1 4 Continuity and One sided Limits Calculus of a Single Variable
When crossing the street, you look to the left and right to ensure there are no problems before walking across. When finding the limits of the function, you do the same thing, look to the left and right!
One-Sided Limits in Calculus
Generally, we call these the limit from the left or the limit from the right because you are specifically looking to the left or right of a specific point.
For a review of the definition of the limit of a function, see Limits of a Function.
Definition of One-sided Limits
How can we formally define "one-sided limits" in calculus? Let's have a look!
This is also called the limit from the left of a function. You can also look at the limit from the right of a function.
The nice thing is that if the limit of the function exists, then both the limit from the left and right exist and are the same.
Each of the results below follow from just the definition of the limit, the left limit, and the right limit. They are an immediate consequence of the definitions and so don't require a fancy proof.
1. Suppose that
where 
is a real number. Then
and 
.
2. Similarly, if
then
.
Note this gives you a handy way to tell if the limit doesn't exist, just by using the contrapositive of part 2.
3. If
then
does not exist.
You can read 
as "
approaching 
from the right", and 
as "
approaching 
from the left".
Finding One-Sided Limits
So how do you figure out what a function's left or right limit is? You can determine one-sided limits by looking at:
-
The graph of a function, OR
-
A table of function values
So let's look at a specific example.
Using the function
,
find
and 
.
What does this tell you about
?
Answer:
First, let's look at the limit from the left. In the graph below, you can see the function, a table of function values that are getting closer to 
from the left-hand side, and the points in the table plotted on the graph.
Limit from the left using a graph and table | StudySmarter Original
As you can see from the graph above, as 
, all of the function values are equal to 
. Therefore
.
Now instead, let's look at the limit from the right. In the graph below, you can see the function, a table of function values that are getting closer to 
from the right-hand side, and the points in the table plotted on the graph.
Limit of a function from the right using a graph and table | StudySmarter Original
As you can see from the graph above, as 
, all of the function values are equal to 
. Therefore
.
Finally, since you know that
,
you also know that
does not exist.
Examples of One-Sided Limits
Let's look at more examples of determining one-sided limits.
Consider the function
.
Find the limits from the left and right of 
.
Answer:
Rather than thinking about this function as one with an absolute value, it can help to think about possible values for 
. Let's look at the 3 possible cases here:
- When
, this function is not defined. - When
is negative, 
. - When
is positive, 
.
So you can instead think of this as the piecewise-defined function:
.
This is very similar to the previous example. In fact
and 
For the function in the picture below, determine the following (if it exists):
1. 
, 
, and 
2. the limit from the left at 
, 
, 
, and 
3. the limit from the right at , , , and
4. the limit at , , , and
Finding One-Sided limits from a graph | StudySmarter Original
Answer:
1. This part is just looking for the function values at these points. So looking at the graph, 
, 
, and 
.
2. Remember that when you are finding the limit from the left, you only look at points on the graph that are to the left of the point you care about. So using the graph,
, 
, 
, and 
.
3. When you are finding the limit from the right, you only look at points on the graph that are to the right of the point you care about. So using the graph,
, 
, 
, and 
.
4. The limit will exist only in cases where the limit from the left and the limit from the right are the same. Otherwise, the limit doesn't exist. Looking at the information in parts 2 and 3 above, that means that the limit exists at 
and at 
. You can also say that
and that 
.
Notice that the fact that the limit exists is independent of the actual function value at the point, or even if the function is defined there.
In addition, the limit does not exist at 
and 
.
One-Sided Limits and Vertical Asymptotes
One question that still needs to be answered. How do we evaluate the left and right limits of a function at a vertical asymptote? The process for finding the limits from the left and right when there is a vertical asymptote is exactly the same as at any other point. Let's look at an example.
Consider the function
.
Find
and 
.
Answer:
First, let's think about the limit from the left. Look at the graph and table below.
Limit from the left at a vertical asymptote | StudySmarter Original
As you can see from both the graph and table, as you take 
values that get closer and closer to 
from the left, the function values become further and further away from the 
axis, and are all negative. So you would say that in fact there is no number that is the limit from the left. When this happens you can say that "the limit from the left diverges to negative infinity", and write it as
.
This may seem odd given that limits usually have to be numbers, but the notation is just saying that the function values to the left at zero, but close to zero, can be as large a negative value as you want them to be.
When we say the limit equals 
, it is just another way of saying the limit does not exist, just being a bit more specific!
Now let's think about the limit from the right. Look at a graph and table below.
The limit from the right of a vertical asymptote | StudySmarter Original
As you can see from both the graph and table, as you take values that get closer and closer to from the right, the function values become further and further away from the axis, and are all positive. So you would say that in fact there is no number that is the limit from the right. When this happens you can say that "the limit from the right diverges to infinity", and write it as
.
This may seem odd given that limits usually have to be numbers, but the notation is just saying that the function values to the left at zero, but close to zero, can be as large a positive number as you want them to be.
If instead of vertical asymptotes you are interested in the limit as 
, also known as limits at infinity, see Infinite Limits
There may be cases where the limit from one side exists, but does not exist from the other side. We see this in the example below.
For the function in the graph below, find
and 
.
Limit from one side exists but limit from other side doesn't | StudySmarter Original
From the picture above, we see that to the left of 
the function values get closer and closer to 
as 
. That means
.
However, if you look at values to the right of 
, the function values get larger and larger as 
. That means
.
Looking at the examples above, you can draw some helpful conclusions:
1. If
or if 
then the function has a vertical asymptote at 
.
2. If the function has a vertical asymptote at 
then either
or 
.
One-Sided Limits - Key takeaways
Source: https://www.studysmarter.co.uk/explanations/math/calculus/one-sided-limits/
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