Amy is helping plan her school's new basketball court. The west edge of the basketball court is located on the line \( y=-4 x \). The east edge cannot intersect with the west edge. On which line could the east edge be located? \( \begin{array}{l}y-4 x=-200 \\ -4 x-y=-50 \\ 4 x-y=-200 \\ -y+4 x=-50\end{array} \) \begin{tabular}{l} \\ \hline\end{tabular}

To keep the east edge of the basketball court from intersecting the line \( y = -4x \) (which represents the west edge), it must have a different slope. The slope of the west edge is -4; therefore, the east edge should have a slope that is not equal to -4. Let's analyze the provided line equations. The relevant line that could represent the east edge must either be parallel (same slope) or have a different slope than -4: 1. The equation \( y - 4x = -200 \) rearranges to \( y = 4x - 200 \), which has a slope of 4. This works because the slopes are different. 2. The equation \( -4x - y = -50 \) becomes \( y = -4x + 50 \), maintaining a slope of -4, which is not acceptable as it could intersect. 3. The equation \( 4x - y = -200 \) rearranges to \( y = 4x + 200 \), which again has a slope of 4, making this suitable for use. 4. The equation \( -y + 4x = -50 \) becomes \( y = 4x + 50 \), also yielding a slope of 4. Thus, the possible lines for the east edge of the court are: 1. \( y - 4x = -200 \) (Slope 4) 2. \( 4x - y = -200 \) (Slope 4) Both options are parallel to the west edge, ensuring they do not intersect.