GeoGebra is free and multi-platform dynamic mathematics software for all levels of education that joins geometry, algebra, tables, graphing, statistics and calculus in one easy-to-use package. It has received several educational software awards in Europe and the USA. Quick Facts: Graphics, algebra and tables are connected and fully dynamic. Easy-to-use interface, yet many powerful features. Authoring tool to create interactive learning materials as web pages. Available in many languages for our millions of users around the world. Free and open source software. Computer algebra system (CAS).

This software is also referenced in ORMS.

References in zbMATH (referenced in 274 articles , 4 standard articles )

Showing results 1 to 20 of 274.
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  1. Botana, Francisco; Recio, Tomas: Computing envelopes in dynamic geometry environments (2017)
  2. Esayan, A.R.; Dobrovolsky, N.N.: A computer proof of the hypothesis about of centroids (2017)
  3. Esayan, A.R.; Yakushin, A.V.: Experimental validation of hypotheses in GeoGebra (2017)
  4. Haftendorn, Dörte: Exploring and understanding curves. With GeoGebra and other tools (2017)
  5. Segal-Halevi, Erel; Nitzan, Shmuel; Hassidim, Avinatan; Aumann, Yonatan: Fair and square: cake-cutting in two dimensions (2017)
  6. Toth, Csaba D. (ed.); Goodman, Jacob E. (ed.); O’Rourke, Joseph (ed.): Handbook of discrete and computational geometry (2017)
  7. Abánades, Miguel; Botana, Francisco; Kovács, Zoltán; Recio, Tomás; Sólyom-Gecse, Csilla: Development of automatic reasoning tools in GeoGebra (2016)
  8. Abánades, Miguel; Botana, Francisco; Kovács, Zoltán; Recio, Tomás; Sólyom-Gecse, Csilla: Towards the automatic discovery of theorems in geogebra (2016)
  9. Bauschke, Heinz H.; Dao, Minh N.; Noll, Dominikus; Phan, Hung M.: On Slater’s condition and finite convergence of the Douglas-Rachford algorithm for solving convex feasibility problems in Euclidean spaces (2016)
  10. Bauschke, Heinz H.; Douglas, Graeme R.; Moursi, Walaa M.: On a result of Pazy concerning the asymptotic behaviour of nonexpansive mappings (2016)
  11. Bauschke, Heinz H.; Moursi, Walaa M.: The Douglas-Rachford algorithm for two (not necessarily intersecting) affine subspaces (2016)
  12. Bauschke, Heinz H.; Moursi, Walaa M.: On the order of the operators in the Douglas-Rachford algorithm (2016)
  13. Botana, Francisco; Recio, Tomas: On the unavoidable uncertainty of truth in dynamic geometry proving (2016)
  14. Caglayan, Gunhan: Exploring the lunes of Hippocrates in a dynamic geometry environment (2016)
  15. Dergiades, Nikolaos: GeoGebra construction of the roots of quadratic, cubic and quartic equations (2016)
  16. Elschenbroich, Hans-Jürgen: Illustrative approaches to calculus with old and new tools (2016) MathEduc
  17. Etayo, Fernando; Trías, Ujué R.: A conformal planar model of the projective plane (2016)
  18. Fraivert, David: Discovering new geometric properties by spiral inductive-deductive investigation (2016)
  19. Granberg, Carina: Discovering and addressing errors during mathematics problem-solving -- a productive struggle? (2016) MathEduc
  20. Hall, Jonas; Lingefjärd, Thomas: Mathematical modeling. Applications with GeoGebra (2016)

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