Which trigonometric function requires a domain restriction of [-pi/2, pi/2] to make it invertable?

Question

asked Dec 9, 2020 198k views

2 Answers

Bes Ley · Answer 1 · 2020-12-13T14:05:32+0000

Answer:

$y=\tan x$

Explanation:

The trigonometric function that needs a domain restriction of
$[-(\pi)/(2),(\pi)/(2) ]$ to make it invertible is
$y=\tan x$ .

The function
$y=\tan x$ will pass the horizontal line test on this interval therefore making it an invertible function on this interval.

This explains why the inverse tangent function,
$y=\tan^(-1) x$ has range
$[-(\pi)/(2),(\pi)/(2) ]$ .