How do I find two-sided limits?

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Answer 1 · 2016-05-01T12:22:20

For 2-sided limits about x = a, approach 'a' through higher and lower values, respectively.

For example,

as $x rarr0$ through positive values $csc x to +oo$ .

It $to-oo$ , for approach through negative values.

See graph, close to y-axis, in both directions. respectively, in the

1st and 3rd quadrants.

graph{y-1/sin x = 0[-10 10 -10 10] }

Definitions:

Limit through lower values is

lim h $rarr$ 0 of f(a-h).

Limit through higher values is

lim h $rarr$ 0 of f(a+h).

Here, f(x) = 1 / sin x and

a = 0 and h = x.

Now, consider lim $x rarr$ 0_ of 1/sin x

For any x < 0 and close to 0, sin x is negative.

So, the limit is 1 / 0_, where 0_ means $rarr 0$ through negative

values. And so, the limit $-oo$ .

Likewise, the right limit is $+oo$ .

Here, the side limits $+- oo$ and f(0) do not exist.

Another vivid example is $lim rarr 0$ of $( abs x)/x$ .

See the graph below. Observe that f(0) is indeterminate.

Here, the side limits are obviously $+-$ 1 and and f(0) does not

exist.

graph{(abs x)/x}