Difference between revisions of "Manuals/calci/SKEWSYMMETRIC"

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<div style="font-size:30px">'''SKEWSYMMETRIC(Order)'''</div><br/>
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*<math>Order</math> is the order of the skew symmetric matrix.
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==Description==
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*This function shows the Skew Symmetric matrix with the given order.
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*Skew Symmetric is also called Anti Symmetric or Antimetric.
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*A Skew Symmetric is a square matrix which satisfies the following identity <math>A=A^T</math>,where <math>A^(T)</math> is the matrix transpose.
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*If the entry in the <math>i^{th}</math> row and <math>j^{th}</math> column is <math>a_{ij}</math>.
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*i.e. <math>A = (a_{ij}) then the skew symmetric condition is <math>a_{ij} = −a_{ji}.
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*So its diagonal values are "0".

Revision as of 14:44, 20 December 2016

SKEWSYMMETRIC(Order)


  • 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. <math>A = (a_{ij}) then the skew symmetric condition is <math>a_{ij} = −a_{ji}.
  • So its diagonal values are "0".