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Grado

Tema

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Observa el siguiente mosaico<img src="data:image/png;base64,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" alt="Lugares Geométricos" style="" web="" uploads="" 13102="" 1463af7260-figura-2.png"="">¿Cómo se llama la figura geométrica formada por seis triángulos amarillos que se encuentra en la mitad del mosaico?<img src="/web/uploads/13102/f1ca795da5-figura-3.png">¿Puedes identificar el dodecágono?

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