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Section 2.13 : Rational Inequalities

4. Solve the following inequality.

\[\frac{{3x + 8}}{{x - 1}} < - 2\]

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Start Solution

The first thing we need to do is get a zero on one side of the inequality and then, if possible, factor the numerator and denominator as much as possible.

So, we first need to add 2 to both sides to get,

\[\frac{{3x + 8}}{{x - 1}} + 2 < 0\]

We now need to combine the two terms in to a single rational expression.

\[\begin{align*}\frac{{3x + 8}}{{x - 1}} + \frac{{2\left( {x - 1} \right)}}{{x - 1}} & < 0\\ \frac{{3x + 8 + 2x - 2}}{{x - 1}} & < 0\\ \frac{{5x + 6}}{{x - 1}} & < 0\end{align*}\]

At this point we can also see that factoring will not be needed for this problem.

Hint : Where are the only places where the rational expression might change signs?
Show Step 2

Recall from the discussion in the notes for this section that the rational expression can only change sign where the numerator is zero and/or where the denominator is zero.

We can see that the numerator will be zero at,

\[x = - \frac{6}{5}\]

and the denominator will be zero at,

\[x = 1\]
Hint : Knowing that the rational expression can only change sign at the points above how can we quickly determine if the rational expression is positive or negative in the ranges between those points?
Show Step 3

Just as we did with polynomial inequalities all we need to do is check the rational expression at test points in each region between the points from the previous step. The rational expression will have the same sign as the sign at the test point since it can only change sign at those points.

Here is a sketch of a number line with the points from the previous step graphed on it. We’ll also show the test point computations on the number line as well. Here is the number line.

Show Step 4

All we need to do now is get the solution from the number line in the previous step. Here is both the inequality and interval notation from of the answer.

\[\require{bbox} \bbox[2pt,border:1px solid black]{\begin{array}{c} \displaystyle - \frac{6}{5} < x < 1\\ \displaystyle \left( { - \frac{6}{5},1} \right)\end{array}}\]