How do you evaluate $arctan(1)$ ?

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How do you evaluate $arctan(1)$ ?

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Answer 1 · 2016-08-13T08:30:57

$=45^@$
$=pi/4$

Explanation:

$arctan(1)$
$=tan^-1(1)$
$=45^@$
$=pi/4$

Answer 2 · 2016-08-13T08:45:11

$arctan(1) = pi/4$

Explanation:

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$theta = arctan(1)$ is the angle $theta in (-pi/2, pi/2)$ satisfying $tan(theta) = 1$

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Note that the triangle formed by bisecting a unit square diagonally is a right angled triangle with sides $1$ , $1$ , $sqrt(2)$ and angles $pi/4$ , $pi/4$ and $pi/2$ .

So we find:

$tan(pi/4) = "opposite"/"adjacent" = 1/1 = 1$

So $theta = pi/4$ satisfies $tan(theta) = 1$ and is in the required range.

$color(white)()$
So:

$arctan(1) = pi/4$

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How do you evaluate $arctan(1)$ ?

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