One-sided limit
approaches a specified point either from the left or from the right.
decreases in value approaching
increases in value approaching
is sometimes called a "two-sided limit".
[citation needed] It is possible for exactly one of the two one-sided limits to exist (while the other does not exist).
It is also possible for neither of the two one-sided limits to exist.
represents some interval that is contained in the domain of
can be rigorously defined as the value
that satisfies:[6][verification needed]
can be rigorously defined as the value
We can represent the same thing more symbolically, as follows.
In comparison to the formal definition for the limit of a function at a point, the one-sided limit (as the name would suggest) only deals with input values to one side of the approached input value.
For reference, the formal definition for the limit of a function at a point is as follows: To define a one-sided limit, we must modify this inequality.
Note that the absolute distance between
We want to bound this distance by our value of
Similarly, for the limit from the left, we want
that is positive and represents the distance between
Again, we want to bound this distance by our value of
, leading to the compound inequality
is in its desired interval, we expect that the value of
In both cases, we want to bound this distance by
for the left sided limit, and
Example 2: One example of a function with different one-sided limits is
picture) where the limit from the left is
To calculate these limits, first show that
because the denominator diverges to infinity; that is, because
The one-sided limit to a point
corresponds to the general definition of limit, with the domain of the function restricted to one side, by either allowing that the function domain is a subset of the topological space, or by considering a one-sided subspace, including
[1][verification needed] Alternatively, one may consider the domain with a half-open interval topology.
[citation needed] A noteworthy theorem treating one-sided limits of certain power series at the boundaries of their intervals of convergence is Abel's theorem.
