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[/img][br][br]Para escribir un vector como combinación lineal de otros dos podemos utilizar un [color=#1e84cc][b]método geométrico[/b][/color] o uno [color=#ff0000][b]método algebraico[/b][/color][br][br]

[b]Página 162. Ejercicio 3[br]Página 178. Ejercicio 40[/b]