This section assumes that you know how to solve polynomial inequalities analytically.
A rational function is a quotient of two polynomials. Let's look at
the inequality
The crucial question we have to answer to solve our inequality is: Where can the function f(x) change its sign?
As in the case of polynomials, f(x) can change its sign, where f(x)=0. (In our case this happens when x=0.) Note that f(x)=0 exactly if the numerator of f(x) equals 0.
But as you can see, the function f(x) also changes its sign rather dramatically at x=1. What happens at x=1? The denominator of f(x) equals 0 at x=1. In particular, f(1) is undefined, since one cannot divide by 0. In almost all cases, this means that the graph of f(x) has a vertical asymptote at points where the denominator is equal to 0. At a vertical asymptote the sign of f(x) might change, from "" to "", or vice versa.
This suggests the following method to solve rational inequalities:
Step 1. Find all points x where the numerator of f(x) equals 0, and find all points x where the denominator of f(x) equals 0. Draw a picture of the x-axis and mark these points. (I will indicate the points where the numerator is 0 by yellow dots, and the points where the denominator equals 0 by green dots. Your teacher might call this collection the critical points of the inequality.
Step 2. The rest of the procedure is more or less identical to the one we used for polynomial inequalities. Our critical points partition the x-axis into three intervals. Pick a point (your choice!) in each interval. Let me take x=-1, x=1/2 and x=2. Compute f(x) for these points:
These three points are representative for what happens in the intervals they are contained in:
Since f(-1)>0, f(x) will be positive for all x in the interval . Similarly, since f(1/2)<0, f(x) will be negative for all x in the interval (0,1). Since f(2)>0, f(x) will be positive for all x in the interval . You can indicate this on the x-axis by inserting plus or minus signs on the x-axis. I use color coding instead: blue for positive, red for negative:
Step 3.
We want to solve the inequality
Warning!
I know that mathematicians make everything complicated, but the shortcut you might think of leads to incorrect answers. We wanted to solve the inequality
Here is another example: Find the solutions of the inequality
Step 1. The numerator equals 0, when x=-3 and when x=3. The denominator equals 0, when x=-1 and when x=1. Draw a picture of the x-axis and mark these points. I will indicate the points where the numerator is 0 by yellow dots, and the points where the denominator equals 0 by green dots.
Step 2. Our critical points partition the x-axis into five intervals. Pick a point (your choice!) in each interval. Let me take ,
and x=0. Compute f(x) for these points:
These five points are representative for what happens in the intervals they are contained in:
Since f(-4)>0, f(x) will be positive for all x in the interval . Similarly, since f(-2)<0, f(x) will be negative for all x in the interval (-3,-1). Since f(0)>0, f(x) will be positive for all x in the interval (-1,1). Since f(2)<0, f(x) will be negative for all x in the interval (1,3). Since f(4)>0, f(x) will be positive for all x in the interval . You can indicate this on the x-axis by inserting plus or minus signs on the x-axis. I use color coding instead: blue for positive, red for negative:
Step 3.
We want to solve the inequality
(Did you notice that our function on the left side of the inequality is an even function? Consequently, the set of solutions will be symmetric with respect to x=0.)
Here is our next example: Find the solutions of the inequality
For our method to work it is essential that one side of the inequality equals zero! So let's change our inequality to
Step 1. I already factored the numerator to make it easy to see that the numerator will be 0, when x=-3 and when x=2. The denominator vanishes at x=-2. Draw a picture of the x-axis and mark these points. I will indicate the points where the numerator is 0 by yellow dots, and the points where the denominator equals 0 by green dots.
Step 2. Our critical points partition the x-axis into four intervals. Pick a point (your choice!) in each interval. Let me take x=- 4, x=-2.5, x=0 and x=3. Compute
These points are representative for what happens in the intervals they are contained in:
Since f(-4)<0, f(x) will be negative for all x in the interval . Similarly, since f(-2.5)>0, f(x) will be positive for all x in the interval (-3,-2). Since f(0)<0, f(x) will be negative for all x in the interval (-2,2). Since f(3)>0, f(x) will be positive for all x in the interval . You can indicate this on the x-axis by inserting plus or minus signs on the x-axis. I use color coding instead: blue for positive, red for negative:
Step 3.
We want to solve the inequality
Time for you to try it yourself:
1998-06-16