The goal here is to reconstruct the 2 displayed pieces of this table using 2 surface equations (with domain restrictions) within GeoGebra Augmented Reality. [br][br][b]Modeling Clues: [br][br][/b]1) For the [b][color=#1e84cc]blue surface[/color][/b], the radius of the top circle (parallel to the plane z = 0) is 2. [br][br]2) If more of the [b][color=#1e84cc]blue surface[/color][/b] could be shown, you would see its apex at (0,0,10). [br][br]3) The intersection of the [b][color=#1e84cc]blue surface[/color][/b] with the plane z = 0 is a circle with radius 2.5. [br][br]4) The intersection of the [b][color=#ff00ff]pink surface[/color][/b] and the plane x = 0 is a pair of intersecting lines that cross[br] at (0,0,1). For these two lines, [math]\left|\frac{\bigtriangleup z}{\bigtriangleup y}\right|=0.5[/math]. [br][br]5) For the [b][color=#ff00ff]pink surface[/color][/b], the radius of the LARGE opening at the top =[math]\sqrt{30}[/math]. [br][br]