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[/img][br]Tomado del trabajo de Moisés Villena[br]

[b]Definición Algebraica[/b]

[img]https://calculo21.com/wp-content/uploads/2020/02/image-134.png[/img]

[b]Representación geométrica[br][br][img]http://www2.montes.upm.es/dptos/digfa/cfisica/magnitudes/magnitudes_files/unitario.gif[/img][/b]

[b]Explicación[/b]

[b]Práctica[/b]

[b]Evaluación[/b]