12-03-2020, 17:52
Bien pero eso se puede hacer facilmente. La via de toma de corriente se puede modificar para que la corriente entre a las dos vias y los cruces de vias cambiarlos a cruces de la escala 2N. La verdad es que no entiendo de este tema pero yo lo veo asì de sencillo.
Entonces en vez de cambiar todas las vias de la maqueta, habria que cambiar unicamente las que llevan la corriente porl el centro. Es que si te fijas las vias son exactamente iguales salvo la de los devios y cruces.
[img] data:image/png;base64,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[/img]
Entonces en vez de cambiar todas las vias de la maqueta, habria que cambiar unicamente las que llevan la corriente porl el centro. Es que si te fijas las vias son exactamente iguales salvo la de los devios y cruces.
[img] data:image/png;base64,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[/img]