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Let's substitute the values of \(p\) into the given equation \(y^2 = 4px\) to create 6 parabola equations: \(p = -5: y^2 = -20x\) \(p = -2: y^2 = -8x\) \(p = -1: y^2 = -4x\) \(p = 1: y^2 = 4x\) \(p = 2: y^2 = 8x\) \(p = 5: y^2 = 20x\)

Use a graphing utility, such as a graphing calculator or an online graphing tool, to plot each parabola equation on the same set of axes. Be sure to label each parabola with the corresponding values of \(p\) for clarity.

Observe how the shape of the parabolas change as \(p\) changes. Here are some notable characteristics: 1. For positive values of \(p\), the parabolas open towards the right. Conversely, for negative values of \(p\), the parabolas open towards the left. 2. For all values of \(p\), the parabolas' vertex is at the origin (0,0). 3. Parabolas with larger magnitudes of \(p\) will stretch more in the vertical direction, making them appear taller and narrower. Parabolas with smaller magnitudes of \(p\) will stretch less in the vertical direction, making them appear shorter and wider. 4. The value of \(p\) is related to the focal distance of the parabola. The focal distance \(|p|\) is the distance from the vertex to the focus, and it controls the sharpness or "flatness" of the curve. By analyzing the relationship between the values of \(p\) and the shapes of the curves, it is evident that the value of \(p\) has a significant impact on the appearance and orientation of the parabolas.