[list][*]Dibuixa la figura en forma de P seleccionant l’eina [img]data:image/png;base64,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[/img] [i]Polígon[/i]. Clica el botó dret del ratolí sobre la figura. Tria [i]Configuració | Estil[/i] i posa [i]Opacitat [/i]a 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[/img][/*][*]Dibuixa un punt a la dreta de la figura que has dibuixat i un altre punt tres quadradets més amunt.[/*][*]Dibuixa una recta que passi per aquests dos punts. Clica amb el botó dret (Configuració): clica la recta i tria [i]Mostra etiqueta[/i]. També tria [i]Canvia de nom[/i]. Escriu [i]Ei[/i]x.[/*][*]Anem a aplicar una simetria a la figura anterior respecte la recta que has dibuixat. [img]data:image/png;base64,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[/img] [i]Simetria axial[/i]. Clica dins la figura i després sobre la recta.[/*][/list]