How do you use substitution to integrate $(1 + 2 tan x)$ $(1+2tanx)$ ?

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How do you use substitution to integrate $(1 + 2 tan x)$ $(1+2tanx)$ ?

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Answer 1 · 2015-07-09T17:36:09

I found: $\int (1 + 2 tan (x)) d x = x - 2 ln | cos (x) | + c$ $int(1+2tan(x))dx=x-2ln|cos(x)|+c$

Explanation:

I would try this:
$\int (1 + 2 tan (x)) d x = \int (1 + 2 \frac{sin (x)}{cos (x)}) d x =$ $int(1+2tan(x))dx=int(1+2sin(x)/cos(x))dx=$
$= \int d x + 2 \int \frac{sin (x)}{cos (x)} d x =$ $=intdx+2intsin(x)/cos(x)dx=$
but: $d [cos (x)] = - sin (x) d x$ $d[cos(x)]=-sin(x)dx$ so substituting you get:
$= \int d x - 2 \int \frac{d [cos (x)]}{cos (x)} =$ $=intdx-2int(d[cos(x)])/cos(x)=$

$= x - 2 ln | cos (x) | + c$ $=x-2ln|cos(x)|+c$

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How do you use substitution to integrate $(1 + 2 tan x)$ $(1+2tanx)$ ?

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How do you use substitution to integrate (1+2tanx)(1+2tanx)?

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How do you use substitution to integrate $(1 + 2 tan x)$ $(1+2tanx)$ ?