Lines Matching refs:vertices
15 transforms the vertices of the tessellated patch, for example to compute
171 relative influence of the three vertices of the triangle on the position of
242 Such vertices are considered distinct from vertices produced by subdividing
243 the outer edge of the patch, even if there are pairs of vertices with
268 If the order is code:VertexOrderCw, the vertices of all generated triangles
270 If the order is code:VertexOrderCcw, the vertices will have
273 If the tessellation domain has an upper-left origin, the vertices of a
283 If the tessellation domain has a lower-left origin, the vertices of a
309 each triangle pair is filled by triangles produced by joining the vertices
347 segments, with the [eq]#n - 1# vertices of this subdivision produced by
349 through the [eq]#n - 1# innermost vertices of the subdivision of the outer
363 Solid black circles depict vertices along the edges of the concentric
368 Dotted lines depict edges connecting corresponding vertices on the inner and
375 In this subdivision, two of the three vertices of each triangle are taken
376 from adjacent vertices on a subdivided edge of one triangle; the third is
377 one of the vertices on the corresponding edge of the other triangle.
380 vertices on that triangle with the center point.
401 the three vertices of the outer triangle.
410 each triangle is generated, and the order in which the vertices are
412 However, the order of vertices in each triangle is consistent across the
432 edges are filled by triangles produced by joining the vertices on the
433 subdivided outer edges to the vertices on the edge of the inner rectangle
459 rectangle, the edges of which are subdivided by the grid vertices that lie
475 Solid black circles depict vertices on the boundary of the outer and inner
479 corresponding vertices on the inner and outer rectangle edges.
492 Two of the three vertices of each triangle are adjacent vertices on a
493 subdivided edge of one rectangle; the third is one of the vertices on the
506 each triangle is generated, and the order in which the vertices are
508 However, the order of vertices in each triangle is consistent across the
518 vertices of each isoline have a constant v coordinate and u coordinates
546 is generated, and the order in which the vertices are generated for each