Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q7370306> ?p ?o }
- Q7370306 subject Q7332881.
- Q7370306 subject Q7446336.
- Q7370306 subject Q8426343.
- Q7370306 subject Q8682964.
- Q7370306 abstract "In geometry, various formalisms exist to express a rotation in three dimensions as a mathematical transformation. In physics, this concept is applied to classical mechanics where rotational (or angular) kinematics is the science of quantitative description of a purely rotational motion. The orientation of an object at a given instant is described with the same tools, as it is defined as an imaginary rotation from a reference placement in space, rather than an actually observed rotation from a previous placement in space.According to Euler's rotation theorem the rotation of a rigid body (or three-dimensional coordinate system with the fixed origin) is described by a single rotation about some axis. Such a rotation may be uniquely described by a minimum of three real parameters. However, for various reasons, there are several ways to represent it. Many of these representations use more than the necessary minimum of three parameters, although each of them still has only three degrees of freedom.An example where rotation representation is used is in computer vision, where an automated observer needs to track a target. Let's consider a rigid body, with three orthogonal unit vectors fixed to its body (representing the three axes of the object's local coordinate system). The basic problem is to specify the orientation of these three unit vectors, and hence the rigid body, with respect to the observer's coordinate system, regarded as a reference placement in space.".
- Q7370306 wikiPageExternalLink Cayley-KleinParameters.html.
- Q7370306 wikiPageExternalLink index.htm.
- Q7370306 wikiPageExternalLink Q36.
- Q7370306 wikiPageExternalLink Q37.
- Q7370306 wikiPageExternalLink SECTION00030000000000000000.
- Q7370306 wikiPageExternalLink dcm_tutorial.html.
- Q7370306 wikiPageWikiLink Q104225.
- Q7370306 wikiPageWikiLink Q107617.
- Q7370306 wikiPageWikiLink Q11210.
- Q7370306 wikiPageWikiLink Q11397.
- Q7370306 wikiPageWikiLink Q11465.
- Q7370306 wikiPageWikiLink Q11476.
- Q7370306 wikiPageWikiLink Q11567.
- Q7370306 wikiPageWikiLink Q117879.
- Q7370306 wikiPageWikiLink Q1186649.
- Q7370306 wikiPageWikiLink Q1190812.
- Q7370306 wikiPageWikiLink Q1256564.
- Q7370306 wikiPageWikiLink Q125977.
- Q7370306 wikiPageWikiLink Q1268589.
- Q7370306 wikiPageWikiLink Q1289248.
- Q7370306 wikiPageWikiLink Q12916.
- Q7370306 wikiPageWikiLink Q1366301.
- Q7370306 wikiPageWikiLink Q1473494.
- Q7370306 wikiPageWikiLink Q1477782.
- Q7370306 wikiPageWikiLink Q15629907.
- Q7370306 wikiPageWikiLink Q1639491.
- Q7370306 wikiPageWikiLink Q165474.
- Q7370306 wikiPageWikiLink Q17295.
- Q7370306 wikiPageWikiLink Q173853.
- Q7370306 wikiPageWikiLink Q17596816.
- Q7370306 wikiPageWikiLink Q178192.
- Q7370306 wikiPageWikiLink Q178546.
- Q7370306 wikiPageWikiLink Q184199.
- Q7370306 wikiPageWikiLink Q188722.
- Q7370306 wikiPageWikiLink Q189569.
- Q7370306 wikiPageWikiLink Q190009.
- Q7370306 wikiPageWikiLink Q190524.
- Q7370306 wikiPageWikiLink Q192788.
- Q7370306 wikiPageWikiLink Q193794.
- Q7370306 wikiPageWikiLink Q193796.
- Q7370306 wikiPageWikiLink Q1962728.
- Q7370306 wikiPageWikiLink Q206925.
- Q7370306 wikiPageWikiLink Q207643.
- Q7370306 wikiPageWikiLink Q211459.
- Q7370306 wikiPageWikiLink Q214159.
- Q7370306 wikiPageWikiLink Q2145211.
- Q7370306 wikiPageWikiLink Q2235286.
- Q7370306 wikiPageWikiLink Q2339425.
- Q7370306 wikiPageWikiLink Q2365325.
- Q7370306 wikiPageWikiLink Q2377336.
- Q7370306 wikiPageWikiLink Q244761.
- Q7370306 wikiPageWikiLink Q2480745.
- Q7370306 wikiPageWikiLink Q2518235.
- Q7370306 wikiPageWikiLink Q2634405.
- Q7370306 wikiPageWikiLink Q288465.
- Q7370306 wikiPageWikiLink Q2995427.
- Q7370306 wikiPageWikiLink Q309314.
- Q7370306 wikiPageWikiLink Q321102.
- Q7370306 wikiPageWikiLink Q333871.
- Q7370306 wikiPageWikiLink Q336233.
- Q7370306 wikiPageWikiLink Q3375355.
- Q7370306 wikiPageWikiLink Q36255.
- Q7370306 wikiPageWikiLink Q382698.
- Q7370306 wikiPageWikiLink Q40735.
- Q7370306 wikiPageWikiLink Q4262277.
- Q7370306 wikiPageWikiLink Q44946.
- Q7370306 wikiPageWikiLink Q526016.
- Q7370306 wikiPageWikiLink Q5408993.
- Q7370306 wikiPageWikiLink Q541961.
- Q7370306 wikiPageWikiLink Q62912.
- Q7370306 wikiPageWikiLink Q641888.
- Q7370306 wikiPageWikiLink Q64861.
- Q7370306 wikiPageWikiLink Q663908.
- Q7370306 wikiPageWikiLink Q681406.
- Q7370306 wikiPageWikiLink Q715746.
- Q7370306 wikiPageWikiLink Q7198892.
- Q7370306 wikiPageWikiLink Q7201016.
- Q7370306 wikiPageWikiLink Q7332881.
- Q7370306 wikiPageWikiLink Q7370315.
- Q7370306 wikiPageWikiLink Q7446336.
- Q7370306 wikiPageWikiLink Q751290.
- Q7370306 wikiPageWikiLink Q765633.
- Q7370306 wikiPageWikiLink Q776598.
- Q7370306 wikiPageWikiLink Q79782.
- Q7370306 wikiPageWikiLink Q8087.
- Q7370306 wikiPageWikiLink Q837414.
- Q7370306 wikiPageWikiLink Q8426343.
- Q7370306 wikiPageWikiLink Q844240.
- Q7370306 wikiPageWikiLink Q848368.
- Q7370306 wikiPageWikiLink Q8682964.
- Q7370306 wikiPageWikiLink Q9288712.
- Q7370306 wikiPageWikiLink Q929302.
- Q7370306 wikiPageWikiLink Q93344.
- Q7370306 type Thing.
- Q7370306 comment "In geometry, various formalisms exist to express a rotation in three dimensions as a mathematical transformation. In physics, this concept is applied to classical mechanics where rotational (or angular) kinematics is the science of quantitative description of a purely rotational motion.".