What is the antiderivative of $(1)/(1+x^2)$ ?

Question

61612 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2016-01-23T01:25:58

The antiderivative of $1/(1+x^2)$ is the integral

$int 1/(1+x^2)dx$ which is equivalent to

$int 1/(1+x^2)dx=arctanx+C$

where $arctanx$ is the inverse of the trigonometric function

$tanx$ and C is the integration constant.

Answer 2 · 2018-02-03T11:05:05

$= arctan(x) + c$

Let

$color(blue)(x = tantheta$

$=> color(red)(dx = sec^2 theta d theta) " By the use of the quotient rule..."$

$int 1/(1+color(blue)(x)^2 ) color(red)(dx) = int 1/(1+color(blue)((tantheta))^2 ) * color(red)(sec^2 theta d theta$

We know $sin^2 x + cos^2 x -= 1$

$=> sin^2 x / cos^2 x + cos^2x/cos^2x -= 1/cos^2 x$

$=> tan^2x + 1 -= sec^2 x$

$=> int sec^2 theta / sec^2 theta d theta$

$=> int 1 d theta$

$=> theta + c$

If $x = tan theta => arctanx = theta$

Substitute back in...

$color(blue)( arctan(x ) + c$

What is the antiderivative of (1)/(1+x^2)(1)/(1+x^2)?