that is a piecewise continuous.

It's defined over several intervals here

for x being,

or for zero less than x,

and being less than or equal to two.

F of x is natural log of x.

For any x's larger than two, well then,

f of x is going to be x squared

times the natural log of x.

And what we wanna do is

we wanna find the limit of f of x

as x approaches two.

Now, what's interesting about the value two

is that that's essentially the boundary between

these two intervals.

If we wanted to evaluate it at two,

we would fall into this first interval.

F of two, well, two is less than or equal to two,

and it's greater than zero.

So f of two would be pretty straightforward.

That would just be natural log of two.

But that's not necessarily what the limit is going to be.

To figure out what the limit is going to be,

we should think about, well,

what's the limit as we approach from the left,

what's the limit as we approach from the right,

and do those exist, and if they do exist,

are they the same thing,

and if they are the same thing, well then,

we have a well-defined limit.

So let's do that.

Let's first think about the limit.

The limit of f of x as we approach two

from the left, from values lower than two.

Well, this is gonna be the case

where we're gonna be operating in this interval

right over here.

We're operating from values less than two,

and we're going to be approaching two

from the left.

And so we'll fall under this clause,

and so, since this clause or case

is continuous over the interval

in which we're operating,

and for sure between, or for all values greater than zero

and less than or equal to two,

this limit is going to be equal to

just this clause evaluated at two,

because it's continuous over the interval.

So this is just going to be the natural log of two.

All right, so now let's think about the limit

from the right hand side,

from values greater than two.

So the limit of f of x

as x approaches two from the right hand side.

Well, even though two falls into this clause,

as soon as we go anything greater than two,

we fall in this clause.

So we're gonna be approaching two

essentially using this case.

And once again, this case here

is continuous for all x values

not only greater than two,

actually, you know, greater than or equal to two.

And so, for this one over here,

we can make the same argument that this limit

is going to be this clause evaluated at two,

because once again, if we just evaluated

the function at two, it falls under this clause,

but if we're approaching from the right,

if we're approaching from the right,

those are x values greater than two,

so this clause is what's at play.

So we'll evaluate this clause at two.

So, because it is continuous.

So this is going to be two squared

times the natural log of two.

And so this is equal to four

times the natural log of two.

Four times the natural log of two.

So, the right hand limit does exist.

The left hand limit does exist.

But the thing that might jump out at you

is that these are two different values.

We approach a different value from the left

as we do from the right.

If you were to graph this,

you would see a jump in the actual graph.

You would see a discontinuity occurring there.

And so for this one in particular,

you have that jump discontinuity,

this limit would not exist

because the left hand limit and the right hand limit

go to two different values.

So this does not exist.