Difference between revisions of "LlAxes2Rot"
Jump to navigation
Jump to search
Search JIRA for related Issues
m |
|||
| Line 9: | Line 9: | ||
|return_text=that is defined by the 3 coordinate axes | |return_text=that is defined by the 3 coordinate axes | ||
|notes=Technically, only the first two vectors are needed to define this rotation, which can be done by calling any of these: | |notes=Technically, only the first two vectors are needed to define this rotation, which can be done by calling any of these: | ||
< | <source lang="lsl2">llAxes2Rot(fwd, left, fwd % left); | ||
llAxes2Rot(left % up, left, up); | llAxes2Rot(left % up, left, up); | ||
llAxes2Rot(fwd, up % fwd, up);</ | llAxes2Rot(fwd, up % fwd, up);</source> | ||
|spec | |spec | ||
|caveats | |caveats | ||
|examples=< | |examples=<source lang="lsl2">default | ||
{ | { | ||
state_entry() | state_entry() | ||
| Line 26: | Line 26: | ||
llSay(0, (string) (llRot2Euler(rot) * RAD_TO_DEG) ); | llSay(0, (string) (llRot2Euler(rot) * RAD_TO_DEG) ); | ||
} | } | ||
}</ | }</source> | ||
This script displays: | This script displays: | ||
Revision as of 23:39, 21 January 2015
| LSL Portal | Functions | Events | Types | Operators | Constants | Flow Control | Script Library | Categorized Library | Tutorials |
Summary
Function: rotation llAxes2Rot( vector fwd, vector left, vector up );| 17 | Function ID |
| 0.0 | Forced Delay |
| 10.0 | Energy |
Returns a rotation that is defined by the 3 coordinate axes
| • vector | fwd | |||
| • vector | left | |||
| • vector | up |
All three vectors must be mutually orthogonal unit vectors.
Caveats
Examples
default
{
state_entry()
{
vector i = < 1.0, 0.0, 0.0>;
vector j = < 0.0, 1.0, 0.0>;
vector k = < 0.0, 0.0, 1.0>;
rotation rot = llAxes2Rot( j, -i, k );
llSay(0, (string) (llRot2Euler(rot) * RAD_TO_DEG) );
}
}
This script displays:
Object: <-0.00000, 0.00000, 90.00000>which shows that (j, -i, k) is obtained by rotating (i, j, k) 90 degrees around z direction.
Notes
Technically, only the first two vectors are needed to define this rotation, which can be done by calling any of these:
llAxes2Rot(fwd, left, fwd % left);
llAxes2Rot(left % up, left, up);
llAxes2Rot(fwd, up % fwd, up);
Deep Notes
Tests
| • | Visual illustration | – | Importance of mutually orthogonal unit vectors |
Signature |
|---|
function rotation llAxes2Rot( vector fwd, vector left, vector up ); |