tag:blogger.com,1999:blog-56873253792193648222024-03-18T20:31:10.374-07:00classemclasse Montmartin CP-CE1 (2019-2022)Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.comBlogger75125tag:blogger.com,1999:blog-5687325379219364822.post-8478339828326870582023-01-12T10:51:00.001-08:002023-01-12T10:52:04.000-08:00Additions et soustractions inférieures à 10 : atelier autonome et différencié<div style="text-align: left;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj6pMd6tUuHbgLU-6Tms21QXQ5Z3mg2ARK2NJEnXpQtiRrjvbAvBBl12ZCtgLCD8Uv5dtuyyXVkJY_-nk9eCszUFvivzmnNregAntY0dQdIcAUKwM0IEUeU2yeJTnAsPU7OY86vj199FvKhiu9GTkZCDf7U2Ay-GXVHeFAdNXogyMGHKllEQf_fRALl/s4080/barquettes-calcul.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4080" data-original-width="3060" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj6pMd6tUuHbgLU-6Tms21QXQ5Z3mg2ARK2NJEnXpQtiRrjvbAvBBl12ZCtgLCD8Uv5dtuyyXVkJY_-nk9eCszUFvivzmnNregAntY0dQdIcAUKwM0IEUeU2yeJTnAsPU7OY86vj199FvKhiu9GTkZCDf7U2Ay-GXVHeFAdNXogyMGHKllEQf_fRALl/s320/barquettes-calcul.jpg" width="240" /></a></div><h2 style="text-align: left;">Introduction pour une mise en place progressive <br /></h2></div><div style="text-align: left;">Cet atelier est très complet. Il intègre de l'entraînement, de l'auto-évaluation, de l'évaluation, un suivi individuel mais aussi un suivi collectif. <b>Sa mise en place se doit donc d'être progressive</b> autant pour l'enseignant qui le met en place pour la première fois que pour l'élève qui le découvre. En effet en CP ou en CE1 l'autonomie est loin d'être gagnée mais en y allant progressivement il est tout à fait possible d'aller au bout.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">Ainsi <b>les paragraphes suivants qui détaillent son fonctionnement suivent également la progression avec laquelle il doit être présenté aux élèves</b>. On commence donc à utiliser simplement les cartes, puis quand le fonctionnement est acquis, on met en place la fiche de suivi individuel puis ensuite on commence à mettre en place les évaluations et enfin la fiche de suivi collectif.</div><div style="text-align: left;"> </div><div style="text-align: left;">Afin de ne pas surcharger les explications du fonctionnement j'explique en bas de page dans un <span style="color: red;"><b>dernier paragraphe comment fabriquer et préparer matériellement</b></span> tous ces éléments pour une organisation optimale. <br /></div><div style="text-align: left;"> </div><div style="text-align: left;"><i><span style="font-size: x-small;"><u>Remarque : </u><br /></span></i></div><div style="text-align: left;"><i><span style="font-size: x-small;">Vous pourrez même selon vos besoins ne pas aller au bout de la mise en place et finalement n'utiliser que les cartes par exemple. Mais probablement qu'à chaque fois le paragraphe suivant correspondra à un besoin que vous sentirez dans la classe. Par exemple, une fois que les élèves sauront s'entraîner avec les cartes, vous allez avoir des élèves qui vont se lasser et vous dire "c'est bon j'y arrive, je n'ai plus besoin de travailler". Alors vous pourrez leur donner des objectifs de réussite clairs avec la fiche de suivi individuelle. Mais après être remotivés en notant leurs résultats sur cette fiche de suivi individuelle, vous allez ressentir le besoin de vérifier leurs résultats (car certains voire beaucoup tricheront c'est certain). Viendra alors l'utilité du paragraphe sur les évaluations pour remettre à leur place les élèves qui pensaient ne plus avoir besoin de s'entraîner. Puis lorsque les évaluations seront bien en place vous ressentirez peut-être le besoin d'avoir une vision globale des résultats de vos élèves. Viendra alors l'utilité du paragraphe sur le suivi collectif.<br /></span></i></div><div style="text-align: left;"><i><span style="font-size: x-small;"><br /></span></i></div><h2 style="text-align: left;">Les cartes pour s'entraîner (sans sablier, puis avec sablier) :</h2><h2 style="text-align: left;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjHRH334OVThif5_sA1qXKonFnx8dChPrTKkYwvirXNGS8Rj9iQ3xnlwB2XmhYVXM07wgP5fAETF_MwMi80sP5pDPydvecNrECET0RmKjAFKKLMNQcCxmwoz5-m2WhYS1ifBBTrE0F4JU7CCekZnPbMJy_wftTacxXfabsphxVdPCJ79fLKUpXA1aX1/s4080/jeu-tapis.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4080" data-original-width="3060" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjHRH334OVThif5_sA1qXKonFnx8dChPrTKkYwvirXNGS8Rj9iQ3xnlwB2XmhYVXM07wgP5fAETF_MwMi80sP5pDPydvecNrECET0RmKjAFKKLMNQcCxmwoz5-m2WhYS1ifBBTrE0F4JU7CCekZnPbMJy_wftTacxXfabsphxVdPCJ79fLKUpXA1aX1/s320/jeu-tapis.jpg" width="240" /></a></div></h2><div style="text-align: left;">- je prends un paquet du premier jeu</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- je vérifie que toutes les cartes sont dans le bon sens</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- je pose le paquet sur la case "point d'interrogation"</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- je regarde le premier calcul et je cherche la réponse dans ma tête. Si je ne sais pas je dis "je ne sais pas".</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- je retourne la carte pour voir la réponse. Si j'ai bon je place la carte sur le tas du bonhomme qui sourit. Si j'ai faux, je cherche à comprendre mon erreur puis je place la carte sur le tas du bonhomme qui grimace.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- je passe ensuite à la carte suivante et je recommence jusqu'à avoir fini toutes les cartes.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- à la fin je compte combien de cartes sont posées sur le bonhomme qui sourit.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- puis je reprends toutes les cartes, je les remets sur le point d'interrogation et je recommence autant de fois que nécessaire pour faire un meilleur score.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- quand je me suis suffisamment entraîné et que réussis toutes (ou presque) les cartes, alors je prends un sablier (CP=2 minutes, CE1 = 1 minute). Je recommence le jeu mais je m'arrête quand le sablier est fini même si je n'ai pas eu le temps de faire toutes les cartes. Je compte à la fin le nombre de cartes réussies puis je recommence pour faire à nouveau un meilleur score dans le temps du sablier.</div><div style="text-align: left;"><br /></div><div style="text-align: center;">DOCUMENTS A IMPRIMER (PDF)</div><div style="text-align: center;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1mvFVYg5d_zJ_Du62zyABGbgjn9NL0Ift/view?usp=share_link" target="_blank">>> tapis de jeu simple <<</a></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1WdiCPP_u_ft0PQ3aPmKG6TfI3dqkooQ7/view?usp=share_link" target="_blank">>> tapis de jeu avec sablier et règles <<</a></div><div style="text-align: center;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1Kj51FmGQi26YQvOakP01rD7pLHeXkTuN/view?usp=share_link" target="_blank">>> jeu n°1 : additions +1 <<</a></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1y8h2Na-5ChHv90QisxJuydFIQbac5keA/view?usp=share_link" target="_blank"> >> jeu n°2 : additions +2 <<</a></div><div style="text-align: center;"><div style="text-align: center;"><a href="https://drive.google.com/file/d/1DB0lgltqH2xijWD7GxNVMann0qrkxuN0/view?usp=share_link" target="_blank">>> jeu n°3 : additions +3 <<</a></div><div style="text-align: center;"><div style="text-align: center;"><a href="https://drive.google.com/file/d/1mr-ELHuhU81sOtnWF0pU-rab8LlcX4e9/view?usp=share_link" target="_blank">>> jeu n°4 : additions +4 <<</a></div><div style="text-align: center;"><div style="text-align: center;"><a href="https://drive.google.com/file/d/1R-3oxDHI9tXYy2TWuE6JKkl4Tx3haDYt/view?usp=share_link" target="_blank">>> jeu n°5 : additions +1+2+3+4 <<</a></div><div style="text-align: center;"> </div><div style="text-align: center;"><div style="text-align: center;"><a href="https://drive.google.com/file/d/1Mvur-Ywxft0q8Cdx_ULOAPRVHpc1nlwJ/view?usp=share_link" target="_blank">>> jeu n°6 : additions +1 1+(commutativité) <<</a><br /><div style="text-align: center;"><a href="https://drive.google.com/file/d/1VLXcSPSMlQFa-XDXbTh_e2X-WM-DZWjE/view?usp=share_link" target="_blank">>> jeu n°7 : additions +2 2+(commutativité) <<</a></div><div style="text-align: center;"><div style="text-align: center;"><a href="https://drive.google.com/file/d/1ZRlswlBdxIcisMSjljwuAnV1Uc0RY5n0/view?usp=share_link" target="_blank">>> jeu n°8 : additions +3 3+(commutativité) <<</a></div><div style="text-align: center;"><div style="text-align: center;">A FAIRE >> jeu n°9 : additions +4 4+(commutativité) << A FAIRE<br /></div><a href="https://drive.google.com/file/d/1coZs2lM59iKXNRnh2aE5SJE4wT8lYnQC/view?usp=share_link" target="_blank">>> jeu n°10 : toutes additions jusque 10 <<</a><br /></div> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1bYDtPlL-dYeVZ34HlpAHCB6jHb9xW-PE/view?usp=share_link" target="_blank">>> jeu n°11 : soustractions -1 << </a><br /></div></div><a href="https://drive.google.com/file/d/15baHqjww4f87uYe3iumY0Ri-cJdVgPiP/view?usp=share_link" target="_blank">>> jeu n°12 : soustractions -2 << </a></div><a href="https://drive.google.com/file/d/1dFaepOVvQCtiuCIApCpXaMwIgXjiHBcL/view?usp=share_link" target="_blank">>> jeu n°13 : soustractions -3 << </a><br /></div><a href="https://drive.google.com/file/d/1ZgX_TyR--CiXcpm9obJBkXL9vGeAIPux/view?usp=share_link" target="_blank"> >> jeu n°14 : soustractions -1 -2 -3 <<</a></div> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1SrRH9S4TNQg2e_YoF-8T5guQW0lPb5ic/view?usp=share_link" target="_blank"> >> jeu n°15 : toutes additions + soustractions -1 -2 -3 << </a><br /></div><div style="text-align: center;"></div><div style="text-align: center;"><a href="https://www.classem.fr/2020/03/les-complements-10.html">>> jeu compléments à 10 <<</a> (page avec vidéo)<br /></div><div style="text-align: center;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1WD0JTqMFIHq2TJ-cXBeq_YBU_lrS7vPy/view?usp=share_link" target="_blank">>> jeu n°16 : additions à trous 5+... ou soustractions -5 <<</a></div><div style="text-align: center;"><div style="text-align: center;"><a href="https://drive.google.com/file/d/1OqRlVFsMfveJ5Yni73Uc3crMTW2wNU1j/view?usp=share_link" target="_blank">>> jeu n°17 : additions à trous 6+... ou soustractions -6 <<</a></div><div style="text-align: center;"><div style="text-align: center;"></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/112LlRAaLJ-ELZehRvD0RQ1uD2or9gksZ/view?usp=share_link" target="_blank">>> jeu n°18 : additions à trous 7+... 8+... 9+... ou soustractions -7 -8 -9 <<</a></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/14VVLtMkLR3cLd1eNtLAMsRHjjgbvz0JJ/view?usp=share_link" target="_blank"> >> jeu n°19 : additions à trous 4+... ou soustractions -4 <<</a></div><div style="text-align: center;"> </div><div style="text-align: center;">A FAIRE >> jeu n°20 : récap jeux 16 à 19 << A FAIRE</div><div style="text-align: center;">A FAIRE >> jeu n°21 : récap jeux 11 à 14 et 16 à 19 << A FAIRE <br /></div><div style="text-align: center;"> A FAIRE >> jeu n°22 : récap jeux 1 à 21 << A FAIRE</div><div style="text-align: center;"> </div><div style="text-align: center;"><div style="text-align: center;">A METTRE >> jeu : les moitiés jusque 10 << A METTRE<br /></div></div><div style="text-align: center;"> <h2 style="text-align: left;">La fiche de suivi individuel :</h2><div style="text-align: left;">Cette fiche permet de récapituler la progression des jeux, leur numéro, leur couleur et de fixer et suivre des objectifs de réussite.</div><div style="text-align: left;"> </div><div style="text-align: left;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhK3w_62b-RqS8_02si_dd8e_d_s8RXmR29yt0emP3bvzmIHwCT8iZbJh0ikTc6olO9N_kpTEiRUgkYtz8z3CEh_KzzGgeQf-AUvRvQnT3wpipji6VKX9M8vy3HIuuw5diCfNu1GrhaGt6-c7Tr94EdyqqpNg1Ax4gmV8La0N15oOGZxVVto8USXn7b/s4080/suivi-individuel.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4080" data-original-width="3060" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhK3w_62b-RqS8_02si_dd8e_d_s8RXmR29yt0emP3bvzmIHwCT8iZbJh0ikTc6olO9N_kpTEiRUgkYtz8z3CEh_KzzGgeQf-AUvRvQnT3wpipji6VKX9M8vy3HIuuw5diCfNu1GrhaGt6-c7Tr94EdyqqpNg1Ax4gmV8La0N15oOGZxVVto8USXn7b/s320/suivi-individuel.jpg" width="240" /></a></div> <br /></div><div style="text-align: left;"><span style="font-size: x-small;"><i><u>Remarque :</u> La progression si elle est assez logique n'en demeure pas absolument figée pour moi c'est pour cela que le numéro du jeu ne figure jamais sur les cartes, il n'y a que le nom du jeu (la notion travaillée). En effet je peux selon les années choisir d'insérer un nouveau jeu, en supprimer un ou changer de place des jeux.</i></span><br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;"><img alt="" src="data:image/png;base64,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" /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">En haut de la fiche on trouve notamment le sablier à utiliser. Moi sur ces jeux de calcul <10 je demande un sablier de 2 minutes pour les CP et d'1 minute pour les CE1. J'ai également des sabliers de 3 minutes que je réserve aux élèves les plus en difficulté (généralement porteurs de troubles).<br /></div><div style="text-align: left;"> </div><div style="text-align: left;"> <img alt="" height="102" 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" width="665" /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">On trouve ensuite une ligne par jeu avec à chaque fois :</div><div style="text-align: left;"> </div><div style="text-align: left;">- le numéro et la notion travaillée</div><div style="text-align: left;"> </div><div style="text-align: left;">- la couleur du jeu (papier utilisé pour l'imprimer). Sur cette fiche je l'ai mis 2 fois pour éviter les erreurs. Dans certaines autres fiches de suivi, je ne le mets qu'une seule fois. Je donne un petit carré de la couleur à coller par-dessus le dessin.<br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">- enfin on trouve trois colonnes avec tous les scores possibles. Dans le jeu n°1 par exemple il y a 18 cartes. Donc on trouve tous les numéros de 0 à 18. Ces nombres sont répartis entre les 3 colonnes avec des bonhommes grimace/moyen/content pour indiquer si le résultat correspond à "pas assez" "moyen" ou "réussi".</div><div style="text-align: left;"> </div><div style="text-align: left;">Lorsque l'élève s'entraîne seul sans sablier, on peut l'inciter à souligner ses scores dans le tableau quand un score a été atteint. Par exemple si l'élève a réussi 8 cartes, il souligne le 8. Puis lors du deuxième essai s'il a fait 12 cartes correctes il souligne le 12. </div><div style="text-align: left;"> </div><div style="text-align: left;">Quand il travaille un sablier il peut entourer plutôt que souligner les scores atteints. Il s'agit alors clairement d'une auto-évaluation.<br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">Le tableau de suivi individuel servira également à noter les résultats des évaluations (voir paragraphe suivant).</div><div style="text-align: left;"><br /></div><div style="text-align: left;"><div style="text-align: center;">DOCUMENTS A IMPRIMER (ODT PDF)</div><div style="text-align: center;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1O-2-DBR7Ep6WI6f8Kfl-IDi3XqqcwETq/view?usp=share_link" target="_blank">>> fiche de suivi individuel (odt) <<</a></div><div style="text-align: center;"><div style="text-align: center;"><a href="https://drive.google.com/file/d/1xn2yHYcaB7TbeMN9Mvem2pb45Ch9f169/view?usp=share_link" target="_blank">>> fiche de suivi individuel (pdf) << </a></div><div style="text-align: center;"></div><div style="text-align: center;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/104870-SIQfrOga_HWaFP_wE29uSFRaks/view?usp=share_link" target="_blank">>> petits dessins des couleurs de feuilles clairefontaine (odt) <<</a></div><div style="text-align: center;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1dwE8A8b2y5xZC1_k_AXyUbm5ygRkb4pX/view?usp=share_link" target="_blank">>> petits carrés des couleurs clairefontaine (assorties <b>intenses)</b> <<</a></div><div style="text-align: center;"> <img alt="" height="135" src="data:image/jpeg;base64,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" width="215" /></div><div style="text-align: center;"><div style="text-align: center;"><a href="https://drive.google.com/file/d/19TyY9X1B-esUzvdBZ8SZPaaAhCoOj2O_/view?usp=share_link" target="_blank">>> petits carrés des couleurs clairefontaine (assorties <b>pastel</b>) <<</a></div><div style="text-align: center;"><img alt="" height="140" src="data:image/jpeg;base64,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" width="216" /> <br /></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1U15ryf7t3TSrnyP4fLXXVBObjK2XOVFZ/view?usp=share_link" target="_blank">>> petits carrés des couleurs clairefontaine (paquets 1 seule couleur) <<</a></div><div style="text-align: center;"> <img alt="" height="120" src="data:image/jpeg;base64,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width="194" /></div></div></div></div></div><div style="text-align: center;"></div><div style="text-align: center;"></div><div style="text-align: center;"></div><div style="text-align: center;"><br /><div style="text-align: left;"><h2 style="text-align: left;">Les évaluations par le maître/la maîtresse :</h2>L'évaluation se déroule comme une auto-évaluation avec un sablier. Mais c'est le maître/la maîtresse qui tient les cartes, qui retourne et surveille le sablier, qui place les cartes au bon endroit sur le tapis, qui compte le nombre de cartes réussies.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">La trace de l'évaluation se fera cette fois ci par un tampon sur la feuille de suivi individuel. Ainsi si l'élève réussit 12 cartes dans le temps du sablier, alors on tamponne la case dans laquelle on trouve le numéro 12. Bien sûr si c'est la case du bonhomme grimace qui est tamponnée, c'est que l'évaluation n'est pas réussie pour l'élève et il doit à nouveau s'entraîner avec le jeu. Si c'est un nombre du bonhomme content, alors l'élève peut passer à un autre jeu. Si c'est le bonhomme du milieu, l'élève doit essayer de faire mieux mais selon ses capacités ou sa motivation, on pourra malgré tout s'en contenter et travailler un autre jeu. On peut tout à fait re-tamponner une case déjà tamponnée pour montrer qu'il y a eu une nouvelle évaluation.</div><div style="text-align: left;"> </div><div style="text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhK3w_62b-RqS8_02si_dd8e_d_s8RXmR29yt0emP3bvzmIHwCT8iZbJh0ikTc6olO9N_kpTEiRUgkYtz8z3CEh_KzzGgeQf-AUvRvQnT3wpipji6VKX9M8vy3HIuuw5diCfNu1GrhaGt6-c7Tr94EdyqqpNg1Ax4gmV8La0N15oOGZxVVto8USXn7b/s4080/suivi-individuel.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4080" data-original-width="3060" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhK3w_62b-RqS8_02si_dd8e_d_s8RXmR29yt0emP3bvzmIHwCT8iZbJh0ikTc6olO9N_kpTEiRUgkYtz8z3CEh_KzzGgeQf-AUvRvQnT3wpipji6VKX9M8vy3HIuuw5diCfNu1GrhaGt6-c7Tr94EdyqqpNg1Ax4gmV8La0N15oOGZxVVto8USXn7b/s320/suivi-individuel.jpg" width="240" /></a></div><div style="text-align: left;"><br /></div><div style="text-align: left;">On remarquera que certains jeux sont indiqués avec une plaque grise dans la feuille de suivi individuel. Ce sont des jeux "bilan". J'ai indiqué en dessous de quels jeux ils sont le bilan. Ainsi on pourra inciter les meilleurs élèves à essayer rapidement de faire les jeux bilan et tamponner d'un coup tous les jeux indiqués pour gagner du temps et leur permettre d'atteindre plus rapidement leur zone proximale de développement.<br /></div><div style="text-align: left;"> </div><div style="text-align: left;"><h2 style="text-align: left;">Les évaluations par des élèves évaluateurs :</h2>Il est impératif de tourner un certain temps avec uniquement le maître/la maîtresse comme évaluateur. Mais une fois que les meilleurs élèves auront bien compris le principe de l'évaluation, vous pourrez les former à évaluer à votre place leurs camarades. </div><div style="text-align: left;"> </div><div style="text-align: left;">Je dis bien "former" car tout cela n'a rien d'évident à cet âge. Pendant un moment, le professeur reste donc à côté de l'élève évaluateur pour lui rappeler toutes les consignes à suivre. Vous trouverez dans le <b>document "leçon évaluateur"</b> le détail de ces explications, fruit de nombreuses années de mise en place. Il faudra bien expliquer par exemple la notion d'évaluation : on ne doit pas aider, mais on ne doit pas non plus entraver le travail. Il faudra aussi montrer comment tenir les cartes pour qu'on les voit bien, comment ne pas perdre de temps en passant d'une carte à l'autre. Tout cela en surveillant le sablier etc. Autant dire un vrai apprentissage. Mais comme il s'agit logiquement des meilleurs élèves, cet apprentissage est tout à fait atteignable.</div><div style="text-align: left;"> </div><div style="text-align: center;"> <img alt="" 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" /></div><div style="text-align: left;"> </div><div style="text-align: left;">Chaque élève évaluateur devra avoir son propre tampon "signature". Ainsi il sera très facile en cas de problème de remonter vers l'élève qui a fait une erreur (par exemple tampon mis sur un jeu pas encore sorti !). Le fait de mettre son propre tampon engage donc l'élève évaluateur, il est responsable de l'apposition de son tampon sur une feuille de suivi. De plus les élèves ne gardent pas leur tampon dans leur trousse : ils sont stockés dans une boîte de la classe. Cela permet d'éviter qu'ils soient perdus bien sûr, mais aussi qu'ils soient utilisés à mauvais escient et enfin quand on leur remet leur tampon, cela symbolise pour eux comme pour les autres que ce sont eux les évaluateurs à ce moment là et pas quelqu'un d'autre. Par exemple si je mets en place du tutorat, je veillerai à ce que les élèves tuteurs n'aient pas leur tampon, car aider, expliquer est très différent d'évaluer. Dans la boîte de tampons j'ai la liste des élèves évaluateurs avec leur tampon apposé pour mémoire.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">En cas d'erreur de tamponnage sur la feuille de suivi, je barre le tampon. Je sais alors qu'il faut un deuxième tampon pour considérer la case comme validée.<br /></div><div style="text-align: left;"></div><div style="text-align: left;"></div><div style="text-align: left;"></div><div style="text-align: left;"><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjg6QUkavMjEPkFwqnDcKVBeZOfD3AX8BqcQ_zQUL_1K54d1XuZLG0ASuWlgFe-9Ih8Loa5Z69jnGy0n5IKYuCLM9LWWsMIsP5Ip8PhB1SZB1kz5F7hxaOI28N6iQY4sV7EcLQa0eUPVaAPIZXzE1Tbt7NKZZH2YTb87fVn9ue7vWZBZiyU8z1vuosu/s4080/tampons.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="3060" data-original-width="4080" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjg6QUkavMjEPkFwqnDcKVBeZOfD3AX8BqcQ_zQUL_1K54d1XuZLG0ASuWlgFe-9Ih8Loa5Z69jnGy0n5IKYuCLM9LWWsMIsP5Ip8PhB1SZB1kz5F7hxaOI28N6iQY4sV7EcLQa0eUPVaAPIZXzE1Tbt7NKZZH2YTb87fVn9ue7vWZBZiyU8z1vuosu/s320/tampons.jpg" width="320" /></a></div> </div><div style="text-align: left;"><br /></div><div style="text-align: left;"> <br /><div style="text-align: center;">DOCUMENTS A IMPRIMER</div><div style="text-align: center;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1oEy1W_SuXNfbjs3_RF9ATjZHdi0SHIbw/view?usp=share_link" target="_blank">>> leçon élève évaluateur (odt) << </a><br /></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1PMWtEsygXHabCYpHfwjYT2Sh5iMCml4w/view?usp=share_link" target="_blank"> >> leçon élève évaluateur (pdf) << </a></div><div style="text-align: center;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/150M-60ikTEr3geTMQIrWO6l-yXz3_91t/view?usp=share_link" target="_blank">>> liste des tampons des élèves évaluateurs (odt) <<</a></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1jHk8sBkrQpU6AsLXLxASj540ed75kbkM/view?usp=share_link" target="_blank">>> liste des tampons des élèves évaluateurs (pdf) <<</a></div><h2 style="text-align: left;">Le suivi collectif :</h2><h2 style="text-align: left;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjlxDlVwF4qFQjxbW4OokTGvNcy2vDg8XRIO8SahGG4G-6gFoOfaqy_AwsjnZvU2B7cMaUcUH1uH8J5t1qNoKqJz9uPXkj7sLw8zUBBYHh4fD4eDdhL8zsbt8qGcH51gttHgiXjzp3x8Pjjo8zwFf2qqcNFd-jcBX30vBzPtkF7DhFNwhZErNYMQMmi/s608/suivi-collectif-calcul.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="608" data-original-width="350" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjlxDlVwF4qFQjxbW4OokTGvNcy2vDg8XRIO8SahGG4G-6gFoOfaqy_AwsjnZvU2B7cMaUcUH1uH8J5t1qNoKqJz9uPXkj7sLw8zUBBYHh4fD4eDdhL8zsbt8qGcH51gttHgiXjzp3x8Pjjo8zwFf2qqcNFd-jcBX30vBzPtkF7DhFNwhZErNYMQMmi/s320/suivi-collectif-calcul.jpg" width="184" /></a></div><br /> <img alt="" 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" /> </h2>Le suivi collectif se présente comme un grand tableau à double entrée avec une ligne par élève et une colonne par jeu. Mais pour faciliter la lecture du tableau et éviter les erreurs, le nom de l'élève sera répété dans chaque case et le numéro de chaque jeu sera répété dans chaque colonne (ceci se fait automatiquement). On collera aussi des morceaux de papier de la couleur du jeu sur chaque colonne pour éviter encore plus les erreurs.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">Quand un élève a réussi un jeu (il peut le justifier en montrant le tampon de sa feuille de suivi individuelle), le maître/la maîtresse coloriera la case correspondante au fluo. Si le tampon indique que le jeu a été réussi seulement moyennement, on ne coloriera que le haut de la case (le prénom). Si le tampon est sur la case bonhomme grimace, on ne coloriera pas du tout la case (difficile à comprendre pour les élèves au début).</div><div style="text-align: left;"> </div><div style="text-align: left;">Cette feuille de suivi collectif permet ainsi de voir tout de suite les élèves en difficulté, de les aider, de faire un groupe de travail. Mais elle permet aussi de repérer les meilleurs élèves et de leur confier l'évaluation des autres. Elle permet également une grosse émulation entre élèves (notamment pour pouvoir être évaluateurs). <br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">Au bout d'un certain temps (assez long en CP !) on pourra confier le fluo à un élève responsable qui reportera sur la feuille collective les résultats individuels en regardant leur cahier. Et quand les élèves ont vraiment bien compris le principe ils peuvent eux-mêmes colorier leurs cases. On peut toujours vérifier en cas de doute sur la feuille individuelle. En cas d'erreur, je barre la case à la craie et j'efface la craie quand le tampon a réellement été obtenu.</div><div style="text-align: left;"><br /></div><div style="text-align: center;">DOCUMENTS A IMPRIMER</div><div style="text-align: center;"><br /></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1OnYuHXUPFWpHXJQJpHPtKRyKF9ob6gEu/view?usp=share_link" target="_blank">>> tableau de suivi collectif (ods) <<</a><br /></div><div style="text-align: left;"><h2 style="text-align: left;">La fabrication et le rangement du matériel :</h2><h4><u>A propos des papiers de couleurs.</u> <br /></h4></div><div style="text-align: left;">Il est absolument indispensable d'utiliser du papier de couleur pour différencier les jeux. Le choix des couleurs est essentiel pour éviter les confusions entre les jeux, les ranger correctement.</div><div style="text-align: left;"><br /></div><div style="text-align: left;"><img alt="" height="222" 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width="710" /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">D'un point de vue économique je conseille d'acheter d'abord les 2 paquets de couleurs assorties Clairefontaine : intenses et pastels (voir plus haut). Ce sont des paquets de 500 feuilles mais avec 100 feuilles de 5 couleurs différentes. Avec seulement 2 paquets on obtient donc déjà 10 couleurs. Je regrette que le bleu pastel soit un peu trop proche du blanc et que le rose saumon soit assez proche du rose pastel mais bon tant pis.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">Pour avoir d'autres couleurs il faut acheter par 500 de la même couleur, ce qui est un peu plus long à écouler... Je conseille particulièrement les couleurs caramel, lilas, rouge
groseille, clémentine, ivoire et bien sûr l'inévitable blanc. Ces couleurs se
différencient bien de celles de deux paquets de couleurs
assorties.</div><div style="text-align: left;"> </div><div style="text-align: left;">Mais comme j'ai une grosse utilisation des feuilles de couleur j'ai aussi acheté les couleurs bleu alizé (pas mal, assez différent de bleu
pastel), gris perle (proche d'ivoire ou bleu pastel), jonquille (un peu
trop proche de jaune canari), vert golf (beaucoup trop proche de vert
pastel !). Notez qu'il existe encore d'autres couleurs chez Clairefontaine mais je ne les ai pas testées.<br /></div><div style="text-align: left;"></div><div style="text-align: left;"> </div><div style="text-align: left;">Avec tout ça j'arrive à 20 couleurs et ce n'est pas encore assez pour différencier tous les jeux. Un moment donné il faut donc forcément que deux jeux aient la même couleur. Dans ce cas il faut veiller à mettre les jeux d'une même couleur les plus différents possibles et les plus éloignés dans la progression (comme ça on peut espérer que quand on arrive au retour de la couleur, le jeu d'avant n'est plus utilisé).</div><div style="text-align: left;"><br /></div><div style="text-align: left;">Comme expliqué plus haut, j'imprime des petits carrés avec le nom de la couleur + un dessin pour que les élèves puissent s'y retrouver. Je prépare des barquettes de ces petits carrés que j'utilise pour tous les jeux de la classe (en effet j'utilise ce système dans beaucoup de domaines). Lorsque je distribue les feuilles de suivi individuel, je demande donc aux élèves de coller les petits carrés de couleur en se basant sur les dessins.</div><div style="text-align: left;"> </div><div style="text-align: left;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh992e9I_R0ZZ4mgJPT8lQp9nXkf30DJK9gx_2K5vFLN_DK2DFp4CaseOwVZ6wcl_jLCBhLG02bZWgz5GIwvp5wTJR4-iosnR_uNbrBUhLH_FU2yol2byaPiP3Mum6XpJrWsLfO5NY3TOy50vdfAKkVQ11dEwUkcdJ4rJMQajDenqDmeGOcnjoxJN_A/s4080/carr%C3%A9s-couleurs.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4080" data-original-width="3060" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh992e9I_R0ZZ4mgJPT8lQp9nXkf30DJK9gx_2K5vFLN_DK2DFp4CaseOwVZ6wcl_jLCBhLG02bZWgz5GIwvp5wTJR4-iosnR_uNbrBUhLH_FU2yol2byaPiP3Mum6XpJrWsLfO5NY3TOy50vdfAKkVQ11dEwUkcdJ4rJMQajDenqDmeGOcnjoxJN_A/s320/carr%C3%A9s-couleurs.jpg" width="240" /></a></div> <h3><u>L'impression le "tamponnage" et le découpage des cartes :</u></h3></div></div><div style="text-align: center;"><div style="text-align: left;"></div><div style="text-align: left;">Pour imprimer les cartes, il faut utiliser du papier épais (160g). Comme expliqué ci-dessus, il est impératif d'utiliser un maximum de couleurs pour différencier chaque jeu.<br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">Il faut bien sûr imprimer en recto puis en verso en plusieurs exemplaires pour chaque jeu. Moi j'imprime généralement chaque jeu en 6 ou 7 exemplaires pour un bon roulement.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">Mais problème : en procédant ainsi si les cartes se mélangent (ce qui arrivera inévitablement), on peut retrouver de quel jeu il s'agit grâce à la couleur et au nom du jeu imprimé mais pas de quel exemplaire il s'agit. Et si on commence à mélanger les exemplaires, il n'y aura plus autant de cartes dans chaque exemplaire, et on risque de retrouver des cartes en double, en triple avec le même calcul dans le même exemplaire. Il faut donc marquer chaque exemplaire différemment. </div><div style="text-align: left;"> </div><div style="text-align: left;">Et pour cela j'ai la solution : avant de découper les cartes, je tamponne le recto de chaque carte du même exemplaire (la même feuille) avec un tampon. Puis pour l'exemplaire suivant je change de tampon autant de fois que d'exemplaires. Ainsi quand une carte est perdue, je retrouve d'abord dans quelle barquette elle va (couleur/nom du jeu) et je la remets avec le bon exemplaire grâce au tampon. Le tampon étant assez visible, les élèves eux-mêmes verront sans y faire attention s'il y a une erreur de rangement en utilisant le jeu.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">Mais si j'ai commencé avec de vrais tampons, j'ai ensuite trouvé une solution plus efficace et rapide : la sur-impression des "tampons". Dans le document fourni en bas vous trouverez donc 10 pages avec 10 "tampons" différents qu'il suffira de lancer une fois (en mode imprimante) pour tamponner tous les exemplaires d'un même jeu. Si vous êtes en mode photocopie, il faudra alors prendre le premier exemplaire de chaque jeu et photocopier le premier tampon sur tous. Puis prendre le deuxième exemplaire avec le deuxième modèle de tampon etc.</div><div style="text-align: left;"> </div><div style="text-align: center;"></div><div style="text-align: center;"><i>4 exemplaires du même jeu</i></div><div style="text-align: left;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiV_NQ_d8FNZHyrEs2PYOQujkotVO19CFBJ4GkUjtvfxHUQc14okaNPK749zR4K67uOLyW6xZHL3wWwwhdxvQe2-6LZkVRbEVnAqxy0-wOFOmzHG9-U3zlutDbWLgp9y2F6IEWf4P2fQmz2oikhchJbsgSoqW0zIGem0ARYwYbpksBUcS9JPN6X5MkP/s4080/tampons-cartes.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4080" data-original-width="3060" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiV_NQ_d8FNZHyrEs2PYOQujkotVO19CFBJ4GkUjtvfxHUQc14okaNPK749zR4K67uOLyW6xZHL3wWwwhdxvQe2-6LZkVRbEVnAqxy0-wOFOmzHG9-U3zlutDbWLgp9y2F6IEWf4P2fQmz2oikhchJbsgSoqW0zIGem0ARYwYbpksBUcS9JPN6X5MkP/s320/tampons-cartes.jpg" width="240" /></a></div></div><div style="text-align: left;"><br /></div><div style="text-align: left;">Bien sûr pour ce qui est du recto-verso et ensuite de la sur-impression au recto il faudra bien prendre vos repères pour savoir dans quel sens mettre les feuilles avant de vous lancer !</div><div style="text-align: left;"><br /></div><div style="text-align: left;">Une fois les feuilles imprimées recto-verso et tamponnées (manuellement ou par impression). On peut passer au découpage. Alors là moi, pas de pitié je fais trop de jeux dans l'année pour le faire feuille par feuille, j'utilise le massicot même si c'est quelquefois un peu moins précis. Et alors l'utilité des couleurs et des tampons prendra encore une fois tout son sens. Car une fois les cartes découpés au massicot elles sont mélangées. Mais pas de panique, il suffit de les mettre en tas dans une barquette et de demander aux élèves de les trier par couleur et par tampon, et d'accrocher chaque exemplaire avec un trombone. </div><div style="text-align: left;"> </div><div style="text-align: left;">Je vous conseille même fortement d'en faire un véritable atelier de rangement avec les élèves car cet apprentissage leur servira ensuite toute l'année pour ranger correctement les jeux. Moi qui ai les jeux déjà fabriqués, je les mélange volontairement pour faire un tel atelier en début d'année. Ils se familiarisent ainsi avec le principe des couleurs, des tampons, du recto-verso, du trombone et rien n'est facile pour des CP !<br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">Vous remarquerez que je ne parle de pas de plastifier. En effet cela rajoute encore du travail et les cartes beaucoup plus épaisses ne rentrent plus bien dans le trombone. De plus comme je modifie assez régulièrement les cartes, je préfère les ré-imprimer plutôt que de les plastifier.</div><div style="text-align: left;"> </div><div style="text-align: center;"><img alt="" height="264" 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width="377" /> <br /></div><div style="text-align: left;"> </div><div style="text-align: center;">DOCUMENTS A IMPRIMER</div><div style="text-align: center;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1J0eElCCbt6jJ8N3VFMrFPsVkVX7hpN64/view?usp=share_link" target="_blank">>> tampons pour sur-impression jeux 18 cartes << </a><br /></div><div style="text-align: left;"></div><div style="text-align: left;"><div style="text-align: left;"><h3><u>Les trombones</u></h3><h3 style="text-align: center;"><img alt="100 ATTACHES GÉANTES 30X40MM K102121 - Papeteries d'Arvor" class="rg_i Q4LuWd" data-iml="1275" height="180" src="https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcQ6ySvJmtNYH5GCefrq3h0yFdQN-A2aYOohNV4T3514S4mugAbsCTxdsH92tpIFirl8QQ0&usqp=CAU" width="180" /></h3><h3><u></u></h3></div><div style="text-align: left;"></div>Comme on le voit sur les photos j'attache chaque exemplaire de jeu par un trombone. Soyons précis quand je les commande il s'agit en réalité d'<b>attaches géantes 30 x 40 mm</b>.</div><div style="text-align: left;"><br /></div><div style="text-align: left;"><h3><u>Les barquettes et les fonds de barquette.<br /></u></h3></div><div style="text-align: left;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj6pMd6tUuHbgLU-6Tms21QXQ5Z3mg2ARK2NJEnXpQtiRrjvbAvBBl12ZCtgLCD8Uv5dtuyyXVkJY_-nk9eCszUFvivzmnNregAntY0dQdIcAUKwM0IEUeU2yeJTnAsPU7OY86vj199FvKhiu9GTkZCDf7U2Ay-GXVHeFAdNXogyMGHKllEQf_fRALl/s4080/barquettes-calcul.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4080" data-original-width="3060" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj6pMd6tUuHbgLU-6Tms21QXQ5Z3mg2ARK2NJEnXpQtiRrjvbAvBBl12ZCtgLCD8Uv5dtuyyXVkJY_-nk9eCszUFvivzmnNregAntY0dQdIcAUKwM0IEUeU2yeJTnAsPU7OY86vj199FvKhiu9GTkZCDf7U2Ay-GXVHeFAdNXogyMGHKllEQf_fRALl/s320/barquettes-calcul.jpg" width="240" /></a></div> </div><div style="text-align: left;">Pour ranger les jeux j'utilise des barquettes de cantine. J'ajoute dedans des "fonds de barquettes" avec le code du jeu. Comme j'ai beaucoup d'atelier de ce type, j'ajoute aussi la couleur de la feuille de suivi individuel et de la feuille de suivi collectif.</div><div style="text-align: center;"><img alt="" height="208" 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width="147" /></div><div style="text-align: left;"> </div><div style="text-align: left;"><div style="text-align: left;"><div style="text-align: center;">DOCUMENTS A IMPRIMER</div><div style="text-align: center;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1ma1ifVw6ZuS1AlvH5mEoMWKRToWNlDqU/view?usp=share_link" target="_blank">>> fonds de barquettes (odg) <<</a><br /></div><div style="text-align: center;"><br /></div></div><div style="text-align: left;"></div></div><div style="text-align: left;"><h3><u>Le tapis de jeu</u> <br /></h3></div><div style="text-align: left;">Je conseille d'imprimer plutôt le tapis simple pour la classe (sans l'emplacement du sablier ni les règles). En effet il est souvent plus pratique de poser le sablier à côté du tapis que dessus (visibilité, éviter qu'il ne tombe). De plus les règles peuvent être amenée à changer légèrement pour d'autres ateliers.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">On imprimera donc ce tapis simple sur du papier épais 160g et on peut le plastifier pour plus de durabilité.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">Le tapis avec le sablier et les règles pourra être imprimé sur papier simple et sans être plastifié pour être confié aux élèves pour travailler à la maison (comme ça les parents ont les explications à disposition). Il peut aussi de ce fait être personnalisé par les élèves (coloriage des bonhommes).</div><div style="text-align: left;"><br /></div><div style="text-align: left;"><div style="text-align: left;"><h3><u>Les sabliers</u></h3><div style="text-align: left;">Dans cet atelier <10, j'utilise des sabliers blancs d'une minute pour les CE1, des sabliers rouges de 2 minutes pour les CP et des sabliers bleus de 3 minutes pour les élèves dys ou en grande difficulté.<br /></div></div> </div><div style="text-align: left;">Je commande ces sabliers sur le site <a href="https://toutpourlejeu.com/fr/">https://toutpourlejeu.com/fr/</a></div><div style="text-align: left;">Possibilité de payer en mandat administratif.</div><div style="text-align: left;"> </div><div style="text-align: left;">Je range les sabliers dans des petites boîtes avec au fond des morceaux de tuyau PVC coupés pour indiquer les emplacements. Cela permet de vérifier s'il manque un sablier et de les laisser droits dans la boîte (donc prêts à l'emploi, pas besoin d'attendre que le sable finisse de couler).</div><div style="text-align: left;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiv4y4qFBuNpzKW8_tSu8IdRVecLNMBkr1x0OqQyYFqUYJJq40hj3BvMbgUHqeHjW6lPe3FLXXHqkVrzGK7PkFd7ASmDwWIM0UbOQF9_xxCa6m-F6qk7JG2cJxstOK_0tTU0KQZqhGNTNlej5kqa6RaPp1jOQMTH5rV89aZQZSCfsLDdjf0oDyHe6vY/s4080/sabliers-rangement.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4080" data-original-width="3060" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiv4y4qFBuNpzKW8_tSu8IdRVecLNMBkr1x0OqQyYFqUYJJq40hj3BvMbgUHqeHjW6lPe3FLXXHqkVrzGK7PkFd7ASmDwWIM0UbOQF9_xxCa6m-F6qk7JG2cJxstOK_0tTU0KQZqhGNTNlej5kqa6RaPp1jOQMTH5rV89aZQZSCfsLDdjf0oDyHe6vY/s320/sabliers-rangement.jpg" width="240" /></a></div><div style="text-align: left;"></div><div style="text-align: left;"><div style="text-align: left;"><h3><u>La feuille de suivi individuel<br /></u></h3><div style="text-align: left;">J'imprime ce document sur du papier normal (80g) pour le coller ensuite dans un cahier. Si on ne le colle pas dans un cahier, il est plus prudent de l'imprimer en papier épais (160g). <br /></div></div></div><div style="text-align: left;"> </div><div style="text-align: left;"><h3><u>La feuille de suvi collectif</u></h3></div><div style="text-align: left;">Ouvrir le tableau dans libreoffice. Ouvrir l'onglet de gauche "prénoms". Ecrire ou copier coller les prénoms. Ouvrir ensuite l'onglet "tableau". Modifier si besoin les 4 premières lignes (titre, code du jeu, notion abordée, couleur du papier). Tous ces éléments se dupliqueront automatiquement dans le reste du tableau (notamment prénom et code du jeu dans chaque case.</div><div style="text-align: left;"> </div><div style="text-align: center;"><img alt="" height="317" 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" width="388" /> <br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">Imprimer ensuite les 3 feuilles et les scotcher à la suite pour faire un grand tableau (inutile de découper les feuilles).<br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">Ajouter des petits carrés de la couleur des jeux aux endroits indiqués pour aider à se repérer.<br /></div><div style="text-align: left;"><br /></div></div></div></div>Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-3704550768342113362023-01-03T13:28:00.016-08:002023-01-12T10:52:10.591-08:00Tables de multiplication : atelier autonome et différencié<h2 style="text-align: left;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhBNTWw0w2f-feuXe0_AjwolQD3PNW4Y8Aczfc2lY65qoP5irK1cG4SdQQkCB00QJiGk1ueWP1Bq0aMT3Dh7ziP_5h_eWO63wFkDE8jWj2l5nFXL4WqGhkZyMyH3jIfqH3z2rgONsxAHz9XTS1KN3XzgKSHgROZhGFWn0V2T9usNABw9l7gNObxMjhW/s4080/IMG_20230103_131528_HDR.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4080" data-original-width="3060" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhBNTWw0w2f-feuXe0_AjwolQD3PNW4Y8Aczfc2lY65qoP5irK1cG4SdQQkCB00QJiGk1ueWP1Bq0aMT3Dh7ziP_5h_eWO63wFkDE8jWj2l5nFXL4WqGhkZyMyH3jIfqH3z2rgONsxAHz9XTS1KN3XzgKSHgROZhGFWn0V2T9usNABw9l7gNObxMjhW/s320/IMG_20230103_131528_HDR.jpg" width="240" /></a></div></h2><h2 style="text-align: left;">Entraînement en classe ou à la maison avec les dépliants et les caches (+ sablier) :</h2><h2 style="text-align: left;"><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjQ5ReDr2FVhcAQOK3nPuUAb5DuEPmnT5Rtro2O799EP4dzSICWy2Tp9wrOyescdH-gVN7cZtcS03Y3LVDd32litK71oX5PbE0TZAid0yeanmOJQIZbuocrLbBeTiCw159POnwVdE3BEiUPLQOf4kachrtMw_0O_wDgl6SmslHUOb-kWPVRkG2pyUPv/s4064/IMG_20230103_131705.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4064" data-original-width="2928" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjQ5ReDr2FVhcAQOK3nPuUAb5DuEPmnT5Rtro2O799EP4dzSICWy2Tp9wrOyescdH-gVN7cZtcS03Y3LVDd32litK71oX5PbE0TZAid0yeanmOJQIZbuocrLbBeTiCw159POnwVdE3BEiUPLQOf4kachrtMw_0O_wDgl6SmslHUOb-kWPVRkG2pyUPv/s320/IMG_20230103_131705.jpg" width="231" /></a> <br /></div></h2><div style="text-align: left;"><div style="text-align: left;"><div style="text-align: center;"><i> vidéo à destination des élèves qui explique le fonctionnement des dépliants</i></div><div style="text-align: center;"><i>(page spéciale élèves <a href="https://www.classem.fr/2020/04/les-tables-de-multiplications.html">ici</a>) </i><br /></div><div style="text-align: center;"><iframe allowfullscreen="" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/V8iPsxlRBpM/0.jpg" frameborder="0" height="266" src="https://www.youtube.com/embed/V8iPsxlRBpM?feature=player_embedded" width="320"></iframe></div></div> </div><div style="text-align: left;"> </div><div style="text-align: left;"> - Je choisis le dépliant de la table des 2 (ou un autre selon mon niveau).</div><div style="text-align: left;"> </div><div style="text-align: left;">- Je plie le dépliant pour voir uniquement le volet <b>A (trottinette) qui présente la table dans l'ordre.</b></div><div style="text-align: left;"><br /></div><div style="text-align: left;">- Je place le cache pour mettre le point d'interrogation en face de la première réponse.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- Je dis la réponse dans ma tête. Si je ne sais pas, je dis dans ma tête "je ne sais pas".<br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">- Je <b>descends légèrement le cache</b> pour laisser la réponse apparaître dans la petite fenêtre.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- Si la réponse est correcte, je lis le deuxième calcul et je cherche la réponse dans ma tête. Si la réponse est fausse (ou que j'ai dit "je ne sais pas"), je recommence depuis le début.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- <b>Je recommence autant de fois que nécessaire</b> jusqu'à réussir tous les calculs sans erreur.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- Quand j'ai fini, je recommence avec un <b>sablier d'une minute</b>. Quand le sablier est fini, je dois avoir réussi toutes les réponses sans erreurs. Je recommence autant de fois que nécessaire.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- Quand j'ai réussi à avoir tout bon en une minute, je plie le dépliant pour mettre en avant la partie <b>B (vélo) qui présente seulement le début de la table mais dans le désordre</b>. Je recommence autant de fois que nécessaire.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- A chaque fois que je parviens à avoir tout bon en une minute, je passe à la partie suivante : <b>C (scooter) la fin de la table dans le désordre</b>, <b>D (voiture) toute la table dans le désordre</b>. </div><div style="text-align: left;"> </div><div style="text-align: left;">- Pour consolider ma connaissance de la table, je peux aussi continuer en travaillant la partie <b>E (avion) qui donne des multiplications à trou</b>, ou même éventuellement la partie <b>F (fusée) qui présente la table sous forme de divisions sans reste</b>.</div><div style="text-align: left;"> </div><div style="text-align: left;">- Ne pas hésiter non plus à revenir sur les étapes d'avant si on a des difficultés sur une nouvelle étape. </div><div style="text-align: left;"><br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;"> </div><div style="text-align: center;">DOCUMENTS A IMPRIMER (PDF)<br /></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1SkxHz8_Ea1I6MZFI35kOl32V2l9eKY4Z/view?usp=share_link" target="_blank">>> dépliants tables 2,3,4,5 <<</a></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1Kg3kPzy_uV1NbxlbKx1dQGa7ueSPNPEF/view?usp=share_link" target="_blank">>> dépliants tables 6,7,8,9 <<</a></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/19kKg2c4Uy__egXfVBpAHBpPhHZ4WNsxI/view?usp=share_link" target="_blank">>> cache <<</a><br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;"><h2 style="text-align: left;">Evaluation différenciée en classe :</h2><div style="text-align: left;">- Je prends mon coupon d'évaluation. </div><div style="text-align: left;"> </div><div style="text-align: left;"><span style="font-size: x-small;"><i><u>Remarque :</u> il y a 4 types de coupons (araignée, oiseau, chat, chien) qui évitent la copie entre voisins et permettent de poser tous les calculs possibles quand il y a plusieurs tables mélangées).</i></span><br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">- J'écris mon prénom.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- J'écris deux fois le nom de ma table dans les cases de droite. Exemple : "TABLE de 2" ou "TABLE de 3" ou "TABLES de 2 et 3". <br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">- Ensuite je complète les calculs en remplissant les petites cases. Si j'évalue la table des 2 par exemple, j'écris 2 dans chaque petite case. Si je récite la table des 3, j'écris 3 dans chaque petite case. Si je récite les tables de 2 et 3, j'écris 2 dans la première case, 3 dans la deuxième, 2 dans la troisième, 3 dans la quatrième et ainsi de suite jusqu'à la dernière (2 dans les cases grises, 3 dans les cases blanches). Si j'évalue les tables de 2,3,4,5, je complète avec 2 dans la première case, 3 dans la suivante, 4 dans la suivante, 5 dans la suivante, puis à nouveau 2 dans la suivante jusqu'à la dernière case. <br /></div><div style="text-align: left;"><div style="text-align: center;"><i> </i></div><div style="text-align: center;"><i>exemples avec 1 seule table</i><br /></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiyYZFIk6l33CRnGDSqiykjjW7KIiJI0g6G3YAtIrLqhhb0Pc2ohApPKGwsBR_5RWyCGOc2tSedte8JGp541TJEIYoyCyMqGlw2xSosqfylNMGWvexJGwvUJIzHYHYP9vMu0wwPf_o-ZMdygAZk4cpmJTknxZdTjqMQYGPJuvhk0RuJxfU8c5OWHXaC/s2997/evaluations1.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1606" data-original-width="2997" height="250" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiyYZFIk6l33CRnGDSqiykjjW7KIiJI0g6G3YAtIrLqhhb0Pc2ohApPKGwsBR_5RWyCGOc2tSedte8JGp541TJEIYoyCyMqGlw2xSosqfylNMGWvexJGwvUJIzHYHYP9vMu0wwPf_o-ZMdygAZk4cpmJTknxZdTjqMQYGPJuvhk0RuJxfU8c5OWHXaC/w468-h250/evaluations1.jpg" width="468" /></a></div></div><div style="text-align: center;"><i> </i></div><div style="text-align: center;"><i> exemple avec 2 tables mélangées et exemple avec 4 tables<br /></i></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi1aAY1vyImZOseLU_Ik3IRyNVhtHnLleUJH0lrCEa_3u3HGaxS7iBHLMYjAacTCFLDYp72G3RMtrp46bt3VGKNLRnv4PITGtjBmWY4Mkhc45JA0f8c53VDP65GWBHcQbjU1_5pgWROJPwJmAz4IE3fK_ab0obIUmTlkaIwodepxaMrwcY_wtMfcg9b/s3035/evaluations2.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1611" data-original-width="3035" height="251" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi1aAY1vyImZOseLU_Ik3IRyNVhtHnLleUJH0lrCEa_3u3HGaxS7iBHLMYjAacTCFLDYp72G3RMtrp46bt3VGKNLRnv4PITGtjBmWY4Mkhc45JA0f8c53VDP65GWBHcQbjU1_5pgWROJPwJmAz4IE3fK_ab0obIUmTlkaIwodepxaMrwcY_wtMfcg9b/w472-h251/evaluations2.jpg" width="472" /></a></div><div style="text-align: left;"><br /></div><div style="text-align: left;">- Mais attention, je n'écris pas les réponses pour l'instant.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">- Quand tout le monde a préparé sa feuille, alors le maître/la maîtresse donne le départ pour écrire les réponses. Au bout d' 1 minute 30. Il/elle dit de poser les stylos et de ramasser les feuilles.<div style="text-align: left;"><br /></div><div style="text-align: center;">DOCUMENT A IMPRIMER (PDF)<br /></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1zotw-AJzvCYKzIZm6gJ6aUlGFnELv7w0/view?usp=share_link" target="_blank">>> coupons évaluation tables 4 versions << </a><br /></div></div><div style="text-align: left;"><br /></div><div style="text-align: left;"><h2 style="text-align: left;">Correction de l'évaluation différenciée :<br /></h2></div><div style="text-align: left;">- Pour corriger, on compte bien sûr le nombre de bonnes réponses et on l'indique en haut de la feuille d'évaluation. <br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">- Si tout est bon (11/11), on tamponne alors 2 fois les cases de droite (bonhomme sourire). La deuxième case sera à découper pour coller sur la feuille de suivi individuel, le premier tampon restera sur la feuille. S'il y a une erreur ou plus, on tamponne la case barrée de gauche (bonhomme moyen / triste).</div><div style="text-align: left;"> </div><div style="text-align: left;"><div style="text-align: center;"><i> exemple d'une évaluation réussie à gauche et échouée à droite</i><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgml5gJK-7AWEjD_MUYPTHajqQ8E7uND9KZd8EAEHVH5pLv8aG9xvhXp6iEvEZ4vP7aZYVeF-lPLvt1KByYbv3W_IXKeavNWN-hAuyxn4MzqvsA0kfjtYJUH74C1GzjA667iGmhpLWChbLAErK6zdUbO-jYombiUJjYe1XuDpPIefq0VK95x4rdl4va/s2928/evals-corrig%C3%A9es.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1592" data-original-width="2928" height="247" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgml5gJK-7AWEjD_MUYPTHajqQ8E7uND9KZd8EAEHVH5pLv8aG9xvhXp6iEvEZ4vP7aZYVeF-lPLvt1KByYbv3W_IXKeavNWN-hAuyxn4MzqvsA0kfjtYJUH74C1GzjA667iGmhpLWChbLAErK6zdUbO-jYombiUJjYe1XuDpPIefq0VK95x4rdl4va/w455-h247/evals-corrig%C3%A9es.jpg" width="455" /></a></div></div><div style="text-align: left;"> </div><div style="text-align: left;"><i><span style="font-size: x-small;"><u>Remarque :</u> Je fais le choix de demander à n'avoir aucune erreur pour valider une table. Cela peut paraître dur mais je pars du principe que si pour chaque table on fait l'impasse sur un ou deux calculs, au bout de plusieurs tables cela fait énormément de calculs non sus et surtout les tables vont être de plus en plus dures car l'élève ne pourra pas s'appuyer sur sa connaissance des tables précédentes. Par exemple, si dans la table des 4 il ne maîtrise pas 4x6, il ne pourra pas s'appuyer dessus quand il arrivera à la table des 6 (où il retrouvera 6x4). Malgré tout il est indiqué dans la fiche de suivi individuel que je valide la table si 4 fois l'élève a eu 10/11.</span></i> <br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">- Pour aider à la correction, on dispose si besoin de feuilles de correction avec toutes les réponses. Il faudra bien sûr prendre soin de trier les feuilles par animal (araignée/chien/chat/oiseau) pour pouvoir utiliser correctement les feuilles de correction.</div><div style="text-align: left;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiPO6mGnhOMkaMsgvy9V-3-3hKyZo-6oXXHkqdV29YDfdKBf5uY23EF4_Jl98_9EWCL1ZeoZkDamazlzVipC4HPGgVR8r1zP6xaqo75C2Gy6nMPDJtUzmKbxBihwARv4rdhl9rHJMKg0zEOpJeauwpv4i8RCBi1L7tCfajmhuGD7Z3VFDpcjGopRtwf/s4080/feuilles-corrections.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4080" data-original-width="3060" height="209" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiPO6mGnhOMkaMsgvy9V-3-3hKyZo-6oXXHkqdV29YDfdKBf5uY23EF4_Jl98_9EWCL1ZeoZkDamazlzVipC4HPGgVR8r1zP6xaqo75C2Gy6nMPDJtUzmKbxBihwARv4rdhl9rHJMKg0zEOpJeauwpv4i8RCBi1L7tCfajmhuGD7Z3VFDpcjGopRtwf/w157-h209/feuilles-corrections.jpg" width="157" /></a></div><div style="text-align: left;"><br /></div><div style="text-align: left;">- Il est tout à fait possible de confier la correction des évaluations à un ou plusieurs élèves qui apposeront leur tampon personnel.</div><div style="text-align: left;"> </div><div style="text-align: center;"><i>liste des élèves avec leur tampon attribué </i><br /></div><div style="text-align: left;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjhJ221A2JndneaDWmJ0i3scP4ai9AXaAYoVTUNO3i8bCnLaSIVr7ZUujbij3jt91eceRXi9ED_4SE8kg5wsAU6u9a0nSVvjYtqP4G-xCHyXRAar5GkNsyxnlAvobld1oX2lnxNlSEuCjLkSWGzIPebEUgIAbKyECx2To5aHX64rqvcYCeEbumAjnIq/s4080/tampons.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="3060" data-original-width="4080" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjhJ221A2JndneaDWmJ0i3scP4ai9AXaAYoVTUNO3i8bCnLaSIVr7ZUujbij3jt91eceRXi9ED_4SE8kg5wsAU6u9a0nSVvjYtqP4G-xCHyXRAar5GkNsyxnlAvobld1oX2lnxNlSEuCjLkSWGzIPebEUgIAbKyECx2To5aHX64rqvcYCeEbumAjnIq/s320/tampons.jpg" width="320" /></a></div></div><div style="text-align: left;"> </div><div style="text-align: left;"><i><span style="font-size: x-small;"><u>Remarque :</u> Le maître/la maîtresse a son propre tampon, et chaque élève correcteur a son propre tampon. Cela permet de remonter facilement au correcteur en cas de problème. Par exemple, le maître/la maîtresse se rend compte qu'une feuille a été très mal corrigée, il suffit de regarder quel tampon a été apposé pour en faire la remarque au correcteur. Cela engage le correcteur à un certain sérieux dans sa correction.</span></i></div><div style="text-align: left;"><div style="text-align: left;"><div style="text-align: left;"><br /></div><div style="text-align: center;">DOCUMENT A IMPRIMER</div><div style="text-align: center;"><br /></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/12SPonxOzSmSdniOgOBh6hXD3qro393NN/view?usp=share_link" target="_blank">>> corrections des coupons d'évaluation 4 versions (PDF) <<</a></div><div style="text-align: center;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1_8terRGZl_vQfdarj3D57KvU0xC53554/view?usp=share_link" target="_blank">>> Liste des élèves avec leurs tampons (ODT) <<</a></div><div style="text-align: center;"> <a href="https://drive.google.com/file/d/1_XhVt5_jgWThLDV-u7HTPuboGo4tCzQ4/view?usp=share_link" target="_blank">>> Liste des élèves avec leurs tampons (PDF) <<</a></div><div style="text-align: center;"> </div></div><h2 style="text-align: left;">Suivi individuel :</h2></div><div style="text-align: left;">Une feuille de suivi individuel peut être mise en place. </div><div style="text-align: left;"> </div><div style="text-align: left;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhUxBPVh7s7V-DS9mzgvK_DzdMm2vKVDizD8-zmsFu9aH06v6SDdAcuT3DGJnl8xT0sEqWaH_LL-WB7kuzmkKKOjC_Vb25lAmhpF6XA-CVS7RYuhrj-t5er-7L517JmDZeDvHG7-RN-wjVQKd_y2npA415zpnsROFfVsgLTWe6WLbkxQPyKz8-AKRK1/s4080/feuille-suivi-indiv-mult.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="3060" data-original-width="4080" height="276" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhUxBPVh7s7V-DS9mzgvK_DzdMm2vKVDizD8-zmsFu9aH06v6SDdAcuT3DGJnl8xT0sEqWaH_LL-WB7kuzmkKKOjC_Vb25lAmhpF6XA-CVS7RYuhrj-t5er-7L517JmDZeDvHG7-RN-wjVQKd_y2npA415zpnsROFfVsgLTWe6WLbkxQPyKz8-AKRK1/w367-h276/feuille-suivi-indiv-mult.jpg" width="367" /></a> <br /></div></div><div style="text-align: left;"> </div><div style="text-align: left;">Elle permet de rappeler à l'élève la progression des tables :</div><div style="text-align: left;">TABLE DE 2</div><div style="text-align: left;">TABLE DE 3</div><div style="text-align: left;">TABLES DE 2 ET 3</div><div style="text-align: left;">TABLE DE 4</div><div style="text-align: left;">TABLE DE 5</div><div style="text-align: left;">TABLES DE 4 ET 5</div><div style="text-align: left;">TABLES DE 2,3,4,5</div><div style="text-align: left;">(éventuellement DIVISIONS par 2,3,4,5) <br /></div><div style="text-align: left;">TABLE DE 6</div><div style="text-align: left;">TABLE DE 7</div><div style="text-align: left;">TABLES DE 6 ET 7</div><div style="text-align: left;">TABLE DE 8</div><div style="text-align: left;">TABLE DE 9</div><div style="text-align: left;">TABLES DE 8 ET 9</div><div style="text-align: left;">TABLES DE 6,7,8,9</div><div style="text-align: left;">(éventuellement DIVISIONS par 6,7,8,9) <br /></div><div style="text-align: left;"> </div><div style="text-align: left;"><i><span style="font-size: x-small;"><u>Remarque :</u> Cette progression suit bien sûr les tables dans l'ordre mais reprend également très régulièrement les anciennes tables en les mélangeant. Cela permet une avancée très progressive et obligeant à réviser sans cesse les tables déjà obtenues.</span></i> <br /></div><div style="text-align: left;"> </div><div style="text-align: left;">Elle permet aussi à l'élève de noter ses résultats aux évaluations et ainsi suivre sa progression (note le score sur 11 obtenu).</div><div style="text-align: left;"> </div><div style="text-align: left;">Elle permet enfin de coller les tampons découpés qui valident la réussite d'une table.<div style="text-align: left;"><br /></div><div style="text-align: center;">DOCUMENT A IMPRIMER<br /></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1RD_Qg8m-y1RtxYjOVC8nUi0KZy-npCKF/view?usp=share_link" target="_blank">>> suivi individuel tables de multiplication (pdf) << </a><br /><div style="text-align: center;"><a href="https://drive.google.com/file/d/1AI-8MNVJTSmCHzaOSHEC2sLhfyMGq3Pt/view?usp=share_link" target="_blank">>> suivi individuel tables de multiplication (odt) <<</a></div></div><div style="text-align: left;"><br /></div><h2 style="text-align: left;">Suivi collectif :</h2><h2 style="text-align: left;"> <div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgrLk9MuNkPUkEviFmybwSMUqIQVmIjd-nngtAse8VLDd2jUYhngkDwtAnKG4NbGnrdmuiQIrmMKiduAcfkH3Y3A1wqnAZmZXKP5VPT0CkHbeZ9kwoZZbnKqTqy6LZZ6ASGTVAH8kNfwVB3rGRwTJSMq9zlTcEPjlyA9YPhe4Fz-fpX-d69FIAxyJH9/s374/suivi-collectif.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="374" data-original-width="200" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgrLk9MuNkPUkEviFmybwSMUqIQVmIjd-nngtAse8VLDd2jUYhngkDwtAnKG4NbGnrdmuiQIrmMKiduAcfkH3Y3A1wqnAZmZXKP5VPT0CkHbeZ9kwoZZbnKqTqy6LZZ6ASGTVAH8kNfwVB3rGRwTJSMq9zlTcEPjlyA9YPhe4Fz-fpX-d69FIAxyJH9/s320/suivi-collectif.jpg" width="171" /></a></div></h2><h2 style="text-align: left;"></h2><div style="text-align: left;"><div style="text-align: left;">Dans ce grand tableau, on a une ligne par élève et une colonne par table. C'est donc un grand tableau à double entrée créé en scotchant 3 feuilles à la suite. Mais en réalité dans chaque case il est rappelé le prénom de l'élève et la table obtenue, ce marquage permet de faciliter la lecture du tableau et d'éviter au maximum les erreurs. Une fois la liste des prénoms entrée dans l'onglet "prénoms" du tableur, tout est rempli automatiquement par dans l'onglet "tableau".<br /></div><div style="text-align: left;"><br /></div><div style="text-align: center;"><img alt="" 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" /></div><div style="text-align: left;"><br /></div>Le maître/la maîtresse colorie au fluo la case lorsque le tampon "bonhomme sourire" a été obtenu. Lorsque les élèves sont suffisamment au point, ils peuvent tout à fait colorier eux-même les cases. En cas de doute, il est toujours possible de vérifier les tampons obtenus sur la feuille de suivi individuel. En cas d'erreur, je barre provisoirement la case avec une craie, j'efface la craie de la feuille quand le tampon a réellement été obtenu.<br /></div><div style="text-align: left;"> </div><div style="text-align: left;">Ce grand tableau permet de suivre pour le maître/la maîtresse l'avancée globale de tous les élèves dans les tables. On peut ainsi repérer facilement les élèves en difficulté pour leur apporter une aide individuelle ou en groupe de besoin. On repère également immédiatement les meilleurs élèves qui pourront être correcteurs par exemple. On peut enfin donner des devoirs différenciés, c'est à dire noter au tableau "apprendre table de ...." et chaque élève écrit là où il en est.<br /><div style="text-align: left;"><br /></div><div style="text-align: center;">DOCUMENT A IMPRIMER (ODS)<br /></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1m1zhesjtybLOZ-_pJWasucaYKPVPwNH3/view?usp=share_link" target="_blank">>> suivi collectif tables de multiplications <<</a></div></div><div style="text-align: left;"><div style="text-align: left;"><br /></div><h2 style="text-align: left;">Documents supplémentaires :</h2></div><div style="text-align: left;">Une leçon classique avec toutes les tables de multiplication pour le cahier de leçons (PDF).</div><div style="text-align: left;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/18_dngAsJ3Rk69w41cRCYtLFtbDE4k-mj/view?usp=share_link" target="_blank">>> leçon tables de multiplications <<</a><br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;">Dans la progression j'ai inséré une évaluation spéciale division. Je ne m'en sers pas en réalité mais je pense qu'avec des CM1 ou des CM2 ça peut être utile (PDF).</div><div style="text-align: left;"> </div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1ZOOLEKx1Ne3Lq-5ZFMDyBhwctDwpJ6r6/view?usp=share_link" target="_blank">>> dépliants tables divisions <<</a></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1XkAlsijHMFmzV2Gich97CXSTmew4a0n7/view?usp=share_link" target="_blank">>> coupons évaluations divisions 2,3,4,5 <<</a></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/1ZFPV7-xfUag93P2Es-Tgs_JWu2Mib3eP/view?usp=share_link" target="_blank">>> coupons évaluations divisions 6,7,8,9 <<</a><br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;"><br /></div>Des modèles pour mettre le nom de chaque table au fond des barquettes de cantine (document au format libreoffice draw pour garder les bonnes mesures).<br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhoVydUMjq41PD7U9MwdU_reoBhz-PttCbgyl_atDJxzD4TS_UlOrIUVHbALlBusgL0jQVAgM4r-UGsXmjSW48_cKwTINvg6b4fK8HUCvI8XnPedVWpY08DTdhJFiX0MgbC7cl0d_5WWH_v4_KwbIV3aWkd4mQayyQ7_dXBBofJrQseIn32UggFF0h9/s4080/fond-barquettes.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="3060" data-original-width="4080" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhoVydUMjq41PD7U9MwdU_reoBhz-PttCbgyl_atDJxzD4TS_UlOrIUVHbALlBusgL0jQVAgM4r-UGsXmjSW48_cKwTINvg6b4fK8HUCvI8XnPedVWpY08DTdhJFiX0MgbC7cl0d_5WWH_v4_KwbIV3aWkd4mQayyQ7_dXBBofJrQseIn32UggFF0h9/s320/fond-barquettes.jpg" width="320" /></a><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiPZUiKwzSlP8Bst8RJtK8YZqMheCUFNoiF1xn9RpqUMz2-nhJsalZa7sHTepbtganae8txVkOUlFsRO6Ht5KVGbp4PclhppzmE4PQtDUsACjPFfBjV49aEpRLmFPYXnVbRU_BaIcOnXmiVjBWF2xzAZsavCoJDV7lQ_0vRDUPP7A6T_mrwdy7U1gDU/s4080/IMG_20230103_173852_HDR.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4080" data-original-width="3060" height="241" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiPZUiKwzSlP8Bst8RJtK8YZqMheCUFNoiF1xn9RpqUMz2-nhJsalZa7sHTepbtganae8txVkOUlFsRO6Ht5KVGbp4PclhppzmE4PQtDUsACjPFfBjV49aEpRLmFPYXnVbRU_BaIcOnXmiVjBWF2xzAZsavCoJDV7lQ_0vRDUPP7A6T_mrwdy7U1gDU/w181-h241/IMG_20230103_173852_HDR.jpg" width="181" /></a><br /></div><div style="text-align: center;"><a href="https://drive.google.com/file/d/14kVHsESIUIQPZHCTrka0O8h0fghE7lDm/view?usp=share_link" target="_blank">>> fonds barquettes <<</a><br /></div><div style="text-align: left;"><div style="text-align: left;"><div style="text-align: left;"><br /></div><h2 style="text-align: left;">Conseils pour la fabrication du matériel :</h2></div><u>Pour les dépliants : </u></div><div style="text-align: left;">- imprimer recto-verso, découper le tour d'un côté puis plier</div><div style="text-align: left;">- utiliser du papier de différentes couleurs pour chaque dépliant afin de les ranger plus facilement </div><div style="text-align: left;"> </div><div style="text-align: left;"><u>Pour les sabliers :</u></div><div style="text-align: left;">Je les achète ici, possibilité de payer en mandat administratif.</div><div style="text-align: left;"><a href="https://toutpourlejeu.com/fr/sablier/499-sablier-1-minute-blanc-pour-jeu-pm-76-cm-3701525301128.html">https://toutpourlejeu.com/fr/sablier/499-sablier-1-minute-blanc-pour-jeu-pm-76-cm-3701525301128.html</a></div><div style="text-align: left;"> </div><div style="text-align: left;">Je les range dans des petites boîtes avec des morceaux de tuyaux PVC pour faire les emplacements. L'utilité d'avoir des emplacements est double : pouvoir vérifier instantanément s'il en manque un et les obliger à rester debout pour être prêts à l'emploi (sable complètement écoulé).<br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;"><u>Pour le cache :</u></div><div style="text-align: left;">- Imprimer sur du papier 160g.</div><div style="text-align: left;">- Découper les caches et les cases grises puis plastifier ensuite pour que les cases grises deviennent des fenêtres transparentes avec le plastique.</div><div style="text-align: left;"><br /></div><div style="text-align: left;">Pour fabriquer une barquette pour les caches, j'ai découpé 2 barquettes de cantine que j'ai assemblées à l'aide d'une bonne agrafeuse sur les bords. Ca tient très bien !<br /></div><div style="text-align: left;"><br /></div><div style="text-align: left;"><u>Pour les coupons d'évaluation :</u></div><div style="text-align: left;">- imprimer à la suite les 4 versions pour alterner les animaux. Ensuite on découpe au massicot et on obtient un tas de coupons avec les animaux qui se suivent pour distribuer au hasard (il ne faut pas qu'il y ait plein de chats à la suite par exemple).</div><div style="text-align: left;"><br /></div><div style="text-align: left;"><u>Pour les corrections :</u></div><div style="text-align: left;">- Imprimer les pages des tables 2,3,4,5 d'une couleur et celles des tables de 6,7,8,9 d'une autre couleur.</div><div style="text-align: left;">- Assembler ensuite pour chaque animal les deux feuilles dans une pochette plastique qui aura donc un côté de chaque couleur pour éviter de les confondre.</div><div style="text-align: left;"><br /></div><div style="text-align: left;"><u>Pour les feuilles de suivi individuelles :</u></div><div style="text-align: left;">- Si elles ne sont pas collées dans un cahier, penser à imprimer dans un papier épais pour la solidité.</div><div style="text-align: left;"><u><br /></u></div><div style="text-align: left;"><u>Pour la grande feuille de suivi collectif :</u></div><div style="text-align: left;">- Ouvrir le tableur, entrer les prénoms dans l'onglet "prénoms"</div><div style="text-align: left;">- Imprimer ensuite l'onglet "tableau"</div><div style="text-align: left;">- Scotcher les trois feuilles les unes en dessous des autres sans les découper.</div><div style="text-align: left;">- On peut éventuellement coller la couleur de chaque dépliant sur la première ligne.<br /></div><div style="text-align: center;"><i> </i></div><div style="text-align: center;"><i>avec les barquettes de cantine, tout s'empile très facilement</i><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj63LlYM-QVrQyZMjL5SF4cDJ2NHW25FsCgIwufBA4Xb5dFk7raufHlJSoIc-2fC0vuG0Ca-ZqsvCtn1khAWPYwrY7dvINK4c_ULTfgoAns5ZPmlSWEd_GrmCxwdIJ0ifSUceDYc6Ci9p3Vu1KzADiV9VzADOQi20ZXgbGvSjqlAz9ivz9qnkFRsrEz/s4080/materiel%20rang%C3%A9.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="4080" data-original-width="3060" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj63LlYM-QVrQyZMjL5SF4cDJ2NHW25FsCgIwufBA4Xb5dFk7raufHlJSoIc-2fC0vuG0Ca-ZqsvCtn1khAWPYwrY7dvINK4c_ULTfgoAns5ZPmlSWEd_GrmCxwdIJ0ifSUceDYc6Ci9p3Vu1KzADiV9VzADOQi20ZXgbGvSjqlAz9ivz9qnkFRsrEz/s320/materiel%20rang%C3%A9.jpg" width="240" /></a></div><br /><div style="text-align: left;"><br /></div></div>Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-28876840989666846642022-03-27T12:35:00.006-07:002022-04-05T03:17:18.675-07:00Bienvenue<p>Bienvenue sur le blog de ressources de la classe CP-CE1.</p><p style="text-align: left;">Vous trouverez les leçons et vidéos utilisées en classe par matières en cliquant sur les liens ci-dessus ↑ .<br /></p>Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-6028892697988567252020-12-06T08:08:00.000-08:002020-12-06T08:08:12.724-08:00L'angle droit et l'équerre<div><br /></div>Un angle est un coin. <br /><br />Il peut être plus ou moins grand (ouvert) ou petit (fermé). <br /><br />Quand il est pile entre les deux (ni trop ouvert, ni trop fermé), c'est un angle droit.<br /><br /><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjpUpvRlVEIhw1uLMA7OROHXWFGeSIZ4TLW_SYCi1j9NpeBadnrUAqbpFrTZ_2nfm50LHgbXigitUwiFdnS482Id7ryCn_x8Fr7KYI2HVtkG_K_y0FuklW4EedhMKoG1nO2ZvvA3udrzHI/s161/agldr.PNG" style="margin-left: 1em; margin-right: 1em; text-align: center;"><img border="0" data-original-height="142" data-original-width="161" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjpUpvRlVEIhw1uLMA7OROHXWFGeSIZ4TLW_SYCi1j9NpeBadnrUAqbpFrTZ_2nfm50LHgbXigitUwiFdnS482Id7ryCn_x8Fr7KYI2HVtkG_K_y0FuklW4EedhMKoG1nO2ZvvA3udrzHI/s0/agldr.PNG" /></a><br /><br /><br /> La formule magique pour utiliser le gabarit ou l'équerre : <br /><br />1) Je mets l'angle dans l'angle <br /><br /> 2) Je mets un côté sur un côté <br /><br /> 3) Je vérifie (ou je trace) l'autre côté <br /><br /><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg3ZzZmUt9TQid3HXZ7y0HWQeIPwRTnvL4GjqaizuSBuSQVjncUtuDNQ0uimZBPLxJKQldl1kIzJtq-eK0pxa_KQZy13SDQVVSghkADMNvpdq7VLOA_UQtbS0kl5uwKhT7B6NaGN2rIiPk/s266/%25C3%25A9qu.PNG" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="227" data-original-width="266" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg3ZzZmUt9TQid3HXZ7y0HWQeIPwRTnvL4GjqaizuSBuSQVjncUtuDNQ0uimZBPLxJKQldl1kIzJtq-eK0pxa_KQZy13SDQVVSghkADMNvpdq7VLOA_UQtbS0kl5uwKhT7B6NaGN2rIiPk/s0/%25C3%25A9qu.PNG" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;">Vidéo : qu'est-ce qu'un angle droit et comment le repérer ?</div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><iframe allowfullscreen="" class="BLOG_video_class" height="266" src="https://www.youtube.com/embed/oHmP6WgItK4" width="320" youtube-src-id="oHmP6WgItK4"></iframe></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><br /></div>
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<a href="https://drive.google.com/drive/u/0/folders/17eomDVSGIGPilcq_qEuJNtQ08eglriaa"><img alt="https://drive.google.com/drive/u/0/folders/17eomDVSGIGPilcq_qEuJNtQ08eglriaa" border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s1600/click-documents.png" /></a></div>
<br /></div>Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-30584792303410861202020-12-05T06:19:00.000-08:002020-12-05T06:19:01.908-08:00l'accord sujet-verbe<p>Le verbe c'est souvent l'action de la phrase. Si plusieurs personnes font cette action alors on met -ENT au bout du verbe.</p><div class="separator" style="clear: both; text-align: center;"><iframe allowfullscreen="" class="BLOG_video_class" height="266" src="https://www.youtube.com/embed/zANWMnNTwFc" width="320" youtube-src-id="zANWMnNTwFc"></iframe></div><br /><p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s318/click-documents.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s0/click-documents.png" /></a></div><br /><p style="text-align: center;"><br /></p>Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-26668022210060410772020-10-04T09:08:00.001-07:002020-10-04T09:08:18.433-07:00être et avoir au présent<p> Découvrez comment on récite le verbe être au présent et entraînez-vous avec une pochette auto-corrective et un jeu de cartes recto-verso (matériel dans le lien ci-dessous).</p><h3 style="clear: both; text-align: left;">LE VERBE ÊTRE</h3><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><iframe allowfullscreen="" class="BLOG_video_class" height="266" src="https://www.youtube.com/embed/tYFzOlV8v2M" width="320" youtube-src-id="tYFzOlV8v2M"></iframe></div><br /><p></p><h3 style="clear: both;">LE VERBE AVOIR</h3><div>pas de vidéo ni exercice disponible pour l'instant</div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://drive.google.com/drive/u/1/folders/1uGQ87F3a4x_zpJu3d5hmK6zPtJtUDVoU" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s0/click-documents.png" /></a></div><br /><p><br /></p>Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-80989493107270208072020-10-04T08:58:00.001-07:002020-10-04T08:58:22.414-07:00M ou N ? m devant mbp<p> </p><div class="separator" style="clear: both; text-align: left;">J'écris N au lieu de M avant M,B,P.</div><div class="separator" style="clear: both; text-align: left;"><br /></div><div class="separator" style="clear: both; text-align: left;">Entraînez-vous avec les cartes 1,2,3.</div><div class="separator" style="clear: both; text-align: left;"> 1-je fais l'exercice sur l'ardoise en complétant avec n ou m</div><div class="separator" style="clear: both; text-align: left;"><span> </span><span> </span><span> 2- je regarde au dos de la carte combien de n et combien de m j'ai mis. Je cherche mes erreurs si besoin.</span><br /></div><div class="separator" style="clear: both; text-align: left;"><span><span> </span><span> </span><span> 3-je regarde les réponses à l'intérieur de la carte</span><br /></span></div><div class="separator" style="clear: both; text-align: left;"><span><span><br /></span></span></div><div class="separator" style="clear: both; text-align: left;"><span><span>Retrouvez la leçon et le jeu de cartes à imprimer dans les documents ci-dessous.</span></span></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><iframe allowfullscreen="" class="BLOG_video_class" height="266" src="https://www.youtube.com/embed/ozC4uOXHy9A" width="320" youtube-src-id="ozC4uOXHy9A"></iframe></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://drive.google.com/drive/u/1/folders/1pMJHIYe7r5Hi_EboUF7Ws6oM0WOIgqmK" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s0/click-documents.png" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><br /></div><br /><p></p>Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-49715958823302277572020-07-03T05:06:00.002-07:002020-07-03T05:08:29.858-07:00Fournitures rentrée<div align="center" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: large;">Matériel
demandé pour la rentrée scolaire <span style="font-size: medium;">(</span><span style="font-size: medium;">2020</span><span style="font-size: medium;">)</span></span></span></div>
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une trousse</span></span></div>
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stylos à bille : vert, rouge, bleu, noir</span></span></div>
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<u>des</u> crayons HB</span></span></div>
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un taille crayon</span></span></div>
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une gomme</span></span></div>
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une règle graduée en cm et mm </span></span>
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une équerre pour les CE1</span></span></div>
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une paire de ciseaux</span></span></div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">-
<u>de</u><u>s</u> tubes de colle</span></span></div>
<div align="left" style="text-decoration: none;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">-
<u>des</u> gros feutres ardoise (les fins ne tiennent pas longtemps)
ou des craies</span></span></div>
<div align="left" style="text-decoration: none;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;"><b>-
PAS DE COMPAS</b></span></span></div>
<div style="margin-bottom: 0cm; text-align: left;">
<br /></div>
<div align="left">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;"><span style="text-decoration: none;"><span style="font-weight: normal;">-
</span></span><span style="text-decoration: none;"><span style="font-weight: normal;">un
cartable (on doit pouvoir y glisser un cahier de taille 24 cm x 32
cm)</span></span></span></span></div>
<div align="left" style="text-decoration: none;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">-
une ardoise avec de quoi effacer</span></span></div>
<div align="left" style="text-decoration: none;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">-
feutres et crayons avec couleurs de base</span></span></div>
<div align="left" style="text-decoration: none;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">-
une pochette à élastique</span></span></div>
<div align="left" style="text-decoration: none;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">-
un agenda (pas cahier de textes)</span></span></div>
<div align="left" style="text-decoration: none;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">-
un porte vues ou classeur</span></span></div>
<div align="left" style="text-decoration: none;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;"><br /></span></span></div>
<div align="left" style="text-decoration: none;">
<br /></div>
<div align="left">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;"><u><b>AUTRE
:</b></u></span></span></div>
<div align="left" style="text-decoration: none;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">-
pensez à lui fournir des mouchoirs</span></span></div>
<div align="left" style="text-decoration: none;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">-
il peut avoir une bouteille/gourde d'eau</span></span></div>
<div align="left" style="text-decoration: none;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">-
conseil : pensez à marquer les affaires</span></span></div>
<div align="left" style="text-decoration: none;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">-
attention : <b>Les crayons, la colle et les feutres d'ardoise s'usent
très vite</b>, achetez en plusieurs pour avoir une réserve à
disposition dès le début de l'année.</span></span></div>
<div align="left">
<br />
</div>
<div style="margin-bottom: 0cm; text-align: left;">
<br /></div>
Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-56990478504065577642020-06-14T09:03:00.001-07:002020-06-14T09:03:54.724-07:00Des verbes à bien connaître<br />
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<a href="https://drive.google.com/drive/u/0/folders/1txx3Vj3d8UNCyHpjI0IOLtlK63JLSKJ3"><img border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s1600/click-documents.png" /></a></div>
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Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-7327749893181776482020-06-11T05:59:00.005-07:002023-06-19T01:13:36.093-07:00Les solides<div class="separator" style="clear: both; text-align: center;">
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg_D_S4LKtSoRkk_5hoOYpkHFbgdgNVxWUTUvtKSc3eAx-q7C_RzLvUNBc9CrETOtanhrzzItYTUY4gnTCOLuYRvXHLkfT7xzlAWCa5r_adxyVSA9tpTB6WZQUw8kAkIah65-Koe-LY9cg/s1600/affiche-solides.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="414" data-original-width="596" height="222" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg_D_S4LKtSoRkk_5hoOYpkHFbgdgNVxWUTUvtKSc3eAx-q7C_RzLvUNBc9CrETOtanhrzzItYTUY4gnTCOLuYRvXHLkfT7xzlAWCa5r_adxyVSA9tpTB6WZQUw8kAkIah65-Koe-LY9cg/s320/affiche-solides.png" width="320" /></a></div>
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Les solides sont une forme géométrique en 3 dimensions, un objet qu'on peut toucher, tourner dans tous les sens, il n'est pas plat.</div>
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Certains solides ont uniquement des faces plates (planes) ce sont des polyèdres, certains solides qui peuvent rouler ont des faces qui sont arrondies.</div>
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Dans le jeu auto-correctif, on cherche à repérer et compter le nombre de faces, de sommets et d'arêtes.</div>
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<span style="color: red;"><br /></span></div>
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ERREUR DANS LA VIDEO :</span></div><div class="separator" style="clear: both; text-align: center;"><span style="color: red;">je dis qu'une arête est forcément non courbe alors que je considère qu'une face peut être courbe. </span><span style="color: red;"></span></div><div class="separator" style="clear: both; text-align: center;"><span style="color: red;">Je ne trouve pas de consensus sur
les sites spécialisés en géométrie sur ce point, certains considèrent qu'une face ne
peut pas être courbe </span><span style="color: red;">(ils parlent alors de "<b>surface </b>courbe")</span><span style="color: red;"> ni une arête. D'autres qu'une face peut être courbe de même qu'une arête. </span><span style="color: red;">Pour plus de cohérence, je considère donc désormais que les arêtes peuvent être courbes, comme je le fais pour les faces. Les réponses du jeu à imprimer sont corrigées dans ce sens.<br /></span></div>
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<iframe allowfullscreen="" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/LmqJGZj3sdw/0.jpg" frameborder="0" height="266" src="https://www.youtube.com/embed/LmqJGZj3sdw?feature=player_embedded" width="320"></iframe></div>
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<a href="https://drive.google.com/drive/u/0/folders/1ejNR_fsXaRxbTSu80zEjJcMw7EHX-mu-"><img border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s1600/click-documents.png" /></a></div>
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Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-1696637730374445332020-06-07T05:34:00.000-07:002020-06-07T05:34:04.944-07:00Additions posées jusque 99<div class="separator" style="clear: both; text-align: center;">
<iframe width="320" height="266" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/TJNqO981fEk/0.jpg" src="https://www.youtube.com/embed/TJNqO981fEk?feature=player_embedded" frameborder="0" allowfullscreen></iframe></div>
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<a href="https://drive.google.com/drive/u/0/folders/1kB--51KvDFLnoPW8VFgptjHKBEX2I8su"><img border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s1600/click-documents.png" /></a></div>
<br />Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-44948868649741751402020-06-07T05:22:00.001-07:002020-06-07T05:22:55.049-07:00Soustractions 2 chiffres moins 1 chiffre<div class="separator" style="clear: both; text-align: center;">
<iframe width="320" height="266" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/bes-lYGV-0I/0.jpg" src="https://www.youtube.com/embed/bes-lYGV-0I?feature=player_embedded" frameborder="0" allowfullscreen></iframe></div>
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<a href="https://drive.google.com/drive/u/0/folders/17fVRQJeZmjqkQs7Tzbgc8e9We9w424W3"><img border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s1600/click-documents.png" /></a></div>
<br />Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-61628422857851034622020-06-07T05:01:00.001-07:002020-06-07T05:01:09.878-07:00Les moitiés de nombres jusque 100<div class="separator" style="clear: both; text-align: center;">
<iframe width="320" height="266" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/wvRxomKxMnE/0.jpg" src="https://www.youtube.com/embed/wvRxomKxMnE?feature=player_embedded" frameborder="0" allowfullscreen></iframe></div>
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<a href="https://drive.google.com/drive/u/0/folders/1DNKitm3W5ONHRw8AWYJ5iR7Tuh2Yzsva"><img border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s1600/click-documents.png" /></a></div>
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<br />Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-29278956477237806692020-06-07T04:58:00.001-07:002020-06-07T04:58:40.445-07:00La multiplication par 1 chiffre posée<div class="separator" style="clear: both; text-align: center;">
<iframe width="320" height="266" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/Fz6ig7jJRc0/0.jpg" src="https://www.youtube.com/embed/Fz6ig7jJRc0?feature=player_embedded" frameborder="0" allowfullscreen></iframe></div>
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<a href="https://drive.google.com/drive/u/0/folders/1NKW039UgjM-xqB8Mr32DlGIwnegC620u"><br /></a></div>
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<a href="https://drive.google.com/drive/u/0/folders/1NKW039UgjM-xqB8Mr32DlGIwnegC620u"><img alt="https://drive.google.com/drive/u/0/folders/1NKW039UgjM-xqB8Mr32DlGIwnegC620u" border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s1600/click-documents.png" /></a></div>
<br />Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-20510198914809298382020-05-24T06:51:00.002-07:002020-05-24T06:51:22.124-07:00Ordonner les nombres jusque 100Pour ordonner les nombres je ne dois pas oublier la valeur de chaque chiffre. Les dizaines indiquent un nombre de paquets de 10, ce sera donc toujours plus important que le nombre d'unité qui sera de 9 maximum donc toujours moins qu'un seul paquet de 10.<br />
<br />
Je mets donc en premier les nombres sans dizaines, qui s'écrivent avec un seul chiffre.<br />
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Puis je regarde uniquement les dizaines pour savoir quel est le nombre suivant. Si plusieurs nombres ont un chiffre de dizaines identiques, alors seulement je regarde les unités pour les départager.<br />
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Pour corriger je retourne les cartes, au verso ça doit faire 1,2,3,4,5,6,7,8,9,10.<br />
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<a href="https://drive.google.com/drive/u/0/folders/1rlfjubO4iTbRvqkC9ZMQdNnEHQOA_zO4"><img border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s1600/click-documents.png" /></a></div>
<br />Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-26668877635068076972020-05-24T06:21:00.001-07:002020-05-24T06:21:13.536-07:00Groupes de 2,5,10<div class="separator" style="clear: both; text-align: left;">
3 équipes de 5 enfants : combien d'enfants en tout ?</div>
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Pour le savoir, j'imagine ou je regarde sur le tableau à quelle situation cela correspond : celle ou j'ai 3 groupes de 5. Je calcule donc 5+5+5=15 enfants en tout.</div>
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<a href="https://drive.google.com/drive/u/0/folders/10mQrnjAUi0BksbkYoxWIZuLI8blld9ZJ"><img border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s1600/click-documents.png" /></a></div>
<br />Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-12689354936831903622020-05-17T06:59:00.001-07:002020-05-17T07:16:15.865-07:00Les euros<div class="separator" style="clear: both; text-align: center;">
<iframe allowfullscreen="" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/gXdlDOO2w78/0.jpg" frameborder="0" height="266" src="https://www.youtube.com/embed/gXdlDOO2w78?feature=player_embedded" width="320"></iframe></div>
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le jeu de cartes auto-correctif utilisé est</div>
<div style="text-align: center;">
<a href="https://www.planet-eveil.com/jeux-educatifs/apprendre-a-compter/carte-exercice-monnaie-niveau-1-p-22336.html">"carte exercice monnaie" niveau 1</a> <a href="https://www.planet-eveil.com/jeux-educatifs/apprendre-a-compter/carte-exercice-monnaie-niveau-1-p-22336.html">de VINCO EDUCATIONAL</a></div>
<div style="text-align: center;">
Je ne peux donc pas vous le proposer en téléchargement, il n'y a que la leçon.</div>
<div style="text-align: center;">
<br /></div>
<div style="text-align: left;">
Mais vous avez ici un jeu en ligne (le niveau 3 correspond à cette leçon) : </div>
<div style="text-align: center;">
<a href="https://www.logicieleducatif.fr/math/calcul/eurobillets.php">https://www.logicieleducatif.fr/math/calcul/eurobillets.php</a></div>
<div style="text-align: center;">
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<div style="text-align: center;">
<br /></div>
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<a href="https://drive.google.com/drive/u/0/folders/1jRRXaJMSbCT4E-C7C_HN2eG7DHJEY59W"><img border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s1600/click-documents.png" /></a></div>
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Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-72961053013818010582020-05-17T06:34:00.001-07:002020-05-17T06:34:09.212-07:00Multiplication en 3 lignes<div class="separator" style="clear: both; text-align: center;">
<iframe width="320" height="266" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/dj_-jJU_E08/0.jpg" src="https://www.youtube.com/embed/dj_-jJU_E08?feature=player_embedded" frameborder="0" allowfullscreen></iframe></div>
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<a href="https://drive.google.com/drive/u/0/folders/1BSYKGAKbNNOnmDUdxX9rAtWfsTRAibsU"><img border="0" data-original-height="79" data-original-width="318" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-OfOjr4rhIkdQS4T6TkgCx4kF3AB8UFKVx4aBpoO1gCkR3khbREvwjkEd7EdrICqH5fQl8b8EswjG3sLeimeqdCPtzrhDWazQPXE5vBkfw-W-xhIzaHiDUft8-WZWm1mRHRVrpV-2F7Q/s1600/click-documents.png" /></a></div>
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<br />Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-57191115008426224732020-05-17T05:33:00.002-07:002020-05-17T05:33:48.639-07:00Moitiés de 20,30,40,...,190<div class="separator" style="clear: both; text-align: center;">
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<br />Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-38955184284622256262020-05-17T05:11:00.001-07:002020-05-17T05:14:23.729-07:00Accord de l'adjectif<div class="separator" style="clear: both; text-align: center;">
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Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-16914167681639131132020-05-17T04:43:00.000-07:002020-05-17T04:55:12.978-07:00L'imparfait<div class="separator" style="clear: both; text-align: center;">
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Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-47345003637299396412020-05-17T02:27:00.004-07:002020-05-17T04:43:59.444-07:00Déterminant-nom-adjectif-verbe<div class="separator" style="clear: both; text-align: center;">
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<br />Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-15472039887084135992020-05-06T12:15:00.001-07:002020-06-01T23:22:45.021-07:00S'enregistrer sur vocaroo<div style="text-align: left;">
<h2>
Un projet de lecture à haute voix</h2>
Je vous propose de vous enregistrer en train de lire un extrait de livre qui vous plait et que vous souhaitez partager aux autres. Pensez bien à m'indiquer aussi le nom du livre. Ne faites pas trop long tout de même, 2-3 minutes peuvent suffire. Envoyez-moi l'enregistrement ou le lien que je partagerai ensuite !</div>
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Répétez bien pour avoir la lecture la plus belle possible. Voilà les différents niveaux de lecture possibles :<br />
Niveau 1 : Je lis sans erreurs.<br />
Niveau 2 : Je lis sans découper les syllabes.<br />
Niveau 3 : Je lis de manière fluide (mais pas trop rapide non plus).<br />
Niveau 4 : Je fais une pause aux points, aux virgules ...<br />
Niveau 5 : Je fais des voix de personnages, je joue les émotions de l'histoire (peur...surprise...etc).<br />
Niveau 6 : Je fais aussi des bruitages aux bons moments.</div>
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Une méthode pour s'enregistrer : vocaroo</h2>
1) Aller d'abord sur le site <a href="https://vocaroo.com/">https://vocaroo.com/</a><br />
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2) Enregistrer comme décrit ci-dessous. Autorisez bien sûr l'utilisation du micro si demandé.<br />
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3) Copier le lien et me l'envoyer par mail en indiquant que vous m'autorisez à le partager. Normalement il y a également possibilité d'envoyer le lien directement par mail en cliquant sur l'enveloppe (pas testé).</div>
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Vous pourrez retrouver pendant plusieurs semaines votre enregistrement grâce à ce lien. Vous pouvez également télécharger l'enregistrement (Download) pour le conserver. Vous pouvez enfin choisir de l'effacer du site (Delete) quand bon vous semble.</div>
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<br />Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-59603690551280377082020-05-05T01:58:00.000-07:002020-05-12T07:17:59.239-07:00Les nombres en "quatre-vingt"<div class="separator" style="clear: both; text-align: center;">
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Quand on a 8 dizaines, on ne dit pas "huitante" ou "octante" mais "quatre-vingt". En effet 8 dizaines, ça fait 4 x 2 dizaines, donc 4 x 20.<br />
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Quand on a 9 dizaines on continue de dire "quatre-vingt" mais au lieu de dire "un, deux, trois, quatre, cinq, six, sept, huit, neuf", on ajoute une dizaine en disant "dix, onze, douze, treize, quatorze, quinze, seize, dix-sept, dix-huit-, dix-neuf".<br />
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On s'entraîne avec les cartes, soit les associer, soit deviner le verso (on peut écrire sur l'ardoise éventuellement). On peut utiliser le tapis de jeu pour trier les bonnes et les mauvaises réponses.<br />
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Quand on y arrive bien on mélange ce jeu avec celui des <a href="https://www.classem.fr/2020/04/nombres-en-soixante.html">nombres en "soixante"</a>.<br />
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Deux séries de jeu de mémory en "quatre-vingt" sont proposées.<br />
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VIDEO BONUS D'ARTE </div>
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qui explique l'origine de ces étrangetés françaises :</div>
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<br />Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0tag:blogger.com,1999:blog-5687325379219364822.post-40937180567131683802020-05-03T00:58:00.000-07:002020-05-05T01:00:09.819-07:00La différenceSi Marc a 27 images et que Julie en a 18. Combien manque-t-il d'images à Julie pour en avoir autant que Marc ? Combien Marc a-t-il d'images de plus que Julie ? Ces deux questions reviennent au même : se demander quel est la différence entre deux nombres.<br />
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Sur ces exercices les images sont déjà dessinées. Il faut donc d'abord entourer la différence. C'est à dire entourer "ce qui dépasse", "ce qui n'est pas pareil". Puis on indique à combien se monte cette différence en observant le dessin.<br />
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Pour calculer une différence on peut faire une soustraction (un moins). On peut dire par exemple qu'on prend les 27 images de Marc et qu'on enlève les 18 qui sont les mêmes que Julie. Restera alors seulement celles qu'il a en plus : 27 - 18 = 9<br />
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La fiche finit en imaginant qu'on ajoute des images à Julie. Si on lui en ajoute 9 elle en aura autant. Si on lui en ajoute plus que 9 elle en aura plus. Si on ajoute moins que 9 elle en aura moins. Attention à l'orthographe du mot "moins" ne pas oublier le S.<br />
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Quand on arrive à faire les fiches du niveau 1, on peut s'entraîner à trouver la réponse uniquement avec le calcul (qu'on peut poser si besoin) dans les fiches du niveau 2. Le dessin peut permettre de vérifier son résultat.<br />
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Pour se corriger on retourne la feuille dans la pochette :<br />
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Thierry Vaubourghttp://www.blogger.com/profile/16256527423929475923noreply@blogger.com0