Solve the following system of linear inequalities by graphing. 3x + 4y < 12 x + 3y < 6 x > 0 y > 0 First get the equations of the boundary lines. These are lines whose equations are found by replace the inequality sumbols in the inequalities by equal signs. The boundary lines have these equations: 3x + 4y = 12 has intercepts (4,0) and (0,3) x + 3y = 6 has intercepts (6,0) and (0,2) x = 0 the y-axis y = 0 the x-axis The last two inequalities x > 0 and y > 0 restrict the graphing to the upper right hand quadrant, above the x-axis and to the right of the y-axis. Plot the intercepts and draw a DOTTED line through them. I can draw only a solid line here, but you can draw a dotted one on your paper. You would draw a solid line if the inequality symbol were " < " or " >." But you draw a dotted line whenver the symbol is " < " or " > "Substitute the origin (x,y) = (0,0) in each of the inequalities. If the result is a true numerical statement, then the graph of the inequality is on the side of the boundary line that the origin (0,0) is on. If the result is a false numerical statement, the graph of the inequality is on the side of the boundary line that the origin is not on. Substituting (x,y) = (0,0) in 3x + 4y < 12 3(0) + 4(0) < 12 0 < 12 That is true, so the graph will be on the same side of the red boundary line that the origin (0,0) is on. So it will be BELOW the red line. Substituting (x,y) = (0,0) in x + 3y < 6 (0)+ 3(0) < 6 0 < 6 That is also true, so the graph will be on the same side of the green boundary line that the origin (0,0) is on. So it will be BELOW the green line. So the graph is the area which is below both the red and the green line, and also which is above the x-axis and to the right of the y-axis. It is this area: You will need to shade that area, which I can't do on here, but which you can do on your paper. You will also need to draw both the red and the green line dotted, which I also can't do here, but which you can do on your paper. The solution is this shaded area. Edwin