Simetria relativa a uma reta (eixo de simetria)

2.
Na figura seguinte, está representado, em referencial cartesiano do plano, o polígono [ABCDEFGHI ] .[br][img]data:image/png;base64,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[/img]
2.1
Apresenta as coordenadas de cada um dos vértices do polígono. 
2.2
Indica os vértices do polígono que têm a mesma abcissa, começando por identificar a abcissa comum. 
2.3
Representa o polígono [ABCDEFGHI] e o seu simétrico em relação ao eixo das abcissas.
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Information: Simetria relativa a uma reta (eixo de simetria)