[b]Gislaine Pscheidt[br][br][br][img width=162,height=222]data:image/jpeg;base64,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[/img][br][br][br][/b]Mestranda em Ensino de Ciências Naturais e Exatas pela Universidade Regional de Blumenau e Licenciada em matemática pela mesma Universidade. Professora de Matemática no Estado de Santa Catarina e no Munícipio de Blumenau. Para entrar em contato: gislaiinepscheidt@gmail.com

[br][br][br][b]Dr. Jorge Cássio[/b][br][br][br][img]https://www.geogebra.org/resource/nkudb398/9faphNKyjxCm307h/material-nkudb398.png[/img][br][br][br]É licenciado em Matemática pela UnB, mestre em Ensino das Ciências pela UFRPE e doutor em Educação com ênfase em Tecnologia pela UnB. Autor das 1ª e 2ª edições dos livros “Aprendendo Matemática com o Cabri-Géomètre II (volumes 1 e 2)”, “Aprendendo Matemática com o Cabri-Géomètre II e II-plus (volume único)” e “Aprendendo Matemática com o GeoGebra”. Professor adjunto na Universidade Federal de Santa Catarina (UFSC). Colaborador do Instituto Internacional do GeoGebra. Cursos e palestras, escreva para [url=mailto:jcassio@gmail.com]jcassio@gmail.com[/url] ou [url=mailto:jorge.cassio@geogebra.org]jorge.cassio@geogebra.org[/url] [br]