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When you graph some mathematical functions, you will see that the resultant curve avoids certain invisible lines in the graph. No matter what, you can’t get the graph to cross those lines. Let me show you what it looks like.
A graph with vertical asymptotes.
General form of a rational function.
Here are some examples of rational functions.
All of the above are fractions where both the numerator and denominator are polynomials. Because of this, this type of function makes it easy for you to find the vertical asymptotes.
Determining Vertical Asymptotes
To determine the vertical asymptotes of a rational function, all you need to do is to set the denominator equal to zero and solve. Vertical asymptotes occur where the denominator is zero. Remember, division by zero is a no-no. Because you can’t have division by zero, the resultant graph thus avoids those areas.Let’s go back to our first function and see if we can find the vertical asymptotes.
Find the vertical asymptotes.
To find the vertical asymptotes, you need to set the denominator equal to zero and solve. Let’s see what we get when we do that. We would use factoring to solve.
Solving the denominator for zero.
We have found that our zeroes for our denominator are -3 and -7. Now, look at the graph to see if that is where my vertical asymptotes are. Yep, looks like it. The graph avoids the lines at x=-3 and x=-7.There is one circumstance where a zero in the denominator does not produce a vertical asymptote.
This is when you have the same zero in the numerator. So, what this means is that you would want to solve both the numerator and denominator for zero. If they have an answer in common, then that number is not a vertical asymptote. Let’s see what that looks like. The following function has already been factored, so you can easily see your zeroes.
A function with a cancelled asymptote.
Looking at this function, we see that the vertical asymptotes are -3, -1, and -2 from solving the denominator for zero. But, solving the numerator for zero, we see that the numerator has zeroes of -3 and 4. They both have a -3, so that means the vertical asymptote at -3 is canceled by the -3 zero in the numerator. So, my actual asymptotes are only x=-1 and x=-2.
To recap, a vertical asymptote is an invisible line which the graph never touches.
The graph will approach this line, but it won’t dare touch or cross it. The graph can approach this asymptote from either direction – or both. To find the asymptote of rational functions, you solve the denominator for zero. All the zeroes of the denominator are vertical asymptotes, except in the case where the same zero occurs in the numerator.