1) Tracer le segment [PQ] avec l'outil [b]"segment"[/b] [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACUAAAAmCAYAAABDClKtAAAB2klEQVRYCe2YvWvCUBTFr7EUoR0dBf8Mu7m51c1FEBycVBAEB8UhjoKgo5Nubo5uQhcnHXUSJaiTHUTEwclTbmpBRfOeXzHQ3OXmvrzk/Dj5uMmj9XqN7XaLZwVrM8NsNsN8PsdmswE9C+ZYl+EYbLFYWAeKIf8cs4xTDMVujcdjaznFYKPRyIY6vrdP1rZTJ205Mfh/ndI0DamUCs4y8XCncrkyFOUdRF965loUD4dSlBcQfYMIeuZaFCZAuUC02kGt4HS6REyPfXnWajV4PH4QveqXj3M+X38O1GQyQTweRzKZxHQ6Rbc7QDSq6llI9Ig202w24fP5UK+LHTkHeLd7arlcIpvNIhKJoN/vn9OTGr8LVLvdRiAQQKVSkRIVTboZqlgsIhgMotPpiLSk918N1ev1EAqFUCgU9G9qaUWJiVdBVatV+P1+tFotCYnLpwihul0N4TA/zhqGwyFisRjS6bT+13G5nNwRhlCJRBlEv32L6A1u9wcajYbcmW+YZQjlcBz2La7NCEMoItr1LG6mgNf7aQaTce8rleogUkCk6plrM8LQKQYYDAbIZFQ9mwHEGkIos0D2dWyofTeMtm2njNzZ32c7te/GuW1LLgVZbtHsYHnRiguxP5zqRZgwv3DOAAAAAElFTkSuQmCC[/img][br]2) Tracer la droite parallèle à (PQ) et qui passe par le point R. utiliser l'outil [b]"parallèle"[/b][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAC0AAAArCAYAAADsQwGHAAADLElEQVRYCe3Z7UtTURzA8fsq3/avqBhG+kJBAxVKzNBQRGYSIkoKZiaYmNVEU/EBm2bJMM0sRUpTfESWiDIUEdO0F440RYb4LKLfOMbWXGPezc1t4YHD7sPv3t9nv5077r1H2tvbw9O6ZA7W6/XodDoWFhaYn593SRe5hUFYzH1i/QR6ZWXlOHhra4ujoyNc1URuYRBwYTKHG9GGCrsSa14kYbFUcSNa7BTfzt2aoeKm1TaixThypyobiidMwmYRLS46d23CdoE+j1/notJOq/L29olTu2+ltVqoqQGFAnx93RQt/q3evoX79+HaNbhzB8rKQKOBgwM3Qa+uwufPkJcHYWEQEQH5+dDVBWtrJ5DmKw4fHkplCyrVgHke2N+H4WEoKYGYGAgMhMxMaG6GHz/+jbeyxaHoS5cuI0nZSFItYpnJSairg+Rk8PaGpCRQqWBiwgrp9F0OQ6vVA8dYSYI/PZsy73AoLoahIdjdPV0jM+JsaL0euruhoIBm37B/0JWVLTIZtoXZhj48hJERKC+HuDi4ehXS06GxEebm8PL6OzzEsrOafHRKCvj5QWIiVFfD+LhF06tXLbS1WbgQLUbbt1E+uq8PNjfty+Lgo+SjHZz4LKdza/Ts9DTvXr/moRiaJs2t0Es6HZ0fP/I0O5vbwcHcjYqiSqlE099vQub4jYDLHgI2NzYY7u2l4tkzFJGRxISE8Dwnhy/t7fxaWjoBNV0590pPjI3xpqqK9IQEwq9c4VFqKu8bGvg+M2PqsrrsdPTC7Cwf1Gpy09KI8PcnLT6e+ooKtKOjVmHWdjocvbq8TE9HB8rcXGJDQ0m8cYPywkKGenrYWF+3ZpG978zo3Z0dvg4OUl1URHJ0NLeCgniSlcWn1lZ+Li7KhtgSaBd6SqtF/fIlmQoF1318eHDvHk319XybmrIlt92xstHtTU08zsjgZkAAKbGx1JaWMqbRcGD2VGG3xIYDZaNf5OfT39mJ/pSnChty2x0qG213BicceIF2QlEtnvL/qrRHvur1yJfqHjl9Ie5XPW6iyHCTbai4GOPiqnVFF7ktTRAZjMY5F8MGT/j0SPRvB2Qaa03hxEoAAAAASUVORK5CYII=[/img][br]--> Pour tracer cette droite, sélectionner l'outil [b]"parallèle"[/b][br]--> Cliquez sur le segment [PQ], une droite apparaîtra.[br]-->en déplaçant la souris, la droite se déplacera avec, placer alors la droite sur le point R et cliquez pour la figer.[br]3) Tracer la droite parallèle à (QR) et qui passe par le point Q. utiliser l'outil [b]"parallèle"[/b][img]data:image/png;base64,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[/img] (suivre les même étapes précédentes).[br]4)D est le point d'intersection des deux droites que vous venez de tracer, utiliser l'outil [b]"intersection"[/b][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACoAAAApCAYAAABDV7v1AAADU0lEQVRYCe2ZO0gjQRjHJy52tpaWtir4KIKCQYJYCCpKQCx8RCSxMkbQTiIWAVFRRIRgYzwxeIJRELVIp6iBCwQR32JA1EJBRLSI/+NbbkK822w2u0secAPD7HzzPX777cxmMss+Pj7A6/PzMyKRCK6urnB5eZmRSrGJgVg4F7WMdx4fH0WFt7c3fH19IVOFYhMDwRIT5xNBeSYzCfh3YoglPrMiKAnoLrKt8MzGHj3Ni2zKJk8YMRFbDJQWTrYWYvsPqufTkc1oZ2cnTk5O9Iyn2pcs6Pr6OsrKytDV1YWbmxvVQfQwlAXlAaamplBUVITh4WEuSnurCJSorq+v0dHRgcrKSoRCoewF5WTz8/MoLCwEZTmdRXFG46HC4TCamprQ09MTL9bt+vDwEA6H45s/VaDcg9PpRGlpKT4/P7lIU7uzs4Pu7m60trbC5/N986UJlDwtLy9DEATc3t5+c5xKZ3V1FS0tLbBardjd3ZU01QzKvVZUVCAQCPBu0vbl5QULCwuoq6vD4OAgjo6OZG10A6UotbW1SWHpfex2u1FeXo6xsTGcn5/LAvJBXUE57ObmJn7MzODX/j6PI77SRkZGUFNTg9nZWXEzHBtUcKE76MbGBgoMBvxkDO68POQLAmw2GxobG7G0tKR64ekOam9ogI8x4E/NYwxer1dBzuRVdAV9f3+H3WhEMA40nzHQwtFadAG9v7/H9PQ0jEYjent7USAImGMMdsaQbzBoZRTtNYGenp5idHQUVVVVmJiYwN3dnej06ekJc04nAl4vmpub4XK5NMOqAj04OMDAwADMZjM8Hg9eX18Tgjw8PKC4uDjhuNKBlEC3t7fFvWlbWxvW1taUxsDk5KSYecUGEopJQaPRKFZWVsRHSPNvb29Pwk1yEf1yBYPB5IoJNGRBaUtnMpkwNDSE4+PjBC6UiWmTYbFYlClLaMmCjo+P4+LiQsJMnai+vl71DcuCqsNJbEVZbW9vT6wgM5JWUOKorq7G2dmZDJL0UNpBFxcX0dfXJ00jI007KLHQv4JUS0ZA+/v7sbW1lRJrRkD9fj/sdrt60HQeO5aUlCgG/efYMWcOcnPmaJwOSnPiYwOBUuWZpTlLqy0TlWLHf2TgbLHPN1yQre1vFie3wHiNNGgAAAAASUVORK5CYII=[/img] pour le placer.[br]-->Cliquez sur[b] "intersection"[/b][img]data:image/png;base64,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[/img][br]-->Cliquez sur une droite ensuite sur une deuxième.[br]--> Un point d'intersection apparaîtra, on le nommera [b]A[/b].

1) Tracer le segment [AB] et [BC] avec l'outil [b]"segment"[/b] [img]data:image/png;base64,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[/img][br]2) Tracer le cercle de centre C et de rayon AB. On utilise l'outil [b]"Cercle (centre -rayon)"[img]data:image/png;base64,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[/img][/b][br]--> Pour tracer le cercle, cliquez sur [b] [b]"Cercle (centre -rayon)"[/b][/b][br]--> Cliquez sur le point C. une petite fenêtre apparaîtra pour saisir le rayon, saisir [b]AB, cliquez sur OK[/b] : [img]data:image/png;base64,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[/img] [br][br]3) Tracer le cercle de centre A et de rayon BC. On utilise l'outil [b]"Cercle (centre -rayon)"[/b][br]4)D est le point d'intersection des deux droites que vous venez de tracer, utiliser l'outil [b]"intersection"[/b][img]data:image/png;base64,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[/img] pour le placer.[br]-->Cliquez sur[b] "intersection"[img]data:image/png;base64,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[/img][/b][br]-->Cliquez sur un cercle ensuite sur un deuxième cercle.[br]--> Deux points d'intersections apparaitront, tu choisiras le point adéquat pour compléter avec l'outil [b]"segment"[/b] le quadrilatère ABCS, tel que ABCS soit un parallélogramme. Il faut alors renommer le point choisi en "[b]S[/b]"