![](data:image/png;base64,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)
19990401
u Para insertar una fila
Ejemplo Insertar una fila nueva entre las filas una y dos de la matriz siguiente :
12
Matriz A = 34
56
c
4(R
•
INS)
u Para sumar una fila
Ejemplo Sumar una fila nueva debajo de la fila 3 en la matriz siguiente :
12
Matriz A = 34
56
cc
5(R
•
ADD)
2-8-8
Cálculos con matrices