Difference between revisions of "Rotation"
m (avoid confusions between dot product and quaternion multiplication) |
Frionil Fang (talk | contribs) m |
||
(66 intermediate revisions by 21 users not shown) | |||
Line 1: | Line 1: | ||
{{ | {{LSL Header|ml=*}}{{RightToc}} | ||
{{ | ==Rotation== | ||
= | |||
The LSL '''rotation''' type is | A [[rotation]] is a data {{LSLGC|Types|type}} that contains a set of four [[float]] values. | ||
Each element can be accessed individually by appending <code>.x</code>, <code>.y</code>, <code>.z</code>, or <code>.s</code> to the variable name. | |||
<source lang="lsl2">rotation rot; | |||
float x = rot.x; | |||
float y = rot.y; | |||
float z = rot.z; | |||
float s = rot.s;</source> | |||
The LSL '''rotation''' type is one of several ways to represent an orientation in 3D. (Note that we try to write the type name in '''bold'''.) | |||
The '''rotation''' can be viewed as a discrete twist in three dimensional space, and the orientation of an object is how much it has been twisted around from whichever axes we are using - normally the region's axes. | |||
It is a mathematical object called a [[quaternion]]. You can think of a quaternion as four numbers, three of which represent the direction an object is facing and a fourth that represents the object's banking left or right around that direction. The main advantage of using | |||
quaternions is that they are not susceptible to [http://en.wikipedia.org/wiki/Gimbal_Lock gimbal lock]. | quaternions is that they are not susceptible to [http://en.wikipedia.org/wiki/Gimbal_Lock gimbal lock]. | ||
For the complex inner workings of quaternion mathematics, see {{LSLG|quaternion}}. | For the complex inner workings of quaternion mathematics, see {{LSLG|quaternion}}. | ||
For a list of functions and events related to rotations see {{LSLG|Rotation Synopsis}}. | For a list of functions and events related to rotations see {{LSLG|LSL Rotation Synopsis}}. | ||
There is also information about causing textures to rotate in {{LSLG|texture}}s. | There is also information about causing textures to rotate in {{LSLG|texture}}s. | ||
Rotations are often regarded a very confusing subject, where scripters use trial-and-error to get it right. The reasons for this confusion are: | |||
* Nobody really knows what a [[quaternion]] is, or how to think about it (not entirely true, the brain just isn't good at thinking in 4 geometric dimensions). | |||
* There are actually several different types of vectors ('dir', 'vec' and 'pos') that need to acted upon differently. | |||
* The order in which translation and rotations need to be applied can vary from case to case. | |||
* There is confusion about the difference between an applied rotation and the rotation 'offset' between coordinate systems. | |||
To master rotations it is therefore essential to use a good naming system for your variables. Such a system is described in the excellent article [[User:Timmy_Foxclaw/About_Coordinate_Systems_and_Rotations|About Coordinate Systems and Rotations]] by [[User:Timmy_Foxclaw|Timmy Foxclaw]]. | |||
==Other representations== | ==Other representations== | ||
Another way to represent a | ===Euler vector=== | ||
Another way to represent a 3D angle is using three numbers, <X, Y, Z>, which represent the amount which the object is rotated around each axis. This is used in the Edit window, for example, and is generally easy for people to visualize. It is easy to adjust the Rotation <x, y, z> numbers in the Edit window and see how the object behaves. Note that in the Edit window, the numbers are in degrees, that is, a right angle is 90. | |||
For good reasons, such as being able to combine rotations, the four number version, the '''rotation''', is better, though harder for a beginner to grasp. Fortunately it's very seldom necessary to do anything with the actual internal representation of ''rotations'' and there are functions for converting easily back and forth. | In LSL, these three angles are expressed in [[radians]] instead of degrees, that is, a right angle is PI/2. (A radian is sort of a very fat degree.) | ||
Note that these three numbers are a '''vector''' type and not a '''rotation''' type, though it can represent the same information. This is called the ''Euler'' representation of a 3D angle. '''In LSL the rotation around z is done first, then around y, and finally around x'''. | |||
===Axis plus Angle=== | |||
In this method you define an axis of rotation, like defining the axis about which the earth spins, and use that together with the angle of rotation about the axis, which defines the amount of turn, to give the '''rotation'''. | |||
So if you want to define a '''rotation''' about an axis at 45 degrees in the x-y plane (North East in region coordinates), you'd need to point the axis with the same amount of x and y, but with no z. The axis could be <1.0, 1.0, 0.0>. The absolute size of the numbers defining the axis don’t matter in this representation; <2.0, 2.0, 0.0> would work just as well. The angle of rotation is a separate number given in radians, eg. PI/3 = 60 degrees. Together they define a global '''rotation''' of 60 degrees about the North East axis. | |||
Like a quaternion Axis plus Angle uses four numbers, but it doesn't need to be "normalized". | |||
===FWD, LEFT, UP=== | |||
Another way to represent the same 3D angle is to use three vectors, showing what the front is pointing at (fwd), what the top is pointing at (up), and what the left side is pointing at (left). Actually, only two of the three are needed, because any two determines the third. | |||
For good reasons, such as being able to easily combine rotations, the four number version, the quaternion '''rotation''', is better, though perhaps harder for a beginner to grasp. Fortunately it's very seldom necessary to do anything with the actual internal representation of ''rotations'' and there are functions for converting easily back and forth between the three LSL types, and between degrees and radians. | |||
==Right hand rule== | ==Right hand rule== | ||
Line 26: | Line 57: | ||
== Combining Rotations == | == Combining Rotations == | ||
' | |||
Suppose you have two rotations. ''r1'' is rotate 90 degrees to the left, and ''r2'' is rotate 30 degrees to the right. (Any rotations will work; these are just an example.) | |||
You can combine ''r1'' and ''r2'' to make ''r3'' using the '''*''' operator. It doesn't really multiply them, it ''composes'' them. | |||
<source lang="lsl2"> | |||
rotation r3 = r1 * r2; | |||
</source> | |||
The result in this case is that ''r3'' means rotate 60 degrees to the left. | |||
In other words, to combine '''rotations''', you use the '''multiply''' and '''divide''' operators. Don't try to use addition or subtraction operators on '''rotations''', as they will not do what you expect. The '''multiply''' operation applies the rotation in the positive direction, the '''divide''' operation does a negative rotation. You can also negate a rotation directly, just negate the s component, e.g. X.s = -X.s. | |||
Unlike other types such as {{LSLG|float}}, the order in which the operations are done, | Unlike other types such as {{LSLG|float}}, the order in which the operations are done, | ||
Line 39: | Line 77: | ||
Clearly this is a different result from the first rotation, but the order of rotation is the only thing changed. | Clearly this is a different result from the first rotation, but the order of rotation is the only thing changed. | ||
To do a constant rotation you need to define a '''rotation''' value which can be done by creating a {{LSLG|vector}} with the X, Y, Z angles in radians as components (called an Euler angle), then converting that to a '''rotation''' by using the {{LSLG|llEuler2Rot}} function. You can alternately create the native rotation directly: the real part is the cosine of half the angle of rotation, and the vector part is the normalized axis of rotation multiplied by the sine of half the angle of rotation | To do a constant rotation you need to define a '''rotation''' value which can be done by creating a {{LSLG|vector}} with the X, Y, Z angles in radians as components (called an Euler angle), then converting that to a '''rotation''' by using the {{LSLG|llEuler2Rot}} function. To go from a rotation to an Euler angle {{LSLG|vector}} use {{LSLG|llRot2Euler}}. | ||
If you want an axial rotation you insert the axis of rotation and the turn angle into the {{LSLG|llAxisAngle2Rot}} function, and this will return the '''rotation'''. To go from a rotation back to axis and angle, use {{LSLG|llRot2Axis}} and {{LSLG|llRot2Angle}} respectively. | |||
You can alternately create the native rotation directly: the real part is the cosine of half the angle of rotation, and the vector part is the normalized axis of rotation multiplied by the sine of half the angle of rotation. | |||
'''NOTE:''' angles in LSL are in radians, not degrees, but you can easily convert by using the built-in constants [[#RAD_TO_DEG|RAD_TO_DEG]] and [[#DEG_TO_RAD|DEG_TO_RAD]]. For a 30 degree '''rotation''' around the X axis you might use: | '''NOTE:''' angles in LSL are in radians, not degrees, but you can easily convert by using the built-in constants [[#RAD_TO_DEG|RAD_TO_DEG]] and [[#DEG_TO_RAD|DEG_TO_RAD]]. For a 30 degree '''rotation''' around the X axis you might use: | ||
< | <source lang="lsl2"> | ||
rotation rot30X = llEuler2Rot(<30, 0, 0>*DEG_TO_RAD); // convert the degrees to radians, then convert that vector into a rotation, rot30x | |||
vector vec30X = llRot2Euler(rot30X); // convert the rotation back to a vector (the values will be in radians) | |||
rotation rot30X = llAxisAngle2Rot(<1, 0, 0>, 30.0*DEG_TO_RAD); // convert the degrees to radians, then convert into a rotation, rot30x | |||
</source> | |||
</ | |||
== Differences between math's quaternions and LSL rotations == | == Differences between math's quaternions and LSL rotations == | ||
Line 56: | Line 95: | ||
There are a few differences between LSL and maths that have little consequences while scripting, but that might puzzle people with prior mathematical knowledge. So we thought it would be good to list them here: | There are a few differences between LSL and maths that have little consequences while scripting, but that might puzzle people with prior mathematical knowledge. So we thought it would be good to list them here: | ||
* In LSL, all quaternions are normalized (the dot product of R by R is always 1), and therefore represent ways to rotate objects without changing their size. In maths, generic quaternions might be not normalized, and they represent ''affinities'', i.e. a way to rotate '''and''' change the size of objects. | * In LSL, all quaternions are normalized (the dot product of '''R''' by '''R''' is always '''1'''), and therefore represent ways to rotate objects without changing their size. In maths, generic quaternions might be not normalized, and they represent ''affinities'', i.e. a way to rotate '''and''' change the size of objects. | ||
* In LSL, the s term is the fourth member of the rotation: <x, y, z, s>. In maths, the s term, also called "real part", is written as the first coordinate of the quaternion: (s, x, y, z). | * In LSL, the '''s''' term is the fourth member of the rotation: '''<x, y, z, s>'''. In maths, the '''s''' term, also called "real part", is written as the first coordinate of the quaternion: '''(s, x, y, z)'''. | ||
* Multiplication is written in reverse order in LSL and in maths. In LSL, you would write R * S, where in maths you would write S . R. | * Since rotations are assumed to be normalized, rotation division is not equivalent to quaternion division: it is simply multiplication by the conjugate, not including division by the squared norm of the divisor. This must be done manually, if true quaternion division is desired. | ||
* Multiplication is written in reverse order in LSL and in maths. In LSL, you would write '''R * S''', where in maths you would write '''S . R'''. | |||
== Order of rotation for Euler Vectors == | == Order of rotation for Euler Vectors == | ||
Line 74: | Line 114: | ||
This does a '''local''' 30 degree rotation by putting the constant 30 degree '''rotation''' to the left of the object's starting '''rotation''' (myRot). It is like the first operation in the first example above, just twisting the dart 30 degrees around its own long axis. | This does a '''local''' 30 degree rotation by putting the constant 30 degree '''rotation''' to the left of the object's starting '''rotation''' (myRot). It is like the first operation in the first example above, just twisting the dart 30 degrees around its own long axis. | ||
< | <source lang="lsl2"> | ||
rotation localRot = rot30X * myRot;// do a local rotation by multiplying a constant rotation by a world rotation | |||
</source> | |||
To do a '''global''' rotation, use the same '''rotation''' values, but in the opposite order. This is like the second operation in the second example, the dart rotating up and to the right around the world X axis. In this case, the existing rotation (myRot) is rotated 30 degrees around the global X axis. | To do a '''global''' rotation, use the same '''rotation''' values, but in the opposite order. This is like the second operation in the second example, the dart rotating up and to the right around the world X axis. In this case, the existing rotation (myRot) is rotated 30 degrees around the global X axis. | ||
< | <source lang="lsl2"> | ||
rotation globalRot = myRot * rot30X;// do a global rotation by multiplying a world rotation by a constant rotation | |||
</source> | |||
== Another way to think about combining rotations == | == Another way to think about combining rotations == | ||
Line 102: | Line 136: | ||
==Using Rotations == | ==Using Rotations == | ||
You can access the individual components of a '''rotation''' '''R''' by '''R.x, R.y, R.z, & R.s''' ('''not''' R.w). The scalar part R.s is the cosine of half the angle of rotation. The vector part (R.x,R.y,R.z) is the product of the normalized axis of rotation and the sine of half the angle of rotation. You can generate an inverse '''rotation''' by negating the x,y,z members (or by making the s value negative). As an aside, you can also use a '''rotation''' just as a repository of | You can access the individual components of a '''rotation''' '''R''' by '''R.x, R.y, R.z, & R.s''' ('''not''' R.w). The scalar part R.s is the cosine of half the angle of rotation. The vector part (R.x,R.y,R.z) is the product of the normalized axis of rotation and the sine of half the angle of rotation. You can generate an inverse '''rotation''' by negating the x,y,z members (or by making the s value negative). As an aside, you can also use a '''rotation''' just as a repository of [[float]] values, each '''rotation''' stores four of them and a [[list]] consisting of '''rotation''' is more efficient than a [[list]] consisting of [[float]]s, but there is overhead in unpacking them. | ||
< | <source lang="lsl2"> | ||
rotation rot30X = llEuler2Rot(<30, 0, 0> * DEG_TO_RAD );// Create a rotation constant | |||
rotation rotCopy = rot30X; // Just copy it into rotCopy, it copies all 4 float components | |||
float X = rotCopy.x; // Get out the individual components of the rotation | |||
float Y = rotCopy.y; | |||
float Z = rotCopy.z; | |||
float S = rotCopy.s; | |||
rotation anotherCopy = <X, Y, Z, S>; // = <rotCopy.x, rotCopy.y, rotCopy.y, rotCopy.s> | |||
</source> | |||
< | |||
There is a built in constant for a zero '''rotation''' [[#ZERO_ROTATION|ZERO_ROTATION]] which you can use directly or, if you need to invert a '''rotation R''', divide [[#ZERO_ROTATION|ZERO_ROTATION]] by '''R'''. As a reminder from above, this works by first rotating to the zero position, then because it is a divide, rotating in the opposite sense to the original '''rotation''', thereby doing the inverse rotation. | There is a built in constant for a zero '''rotation''' [[#ZERO_ROTATION|ZERO_ROTATION]] which you can use directly or, if you need to invert a '''rotation R''', divide [[#ZERO_ROTATION|ZERO_ROTATION]] by '''R'''. As a reminder from above, this works by first rotating to the zero position, then because it is a divide, rotating in the opposite sense to the original '''rotation''', thereby doing the inverse rotation. | ||
< | <source lang="lsl2"> | ||
rotation rot330X = <-rot30X.x, -rot30X.y, -rot30X.z, rot30X.s>;// invert a rotation - NOTE the s component isn't negated | |||
rotation another330X = ZERO_ROTATION / rot30X; // invert a rotation by division, same result as rot330X | |||
rotation yetanother330X = <rot30X.x, rot30X.y, rot30X.z, -rot30X.s>; // not literally the same but works the same. | |||
</source> | |||
==Single or Root Prims vs Linked Prims vs Attachments == | ==Single or Root Prims vs Linked Prims vs Attachments == | ||
Line 145: | Line 165: | ||
==Rotating Vectors == | ==Rotating Vectors == | ||
In LSL, rotating a | In LSL, rotating a [[vector]] is very useful if you want to move an object in an arc or circle when the center of rotation isn't the center of the object. | ||
This sounds very complex, but there is much less here than meets the eye. Remember from the above discussion of rotating the [[#Combining Rotations|dart]], and replace the physical dart with a [[vector]] whose origin is the tail of the dart, and whose components in X, Y, and Z describe the position of the tip of the dart. Rotating the dart around its tail moves the tip of the dart through and arc whose center of rotation is the tail of the dart. In exactly the same way, rotating a [[vector]] which represents an offset from the center of a prim rotates the prim through the same arc. What this looks like is the object rotates around a position offset by the [[vector]] from the center of the prim. | |||
=== Position of Object Rotated Around A Relative Point === | |||
<source lang="lsl2">rotation vRotArc = llEuler2Rot( <30.0, 0.0, 0.0> * DEG_TO_RAD ); | |||
//-- creates a rotation constant, 30 degrees around the X axis | |||
vector vPosOffset = <0.0, 1.0, 0.0>; | |||
//-- creates an offset one meter in the positive Y direction | |||
vector vPosRotOffset = vPosOffset * vRotArc; | |||
//-- rotates the offset to get the motion caused by the rotation | |||
vector vPosOffsetDiff = vPosOffset - vPosRotOffset; | |||
//-- gets the local difference between the current offset and the rotated one | |||
vector vPosRotDiff = vPosOffsetDiff * llGetRot(); | |||
//-- rotates the difference in the offsets to be relative to the global rotation. | |||
vector vPosNew = llGetPos() + vPosRotDiff; | |||
//-- finds the prims new position by adding the rotated offset difference | |||
rotation vRotNew = vRotArc * llGetRot(); | |||
//-- finds rot to continue facing offset point</source> | |||
:in application, the same action as: | |||
<source lang="lsl2">llSetPrimitiveParams( [PRIM_POSITION, llGetPos() + (vPosOffset - vPosOffset * vRotArc) * llGetRot(), | |||
PRIM_ROTATION, vRotArc * llGetRot()] );</source> | |||
* The above method results in the orbiting object always having the same side facing the center. An alternative that preserves the orbiters rotation is as follows | |||
<source lang="lsl2">llSetPrimitiveParams( [PRIM_POSITION, llGetPos() + (vPosOffset - vPosOffset * vRotArc) * llGetRot()]; | |||
vPosOffset = vPosOffset * vRotArc;</source> | |||
'''Nota Bene:''' Doing this is a move, so don't forget about issues of moving a prim off world, below ground, more than 10 meters etc. Also to get a full orbit, you'll need to repeat the listed steps (in a [[timer]] perhaps). | |||
'''Notice:''' These apply to objects (or root prims if you prefer), child prims should use [[PRIM_POS_LOCAL]] for position, and [[PRIM_ROT_LOCAL]] or [[llGetLocalRot]] for rotation, and the point being rotated around should be relative to the root. | |||
=== Position of Relative Point Around Rotated Object === | |||
To get a point relative to the objects current facing (such as used in rezzors) | To get a point relative to the objects current facing (such as used in rezzors) | ||
< | <source lang="lsl2">vector vPosOffset = <0.0, 0.0, 1.0>; | ||
//-- creates an offset one meter in the positive Z direction. | |||
vector vPosRotOffset = vPosOffset * llGetRot(); | |||
//-- rotate the offset to be relative to objects rotation | |||
vector vPosOffsetIsAt = llGetPos() + vPosRotOffset; | |||
//-- get the region position of the rotated offset</source> | |||
:in application, the same action as: | |||
<source lang="lsl2">llRezAtRoot( "Object", llGetPos() + vPosOffset * llGetRot(), ZERO_VECTOR, ZERO_ROTATION, 0 );</source> | |||
< | ==Normalizing a Rotation == | ||
< | When you need precision, it is often important -- even necessary -- to work with normalized rotations, which means scaling each quaternion so that its ''x, y,'' and ''z'' values are equal to 1. Some operations in LSL will actually generate a run-time error if you do not do this. Looking at it another way, you need to express the rotation in a way that applies an angle of rotation to a vector <1.0,1.0,1.0>. Mathematically, normalizing rotation '''Q''' means calculating | ||
/ | |||
'''Normalized Q = Q / Sqrt( Q.x^2 + Q.y^2 + Q.z^2 + Q.s^2)''' | |||
</ | |||
Putting that in LSL terms: | |||
<source lang="lsl2">rotation NormRot(rotation Q) | |||
{ | |||
float MagQ = llSqrt(Q.x*Q.x + Q.y*Q.y +Q.z*Q.z + Q.s*Q.s); | |||
return <Q.x/MagQ, Q.y/MagQ, Q.z/MagQ, Q.s/MagQ>; | |||
}</source> | |||
: '''Note''': The only methods in LSL for obtaining a de-normalized rotations are [[llAxes2Rot]] (''via inputs which are not mutually orthogonal, or via inputs of different magnitude''), or direct manipulation of the rotation's elements. All other ll* functions return normalized rotations. Use of the preceding example may introduce small floating point errors into normalized rotations due to limited precision. | |||
==Useful Snippets== | ==Useful Snippets== | ||
< | <syntaxhighlight lang="lsl2">integer IsRotation(string s) | ||
{ | { | ||
list split = llParseString2List(s, [" "], ["<", ">", ","]); | list split = llParseString2List(s, [" "], ["<", ">", ","]); | ||
if(llGetListLength(split) != 9)//we must check the list length, or the next test won't work properly. | if(llGetListLength(split) != 9)//we must check the list length, or the next test won't work properly. | ||
return | return FALSE; | ||
return !((string)((rotation)s) == (string)((rotation)((string)llListInsertList(split, ["-"], 7)))); | return !((string)((rotation)s) == (string)((rotation)((string)llListInsertList(split, ["-"], 7)))); | ||
//it works by trying to flip the sign on the S element of the rotation, | //it works by trying to flip the sign on the S element of the rotation, | ||
Line 199: | Line 236: | ||
//if the rotation was already broken then the sign flip will have no affect and the values will match | //if the rotation was already broken then the sign flip will have no affect and the values will match | ||
//we cast back to string so we can catch negative zero which allows for support of <0,0,0,0> | //we cast back to string so we can catch negative zero which allows for support of <0,0,0,0> | ||
}//Strife Onizuka</ | }//Strife Onizuka</syntaxhighlight> | ||
{{CopyAsComment|Calculate a point at distance d in the direction the avatar id is facing}} | |||
<syntaxhighlight lang="lsl2">vector point_in_front_of( key id, float d ) | |||
{ | |||
list pose = llGetObjectDetails( id, [ OBJECT_POS, OBJECT_ROT ] ); | |||
return ( llList2Vector( pose, 0 ) + < d, 0.0, 0.0 > * llList2Rot( pose, 1 ) ); | |||
}// Mephistopheles Thalheimer</syntaxhighlight> | |||
{{CopyAsComment|Rez an object o at a distance d from the end of the z axis.<br> | |||
The object is rezzed oriented to the rezzer}} | |||
<syntaxhighlight lang="lsl2">rez_object_at_end( string o, float d ) | |||
{ | |||
vector s = llGetScale(); | |||
if( llGetInventoryType( o ) == INVENTORY_OBJECT ) | |||
{ | |||
llRezObject( o, llGetPos() + llRot2Up( llGetRot() ) * ( s.z / 2.0 + d ) , ZERO_VECTOR, llGetRot(), 0 ); | |||
} | |||
}// Mephistopheles Thalheimer</syntaxhighlight> | |||
{{CopyAsComment|Scale a rotation:}} | |||
<syntaxhighlight lang="lsl2">rotation ScaleQuat(rotation source, float ratio) | |||
{ | |||
return llAxisAngle2Rot(llRot2Axis(source), ratio * llRot2Angle(source)); | |||
}</syntaxhighlight> | |||
{{CopyAsComment|Constrain a rotation to a given plane, defined by its normal, very useful for vehicles that remain horizontal in turns:<br/> | |||
Note that there is a flaw somewhere in this function, it gives incorrect results in some circumstances.}} | |||
<syntaxhighlight lang="lsl2">rotation ConstrainQuat2Plane(rotation source, vector normal) | |||
{ | |||
return llAxisAngle2Rot(normal, <source.x, source.y, source.z> * normal * llRot2Angle(source)); | |||
} // Jesrad Seraph : minor typo corrected by Rolig Loon</syntaxhighlight> | |||
{{CopyAsComment|Slerp (accurate rotation interpolation) function from [[Slerp]]:}} | |||
<syntaxhighlight lang="lsl2">rotation BlendQuats(rotation a, rotation b, float ratio) | |||
{ | |||
return llAxisAngle2Rot(llRot2Axis(b /= a), ratio * llRot2Angle(b)) * a; | |||
}</syntaxhighlight> | |||
{{CopyAsComment|Nlerp (fast rotation interpolation) function from [[Nlerp]]:}} | |||
<syntaxhighlight lang="lsl2">rotation nlerp(rotation a, rotation b, float t) | |||
{ | |||
float ti = 1-t; | |||
rotation r = <a.x*ti, a.y*ti, a.z*ti, a.s*ti>+<b.x*t, b.y*t, b.z*t, b.s*t>; | |||
float m = llSqrt(r.x*r.x+r.y*r.y+r.z*r.z+r.s*r.s); // normalize | |||
return <r.x/m, r.y/m, r.z/m, r.s/m>; | |||
}</syntaxhighlight> | |||
== Constants == | == Constants == | ||
Line 215: | Line 302: | ||
[[Category:LSL_Types|Rotation]][[Category:LSL_Math]][[Category:LSL_Math/3D]][[Category: | [[Category:LSL_Types|Rotation]][[Category:LSL_Math]][[Category:LSL_Math/3D]][[Category:LSL Rotation]] |
Latest revision as of 08:18, 11 March 2024
LSL Portal | Functions | Events | Types | Operators | Constants | Flow Control | Script Library | Categorized Library | Tutorials |
Rotation
A rotation is a data type that contains a set of four float values.
Each element can be accessed individually by appending .x
, .y
, .z
, or .s
to the variable name.
rotation rot;
float x = rot.x;
float y = rot.y;
float z = rot.z;
float s = rot.s;
The LSL rotation type is one of several ways to represent an orientation in 3D. (Note that we try to write the type name in bold.)
The rotation can be viewed as a discrete twist in three dimensional space, and the orientation of an object is how much it has been twisted around from whichever axes we are using - normally the region's axes.
It is a mathematical object called a quaternion. You can think of a quaternion as four numbers, three of which represent the direction an object is facing and a fourth that represents the object's banking left or right around that direction. The main advantage of using quaternions is that they are not susceptible to gimbal lock. For the complex inner workings of quaternion mathematics, see quaternion. For a list of functions and events related to rotations see LSL Rotation Synopsis. There is also information about causing textures to rotate in textures.
Rotations are often regarded a very confusing subject, where scripters use trial-and-error to get it right. The reasons for this confusion are:
- Nobody really knows what a quaternion is, or how to think about it (not entirely true, the brain just isn't good at thinking in 4 geometric dimensions).
- There are actually several different types of vectors ('dir', 'vec' and 'pos') that need to acted upon differently.
- The order in which translation and rotations need to be applied can vary from case to case.
- There is confusion about the difference between an applied rotation and the rotation 'offset' between coordinate systems.
To master rotations it is therefore essential to use a good naming system for your variables. Such a system is described in the excellent article About Coordinate Systems and Rotations by Timmy Foxclaw.
Other representations
Euler vector
Another way to represent a 3D angle is using three numbers, <X, Y, Z>, which represent the amount which the object is rotated around each axis. This is used in the Edit window, for example, and is generally easy for people to visualize. It is easy to adjust the Rotation <x, y, z> numbers in the Edit window and see how the object behaves. Note that in the Edit window, the numbers are in degrees, that is, a right angle is 90.
In LSL, these three angles are expressed in radians instead of degrees, that is, a right angle is PI/2. (A radian is sort of a very fat degree.) Note that these three numbers are a vector type and not a rotation type, though it can represent the same information. This is called the Euler representation of a 3D angle. In LSL the rotation around z is done first, then around y, and finally around x.
Axis plus Angle
In this method you define an axis of rotation, like defining the axis about which the earth spins, and use that together with the angle of rotation about the axis, which defines the amount of turn, to give the rotation.
So if you want to define a rotation about an axis at 45 degrees in the x-y plane (North East in region coordinates), you'd need to point the axis with the same amount of x and y, but with no z. The axis could be <1.0, 1.0, 0.0>. The absolute size of the numbers defining the axis don’t matter in this representation; <2.0, 2.0, 0.0> would work just as well. The angle of rotation is a separate number given in radians, eg. PI/3 = 60 degrees. Together they define a global rotation of 60 degrees about the North East axis.
Like a quaternion Axis plus Angle uses four numbers, but it doesn't need to be "normalized".
FWD, LEFT, UP
Another way to represent the same 3D angle is to use three vectors, showing what the front is pointing at (fwd), what the top is pointing at (up), and what the left side is pointing at (left). Actually, only two of the three are needed, because any two determines the third.
For good reasons, such as being able to easily combine rotations, the four number version, the quaternion rotation, is better, though perhaps harder for a beginner to grasp. Fortunately it's very seldom necessary to do anything with the actual internal representation of rotations and there are functions for converting easily back and forth between the three LSL types, and between degrees and radians.
Right hand rule
In LSL all rotations are done according to the right hand rule. With your right hand, extend the first finger in the direction of the positive direction of the x-axis. Extend your second finger at right angles to your first finger, it will point along the positive y-axis, and your thumb, extended at right angles to both will point along the positive z-axis. When you're editing an object, the three colored axis arrows point in the positive direction for each axis (X: red, Y: green, Z: blue).
http://en.wikipedia.org/wiki/Right_hand_rule
Now, don't remove your right hand just yet, there is another use for it, determining the direction of a positive rotation. Make a fist with your right hand, thumb extended and pointing in the positive direction of the axis you are interested in. Your fingers curl around in the direction of positive rotation. Rotations around the X, Y, and Z axis are often referred to as Roll, Pitch, and Yaw, particularly for vehicles.
Combining Rotations
' Suppose you have two rotations. r1 is rotate 90 degrees to the left, and r2 is rotate 30 degrees to the right. (Any rotations will work; these are just an example.) You can combine r1 and r2 to make r3 using the * operator. It doesn't really multiply them, it composes them.
rotation r3 = r1 * r2;
The result in this case is that r3 means rotate 60 degrees to the left.
In other words, to combine rotations, you use the multiply and divide operators. Don't try to use addition or subtraction operators on rotations, as they will not do what you expect. The multiply operation applies the rotation in the positive direction, the divide operation does a negative rotation. You can also negate a rotation directly, just negate the s component, e.g. X.s = -X.s.
Unlike other types such as float, the order in which the operations are done, non-commutative, is important. The reason for this is simple: the order you do rotations in is important in RL. For example, if you had a dart with four feathers, started from rotation <0, 0, 0> with its tail on the origin, it would lie on the X axis with its point aimed in the positive X direction, its feathers along the Z and Y axes, and the axes of the dart and the axes of the world would be aligned. We're going to rotate it 45 degrees around X and 30 degrees around Y, but in different orders.
First, after rotating 45 deg around X the dart would still be on the X axis, unmoved, just turned along its long axis, so the feathers would be at 45 deg to the axes. Then rotating 30 deg around Y would move it in the XZ plane to point down 30 deg from the X axis (remember the right hand rule for rotations means a small positive rotation around Y moves the point down). The dart winds up pointing 30 deg down, in the same vertical plane it started in, but turned around its own long axis so the feathers are no longer up and down.
If you did it the other way, first rotating 30 deg in Y, the dart would rotate down in the XZ plane, but notice that it no longer is on the X axis; its X axis and the world's aren't aligned any more. Now a 45 degree rotation around the X axis would pivot the dart around its tail, the point following a 30 deg cone whose axis is along the positive world X axis, for 45 degrees up and to the right. If you were looking down the X axis, it would pivot from pointing 30 deg below the X axis, up and to the right, out of the XZ plane, to a point below the 1st quadrant in the XY plane, its feathers rotating as it went.
Clearly this is a different result from the first rotation, but the order of rotation is the only thing changed.
To do a constant rotation you need to define a rotation value which can be done by creating a vector with the X, Y, Z angles in radians as components (called an Euler angle), then converting that to a rotation by using the llEuler2Rot function. To go from a rotation to an Euler angle vector use llRot2Euler.
If you want an axial rotation you insert the axis of rotation and the turn angle into the llAxisAngle2Rot function, and this will return the rotation. To go from a rotation back to axis and angle, use llRot2Axis and llRot2Angle respectively.
You can alternately create the native rotation directly: the real part is the cosine of half the angle of rotation, and the vector part is the normalized axis of rotation multiplied by the sine of half the angle of rotation.
NOTE: angles in LSL are in radians, not degrees, but you can easily convert by using the built-in constants RAD_TO_DEG and DEG_TO_RAD. For a 30 degree rotation around the X axis you might use:
rotation rot30X = llEuler2Rot(<30, 0, 0>*DEG_TO_RAD); // convert the degrees to radians, then convert that vector into a rotation, rot30x
vector vec30X = llRot2Euler(rot30X); // convert the rotation back to a vector (the values will be in radians)
rotation rot30X = llAxisAngle2Rot(<1, 0, 0>, 30.0*DEG_TO_RAD); // convert the degrees to radians, then convert into a rotation, rot30x
Differences between math's quaternions and LSL rotations
There are a few differences between LSL and maths that have little consequences while scripting, but that might puzzle people with prior mathematical knowledge. So we thought it would be good to list them here:
- In LSL, all quaternions are normalized (the dot product of R by R is always 1), and therefore represent ways to rotate objects without changing their size. In maths, generic quaternions might be not normalized, and they represent affinities, i.e. a way to rotate and change the size of objects.
- In LSL, the s term is the fourth member of the rotation: <x, y, z, s>. In maths, the s term, also called "real part", is written as the first coordinate of the quaternion: (s, x, y, z).
- Since rotations are assumed to be normalized, rotation division is not equivalent to quaternion division: it is simply multiplication by the conjugate, not including division by the squared norm of the divisor. This must be done manually, if true quaternion division is desired.
- Multiplication is written in reverse order in LSL and in maths. In LSL, you would write R * S, where in maths you would write S . R.
Order of rotation for Euler Vectors
From the above discussion, it's clear that when dealing with rotations around more than one axis, the order they are done in is critical. In the Euler discussion above this was kind of glossed over a bit, the individual rotations around the three axis define an overall rotation, but that begs the question: What axis order are the rotations done in? The answer is Z, Y, X in global coordinates. If you are trying to rotate an object around more than one axis at a time using the Euler representation, determine the correct Euler vector using the Z, Y, X rotation order, then use the llEuler2Rot function to get the rotation for use in combining rotations or applying the rotation to the object.
Local vs Global (World) rotations
It is important to distinguish between the rotation relative to the world, and the rotation relative to the local object itself. In the editor, you can switch back and forth from one to the other. In a script, you must convert from one to the other to get the desired behavior.
Local rotations are ones done around the axes embedded in the object itself forward/back, left/right, up/down, irrespective of how the object is rotated in the world. Global rotations are ones done around the world axes, North/South, East/West, Higher/Lower. You can see the difference by rotating a prim, then edit it and change the axes settings between local and global, notice how the colored axes arrows change.
In LSL, the difference between doing a local or global rotation is the order the rotations are evaluated in the statement.
This does a local 30 degree rotation by putting the constant 30 degree rotation to the left of the object's starting rotation (myRot). It is like the first operation in the first example above, just twisting the dart 30 degrees around its own long axis.
rotation localRot = rot30X * myRot;// do a local rotation by multiplying a constant rotation by a world rotation
To do a global rotation, use the same rotation values, but in the opposite order. This is like the second operation in the second example, the dart rotating up and to the right around the world X axis. In this case, the existing rotation (myRot) is rotated 30 degrees around the global X axis.
rotation globalRot = myRot * rot30X;// do a global rotation by multiplying a world rotation by a constant rotation
Another way to think about combining rotations
You may want to think about this local vs global difference by considering that rotations are done in evaluation order, that is left to right except for parenthesized expressions.
In the localRot case, what happened was that starting from <0, 0, 0>, the rot30X was done first, rotating the prim around the world X axis, but since when it's unrotated, the local and global axes are identical it has the effect of doing the rotation around the object's local X axis. Then the second rotation myRot was done which rotated the prim to its original rotation, but now with the additional X axis rotation baked in. What this looks like is that the prim rotated in place, around its own X axis, with the Y and Z rotations unchanged, a local rotation.
In the globalRot case, again starting from <0, 0, 0>, first the object is rotated to its original rotation (myRot), but now the object's axes and the world's axes are no longer aligned! So, the second rotation rot30x does exactly what it did in the local case, rotates the object 30 degrees around the world X axis, but the effect is to rotate the object through a cone around the world X axis since the object's X axis and the world's X axis aren't the same this time. What this looks like is that the prim pivoted 30 degrees around the world X axis, hence a global rotation.
Division of rotations has the effect of doing the rotation in the opposite direction, multiplying by a 330 degree rotation is the same as dividing by a 30 degree rotation.
Using Rotations
You can access the individual components of a rotation R by R.x, R.y, R.z, & R.s (not R.w). The scalar part R.s is the cosine of half the angle of rotation. The vector part (R.x,R.y,R.z) is the product of the normalized axis of rotation and the sine of half the angle of rotation. You can generate an inverse rotation by negating the x,y,z members (or by making the s value negative). As an aside, you can also use a rotation just as a repository of float values, each rotation stores four of them and a list consisting of rotation is more efficient than a list consisting of floats, but there is overhead in unpacking them.
rotation rot30X = llEuler2Rot(<30, 0, 0> * DEG_TO_RAD );// Create a rotation constant
rotation rotCopy = rot30X; // Just copy it into rotCopy, it copies all 4 float components
float X = rotCopy.x; // Get out the individual components of the rotation
float Y = rotCopy.y;
float Z = rotCopy.z;
float S = rotCopy.s;
rotation anotherCopy = <X, Y, Z, S>; // = <rotCopy.x, rotCopy.y, rotCopy.y, rotCopy.s>
There is a built in constant for a zero rotation ZERO_ROTATION which you can use directly or, if you need to invert a rotation R, divide ZERO_ROTATION by R. As a reminder from above, this works by first rotating to the zero position, then because it is a divide, rotating in the opposite sense to the original rotation, thereby doing the inverse rotation.
rotation rot330X = <-rot30X.x, -rot30X.y, -rot30X.z, rot30X.s>;// invert a rotation - NOTE the s component isn't negated
rotation another330X = ZERO_ROTATION / rot30X; // invert a rotation by division, same result as rot330X
rotation yetanother330X = <rot30X.x, rot30X.y, rot30X.z, -rot30X.s>; // not literally the same but works the same.
Single or Root Prims vs Linked Prims vs Attachments
The reason for talking about single or linked prim rotations is that for things like doors on vehicles, the desired motion is to move the door relative to the vehicle, no matter what the rotation of the overall vehicle is. While possible to do this with global rotations, it would quickly grow tedious. There are generally three coordinate systems a prim can be in: all alone, part of a linkset, or part of an attachment. When a prim is alone, i.e., not part of a linkset, it acts like a root prim; when it is part of an attachment, it acts differently and is a bit broken.
Function | Ground (rez'ed) Prims | Attached Prims | ||
---|---|---|---|---|
Root | Children | Root | Children | |
llGetRot llGPP:PRIM_ROTATION llGetObjectDetails |
global rotation of prim | global rotation of prim | global rotation of avatar | global rotation of avatar * global rotation of prim (Not Useful) |
llGetLocalRot llGPP:PRIM_ROT_LOCAL |
global rotation of prim | rotation of prim relative to root prim | rotation of attachment relative to attach point | rotation of prim relative to root prim |
llGetRootRotation | global rotation of prim | global rotation of root prim | global rotation of avatar | global rotation of avatar |
llSetRot* llSPP:PRIM_ROTATION* |
set global rotation | complicated, see llSetRot | set rotation relative to attach point | set rotation to root attachment rotation * new_rot. |
llSetLocalRot* llSPP:PRIM_ROT_LOCAL* |
set global rotation | set rotation of prim relative to root prim | set rotation relative to attach point | set rotation of prim relative to root prim |
llTargetOmega† ll[GS]PP:PRIM_OMEGA |
spin linkset around prim's location | spin prim around its location | spin linkset around attach point | spin prim around its location |
* | Physical objects which are not children in a linkset will not respond to setting rotations. |
† | For non-Physical objects llTargetOmega is executed on the client side, providing a simple low lag method to do smooth continuous rotation. |
Rotating Vectors
In LSL, rotating a vector is very useful if you want to move an object in an arc or circle when the center of rotation isn't the center of the object.
This sounds very complex, but there is much less here than meets the eye. Remember from the above discussion of rotating the dart, and replace the physical dart with a vector whose origin is the tail of the dart, and whose components in X, Y, and Z describe the position of the tip of the dart. Rotating the dart around its tail moves the tip of the dart through and arc whose center of rotation is the tail of the dart. In exactly the same way, rotating a vector which represents an offset from the center of a prim rotates the prim through the same arc. What this looks like is the object rotates around a position offset by the vector from the center of the prim.
Position of Object Rotated Around A Relative Point
rotation vRotArc = llEuler2Rot( <30.0, 0.0, 0.0> * DEG_TO_RAD );
//-- creates a rotation constant, 30 degrees around the X axis
vector vPosOffset = <0.0, 1.0, 0.0>;
//-- creates an offset one meter in the positive Y direction
vector vPosRotOffset = vPosOffset * vRotArc;
//-- rotates the offset to get the motion caused by the rotation
vector vPosOffsetDiff = vPosOffset - vPosRotOffset;
//-- gets the local difference between the current offset and the rotated one
vector vPosRotDiff = vPosOffsetDiff * llGetRot();
//-- rotates the difference in the offsets to be relative to the global rotation.
vector vPosNew = llGetPos() + vPosRotDiff;
//-- finds the prims new position by adding the rotated offset difference
rotation vRotNew = vRotArc * llGetRot();
//-- finds rot to continue facing offset point
- in application, the same action as:
llSetPrimitiveParams( [PRIM_POSITION, llGetPos() + (vPosOffset - vPosOffset * vRotArc) * llGetRot(),
PRIM_ROTATION, vRotArc * llGetRot()] );
- The above method results in the orbiting object always having the same side facing the center. An alternative that preserves the orbiters rotation is as follows
llSetPrimitiveParams( [PRIM_POSITION, llGetPos() + (vPosOffset - vPosOffset * vRotArc) * llGetRot()];
vPosOffset = vPosOffset * vRotArc;
Nota Bene: Doing this is a move, so don't forget about issues of moving a prim off world, below ground, more than 10 meters etc. Also to get a full orbit, you'll need to repeat the listed steps (in a timer perhaps).
Notice: These apply to objects (or root prims if you prefer), child prims should use PRIM_POS_LOCAL for position, and PRIM_ROT_LOCAL or llGetLocalRot for rotation, and the point being rotated around should be relative to the root.
Position of Relative Point Around Rotated Object
To get a point relative to the objects current facing (such as used in rezzors)
vector vPosOffset = <0.0, 0.0, 1.0>;
//-- creates an offset one meter in the positive Z direction.
vector vPosRotOffset = vPosOffset * llGetRot();
//-- rotate the offset to be relative to objects rotation
vector vPosOffsetIsAt = llGetPos() + vPosRotOffset;
//-- get the region position of the rotated offset
- in application, the same action as:
llRezAtRoot( "Object", llGetPos() + vPosOffset * llGetRot(), ZERO_VECTOR, ZERO_ROTATION, 0 );
Normalizing a Rotation
When you need precision, it is often important -- even necessary -- to work with normalized rotations, which means scaling each quaternion so that its x, y, and z values are equal to 1. Some operations in LSL will actually generate a run-time error if you do not do this. Looking at it another way, you need to express the rotation in a way that applies an angle of rotation to a vector <1.0,1.0,1.0>. Mathematically, normalizing rotation Q means calculating
Normalized Q = Q / Sqrt( Q.x^2 + Q.y^2 + Q.z^2 + Q.s^2)
Putting that in LSL terms:
rotation NormRot(rotation Q)
{
float MagQ = llSqrt(Q.x*Q.x + Q.y*Q.y +Q.z*Q.z + Q.s*Q.s);
return <Q.x/MagQ, Q.y/MagQ, Q.z/MagQ, Q.s/MagQ>;
}
- Note: The only methods in LSL for obtaining a de-normalized rotations are llAxes2Rot (via inputs which are not mutually orthogonal, or via inputs of different magnitude), or direct manipulation of the rotation's elements. All other ll* functions return normalized rotations. Use of the preceding example may introduce small floating point errors into normalized rotations due to limited precision.
Useful Snippets
integer IsRotation(string s)
{
list split = llParseString2List(s, [" "], ["<", ">", ","]);
if(llGetListLength(split) != 9)//we must check the list length, or the next test won't work properly.
return FALSE;
return !((string)((rotation)s) == (string)((rotation)((string)llListInsertList(split, ["-"], 7))));
//it works by trying to flip the sign on the S element of the rotation,
//if it works or breaks the rotation then the values won't match.
//if the rotation was already broken then the sign flip will have no affect and the values will match
//we cast back to string so we can catch negative zero which allows for support of <0,0,0,0>
}//Strife Onizuka
Calculate a point at distance d in the direction the avatar id is facing
vector point_in_front_of( key id, float d )
{
list pose = llGetObjectDetails( id, [ OBJECT_POS, OBJECT_ROT ] );
return ( llList2Vector( pose, 0 ) + < d, 0.0, 0.0 > * llList2Rot( pose, 1 ) );
}// Mephistopheles Thalheimer
Rez an object o at a distance d from the end of the z axis.
The object is rezzed oriented to the rezzer
rez_object_at_end( string o, float d )
{
vector s = llGetScale();
if( llGetInventoryType( o ) == INVENTORY_OBJECT )
{
llRezObject( o, llGetPos() + llRot2Up( llGetRot() ) * ( s.z / 2.0 + d ) , ZERO_VECTOR, llGetRot(), 0 );
}
}// Mephistopheles Thalheimer
Scale a rotation:
rotation ScaleQuat(rotation source, float ratio)
{
return llAxisAngle2Rot(llRot2Axis(source), ratio * llRot2Angle(source));
}
Note that there is a flaw somewhere in this function, it gives incorrect results in some circumstances.
rotation ConstrainQuat2Plane(rotation source, vector normal)
{
return llAxisAngle2Rot(normal, <source.x, source.y, source.z> * normal * llRot2Angle(source));
} // Jesrad Seraph : minor typo corrected by Rolig Loon
rotation BlendQuats(rotation a, rotation b, float ratio)
{
return llAxisAngle2Rot(llRot2Axis(b /= a), ratio * llRot2Angle(b)) * a;
}
rotation nlerp(rotation a, rotation b, float t)
{
float ti = 1-t;
rotation r = <a.x*ti, a.y*ti, a.z*ti, a.s*ti>+<b.x*t, b.y*t, b.z*t, b.s*t>;
float m = llSqrt(r.x*r.x+r.y*r.y+r.z*r.z+r.s*r.s); // normalize
return <r.x/m, r.y/m, r.z/m, r.s/m>;
}
Constants
ZERO_ROTATION
ZERO_ROTATION = <0.0, 0.0, 0.0, 1.0>;
A rotation constant representing a Euler angle of <0.0, 0.0, 0.0>.
DEG_TO_RAD
DEG_TO_RAD = 0.01745329238f;
A float constant that when multiplied by an angle in degrees gives the angle in radians.
RAD_TO_DEG
RAD_TO_DEG = 57.29578f;
A float constant when multiplied by an angle in radians gives the angle in degrees.