Difference between revisions of "LlRot2Left"

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{{LSL_Function
{{LSL Function
|func_id=19|func_sleep=0.0|func_energy=10.0
|func_id=19|func_sleep=0.0|func_energy=10.0
|func=llRot2Left|sort=Rot2Left
|func=llRot2Left|sort=Rot2Left
|return_type=vector|p1_type=rotation|p1_name=q
|return_type=vector|p1_type=rotation|p1_name=q
|func_desc=Computes the orientation of the {{HoverText|local y-axis|left-direction of prim}} relative to {{HoverLink|Viewer_coordinate_frames#Global|global coordinate system|the earth}}.
|func_desc=Computes the orientation of the {{HoverText|local y-axis|left-direction of prim}} relative to the parent (i.e. relative to the root prim or the world).
|return_text=that is the left vector defined by '''q''', i.e. a unit vector pointing in the local positive Y direction
|return_text=that is the left vector defined by {{LSLP|q}}, i.e. a unit vector pointing in the local positive Y direction
|func_footnote=Can be useful to identify the orientation of the local {{Wikipedia|Sagittal_plane|sagittal-plane}} of the prim, since it's y-axis is always perpendicular to this local sagittal-plane.
|spec=Mathematically equivalent to:
|spec=Mathematically equivalent to:
<lsl>ret = llVecNorm(<0., 1., 0.> * q);</lsl>
<source lang="lsl2">ret = llVecNorm(<0., 1., 0.> * q);</source>
If '''q''' is known to be a unit quaternion then it can be simplified as:
If {{LSLP|q}} is known to be a unit quaternion then it can be simplified as:
<lsl>ret = <0., 1., 0.> * q;</lsl>
<source lang="lsl2">ret = <0., 1., 0.> * q;</source>
Keep in mind that object and agent rotations will always be unit quaternions. For example, <0.0, 1.0, 0.0>*llGetRot() is about 25-30% faster than llRot2Left(llGetRot()) depending on the VM used. If done often and at extremely fast rates, it can be advantageous to even save <0.0, 1.0, 0.0> to a local/global variable and reuse it.
|caveats
|caveats
|constants
|constants
|examples
|examples=
<source lang="lsl2">
// Move an object 5 metres forwards along its own y axis, when touched, no matter how the object is oriented in world.
// Works for a root or child prim
default
{
    touch_start(integer total_number)
    {
        vector v = llRot2Left( llGetLocalRot() );
        llSetPos( llGetLocalPos() + v * 5 );
    }
}
</source>
|helpers
|helpers
|also_functions={{LSL DefineRow||[[llRot2Up]]|}}
|also_functions={{LSL DefineRow||[[llRot2Up]]|}}
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|also_events
|also_events
|also_articles
|also_articles
|notes
|notes=Can be useful to identify the orientation of the local {{Wikipedia|sagittal plane|sagittal-plane}} of the prim, since it's y-axis is always perpendicular to this local sagittal-plane.
|cat1=Rotation
|cat1=Rotation
|cat2
|cat2

Latest revision as of 13:36, 22 January 2015

Summary

Function: vector llRot2Left( rotation q );
0.0 Forced Delay
10.0 Energy

Computes the orientation of the local y-axis relative to the parent (i.e. relative to the root prim or the world).
Returns a vector that is the left vector defined by q, i.e. a unit vector pointing in the local positive Y direction

• rotation q

Specification

Mathematically equivalent to:

ret = llVecNorm(<0., 1., 0.> * q);

If q is known to be a unit quaternion then it can be simplified as:

ret = <0., 1., 0.> * q;

Keep in mind that object and agent rotations will always be unit quaternions. For example, <0.0, 1.0, 0.0>*llGetRot() is about 25-30% faster than llRot2Left(llGetRot()) depending on the VM used. If done often and at extremely fast rates, it can be advantageous to even save <0.0, 1.0, 0.0> to a local/global variable and reuse it.

Examples

// Move an object 5 metres forwards along its own y axis, when touched, no matter how the object is oriented in world.
// Works for a root or child prim
default
{
    touch_start(integer total_number)
    {
        vector v = llRot2Left( llGetLocalRot() );
        llSetPos( llGetLocalPos() + v * 5 );
    }
}

Notes

Can be useful to identify the orientation of the local "Wikipedia logo"sagittal-plane of the prim, since it's y-axis is always perpendicular to this local sagittal-plane.

See Also

Functions

•  llRot2Up
•  llRot2Fwd
•  llRot2Axis
•  llRot2Angle

Deep Notes

Signature

function vector llRot2Left( rotation q );