Axl.com/math/algebra-1/checkpoint-modeling-with-linear-equations-and-inequalities?lmsplatform=1 English paper takes \( \frac{1}{4} \) of an hour to grade, and each math test takes \( \frac{1}{6} \) of an hour to grade. The teacher wants to spend over 3 hours but under 6 hours on grading this weekend. 4)) Graph a system of inequalities that represents this story. One inequality should represent the minimum number of hours the teacher wants to spend grading, and the other inequality should represent the maximum number of hours she wants to spend grading, \( \begin{array}{l}\text { ()) Select a line to change it between solid and dotted. Select a region to shade it. } \\ \text { 4)) Grading over the weekend }\end{array} \)

To model this scenario, let's define \( x \) as the number of English papers and \( y \) as the number of math tests graded. The time taken for grading can be expressed with the inequalities \( \frac{1}{4}x + \frac{1}{6}y > 3 \) (for the minimum) and \( \frac{1}{4}x + \frac{1}{6}y < 6 \) (for the maximum). Now, to graph this system of inequalities, first convert the equations to a standard form. Multiply through by 12 to eliminate the fractions: 1. For the minimum: \( 3x + 2y > 36 \) 2. For the maximum: \( 3x + 2y < 72 \) This gives you two boundary lines to graph. The line for the minimum will be solid (include the boundary) while for the maximum you will use a dotted line (not include the boundary). Make sure to shade the appropriate regions (above for the minimum and below for the maximum) to represent the grading time constraints! To avoid confusion, be sure to label your axes and indicate the areas clearly. Happy graphing!