The hardware and bandwidth for this mirror is donated by METANET, the Webhosting and Full Service-Cloud Provider.
If you wish to report a bug, or if you are interested in having us mirror your free-software or open-source project, please feel free to contact us at mirror[@]metanet.ch.
Most transform literals are formed by constructors. These are summarized in the following table.
Constructor | Param types | Description
|
---|---|---|
rotate(A,P,X)
| scalar,point,vector | Rotate A degrees about point P with axis X
according to the right hand rule. See Right hand rule.
P and X are both optional and default to the origin and
the z-axis respectively.
|
translate(X)
| vector | Translate by X .
|
scale(S)
| scalar | Scale uniformly by factor S .
|
scale(V)
| vector | Scale along each axis by components of V .
|
project()
| — | Same as scale([1,1,0]) .
|
project(S)
| scalar | Perspective projection with view center at origin and projection
plane z=-S .
|
perspective(S)
| scalar | Perspective transform identical to project(S)
except that the z-coordinate of the transformed result is
pseudodepth, usable by the hidden surface algorithm.
|
view(E,D,U)
| point,vector,vector | View transform similar to that of OpenGL 's. The
eye point E is translated to the origin while a rotation
is also applied that makes the view direction vector D
and the view “up” vector U point in the negative
z- and the y-directions respectively. If U is
omitted, it defaults to [0,1,0]. When U is omitted,
D may be also; it defaults to (0,0,0)-(E) , a vector
pointing from the eye toward the origin.
|
view(E,L,U)
| point,point,vector | An alternate form of view(E,D,U) above where
the view direction parameter D is replaced with a
“look at” point L , i.e., a point where the viewer is focusing
her attention. This form of view is equivalent to
view(E, (L)-(E), U) , where (L)-(E) is a direction
vector. U is optional and defaults to [0,1,0].
|
[[a_11,a_12,a_13,a_14] [a_21,a_22,a_23,a_24] [a_31,a_32,a_33,a_34] [a_41,a_42,a_43,a_44]] | 16 scalars | Direct transform matrix definition. Each
of the a_ij is a scalar expression. If you don't know what
this is about, you don't need it.
|
project
constructor is not generally useful because it
defeats hidden surface removal by collapsing the scene onto a single
plane. It is a special purpose transform for drawing pictures of
scenes where three-dimensional objects are being projected onto
planes. See, for example, Overview.
These binaries (installable software) and packages are in development.
They may not be fully stable and should be used with caution. We make no claims about them.