Manuals/calci/SKEWSYMMETRIC
SKEWSYMMETRIC(Order)
- is the order of the skew symmetric matrix.
is the order of the skew symmetric matrix.Description
- This function shows the Skew Symmetric matrix with the given order.
- Skew Symmetric is also called Anti Symmetric or Antimetric.
- A Skew Symmetric is a square matrix which satisfies the following identity ,where is the matrix transpose.
- If the entry in the row and column is .
- i.e. then the skew symmetric condition is Failed to parse (syntax error): {\displaystyle (a_{ij}) = −(a_{ij})} .
- So its diagonal values are "0".
,where 
is the matrix transpose.
row and 
column is 
.
then the skew symmetric condition is Failed to parse (syntax error): {\displaystyle (a_{ij}) = −(a_{ij})}
.Examples
1. SKEWSYMMETRIC(4)
| 0 | -39 | 2 | 25 |
| 39 | 0 | 15 | 72 |
| (-2) | -15 | 0 | 43 |
| (-25) | -72 | -43 | 0 |
2. SKEWSYMMETRIC(9)
| 0 | 48 | -36 | 72 | 25 | 51 | -13 | -98 | 70 |
| (-48) | 0 | -97 | -33 | 78 | -30 | -56 | 62 | 45 |
| 36 | 97 | 0 | 42 | -47 | 58 | 94 | 24 | -43 |
| (-72) | 33 | -42 | 0 | -23 | -77 | -80 | 69 | 70 |
| (-25) | -78 | 47 | 23 | 0 | -17 | 17 | -100 | 34 |
| (-51) | 30 | -58 | 77 | 17 | 0 | -43 | -67 | 0 |
| 13 | 56 | -94 | 80 | -17 | 43 | 0 | -24 | 55 |
| 98 | -62 | -24 | -69 | 100 | 67 | 24 | 0 | 76 |
| (-70) | -45 | 43 | -70 | -34 | 0 | -55 | -76 | 0 |
0 48 -36 72 25 51 -13 -98 70 -48 0 -97 -33 78 -30 -56 62 45 36 97 0 42 -47 58 94 24 -43 -72 33 -42 0 -23 -77 -80 69 70 -25 -78 47 23 0 -17 17 -100 34 -51 30 -58 77 17 0 -43 -67 0 13 56 -94 80 -17 43 0 -24 55 98 -62 -24 -69 100 67 24 0 76 -70 -45 43 -70 -34 0 -55 -76 0