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Sujet J'apprends à compter avec audiofanzine

  • 17 203 réponses
  • 358 participants
  • 336 980 vues
  • 211 followers
Sujet de la discussion J'apprends à compter avec audiofanzine
Dans la série "jusqu'ou peut on pousser la débilité", je propose un jeu instructif et ludique (forcément pour un jeu...).

le but est de compter aussi loin que possible, avec la contraine de trouver une illustration à chaque pas.

exemple :

Afficher le sujet de la discussion
11491
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Avant j'étais indécis, maintenant je n'en suis plus très sur...

Ken Smith Addict

 

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"Il est plus facile de briser un atome que de briser un préjugé"

 

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:-D

L'esprit c'est comme un parachute: Il marche mieux quand il est ouvert.

J'ai enregistré un peu de tout et n'importe quoi

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"Il est plus facile de briser un atome que de briser un préjugé"

 

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11496
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"Il est plus facile de briser un atome que de briser un préjugé"

 

11497
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-- Bin quoi? Jai encore dit une connerie?  --
= Mєѕ Ẳfιєииєѕ ∂є Čσитяιвѕ =

 

11498
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-- Bin quoi? Jai encore dit une connerie?  --
= Mєѕ Ẳfιєииєѕ ∂є Čσитяιвѕ =

 

11499
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-- Bin quoi? Jai encore dit une connerie?  --
= Mєѕ Ẳfιєииєѕ ∂є Čσитяιвѕ =

 

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