[size=100]se présente ainsi par défaut 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[/img][/size][size=100][br][/size][br][size=100]Elle contient un certain nombre d'[i]Outils Tableur[/i] classés dans des [i]Boites à outils[/i].[/size]
[icon]https://tube.geogebra.org/images/ggb/toolbar/mode_createlistofpoints.png[/icon][b]Liste de points[/b][br]Sélectionner toutes les cellules des colonnes [i]A[/i] et [i]B[/i] contenant des données.[br]Sélectionner ensuite l'[i]Outil Liste de points [/i]dans sa [i]Boite à outils[/i]. [br]Dans le dialogue qui s'ouvre, il est possible de :[br][list][*]modifier le nom par défaut attribué à la liste ;[/*][*]décider quelle colonne va déterminer les abscisses ;[/*][*]visualiser l'aperçu de la liste de points en cours de création.[br][br][/*][/list]Cliquer sur le bouton [button_small]Créer[/button_small] pour confirmer la création des points à partir de votre ensemble de données.[br][br][u]Note[/u] : [br][list][*]L'utilisation de cet [i]Outil[/i] permet de créer le [i][b]Nuage de points[/b][/i] associé aux données.[/*][*]La liste créée est aussi affichée dans [i]Algèbre[/i].[/*][/list][br][icon]https://tube.geogebra.org/images/ggb/toolbar/mode_createpolyline.png[/icon][b]Ligne Brisée[/b][br]Sélectionner un ensemble de cellules du [i]Tableur[/i] définissant des paires en ligne ou en colonne. Sélectionner ensuite l'[i]Outil Ligne Brisée[/i] dans sa [i]Boite à outils[/i]. [br][br]Dans le dialogue qui s'ouvre, il est possible de :[br][list][*]modifier le nom par défaut attribué à la ligne brisée ;[/*][*]décider quelle ligne/colonne va déterminer les abscisses.[/*][/list][br][br][size=100]Cliquer sur le bouton [button_small]Créer[/button_small] pour confirmer la création des points et de la ligne brisée les joignant, tous seront affichés à la fois dans [/size][i]Graphique[/i] et dans[i] Algèbre[/i].[br][br][icon]https://tube.geogebra.org/images/ggb/toolbar/mode_sumcells.png[/icon] [b]Somme[/b][br]a) Sélectionner une plage en ligne ;[br]b) Sélectionner une plage en colonne ;[br]c) Sélectionner une plage rectangulaire [br][br]de cellules dont les valeurs sont à additionner et sélectionner ensuite l'[i]Outil Somme[/i]. [br][br]La somme est affichée [br]a) dans la prochaine cellule vide de la ligne ;[br]b) dans la prochaine cellule vide de la colonne ;[br][br]c) Les sommes [b]par colonne[/b] sont affichées dans chacune des colonnes.
[br][u]Note[/u] : Utiliser le bouton [img]https://wiki.geogebra.org/uploads/thumb/8/81/Menu-view-refresh-views.svg/16px-Menu-view-refresh-views.svg.png[/img] [i]Réinitialiser [/i]pour repartir avec un nouveau fichier et tester d'autres [i]Outils Tableur[/i].