Difference between revisions of "Manuals/calci/DYADIC"

Revision as of 14:51, 3 March 2017

DYADIC(a,b)

OR VECTORDIRECTPRODUCT (a,b)

$a$ and $b$ any two set of values.

Description

This function shows the Vector Direct product.
The third type of vector multiplication is called the direct product, and is written AB.
In $VECTORDIRECTPRODUCT(a,b)$ , $a$ and $b$ are the two vectors.
Multiplying one vector by another under the direct product gives a tensor result.
The rectangular components of the direct product may be found by matrix multiplication: one multiplies the column vector A by the transpose of B, which gives a 3X3 matrix:

$AB=AB^{T}$ = ${\begin{pmatrix}A_{x}\\A_{y}\\A_{z}\end{pmatrix}}$ $(B_{x}B_{y}B_{Z})$ = ${\begin{pmatrix}A_{x}B_{x}&A_{x}B_{y}&A_{x}B_{z}\\A_{y}B_{x}&A_{y}B_{y}&A_{y}B_{z}\\A_{z}B_{x}&A_{z}B_{y}&A_{z}B_{z}\end{pmatrix}}$

The direct product is non-commutative $(AB\neq BA)$ .
A few vector product identities are of interest

$A.BXC=AXB.C=B.CXA=BXC.A=C.AXB$ $AX(BXC)=B.(A.C)-C(A.B)$ $(AXB)XC=B(A.C)-A(B.C)$ $(AXB).(CXD)=(A.C)(B.D)-(A.D)(B.C)$ $(AXB).(CXD)=(AxB.D)C-(AxB.C)D$

@@ Line 21: / Line 21: @@
 *The direct product is non-commutative <math>(AB \neq BA)</math>.
 *A few vector product identities are of interest
+<math>A.BXC = AXB.C=B.CXA=BXC.A=C.AXB</math>
+<math>AX(BXC)= B.(A.C)- C(A.B)</math>
+<math>(AXB)XC = B(A.C)-A(B.C)</math>
+<math>(AXB).(CXD)= (A.C)(B.D)-(A.D)(B.C)</math>
+<math>(AXB).(CXD) = (AxB.D)C-(AxB.C)D</math>

Difference between revisions of "Manuals/calci/DYADIC"

Revision as of 14:51, 3 March 2017

Description

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