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SOME GRAPHICAL EXAMPLES:
On the previous page, we saw what happened
to the sequence whose nth term is given by 1/n as n approaches infinity...
The terms 1/n approached 0.
Now, let's look at the graph of f(x)=1/x and
see what happens!
The x-axis is a horizontal asymptote...
Let's look at the blue arrow first. As x gets really, really big, the
graph gets closer and closer to the x-axis which has a height of 0. So, as
x approaches infinity, f(x) is approaching 0. This is called a limit at
infinity.
Now let's look at the green arrow...
What is happening to the graph as x gets really, really small? Yep, the
graph is again getting closer and closer to the x-axis (which is 0.) It's
just coming in from below this time.
But what happens as x approaches
0?
Since different things happen, we need to
look at two separate cases: what happens as x approaches 0 from the left
and at what happens as x approaches 0 from the
right:
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and |
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Since the limit from the left does
not equal the limit from the right...
Continued on the
next
page
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