Question

How do you find `\lim _ { x \rightarrow ( \pi / 2)^+ } e ^ { \tan x }`?

Answer 1

`lim_( x to ( pi / 2)^+ ) e ^(tan x) = 0`

Explanation:

We know that `x = pi/2` is a singularity in the plot of `tan x`, ie that:

`lim_( x to ( pi / 2)^- ) tan x = oo`

`lim_( x to ( pi / 2)^+ ) tan x = -oo`

And, because the exponential function is continuous we can re-write the limit as:

`lim_( x to ( pi / 2)^+ ) e ^(tan x)`

`= e ^( (lim_( x to ( pi / 2)^+ ) tan x ) )`

It follows that:

`lim_( x to ( pi / 2)^+ ) e ^(tan x) = e^(-oo) = 1/e^(oo) = 0`