Calculus:Limits

${\displaystyle \lim _{x\to a}f(x)=L,}$

When you see this equation it means you are trying to let "x" approach "a".

You may have a question, "why can't we just write it as ${\displaystyle f(a)=L}$?"

Sometimes we can't tell what F(a) equals.

example 1

${\displaystyle \lim _{x\to a}f(x)={x^{2}-1 \over x-1}}$

But if a = 1 then you will get

${\displaystyle ({1^{2}-1 \over 1-1})^{2}=({0 \over 0})^{2}}$

Denominator can't be 0 so it is undefined at that point.

But in the graph if a = 1 it looks like it is than f(x) = 4

So the logic of the limit is approaching to not equal to. (what's the difference?)

it will be like this:

When we say x=1 then x is one.

But if we say ${\displaystyle x\to 1}$ then it could be 1.00000....0001 or 9.9999....999, x will not be 1 it will just be close to one.

When looking at the graph, you will see h is mean Δx the rate of change of x most of the time we will like h or dx approaches to 0.