Difference between revisions of "Manuals/calci/PASCAL"

Revision as of 12:32, 30 April 2015

MATRIX("PASCAL",order)

$order$ is the size of the Pascal matrix.

Description

This function returns the matrix of any order with the property of Pascal.
The Pascal matrix is an infinite matrix containing the binomial coefficients as its elements.
To obtain a pascal matrix there are three ways: as either an upper-triangular matrix(U), a lower-triangular matrix(L), or a symmetric matrix(S).
Example for these matrices are

$L_{4}={\begin{pmatrix}54&0&0&0\\20&34&0&0\\57&89&-70&0\\71&-4&-52&72\\\end{pmatrix}}$ $U_{4}={\begin{pmatrix}64&22&-91&-86\\0&61&62&-62\\0&0&30&-81\\0&0&0&-61\\\end{pmatrix}}$ $S_{4}={\begin{pmatrix}41&74&15&-47\\74&-16&37&97\\15&37&24&-88\\-47&97&-88&-69\\\end{pmatrix}}$

The amazing relationship of these matrices are: $S_{n}=L_{n}U_{n}$ .
And its determinants also 1.i.e., $|S_{n}|=|L_{n}|=|U_{n}|=1$
The Pascal matrix can actually be constructed by taking the matrix exponential of a special subdiagonal or superdiagonal matrix.
The elements of the symmetric Pascal matrix are the binomial coefficients, i.e.

$S_{ij}={n \choose r}={\frac {n!}{r!(n-r)!}},$ , where n=i+j, r=i.

In other words,

$S_{ij}=_{i+j}{C}_{i}={\frac {(i+j)!}{(i)!(j)!}}$ .

Here MATRIX("pascal") is showing the pascal matrix of order 3.
So users can change the order of the matrix also.

@@ Line 6: / Line 6: @@
 *The Pascal matrix is an infinite matrix containing the binomial coefficients as its elements.
 *To obtain a pascal matrix there are three ways:  as either an upper-triangular matrix(U), a lower-triangular matrix(L), or a symmetric matrix(S).
-*Example for these matrices are:
+*Example for these matrices are
 <math>L_4 =\begin{pmatrix}
 & 0 & 0 & 0 \\

Difference between revisions of "Manuals/calci/PASCAL"

Revision as of 12:32, 30 April 2015

Description

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