Reference:Parametric
While the isosurface
object uses implicit surface functions like F(x,y,z) = 0 the parametric
object uses is a set of equations for a surface expressed in the form of the parameters that locate points on the surface. For example: x(u,v)
, y(u,v)
, z(u,v)
. Each of the pairs of values for u
and v
gives a single point <x,y,z>
in 3d space.
The parametric
object is not a solid it is hollow, like a thin shell. The syntax is as follows:
parametric { function { FUNCTION_ITEMS }, function { FUNCTION_ITEMS }, function { FUNCTION_ITEMS } <u1,v1>, <u2,v2> [contained_by { SPHERE | BOX }] [max_gradient FLOAT_VALUE] [accuracy FLOAT_VALUE] [precompute DEPTH, VarList] }
The default values are:
accuracy : 0.001 contained_by : box {<-1,-1,-1>, <1,1,1>}
- The first function calculates the
x
value of the surface, the secondy
and the third thez
value. Any function that results in a float is allowed. - The
<u1,v1>
and the<u2,v2>
boundaries of the(u,v)
space, in which the surface has to be calculated. - The
contained_by
object limits the area where POV-Ray samples for the surface of the function. The container can either be asphere
or abox
. - The
max_gradient
is the maximum magnitude of all six partial derivatives over the specified ranges of u and v. - Take
dx/du
,dx/dv
,dy/du
,dy/dv
,dz/du
, anddz/dv
and calculate them over the entire range - The
max_gradient
is the maximum (absolute value) of all of those values. - For
accuracy
smaller values produces more accurate surfaces, but take longer to render. - Using
precompute
can speedup the rendering of parametric surfaces by simply dividing the parametric surfaces into smaller ones - The maximum value for DEPTH is 20. High values of depth can produce arrays that use a lot of memory, take longer to parse and render.
- It precomputes the ranges for the VarList variables (x,y,z)
- If you declare a
parametric
surface usingprecompute
and then use it twice, all arrays are in memory only once.
Example, a unit sphere:
parametric { function { sin(u)*cos(v) } function { sin(u)*sin(v) } function { cos(u) } <0,0>, <2*pi,pi> contained_by { sphere{0, 1.1} } max_gradient ?? accuracy 0.0001 precompute 10 x,y,z pigment {rgb 1} }