Number Discussion Problems 2.1 6, 10, 14 2.3 36 - 42 (even) 2.4 18, 22, 26, 30, 34, 38, 42, 46, 50 *include the graph 2.5 18 - 46 (even) 3.1 14 - 38 (even) 3.2 2, 8, 12, 28, 30 Linear Modeling Applications Linear Modeling Applications.docx Solve each compound inequality, graph its solution, and give interval notation. Sample: Inequalities - Compound Inequalities Objective: Solve, graph and give interval notation to the solution of compound inequalities. Several inequalities can be combined together to form what are called compound inequalities. There are three types of compound inequalities which we will investigate in this lesson. The rst type of a compound inequality is an OR inequality. For this type of inequality we want a true statment from either one inequality OR the other inequality OR both. When we are graphing these type of inequalities we will graph each individual inequality above the number line, then move them both down together onto the actual number line for our graph that combines them together. When we give interval notation for our solution, if there are two dierent parts to the graph we will put a (union) symbol between two sets of interval notation, one for each part. Example 157. Solve each inequality, graph the solution, and give interval notation of solution 2x5>3 or 4x>6 Solveeachinequality +5+5 4 4 Addorsubtractrst 2x>8 or x>2 Divide 2 2 1 1 Dividingbynegativeipssign x>4 or x62 Graphtheinequalitiesseparatlyabovenumberline (,2](4,) IntervalNotation World View Note: The symbol for innity was rst used by the Romans, although at the time the number was used for 1000. The greeks also used the symbol for 10,000. There are several dierent results that could result from an OR statement. The graphs could be pointing dierent directions, as in the graph above, or pointing in the same direction as in the graph below on the left, or pointing opposite directions, but overlapping as in the graph below on the right. Notice how interval notation works for each of these cases. 124 As the graphs overlap, we take the largest graph for our solution. Interval Notation: (,1) When the graphs are combined they cover the entire number line. Interval Notation: (,)orR The second type of compound inequality is an AND inequality. AND inequalities require both statements to be true. If one is false, they both are false. When we graph these inequalities we can follow a similar process, rst graph both inequalities above the number line, but this time only where they overlap will be drawn onto the number line for our nal graph. When our solution is given in interval notation it will be expressed in a manner very similar to single inequalities (there is a symbol that can be used for AND, the intersection - , but we will not use it here). Example 158. Solve each inequality, graph the solution, and express it interval notation. 2x+8>5x7 and 5x3>3x+1 Movevariablestooneside 2x 2x 3x 3x 8>3x7 and 2x3>1 Add7or3tobothsides +7 +7 +3+3 15>3x and 2x>4 Divide 3 3 2 2 5>x and x>2 Graph, x is smaller (or equal) than 5, greaterthan2 (2,5] IntervalNotation Again, as we graph AND inequalities, only the overlapping parts of the individual graphs makes it to the nal number line. As we graph AND inequalities there are also three dierent types of results we could get. The rst is shown in the above 125 example. The second is if the arrows both point the same way, this is shown below on the left. The third is if the arrows point opposite ways but don't overlap, this is shown below on the right. Notice how interval notation is expressed in each case. In this graph, the overlap is only the smaller graph, so this is what makes it to the nal number line. Interval Notation: (,2) In this graph there is no overlap of the parts. Because their is no overlap, no values make it to the nal number line. Interval Notation: No Solution or The third type of compound inequality is a special type of AND inequality. When our variable (or expression containing the variable) is between two numbers, we can write it as a single math sentence with three parts, such as 5 < x 6 8, to show x is between 5 and 8 (or equal to 8). When solving these type of inequalities, because there are three parts to work with, to stay balanced we will do the same thing to all three parts (rather than just both sides) to isolate the variable in the middle. The graph then is simply the values between the numbers with appropriate brackets on the ends. Example 159. Solve the inequality, graph the solution, and give interval notation. 664x+2<2 subtract2fromallthreeparts 2 22 864x<0 divideallthreepartsby4 4 dividingbyanegativeipsthesymbols>x>0 Flipentirestatementsovaluesgetlargerlefttoright 02a+1or10a10>9a+9