To make the cards coplanar, you would have to lay them all out on a table with no overlaps. So in the deck we have 52 separate (but parallel) planes with one card in each plane. In the deck of cards on the right none of the cards are coplanar.Įach card is in a plane of its own, and although those planes are parallel to each other, that does not count as being in the same plane. * Each time you uncheck the box a different set of random points is produced. You can think of the green surface as a plane, and because the two cards are on that plane they are coplanar. In the image above, the two cards are both laying on a green surface. Imagine some playing cards laying side by side on a tabletop, they are coplanar,īecause they both are in the same plane as each other. If that does not work you may need convert 3dpoly to 2dpoly just google for the lisp. It's not just points that can be coplanar. non-coplanar means that the line/plines have different Z values and so a fillet would be on a odd plane as an answer, try Flatten on the 2 objects, then fillet. If you uncheck the 'coplanar' checkbox, the points are then randomly spread out in space and are therefore not coplanar*. They are coplanar because they all lie in the same plane as indicated by the yellow area. In the applet above, there are 16 coplanar points. Two objects are coplanar if they both lie in the same plane.
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