[b][color=#0b5394]1) Constrói um paralelogramo [ABCD] igual ao da figura [/color][/b][br][img]data:image/png;base64,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[/img]

[b][color=#3d85c6]2) Constrói o losango [ABCD], em que o comprimento da diagonal AC é 5 cm e o comprimento do lado BD é 2,5 cm:[/color][/b][br]Sugestão: Vê as propriedades do losango e faz um esboço

[color=#0b5394][b]3) Constrói um trapézio retângulo [ABCD] em que a base maior [AB] mede 4 cm, a altura mede 2cm e o ângulo obtuso mede 120º.[/b][/color][br]Sugestão vê as propriedades dos trapézios e faz um esboço