiate and see if you get back the function you started from.
But there's a much simpler method. I'd simply observe that with the substitution tan x = 2 u, the integral becomes
1 8 1 ( 1 + u 2 ) 2 d u
which is standard. Leaving aside the factor 1/8, we can write
1 + u 2 u 2 ( 1 + u 2 ) 2 d u = 1 1 + u 2 d u + 1 2 u 2 u ( 1 + u ) 2 d u = arctan u + 1 2 u 1 + u 2 1 2 1 1 + u 2 d u
and therefore
1 2 arctan u + 1 2 u 1 + u 2 + c
Now reinsert the factor 1 / 8 and do back substitution to get
1 16 ( arctan ( tan x 2 ) + 2 tan x 4 + tan 2 x ) + c
bucstar11n0h

bucstar11n0h

Beginner2022-11-06Added 7 answers

You can use the noble method known as Ostrogradski method:
Assume you are at the step evaluating 1 ( 1 + u 2 ) 2 d u. According to this method, it
1 ( 1 + u 2 ) 2 d u = a u + b 1 + u 2 + c u + d 1 + u 2 d u
Now apply the method to find the constants a,b,c and d.

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