quaternions · quaternions quaternions are hypercomplexnumbers composedof a realand a vector parts...
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Quaternions
Quaternions are hypercomplexnumbers composed of a realand a vector parts
Q q q 9 1 9 It 9e It 9deVectorpart reatorscalarpart
Thequaternion algebrastates that
ii É É 1
II E IIThemultiplicationordermatters
Multiplication table
X I I I II I I I II I I E II I I IitI I I I
Giventhatthemultiplication oftwoquaternionsyield
Q E TUQ Ee qQQ E M EctNrE E t MM t I E NaE14 1 EmIr EeE car It dayItEezII think t I E NaEEn En EnEn EeEu1 EuEu EuCryI ExleyEuEndátlendayEuCadetNhatNEALE
EiEz EFEQQ NNa EIE q Ea NE EFE
Realpart VectorpartHence theresultof quaternion multiplication is identical totheresult of rotationcompositionusingtheEulersymmetric parameters Thus wecanusequaternions torotate referencesystems
tochangebasisNotei Thequaternionmultiplicativeinverse is theconjugatequaternion É 1 E
QÉ MeE 4 E p Etc NE µ EÉ 1 aAssumingthattheµ quaternionnorm is 1Q OI it 191 1 1
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Basistransformation using quaternions
let Iaand Isbetwo referencesystem relatedbytheEulersymmetricparameters1411 letI bea vector in whichitsrepresentation in Ia isknown Ya Wewanttofind Is usingquaternions
Considerthefollowingoperation s a Ia QLotta Quaternionwithrealpartoandvectorpartva
a YaQ 1 ELotta q E 4 E loq v.atE t 0 E que VÁE11 E I YEE Na VÁE
vector
VÍ E Et µ até E MIMVatv.ae VÍ E E El year Ya E1Iate YETIa E aíE viva VáE KATEE Ela EVÁEVEIA t 1 a E Ia Ia EIa t E EIa LEYa Ia
Aaté EÉ fvá EE I e EE EEEsyYa 21ÉYa 1 EEtta E EIa ETEIaq ÉE Ya t 2 EEtta 2ME IaIII EE t 2E É 21E Ia
Thus
QYaQ IM EtE 2E É 21E Ia NoteTherealpartofthequaternionÉYaE willalwaysbe 0CbaQYaQ ÉYaQ Csala Ib
Ib ÉYaQRotationcompositionusingquaternions
Letesabethequaternionthattransforms Iainto Is andQasbethe quaternionthattransformsEsmto E Thus thequaternion thattransforms IaintoFecanbecomputedusingYb ÉbalaQue Y y CRsIc EcbIbEcb
Yc ÀcbÉbaIa QbaQdoHowever Ia QcalaÉca Sincethisresultisvalid TI ER then
Eca QsaQas Notice thatthemultiplicationorderis inverseofthatoftheDCMs