Show that every element on diagonal of sew symmetric matrix is0
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in mathematics particularly email linear algebra a skew symmetric matrix is a a square Matrix whose transport equal is negative that it is satisfied the condition
A skew symmetric -A^t=-A
in terms of entire matrix if a¡¿denotes the entry in the i-throw and j-th column then the skew symmetric condition is equivalent to
A skew symmetry =a¡¿=-a¡¿
A skew symmetric -A^t=-A
in terms of entire matrix if a¡¿denotes the entry in the i-throw and j-th column then the skew symmetric condition is equivalent to
A skew symmetry =a¡¿=-a¡¿
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