Difference between revisions of "User talk:Aleric Inglewood"

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== About Coordinate Systems and Rotations ==
This was moved elsewhere...
 
=== The four coordinate systems ===
 
There are four coordinate systems that are related to LSL programming:
# World coordinates
# Region coordinates
# Object coordinates (root prim coordinates)
# Child prim coordinates (coordinates relative to the prim that the script is in, or refers to by link number)
 
The World coordinates refer to the map, and allow to include the sim
in the coordinates, or refer to void water.
 
Region coordinates are relative to a given sim.
The origin is in the South/West corner at height 0.
The North/East corner then is 256, 256 and a Z coordinate
for the height up to 4096 meter (on opensim you can go even
higher).
 
Object coordinates are relative to the root prim. Hence, if the object
is moved or rotated then the orientation of a child prim, when given
in object coordinates, doesn't change. In LSL "local position" and
"local rotation" refer to this coordinate system. "local" means
relative to the root prim.
 
Prim Coordinates are relative to a given prim. If this prim is the root
prim then the Prim Coordinates are the same as the Object Coordinates.
For example, if a child prim is a cube with a size of 1,1,1 and one
red surface where the center of that surface is at 1,0,0 then it will
still be at 1,0,0 no matter how you move or rotate that child prim
(relative to the other linked prims).
 
=== Positions ===
 
A different position of the origin of a coordinate system is easy to understand:
You can think of positions as vectors that start in the origin of the
coordinate system that they are given in and end in the point that they
refer to. While the length of the vector is independent of the rotation of
the coordinate system, the three coordinates are not; but a mental picture
of an arrow doesn't have little numbers for three coordinates, so that
picture works independent of the rotation too.
 
Since the rotation of the World Coordinate system and the Region Coordinate
system is the same (X, Y and Z axis are parallel of both), and since
World Coordinates aren't used in many LSL functions to begin with, we
will ignore World Coordinates for now and only refer to Region Coordinates,
or say "global" when we mean Region Coordinates.
 
=== Rotations ===
 
An LSL rotation internally stores a vector that is the axis around which
to rotate and the angle of the rotation around that axis.
Let '''V''' = <u, v, w> be the normalized vector (that is, with length 1) around
which we rotate and let α (alpha) be the angle around which we have to rotate.
Then the LSL rotation is a quaternion stored as r = <x, y, z, s> = < '''V''' * sin(α/2), cos(α/2) >.
Thus, r.x = x * sin(α/2), and r.s = cos(α/2) etc. Note that the quaternion
is also normalized.
Also note that there is a duality here because inverting '''V''' (making it point the
opposite way) and inverting the angle gives the same rotation; r and -r have
different values but are the same rotation.
Also note that if you don't rotate at all (α == 0) then it doesn't matter
what axis '''V''' you pick, which is apparent because '''V''' drops out since sin(0) = 0.
The quaternion <0, 0, 0, 1> is the ZERO_ROTATION quaternion.
 
The point of this technical story is to show that for an LSL rotation to
make sense in terms of orientation, you need to be able to express a vector
in three coordinates (u, v, w above): the axis around which we rotate is
expressed relative to the X-, Y- and Z-axes of the coordinate system. Hence,
it is the orientation of the X-, Y- and Z-axes that defines the meaning
of a rotation in LSL.
 
In terms of a mental picture the origin with the (orientation of the) three axis,
the red X-axis, the green Y-axis and the blue Z-axis is all the reference
we need, combined with a vector for position or a quaternion for rotation.
 
When you edit an object, the viewer shows either 'World' or 'Local' axes, but
really the 'World' axes show the wrong origin, shifted to an averaged center
of the object, because if the origin was drawn at (0, 0, 0) you'd most likely
not see it. The 'Local' ruler shows the correct coordinate system for the
selected prim as its Prim Coordinate System. Selecting the root prim with
'Local' ruler on then shows the Object Coordinate System.
 
=== The dimension of rotations ===
 
As said before, given some coordinate system, any point in space can
be represented with a vector. Obviously space is three dimensional,
and thus vectors exists of three real values:
one needs three distinct floating point numbers, the x coordinate,
the y coordinate and the z coordinate to uniquely
identify a position in a given coordinate system.
 
However, if one limits oneself to only normalized vectors, vectors
with a length of one, then those represent all points on the surface
of a sphere with radius 1.
A surface is obviously two dimensional, so it should be possible to
uniquely identify any point on the surface of such a sphere with
only two floating point numbers.
 
One might think that selecting just two coordinates of the three of
the vector will suffice because the third is fixed by the length requirement,
but that only works for half spheres; for example, if x and y are known
then z can still be either plus the square root of x squared plus y squared,
''or'' minus that value.
 
Instead, a better choice would be the [http://mathworld.wolfram.com/SphericalCoordinates.html spherical coordinate system]
and express the unit vectors with the two the angular coordinates φ (phi) and θ (theta),
where φ is the angle between the vector and the positive Z axis, and
θ the angle that the projection of the vector on to the X,Y plane makes
with the positive X axis. In other words, starting with a unit vector
along the positive Z-axis, one can obtain the required point on
the surface of the sphere by first rotating this vector around the
Y axis (towards the positive X axis) by an angle of φ and then rotating
the result around the Z-axis by an angle of θ. Note that in both cases
the rotations are counter-clockwise when one looks at it from the positive
side of the axis that one rotates around (towards the origin).
 
What we just did was expressing a unit vector in terms of two rotations:
one around the Z axis and one around the Y axis; and indeed every rotation
can be expressed as two rotations around those two axis (or really, any
two arbitrary axes, as long as they are independent (not parallel)).
 
It is therefore possible to represent unit vectors (aka, a ''direction'')
with a rotation, as both are two dimensional. The mental picture here is
that any unit vector can be expressed as some fixed unit vector (for example
the one pointing along the positive Z axis, but any other would do as well)
and the rotation needed to turn that 'starting vector' into the unit vector
that one wants to represent. The other way around almost works as well, with the
exception of the starting vector itself, as that can be expressed by any arbitrary
rotation around itself, so that information was lost and it is not possible
to know which of those rotations was used. In fact, any vector
close to the starting vector would give inaccurate results in the light
of floating point round off errors and is not a good way to represent
a rotation. Of course, the two dimensional vector (θ, φ) would be excellent
to represent both: the unit vector, as well as any rotation; but LSL stores
vectors in x, y, z coordinates, not in spherical coordinates.
 
=== Converting between coordinate systems ===
 
Consider a child prim of an object that is not the root prim and express
its position with the vector pos_oc, and its orientation with the rotation rot_oc,
both relative to the Object Coordinates System.
 
A script inside that prim can easily obtain those values:
 
vector pos_oc = [[llGetLocalPos]]();
rotation rot_oc = [[llGetLocalRot]]();
 
The postfix '_oc' stands for Object Coordinates and is used to make clear
relative to which coordinate system the x, y and z values of both
variables are. Remember that also the rotation contains a vector
(the axis around which we rotate), so from now on we'll talk about
'coordinates' relative to a coordinate system for both, the position
as well as the rotation, where the coordinates refer to the x, y and z
components of the position and the rotation. For example, the first
sentence of this paragraph will read "...express its position with the
vector pos_oc, and its orientation with the rotation rot_oc, ''both in Object Coordinates''."
 
'''Note that''' one has to be careful here, because a script in the
root prim of the object will '''''not''''' obtain
Object Coordinates but instead Region Coordinates!
The reason is that the 'Local' functions return coordinates relative to
the 'parent' coordinate system, where the parent of a non-root prim is the root prim,
but the parent of the root prim is the region (or avatar in case
of an attachment). The position and rotation of the root prim in
Object Coordinates is trivial (ZERO_VECTOR and ZERO_ROTATION respectively).
 
Back to the script in the child prim. It can also easily obtain its position
and rotation in Region Coordinates:
 
vector pos_rc = [[llGetPos]]();
rotation rot_rc = [[llGetRot]]();
 
Both sets, (pos_oc, rot_oc) and (pos_rc, rot_rc) refer to the same thing,
so it should be possible to convert them into each other.
 
One can do this by looking at the orientation (position and rotation) of
one coordinate system relative to the other and expressed
in the coordinates of that other. The position and rotation
of the Object Coordinate System relative to the Region Coordinate
System, and in Region Coordinates, could be obtained as follows:
 
vector oc_pos_rc = [[llGetRootPosition]]();
rotation oc_rot_rc = [[llGetRootRotation]]();
 
As indicated by the '_rc' postfix, these are again in Region Coordinates.
 
Having the relative orientation of the Object Coordinate System in Region Coordinates, it is
possible to convert Object Coordinates into Region Coordinates. More
abstractly put, if you have two coordinate systems A and B, and you have
their relative orientation expressed in A then you can convert orientations
expressed in B into A.
 
The formula is as follows:
 
'''vector  pos_A = pos_B * B_rot_A + B_pos_A;'''
'''rotation rot_A = rot_B * B_rot_A;'''
 
The order of the multiplications is important; swapping the B_rot_A to the front will not work!
 
Note that the B_*_A are the position and rotation of the coordinate system B expressed
in terms of the coordinate system A. The reason that I use the prefix and postfix in
the order is directly related to the order enforced for rotation multiplications.
Written this way, the left-hand postfix of a multiplication must match the right-hand prefix
and conviently short-circuits the notation:
 
something_A = something_B * B_rot_A
 
the two B's 'connect' and drop out (along with the '_rot_') to give something_ ... A.
This ''only'' works when the postfix refers to the coordinate system that the variable
is in, and the prefix is whatever is described by the variable, possibly another
coordinate system.
 
A complete example script follows:
<lsl>
default
{
    touch(integer num_detected)
    {
        llSay(0, "---------");
 
        // Get the pos and rot in Object Coordinates.
        vector pos_oc = llGetLocalPos();
        rotation rot_oc = llGetLocalRot();
       
        // Fix these values when this script is in the root prim!
        if (llGetLinkNumber() == 0)
        {
            pos_oc = ZERO_VECTOR;
            rot_oc = ZERO_ROTATION;
        }
       
        // Get the pos and rot in Region Coordinates.
        vector pos_rc = llGetPos();
        rotation rot_rc = llGetRot();
       
        // Get the pos and rot of the Object Coordinate System in Region Coordinates.
        vector oc_pos_rc = llGetRootPosition();
        rotation oc_rot_rc = llGetRootRotation();
       
        // Print the values of the positions (the rotations are too hard to understand).
        llSay(0, "oc_pos_rc = " + (string)oc_pos_rc);
        llSay(0, "pos_os = " + (string)pos_os);
        llSay(0, "pos_rc = " + (string)pos_rc);
       
        // Calculate pos_rc and rot_rc from pos_oc and rot_oc : converting between _oc and _rc.
        vector  pos2_rc = pos_oc * oc_rot_rc + oc_pos_rc;
        rotation rot2_rc = rot_oc * oc_rot_rc;
       
        // Print the result for the position, and show the difference with what llGetPos() and llGetRot() returned.
        llSay(0, "pos2_rc = " + (string)pos2_rc);
        // These values should be ZERO_VECTOR and ZERO_ROTATION (or -ZERO_ROTATION).
        llSay(0, "pos_rc - pos2_rc = " + (string)(pos_rc - pos2_rc));
        llSay(0, "rot_rc / rot2_rc = " + (string)(rot_rc / rot2_rc));
    }
}
</lsl>
 
Obviously there is no preference for one coordinate system over the other for this conversion;
one can equally as well convert orientations in A into B:
 
vector  pos_B = pos_A * A_rot_B + A_pos_B;
rotation rot_B = rot_A * A_rot_B;
 
The question arises then how to obtain the A_*_B values. For example, there is no LSL function that returns directly
the position or rotation of the region relative to a prim (aka, rc_*_oc).
 
Intuitively one would say that it has to be possible to express A_*_B in B_*_A on grounds of symmetry, and that
is indeed the case.
 
To show how this works, lets just take the formula for pos_A and rot_A (see above) and rework
them to get pos_B and rot_B on the left-hand side. This results first in
 
pos_B * B_rot_A = pos_A - B_pos_A
rot_B * B_rot_A = rot_A
 
Then divide both sides by B_rot_A to get:
 
pos_B = pos_A / B_rot_A - B_pos_A / B_rot_A
rot_B = rot_A / B_rot_A
 
from which we can conclude that
 
'''A_pos_B = - B_pos_A / B_rot_A'''
'''A_rot_B = ZERO_ROTATION / B_rot_A'''
 
Note how A_rot_B is the inverse of B_rot_A: A_rot_B * B_rot_A = ZERO_ROTATION.
As per our notation convention you'd expect A_rot_B * B_rot_A to be A_rot_A, and that is
actually the case as A_rot_A means the relative orientation of coordinate system A
expressed in A's coordinates, which is the trivial ZERO_VECTOR and ZERO_ROTATION as
we saw before for the root prim orientation expressed in Object Coordinates.
 
And for fun, note that if we do this inversion again we get:
 
B_pos_A = - A_pos_B / A_rot_B = - (- B_pos_A / B_rot_A) / (ZERO_ROTATION / B_rot_A) = B_pos_A / B_rot_A * B_rot_A = B_pos_A
B_rot_A = ZERO_ROTATION / A_rot_B = ZERO_ROTATION / (ZERO_ROTATION / B_rot_A) = B_rot_A
 
as expected.
 
We can now also convert Region Coordinates to Object Coordinates.
 
One could first calculate,
 
vector rc_pos_oc = - llGetRootPosition() / llGetRootRotation();
rotation rc_rot_oc = ZERO_ROTATION / llGetRootRotation();
 
and then convert as usual:
 
vector  pos_oc = pos_rc * rc_rot_oc + rc_pos_oc;
rotation rot_oc = rot_rc * rc_rot_oc;
 
or if you don't want to calculate the intermediate rc_*_oc values, you could do immediately:
 
vector  pos_oc = (pos_rc - llGetRootPosition()) / llGetRootRotation();
rotation rot_oc = rot_rc / llGetRootRotation();
 
To verify this, you could extend the above script with
<lsl>
        // Calculate pos_oc and rot_oc from pos_rc and rot_rc.
        vector  pos2_oc = (pos_rc - llGetRootPosition()) / llGetRootRotation();
        rotation rot2_oc = rot_rc / llGetRootRotation();
       
        llSay(0, "pos2_oc = " + (string)pos2_oc);
        // These values should again be ZERO_VECTOR and +/- ZERO_ROTATION.
        llSay(0, "pos_oc - pos2_oc = " + (string)(pos_oc - pos2_oc));
        llSay(0, "rot_oc / rot2_oc = " + (string)(rot_oc / rot2_oc));
</lsl>
 
More in general, if you want to convert from B to A, but you only have A_*_B instead of B_*_A, then (combining the above)
you can do:
 
'''vector  pos_A = (pos_B - A_pos_B) / A_rot_B;'''
'''rotation rot_A = rot_B / A_rot_B;'''
 
=== Cascading coordinate systems ===
 
Imagine you have a castle object where the floor is the root prim. Everything is linked because you
want it to be easy to move the castle around. One of the child prims is a sculpty representing the hinges
around which you want to rotate a large gate. The gate has a rotating wheel on it.
 
You want that the object (castle) to keep working when it is moved and/or rotated, but also when it is edited
and the hinges are moved and/or rotated. This means that the state of the gate prims
must be ''stored'' relative to the hinges, which is by far the easiest thing to do to begin with,
after all, the gate rotates around the hinges and has no relation with the rest of the castle.
 
Hence, we have the Region Coordinate System, the Object Coordinate System (the castle) and the Hinges Coordinate System.
The latter is our first example of a Prim Coordinates System, but I'll use the postfix '_hc' for "Hinges Coordinates"
instead of '_pc'. Finally we have the Spill Coordinate System (or Gate Coordinates) where the spill is a prim
around which we want to rotate the wheel, and I'll used '_sc' as postfix for that.
 
The variables used then would be an orientation for the wheel in *_sc coordinates, the orientation of the spill,
and other gate prims, in *_hc coordinates and the orientation of the hinges in *_oc coordinates. Finally we could
have variables for the orientation of the castle (root prim) in *_rc coordinates of course.
 
vector  castle_pos_rc; // The position of the castle in Region Coordinates.
rotation castle_rot_rc; // The rotation of the castle in Region Coordinates.
vector  hinges_pos_oc; // The position of the hinges in Object Coordinates.
rotation hinges_rot_oc; // The rotation of the hinges in Object Coordinates.
vector  spill_pos_hc;  // The position of the spill in Hinges Coordinates.
rotation spill_rot_hc;  // The rotation of the spill in Hinges Coordinates.
vector  wheel_pos_sc;  // The position of the wheel in Spill Coordinates.
rotation wheel_rot_sc;  // The rotation of the wheel in Spill Coordinates.
 
Now because we used existing prims orientations as coordinate system for the next prim, the position
and rotation of those prims ''are'' the position and rotation of that coordinate system.
Just like before we saw that llGetPos/llGetRot returns the global orientation of the root prim
when used in a script in the root prim, while llGetRootPos/llGetRootRot gave us the relative
orientation of the Object Coordinate System in Region Coordinates, but is in fact the same as
what llGetPos/llGetRot in the root prim returns: the position/rotation of the root prim '''is'''
the orientation of the Object Coordinate System relative to the Region.
 
Likewise, in this case, castle_*_rc is the relative orientation of the Object Coordinate System
in Region Coordinates as well as the orientation of the root prim in Region Coordinates; they
are the same thing.
 
The same then applies to the *_oc variables, which we defined as the orientation of
the hinges in Object Coordinates, but at the same time are the relative orientation
of the Hinges Coordinate System in Object Coordinates. The *_hc variables are the
orientation of spill in Hinges Coordinates, but also the relative orientation of
the Spill Coordinates in Hinges Coordinates.
 
Lets write it out using the same notation convention as used above, then
we have:
 
vector  oc_pos_rc = castle_pos_rc; // The Object Coordinate System orientation in Region Coordinates.
rotation oc_rot_rc = castle_rot_rc;
vector  hc_pos_oc = hinges_pos_oc; // The Hinges Coordinate System orientation in Object Coordinates.
rotation hc_rot_oc = hinges_rot_oc;
 
vector  sc_pos_hc = spill_pos_hc;  // The Spill Coordinate System orientation in Hinges Coordinates.
rotation sc_rot_hc = spill_rot_hc;
 
It will therefore probably not surprise you that
 
vector  hc_pos_rc = hc_pos_oc * oc_rot_rc + oc_pos_rc; // The Hinges Coordinate System orientation in Region Coordinates.
rotation hc_rot_rc = hc_rot_oc * oc_rot_rc;
vector  sc_pos_rc = sc_pos_hc * hc_rot_rc + hc_pos_rc; // The Spill Coordinate System orientation in Region Coordinates.
rotation sc_rot_rc = sc_rot_hc * hc_rot_rc;
 
And finally, using the latter, we can express the wheel orientation in region coordinates:
 
vector  wheel_pos_rc = wheel_pos_sc * sc_rot_rc + sc_pos_rc;
rotation wheel_rot_rc = wheel_rot_sc * sc_rot_rc;
 
Although this was nothing else but applying the coordinate system conversion formula three times,
it might give some insight to get rid of the intermediate variables and express the wheel
orientation in region coordinates without them, giving:
 
wheel_pos_rc = ((wheel_pos_sc * sc_rot_hc + sc_pos_hc) * hc_rot_oc + hc_pos_oc) * oc_rot_rc + oc_pos_rc
wheel_rot_rc = wheel_rot_sc * sc_rot_hc * hc_rot_oc * oc_rot_rc
 
=== Applying rotations and translations ===
 
Applying rotations and translations (moving) is very much the same as coordinate system transformations described above.
To show this consider the following: imagine you have a prim 'pa' with its own coordinate system A.
Then it trivially has position ZERO_VECTOR and rotation ZERO_ROTATION relative to A, per definition.
 
vector  pa_pos_A = ZERO_VECTOR;
rotation pa_rot_A = ZERO_ROTATION;
 
Now consider a prim 'pb' that has some relative position pb_pos_A and rotation pb_rot_A given in A coordinates.
For example,
 
vector  pb_pos_A = <0.5, 0.6, 0.7>;
rotation pb_rot_A = <0.38, 0.26, 0.34, 0.82>;
 
Note that 0.38&sup2; + 0.26&sup2; + 0.34&sup2; + 0.82&sup2; = 1, as it must be since rotations are normalized.
 
As seen before, the orientation of pb relative to pa is the same as the orientation of pb relative to A,
and the same as the orientation of B relative to A. pa and A are interchangeable as long as pa has
ZERO_VECTOR and ZERO_ROTATION relative to A. Thus, with B being the coordinate system where pb currently
is, we also have:
 
vector  B_pos_A = pb_pos_A; // The orientation of coordinate system B, in coordinates of A.
rotation B_rot_A = pb_rot_A;
 
Now suppose we want move the prim pa (without moving the coordinate system A),
by applying the translation 'B_pos_A', after all a translation is stored in a vector
and B_pos_A is a vector. Likewise, we want to rotate pa (again without influencing A)
by applying the rotation B_rot_A. Then the most logical order to this in is by
''first'' applying the rotation and ''then'' applying the translation, because then
the meaning of the translation is preserved and will match the meaning of B_pos_A
in that pa will end up where pb is now. If you'd first apply the translation so that
pa ends up where pb is, and then apply the rotation (around A!) then pa would swoop
around the origin of A and move away from its desired position.
 
Doing this correctly should leave us with pa_pos_A == pb_pos_A and pa_rot_A == pb_rot_A,
so that pa ended up precisely where pb is now. We can't just assign those values
however, because we're looking for a formula that works in general; a way to apply
B_rot_A and then B_pos_A to any prim with -say- orientation pc_pos_A, pc_rot_A.
 
Thus, first we apply the rotation:
 
pc_rot_A *= B_rot_A;
pc_pos_A *= B_rot_A;
 
And then apply the translation:
 
pc_pos_A += B_pos_A;
 
Now lets check if indeed this would cause pa to end up where pb is.
The effect on pa_*_A would be:
 
pa_rot_A = pa_rot_A * B_rot_A = ZERO_ROTATION * B_rot_A = B_rot_A = pb_rot_A;
pa_pos_A = pa_pos_A * B_rot_A = ZERO_VECTOR * B_rot_A = ZERO_VECTOR;
and then the translation
pa_pos_A = pa_pos_A + B_pos_A = ZERO_VECTOR + B_pos_A = B_pos_A = pb_pos_A;
 
So yes, pa_*_A ends up as pb_*_A!
 
The real test however would be if we first applied some transformation to pa
to bring it to some arbitrary orientation (aka, pc), then apply the transformation
B_rot_A,B_pos_A and then reverse the first transformation but now relative to B,
and then find that we indeed end up at pb.
 
Let us first define a 'transformation', which exists of a vector for the
translation and a rotation for the rotation. We will have two transformation
during this test: t1: pa -> pc, and t2: pa -> pb.
 
As we just saw (or we hope this is going to be the case), t2 can be defined as:
 
vector  t2_translation = B_pos_A;
rotation t2_rotation = B_rot_A;
 
where as t1 is arbitrary, just some values t1_translation and t1_rotation.
 
Applying t1 to pa, we get (this is thus the same as above, but now with the 't1' notation):
 
pa_rot_A *= t1_rotation;
pa_pos_A *= t1_rotation;
pa_pos_A += t1_translation;
 
Next we apply translation t2 to that:
 
pa_rot_A *= t2_rotation;
pa_pos_A *= t2_rotation;
pa_pos_A += t2_translation;
 
Finally we want to reverse t1, but in the coordinate system of B.
Therefore, we first convert our coordinates to that of B:
 
pa_pos_B = pa_pos_A * A_rot_B + A_pos_B;
pa_rot_B = pa_rot_A * A_rot_B;
 
where
 
A_pos_B = - B_pos_A / B_rot_A;
A_rot_B = ZERO_ROTATION / B_rot_A;
 
and then reverse t1. Note now we have to do the translation first!
 
pa_pos_B -= t1_translation;
pa_pos_B /= t1_rotation;
pa_rot_B /= t1_rotation;
 
And if everything worked out then pa now should be at ZERO_VECTOR, ZERO_ROTATION relative to B!
 
As pa_pos_A,pa_rot_A started as ZERO_VECTOR,ZERO_ROTATION, the first step
of applying t1 resulted in pa_rot_A = t1_rotation and pa_pos_A = t1_translation.
 
After applying t2 we get pa_rot_A = t1_rotation * t2_rotation, and pa_pos_A = t1_translation * t2_rotation + t2_translation.
 
Converting that to B gives
 
pa_pos_B = (t1_translation * t2_rotation + t2_translation) * A_rot_B + A_pos_B
pa_rot_B = (t1_rotation * t2_rotation) * A_rot_B
 
where, remembering that t2_translation = B_pos_A and t2_rotation = B_rot_A,
 
A_pos_B = - B_pos_A / B_rot_A = - t2_translation / t2_rotation
A_rot_B = ZERO_ROTATION / B_rot_A = ZERO_ROTATION / t2_rotation
 
so that we get
 
pa_pos_B = (t1_translation * t2_rotation + t2_translation) / t2_rotation - t2_translation / t2_rotation = t1_translation
pa_rot_B = (t1_rotation * t2_rotation) / t2_rotation = t1_rotation
 
and finally reversing t1 gives:
 
pa_pos_B = (t1_translation - t1_translation) / t1_rotation = ZERO_VECTOR
pa_rot_B = t1_rotation / t1_rotation = ZERO_ROTATION
 
So that we can conclude that if you have two prims pa and pb, each representing their own coordinate system A and B respectively,
and you express the orientation of B relative to A as the pair (B_pos_A, B_rot_A) &mdash; then the following holds.
 
'''The transformation pair (t_translation, t_rotation) equals (B_pos_A, B_rot_A) as long as you first apply the rotation and then the translation while working in the coordinate system of A'''.
 
The latter is also very practical, because you normally won't know
anything about the target coordinate system B until you actually did the transformation.
 
Now remember that we found that in order to convert variables from being relative to a coordinate system B to a coordinate system A,
we did:
 
pos_A = pos_B * B_rot_A + B_pos_A
rot_A = rot_B * B_rot_A
 
which is thus exactly the same as first applying the rotation t1_rotation and then the translation t1_translation
on the pair (pos_B, rot_B) where that pair is relative to A! That isn't too weird because if you consider a prim
in the origin of A with no rotation, aka (ZERO_VECTOR, ZERO_ROTATION) relative to A and then apply the transformation
then you expect to end up in the origin of B with no rotation relative to B. Aka pos_B = ZERO_VECTOR and rot_B = ZERO_ROTATION.
So now work backwards: assume you already have the prim in B like that, then what are its coordinates in A?
That would be the above conversion thus, with pos_B = ZERO_VECTOR and rot_B = ZERO_ROTATION.
 
Hence, doing the conversion with ZERO as input gives the same results as doing the t transformation with ZERO as input!
And the final formula for a transformation just looks exactly the same:
 
'''target_pos_A = source_pos_A * t_rotation + t_translation'''
'''target_rot_A = source_rot_A * t_rotation'''
 
=== Scaling coordinate systems ===
 
Apart from rotation and translation, there is one more linear operator that can be used to convert
between coordinate systems: scaling.
 
Let A_pos_B be the position of the origin of A in the coordinates of B. Let A_rot_B be the orientation of A within B,
and let the vector A_B_scale be the scaling factors for each axes. Scaling has no influence on the origin of
a coordinate system, but it matters for the rotation when the scaling factors per axis are different.
 
I think that a good choice is scale first and rotate afterwards. Because that leaves the values
of the coordinates of A_rot_B alone: it remains the rotation as defined in B, which makes sense
since it is written in the coordinates of B. However, it's just a matter of choice really, which
in this case will deform B_rot_A instead of A_rot_B. I can imagine that the choice might depend
on the application.
 
Chosing that we first scale, a point at pos_A is mapped onto the point pos_B as follows:
 
pos_B = (S * pos_A) * A_rot_B + A_pos_B
 
where S is a 3x3 matrix with as diagonal the vector A_B_scale (and the rest zeroes).
Note that when each element of A_B_scale is the same then you can just use a scalar for S, equal to the scale of each axis.
 
Whether or not S is a matrix or a scalar, lets just replace it with 'A_B_scale' here. Just keep in
mind that if it isn't a scalar then this won't work in LSL directly: then you'll have to split
it up in three different code lines because LSL doesn't support scaling or matrices.
 
  pos_B = pos_A;
  pos_B.x *= A_B_scale.x;  // Scale
  pos_B.y *= A_B_scale.y;
  pos_B.z *= A_B_scale.z;
  pos_B *= A_rot_B;        // Rotate
  pos_B += A_pos_B;        // Translate
 
Note that the inverse of S, 1/S, is a 3x3 matrix with as diagonal the inverse of each element of A_B_scale.
We will either write 'B_A_scale', or divide by 'A_B_scale' in our notation.
 
Therefore our notation becomes:
 
pos_B = ('A_B_scale' * pos_A) * A_rot_B + A_pos_B
 
Since A and B are arbitrary, we would expect the same formula to hold when swapping A and B:
 
pos_A = ('B_A_scale' * pos_B) * B_rot_A + B_pos_A
 
Solving pos_B from that by subtracting B_pos_A from both sides, then dividing both sides by B_rot_A
and finally left multiplying both sides with the inverse of B_A_scale, gives:
 
pos_B = 'A_B_scale' * ((pos_A - B_pos_A) / B_rot_A) = 'A_B_scale' * (pos_A / B_rot_A) - 'A_B_scale' * (B_pos_A / B_rot_A)
 
from which we can conclude (by setting pos_A to ZERO_VECTOR) that
 
A_pos_B = -'A_B_scale' * (B_pos_A / B_rot_A)
 
Solving B_pos_A from that by left multiplying both sides with -B_A_scale and then right multiplying both sides with B_rot_A, gives:
 
B_pos_A = - ('B_A_scale' * A_pos_B) * B_rot_A
 
By setting A_pos_B to ZERO_VECTOR, and this B_pos_A too, we can also conclude that
 
('A_B_scale' * pos_A) * A_rot_B = 'A_B_scale' * (pos_A / B_rot_A)
 
If 'A_B_scale' is a scalar, so that the order of multiplication doesn't matter,
then the scale just cancels on both sides and we find the conversion that we
found before, that B_rot_A is the inverse of A_rot_B. However, if A_B_scale
is a diagonal matrix then the order matters and the brackets are significant.
 
There is no way to let pos_A drop out: we cannot write B_rot_A as function
of A_B_scale and A_rot_B.
 
The conclusion is that a scale is asymmetrical: if you choose that a scale A_B_scale
means that you first apply the scale on a vector in A and then rotate, then
that automatically implies that when going from B to A you first have to rotate
and ''then'' apply the scale.
 
To make the choice clear in the name, I suggest to put an 'r' in front of the
coordinate system that need rotation to be applied first.
 
In summary, if A_rB_scale is defined as
 
'''pos_B = ('A_rB_scale' * pos_A) * A_rot_B + A_pos_B'''
 
then that implies that rB_A_scale has to be applied after rotation.
Note this means braces, NOT changing the left- or right- side of
multiplications! Matrices (scales) are always on the left side
of a vector, while rotations are always on the right side. Thus we get:
 
'''pos_A = 'rB_A_scale' * (pos_B * B_rot_A) + B_pos_A'''
 
If now we solve pos_B from the latter, we get:
 
pos_B = ('A_rB_scale' * (pos_A - B_pos_A)) / B_rot_A = ('A_rB_scale' * pos_A) / B_rot_A - ('A_rB_scale' * B_pos_A) / B_rot_A
 
Hence
 
'''B_pos_A = - 'rB_A_scale' * (A_pos_B / A_rot_B)'''
'''B_rot_A = ZERO_ROTATION / A_rot_B'''
 
and
 
'''A_pos_B = - ('A_rB_scale' * B_posA) / B_rot_A'''
'''A_rot_B = ZERO_ROTATION / B_rot_A'''
 
Note how these two sets condense into the same thing when the scale is a scalar,
but also when A_rot_B and B_rot_A are ZERO_ROTATION. In fact, when the rotation
involved is of the special case of one or more rotations of 90 degrees around
any of the axes, so that the rotation merely swaps axes, one could define
the inverse of A_B_scale by applying that rotation to that vector (swapping
the scaling factors), next to inverting each factor individually.
That is a different way of how we defined B_A_scale, but it would collapse
the two sets into one for that special set of rotations. I'm using that trick
in the example script below.
 
=== Direction vectors ===
 
A 'direction' is a normalized vector (its length is 1), or unit vector, where only the direction
is points to is important.
 
Of course, in the light of rotations between coordinate systems, also the directions
are relative to some coordinate system.
 
As stated before, using some 'starting' unit vector a rotation can be expressed
as a direction by applying the rotation on the starting vector. Reversing this
process runs into floating point round off errors however, or might even have lost
all information of the rotation when we rotate around the starting vector itself.
 
There is a better way to convert directions (back) to a rotation however: by using ''two''
directions that are perpendicular, each having a unit vector along one of the axes
as starting vector. That way there is always at least one vector enough rotated away
from the actual rotation in order not to suffer from (too much) information loss.
 
For example, let us use the unit vector along the positive X axis and the unit vector
along the positive Z axis. In LSL those are often called fwd and up respectively.
Furthermore, lets work in a coordinate system A. Then we have the 'starting' vectors:
 
'''vector A_fwd_A  = <1, 0, 0>;'''
'''vector A_left_A = <0, 1, 0>;'''
'''vector A_up_A  = <0, 0, 1>;'''
 
We said we only knew the fwd and up directions, but the third can always be
calculated from the other two with a cross product:
 
'''A_fwd_B  = A_left_B % A_up_B;'''
'''A_left_B = A_up_B % A_fwd_B;'''
'''A_up_B  = A_fwd_B % A_left_B;'''
 
Hence, the cross product of the other two in the order left to right where after 'up' you start at 'fwd' again; they rotate: ... left up fwd left up fwd ...
Put a '=' at any space in that sequence and a '%' at the next space and you have the right formula. Also note that x % y = - y % x, in case you were wondering.
 
Now assume we have the target directions A_*_B, then we can find the rotation between
A and B with:
 
'''A_rot_B = [[llAxes2Rot]](A_fwd_B, A_left_B, A_up_B);'''
 
Where A_rot_B is the rotation that turns A_*_A into A_*_B:
 
A_fwd_B  = A_fwd_A  * A_rot_B
A_left_B = A_left_A * A_rot_B
A_up_B  = A_up_A  * A_rot_B
 
=== Finding coordinate systems ===
 
Assume you already have a coordinate system B (for example, region or object coordinates, the functions for which you can find directly with [[#LSL functions]]).
 
Finding coordinate system A means that you find A_rot_B (or B_rot_A which is just the inverse), and A_pos_B or B_pos_A.
 
Finding the rotation is usually the easiest since it doesn't depend on the where the origin is and can most likely
be derived somehow. For example, in many cases you will have two orthogonal direction vectors in B that you know
of to be parallel with the x, y or z axes of A. Lets say that you have AsX_dir_B and a AsY_dir_B that make an angle
of 90 degrees and have a length of 1, where AsX_dir_B is known to be parallel with the X axis of A and AsY_dir_B
is known to be parallel with the Y axis of A. Note that in case we can also use the notation A_fwd_B for AsX_dir_B since
'fwd' is in the X direction (AsX_dir_B means "A's X-axis direction in coordinates of B", and A_fwd_B means "A's
forwards direction in coordinates of B", so they are the same thing). Then we find:
 
A_rot_B = [[llAxes2Rot]](AsX_dir_B, AsY_dir_B, AsX_dir_B % AsY_dir_B);
 
as discussed in the previous paragraph.
 
Next, if you have a vector from_B_to_A pointing from the origin of B to the origin of A, then you have
the translation between A and B too:
 
If from_B_to_A is in coordinates of A, then
 
B_pos_A = -from_B_to_A
 
while if from_B_to_A is in coordinates of B, then
 
A_pos_B = from_B_to_A
 
Slight counter intuitive you have to read 'A_pos_B' as 'The vector pointing from the origin of B to the origin of A',
but plausible since it is in the coordinates of B and thus you should expect the vector to start in the origin
of B.
 
If you have a series of vectors that are stacked, all the way from B to A, then of course you just add them all up
to get A_pos_B. Likewise, if you have a series of vectors in the coordinates of A that are stacked to add up
to go from A to B, then add them all up to get B_pos_A.
 
The interesting case therefore is where you have a vector C_pos_A that points from A to C and is in the coordinates
of A, and a vector C_pos_B that points from B to C and in the coordinates of B.
 
To solve this puzzle, lets first write the vectors slightly different so we're not confused about
what they mean, even after converting between the coordinate systems A and B.
 
Let AC_vec_A be C_pos_A: the vector (arrow) from the origin of A to C (in coordinates of A) and
let BC_vec_B be C_pos_B: the vector from the origin of B to C (in the coordinates of B).
Note how the notation of _vec_ is similar to that of _dir_, except that a direction vector has
a length of 1, and this vector has both a direction and a length: it describes how to get from
one point to another. Like directions, when converting between them between A and B you ONLY
apply the rotation A_rot_B! Also note that a vector with a minus sign just means "in the opposite direction",
hence CA_vec_A = -AC_vec_A.
 
Thus, we find that
 
AC_vec_B = AC_vec_A * A_rot_B
 
and find
 
A_pos_B = BA_vec_B = BC_vec_B + CA_vec_B = BC_vec_B - AC_vec_B = BC_vec_B - AC_vec_A * A_rot_B
 
then dropping the extra notation again
 
'''A_pos_B = C_pos_B - C_pos_A * A_rot_B'''
 
Which is rather logical when you read it in English as "To go from B to A in coordinates of B (A_pos_B),
you first go from B to C in coordinates of B (C_pos_B) and then in the opposite direction (the minus sign)
of going from A to C (namely from C to A) converted to the coordinates of B.
 
And oh wonder - if we write this result a little different we find:
 
C_pos_A = (C_pos_B - A_pos_B) / A_rot_B
 
which is the normal conversion for the position of C from A to B coordinates!
 
=== LSL functions ===
 
What all of the above taught you is mainly a coding style: use prefixes and postfixes for your rotations (and translations)!
It's all in the '''''names''''' of your variables. A 'rotation' type can be the rotation part of a transformation
(not tight to a particular coordinate system, but rather rotating around whatever coordinate system you apply it to),
it can be the representation of a unit vector, it can be the rotation part of the orientation of a prim relative to a
given coordinate system, or it can represent the rotation part of a coordinate system conversion.
If you don't use a consistent way to reflect all that in your variable names then you ''will'' get confused.
 
The LSL functions mostly deal with two types: orientations (position + rotation) of prims relative to some coordinate system,
and simply transformations (rotation and/or translation).
 
The table below shows the coordinate systems involved.
 
{| rules="all" style="margin:2em 1em 2em 1em; border:none 2px #000000; background-color:#F9F9F9; font-size:120%; empty-cells:hide;"
|-
| colspan=2 |
| style="padding: 5px 10px 5px 10px; background-color: #ffdddd; text-align: center" colspan=2 | Coordinates of the prim containing the script ('''sc_''')
|- {{Hl2}}
! style="padding: 5px 10px 5px 10px; color: blue; background-color: #eeeeb0" | Coordinate System
! style="padding: 5px 10px 5px 10px; color: green; background-color: lightgray" | Abbreviation
! style="padding: 5px 10px 5px 10px" | script in child prim
! style="padding: 5px 10px 5px 10px" | script in root prim
|-
| style="padding: 5px 10px 5px 10px; color: blue; background-color: #ffffa0" | World/Map Coordinates
| style="padding: 5px 10px 5px 10px"                                        | '''wc'''
| style="padding: 5px 10px 5px 10px" colspan=2                              | <span style="font-family: mono; font-size: 90%">sc_pos_'''wc''' = sc_pos_rc + [[llGetRegionCorner]]()<br>sc_rot_'''wc''' = sc_rot_rc</span>
|-
| style="padding: 5px 10px 5px 10px; color: blue; background-color: #ffffa0" | Region Coordinates
| style="padding: 5px 10px 5px 10px"                                        | '''rc'''
| style="padding: 5px 10px 5px 10px" colspan=2                              | <span style="font-family: mono; font-size: 90%">sc_pos_'''rc''' = [[llGetPos]]()<br>sc_rot_'''rc''' = [[llGetRot]]()</span>
|-
| style="padding: 5px 10px 5px 10px; color: blue; background-color: #ffffa0" | Object/Root Coordinates
| style="padding: 5px 10px 5px 10px"                                        | '''oc'''
| style="padding: 5px 10px 5px 10px"                                        | <span style="font-family: mono; font-size: 90%">sc_pos_'''oc''' = [[llGetLocalPos]]()<br>sc_rot_'''oc''' = [[llGetLocalRot]]()</span>
| style="padding: 5px 10px 5px 10px"                                        | <span style="font-family: mono; font-size: 90%">sc_pos_'''oc''' = [[ZERO_VECTOR]]<br>sc_rot_'''oc''' = [[ZERO_ROTATION]]</span>
|-
| style="padding: 5px 10px 5px 10px; color: blue; background-color: #ffffa0" | Self Coordinates
| style="padding: 5px 10px 5px 10px"                                        | '''sc'''
| style="padding: 5px 10px 5px 10px" colspan=2                              | <span style="font-family: mono; font-size: 90%">sc_pos_'''sc''' = [[ZERO_VECTOR]]<br>sc_rot_'''sc''' = [[ZERO_ROTATION]]</span>
|}
 
Where 'in the root prim' can be detect by testing that [[llGetLinkNumber]]() returns a value <= 1.
 
Alternatively, you can set link = [[llGetLinkNumber]]() and use the following table which
shows how to obtain the coordinates of a prim with link number 'link' from a script anywhere in the same object.
Note that this doesn't work when the object exist of a single prim: then [[llGetLinkNumber]]() returns 0,
while 'link' must be larger than 0 here. If you need to get Object Coordinates (_oc) then do not use the
negative value [[LINK_THIS]]. You can use [[LINK_THIS]] for the other coordinate systems, provided
the object exists of at least two prims.
 
{| rules="all" style="margin:2em 1em 2em 1em; border:none 2px #000000; background-color:#F9F9F9; font-size:120%; empty-cells:hide;"
|-
| colspan=2 |
| style="padding: 5px 10px 5px 10px; background-color: #ffdddd; text-align: center" colspan=2 | Coordinates of a linked prim ('''link_''')
|- {{Hl2}}
! style="padding: 5px 10px 5px 10px; color: blue; background-color: #eeeeb0" | Coordinate System
! style="padding: 5px 10px 5px 10px; color: green; background-color: lightgray" | Abbreviation
! style="padding: 5px 10px 5px 10px" | link > 1
! style="padding: 5px 10px 5px 10px" | link = 1
|-
| style="padding: 5px 10px 5px 10px; color: blue; background-color: #ffffa0" | World/Map Coordinates
| style="padding: 5px 10px 5px 10px"                                        | '''wc'''
| style="padding: 5px 10px 5px 10px" colspan=2                              | <span style="font-family: mono; font-size: 90%">link_pos_'''wc''' = link_pos_rc + [[llGetRegionCorner]]()<br>link_rot_'''wc''' = link_rot_rc</span>
|-
| style="padding: 5px 10px 5px 10px; color: blue; background-color: #ffffa0" | Region Coordinates
| style="padding: 5px 10px 5px 10px"                                        | '''rc'''
| style="padding: 5px 10px 5px 10px" colspan=2                              | <span style="font-family: mono; font-size: 90%">link_pos_'''rc''' = [[llList2Vector]]([[llGetLinkPrimitiveParams]]('''link''', [<span></span>[[PRIM_POSITION]]]), 0)<br>link_rot_'''rc''' = [[llList2Rot]]([[llGetLinkPrimitiveParams]]('''link''', [<span></span>[[PRIM_ROTATION]]]), 0)</span>
|-
| style="padding: 5px 10px 5px 10px; color: blue; background-color: #ffffa0" | Object/Root Coordinates
| style="padding: 5px 10px 5px 10px"                                        | '''oc'''
| style="padding: 5px 10px 5px 10px"                                        | <span style="font-family: mono; font-size: 90%">link_pos_'''oc''' = [[llList2Vector]]([[llGetLinkPrimitiveParams]]('''link''', [<span></span>[[PRIM_POS_LOCAL]]]), 0)<br>link_rot_'''oc''' = [[llList2Rot]]([[llGetLinkPrimitiveParams]]('''link''', [<span></span>[[PRIM_ROT_LOCAL]]]), 0)</span>
| style="padding: 5px 10px 5px 10px"                                        | <span style="font-family: mono; font-size: 90%">link_pos_'''oc''' = [[ZERO_VECTOR]]<br>link_rot_'''oc''' = [[ZERO_ROTATION]]</span>
|-
| style="padding: 5px 10px 5px 10px; color: blue; background-color: #ffffa0" | Self Coordinates
| style="padding: 5px 10px 5px 10px"                                        | '''sc'''
| style="padding: 5px 10px 5px 10px" colspan=2                              | <span style="font-family: mono; font-size: 90%">link_pos_'''sc''' = (link_pos_oc - sc_pos_oc) / sc_rot_oc<br>link_rot_'''sc''' = link_rot_oc / sc_rot_oc</span>
|}
 
While the above table works for link = [[LINK_ROOT]], it is probably more convenient to use the following table:
 
{| rules="all" style="margin:2em 1em 2em 1em; border:none 2px #000000; background-color:#F9F9F9; font-size:120%; empty-cells:hide;"
|-
| colspan=2 |
| style="padding: 5px 10px 5px 10px; background-color: #ffdddd; text-align: center" colspan=2 | Coordinates of the root prim ('''oc_''')
|- {{Hl2}}
! style="padding: 5px 10px 5px 10px; color: blue; background-color: #eeeeb0" | Coordinate System
! style="padding: 5px 10px 5px 10px; color: green; background-color: lightgray" | Abbreviation
! style="padding: 5px 10px 5px 10px" | script in any prim
|-
| style="padding: 5px 10px 5px 10px; color: blue; background-color: #ffffa0" | World/Map Coordinates
| style="padding: 5px 10px 5px 10px"                                        | '''wc'''
| style="padding: 5px 10px 5px 10px"                                        | <span style="font-family: mono; font-size: 90%">oc_pos_'''wc''' = oc_pos_rc + [[llGetRegionCorner]]()<br>oc_rot_'''wc''' = oc_rot_rc</span>
|-
| style="padding: 5px 10px 5px 10px; color: blue; background-color: #ffffa0" | Region Coordinates
| style="padding: 5px 10px 5px 10px"                                        | '''rc'''
| style="padding: 5px 10px 5px 10px"                                        | <span style="font-family: mono; font-size: 90%">oc_pos_'''rc''' = [[llGetRootPosition]]()<br>oc_rot_'''rc''' = [[llGetRootRotation]]()</span>
|-
| style="padding: 5px 10px 5px 10px; color: blue; background-color: #ffffa0" | Object/Root Coordinates
| style="padding: 5px 10px 5px 10px"                                        | '''oc'''
| style="padding: 5px 10px 5px 10px"                                        | <span style="font-family: mono; font-size: 90%">oc_pos_'''oc''' = [[ZERO_VECTOR]]<br>oc_rot_'''oc''' = [[ZERO_ROTATION]]</span>
|-
| style="padding: 5px 10px 5px 10px; color: blue; background-color: #ffffa0" | Self Coordinates
| style="padding: 5px 10px 5px 10px"                                        | '''sc'''
| style="padding: 5px 10px 5px 10px"                                        | <span style="font-family: mono; font-size: 90%">oc_pos_'''sc''' = - sc_pos_oc / sc_rot_oc<br>oc_rot_'''sc''' = [[ZERO_ROTATION]] / sc_rot_oc</span>
|}
 
As shows from the above table, LSL does not directly support '''_sc''' coordinates,
and I used conversions to fill in the tables. All in all, we listed four coordinate systems (wc, rc, oc and sc; not including the 'link_' stuff,
which isn't really a separate coordinate system)
and thus could write out four times four is sixteen ways to convert one into the other. Four of those would be trivial, and of the remaining
twelve we can express six as the inverse of the other six.
 
However, lets ignore the World Coordinates for now, which are just the same as the Region Coordinates with an offset for the position.
Then we have three coordinate systems (rc, oc and sc), leading to nine conversion, three of which are trivial, and of the remaining
six three can be expressed as the inverse of the other three. Those three are: oc_*_rc, sc_*_rc and sc_*_oc, which are all listed above.
The trivial ones, rc_*_rc, oc_*_oc and sc_*_sc, are all ZERO_* (the latter two also are listed in the tables above).
Finally, the inverse values, rc_*_oc, rc_*_sc and oc_*_sc can be expressed with the inversion formula given in [[#Converting between coordinate systems]].
So this is really all there is.
 
=== The fourth dimension ===
 
Picture a coordinate system as three perpendicular lines, like an object in-world perhaps existing of
three really long prims in the colors red, green and blue. You can toss them into the region
where they randomly bounce around like dice &ndash; a whole bunch of them!
And then you freeze time - make a snapshot.
 
With the knowledge so far you can now express the position and rotation of an object or prim relative
to any of those coordinate systems &ndash; and convert between them at will.
Apply rotations and translations relative to any chosen system.
All of the coordinate systems are virtually the same! But in practice isn't the case, why is that?
 
The reason is that in practice coordinate systems change in time, in a way that you cannot predict.
It's like they are still tumbling and bouncing around and you have no idea where they are.
 
This noise comes mainly from one thing: objects are being moved. Taken into repositories and rezzed back,
rotated and possibly even scaled! In fact, not just objects, but also prims inside objects can be changed
at will at any moment and a good script must take that into account.
 
The art of programming therefore becomes ''design''. You must choose which coordinate systems you
want to use; what your global variables store: relative to which coordinate system!
 
Unfortunately, a script can ''not'' detect when this might have happened and only perform extra computations,
or re-computation, of otherwise constant variables when a prim or object has actually been changed.
There is an LSL event [[moving_start]] but that only works half on SL and not at all on opensim.
For rotation detection there is nothing.
 
As such, it is necessary to call the LSL functions listed in the tables above every time you
want to do anything that depends on them; which hopefully won't be too often.
 
The following example script can be put in the root prim of an object of any number of cubes
and allows one to sit on each cube, using [[llLinkSitTarget]], even if you move or rotate
child prims.
 
<lsl>
 
</lsl>

Latest revision as of 18:02, 27 March 2014

This was moved elsewhere...