The rules for solving linear equations (see the section “Linear Equations: Handling the First Degree”) also work with inequalities – somewhat. Everything goes smoothly until you try to multiply or divide each side of an inequality by a negative number.
The inequality 4(x – 3) – 2> 3(2x + 1) + 7, for example, has grouping symbols that you have to deal with. Distribute the 4 and 3 through their respective multipliers to make the inequality into 4x – 12 – 2> 6x + 3 + 7. Simplify the terms on each side to get 4x – 14 > 6x + 10. Now you put your inequality skills to work. Subtract 6x from each side and add 14 to each side; the inequality becomes –2x> 24. When you divide each side by –2, you have to reverse the sense; you get the answer x< – 12. Only numbers smaller than –12 or exactly equal to –12 work in the original inequality.
You can alleviate the awkwardness of writing answers with inequality notation by using another format called interval notation. You use interval notation extensively in calculus, where you’re constantly looking at different intervals involving the same function. Much of higher mathematics uses interval notation, although I really suspect that book publishers pushed its use because it’s quicker and neater than inequality notation. Interval notation uses parentheses, brackets, commas, and the infinity symbol to bring clarity to the murky inequality waters.
✔ You order any numbers used in the notation with the smaller number to the left of the larger number.
✔ You indicate “or equal to” by using a bracket.
✔ If the solution doesn’t include the end number, you use a parenthesis.
✔ When the interval doesn’t end (it goes up to positive infinity or down to negative infinity), use +∞ or –∞, whichever is appropriate, and a parenthesis.
Here are some examples of inequality notation and the corresponding interval notation:
Notice that the second example has a bracket by the –2, because the “greater than or equal to” indicates that you include the –2 also. The same is true of the 4 in the third example. The last example shows you why interval notation can be a problem at times. Taken out of context, how do you know if (–3, 7) represents the interval containing all the numbers between –3 and 7 or if it represents the point (–3, 7) on the coordinate plane? You can’t tell. You consider the context. A problem containing such notation has to give you some sort of hint as to what it’s trying to tell you.
A compound inequality is an inequality with more than one comparison or inequality symbol – for instance, –2 < x < 5. To solve compound inequalities for the value of the variables, you use the same inequality rules (see the intro to this section), and you expand the rules to apply to each section (intervals separated by inequality symbols).
To solve the inequality
Many ancient cultures used their own symbols for mathematical operations, and the cultures that followed altered or modernized the symbols for their own use. You can see one of the first symbols used for addition in the following figure, located on the far left – a version of the Italian capital P for the word piu, meaning plus. Tartaglia, a self-taught 16th century Italian mathematician, used this symbol for addition regularly. The modern plus symbol, +, is probably a shortened form of the Latin word et, meaning and.
The second figure from the left is what Greek mathematician Diophantes liked to use in ancient Greek times for subtraction. The modern subtraction symbol, –, may be a leftover from what the traders in medieval times used to indicate differences in product weights.
Leibniz, a child prodigy from the 17th century who taught himself Latin, preferred the third symbol from the left for multiplication. One modern multiplication symbol, × or
The symbol on the far right is a somewhat backward D, used in the 18th century by French mathematician Gallimard for division. The modern division symbol,÷ , may come from a fraction line with dots added above and below.
You write the answer,
Here’s a more complicated example. You solve the problem
You write the answer,
Absolute Value: Keeping Everything in Line
When you perform an absolute value operation, you’re not performing surgery at bargain-basement prices; you’re taking a number inserted between the absolute value bars,
