en este ejemplo podemos ver como las medidas de los lados del triagulo son de la mimsa medida y que sus angulos todos son d 60 grados
viernes, 30 de marzo de 2012
4.1 trianguo quilatero
es una figura que esta constituida por tres lados todos de la misma medida y por tres ángulosde 60 grados , también todos con la misma medida . es conocida por ser una de las estructuras mas fuertes que es utilizada por los arquitectos
![](data:image/png;base64,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)
en este ejemplo podemos ver como las medidas de los lados del triagulo son de la mimsa medida y que sus angulos todos son d 60 grados
en este ejemplo podemos ver como las medidas de los lados del triagulo son de la mimsa medida y que sus angulos todos son d 60 grados
Suscribirse a:
Enviar comentarios (Atom)
No hay comentarios:
Publicar un comentario