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[/img][br][u][b]N.B[/b][/u] : [/color][/color][size=85][color=#ff0000]La construction de M ne fait pas partie du programme, mais il est utile de la savoir (par curiosité scientifique).[/color][/size][/i] [br] [size=85][color=#ff0000][i]Le choix du point H est soumis a des conditions très particulières qu'on va pas en parler.[/i][/color][/size]