Difference between revisions of "Manuals/calci/MATRIXMULTIPLY"

From ZCubes Wiki

Jump to navigation Jump to search

Latest revision as of 14:51, 15 April 2019

MATRIXMULTIPLY(a,b)

where $a$ and $b$ are the array of two matrices.

Description

This function gives product of two matrices.
Matrix multiplication is of two types:

Type 1: A scalar (a constant) is multiplied with the each element of the matrix.
Type 2: Multiplication of two matrices.

We can do the matrix multiplication when the number of columns in the first matrix equals the number of rows in the second matrix.
For e.g. 4x2 matrix can multiply with 2x3. The matrix product of two arrays $a$ and $b$ is: $x_{ij}=\sum _{k=1}^{n}a_{ik}.b_{kj}$ where $i$ is the row number and $j$ is the column number.
i.e Multiply the elements of each row of 1st matrix by elements of each column of 2nd matrix.
So the resultant mat

rix is of the order: Rows of 1st matrix × Columns of 2nd.

For e.g If we multiply a 4x2 matrix with a 2x3 matrix, the product matrix is of order 4x3.
Matrix multiplication satisfies the associative and distributive properties.But it is not satisfies the commutative property.
i.e., Let A,B and C are three matrices, then A(BC)= (AB)C (Associative property)
A(B+C)= AB+AC and (A+B)C = AC+BC (Distributive properties)
k(AB)=(kA)B=A(kB)where k is a constant.But $AB\neq BA$ (Commutative property)

Examples

1. MATRIXMULTIPLY([2,-3,4;-5,6,7],9)

18	-27	36
-45	54	63

2. MATRIXMULTIPLY([4,7.2,6;9,-8,12],[2,3;6,5;9,8])

105.2	96
78	83

Related Videos

Matrix Multiply

See Also

References

Matrix Multiplication

List of Main Z Functions

Z3 home

Retrieved from "http://wiki.zcubes.com/index.php?title=Manuals/calci/MATRIXMULTIPLY&oldid=211998"