"How to graph rational functions 2" is the question having had by almost all the students who study math in high schools.
Even though students can get this stuff on internet, they do not understand exactly what has been explained.
To make the students to understand "How to graph rational functions 2", we have explained the above mentioned stuff step by step.
Before learning "How to graph the rational functions", first you have to be knowing the following stuff.
To know more about the above mentioned stuff, please click the topics given above.
If you had already learned the above mentioned stuff, then you are ready to learn the stuff, "How to graph rational functions 2".
Now let us take an example and understand graphing rational functions.
Graph the rational function given below.
First, we have to find hole, if any.
To find hole of the rational function, we have to see whether there is any common factor found at both numerator and denominator.
In our problem, clearly there is no common factor found at both numerator and denominator.So, there is no hole.
Now, we have to find vertical asymptote, if any.
Most of the rational function will have vertical asymptote.
To find vertical asymptote, we have to make the denominator equal to zero.
When we do so, x² - 9 = 0 ====> (x+3)(x-3) = 0
x + 3 = 0 or x - 3 = 0
x = -3 or x = 3
So, the vertical asymptotes are x = -3 and x = 3
Step 3 :
Now we have to find horizontal asymptote, if any.
In the rational function given above, the highest exponent of the numerator is 1 and denominator is 2.
If the highest exponent of the numerator is less than the highest exponent of the denominator.
So, the horizontal asymptote is y = o or x-axis
Step 4 :
Now we have to find slant asymptote, if any.
Since there is horizontal asymptote, there is no slant asymptote.
Step 5 :
In the given rational function, now we have to plug some random values for "x" and find the corresponding values of "y".
We have already known that the vertical asymptotes are x = -3 and x = 3.
Now, we have to take some random values for x in the following intervals.
x<-3, -3<x<3, x>3 but not x = -3 & x = 3.
(Because, x = -3 and x = 3 are vertical asymptotes)