![](data:image/png;base64,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)
Z przyjemnością informujemy, że uczniowie
Agnieszka Duda 3eG (n-el p.Piotr Jarosz), Piotr Karamon 3aG, Arkadiusz Solarz 3aG i Martyna Żurawska 3aG (n-el p.Kazimierz Malarczyk) zakwalifikowali się do II etapu Olimpiady Matematycznej.
Gratulujemy i życzymy dalszych sukcesów.