Solve int(tan^3 x+tan^4 x)dx using substitution t=tan x

Cortez Clarke

Cortez Clarke

Answered question

2022-11-16

Evaluating ( tan 3 x + tan 4 x ) d x using substitution t = tan x

Answer & Explanation

x713x9o7r

x713x9o7r

Beginner2022-11-17Added 15 answers

Let's wrap it up. Let t = t a n x, so d t = s e c 2 x d x = ( 1 + t a n 2 x ) d x = ( 1 + t 2 ) d x, and d x = d t 1 + t 2 . So I = t 3 + t 4 1 + t 2 d t = ( t t 1 + t 2 + t 2 1 + 1 1 + t 2 ) d t = t 3 3 + t 2 2 t l n ( 1 + t 2 ) 2 + t a n 1 t + C = t a n 3 x 3 + t a n 2 x 2 t a n x l n | s e c x | + x + C
Tiffany Page

Tiffany Page

Beginner2022-11-18Added 3 answers

If you feel unconfortable with sec you may proceed from your last integral
I = ( 1 + t ) t sin 2 ( arctan t ) d t
by using the following trigonometric identity
sin 2 x = tan 2 x 1 + tan 2 x , x = arctan t ,
which you can derive from the fundamental identity sin 2 x + cos 2 x = 1 to obtain
sin 2 ( arctan t ) = t 2 1 + t 2 .
Consequently
I = ( 1 + t ) t t 2 1 + t 2 d t = t 3 + t 4 1 + t 2 d t ,
which is integrable by partial fractions. By long division we compute
t 4 + t 3 1 + t 2 = t 2 + t 1 + t + 1 1 + t 2 .
So
I = ( t 2 + t 1 ) d t + t + 1 1 + t 2 d t .
Since
t + 1 1 + t 2 d t = 1 2 2 t 1 + t 2 d t + 1 1 + t 2 d t = 1 2 ln ( 1 + t 2 ) + arctan t + C ,
we thus have
I = 1 3 t 3 + 1 2 t 2 t 1 2 ln ( 1 + t 2 ) + arctan t + C = 1 3 tan 3 x + 1 2 tan 2 x tan x 1 2 ln ( 1 + tan 2 x ) + x + C .

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