Voir la notice de l'article provenant de la source Math-Net.Ru
[1] V. Z. Belenkii, A. A. Zaslavskii, “Reshenie obobschennoi zadachi Malfatti s pomoschyu kompleksnoi (giperbolicheskoi) trigonometrii”, Matematicheskoe prosveschenie. - ser. 3, 1998, no. 2, 141–154
[2] D. D. Efremov, Geometriya treugolnika, Fiziko-matematicheskoe nasledie, Izd. 2, reprintnoe vosproizvedenie izdaniya, Lenand, Moskva, 2015, 352 pp.
[3] G. S. M. Kokseter, S. P. Greittser, Novye vstrechi s geometriei, Biblioteka matematicheskogo kruzhka, 14, Nauka, M., 1978
[4] A. G. Myakishev, Elementy geometrii treugolnika, MTsNMO, M., 2002
[5] V. Z. Belenkii, A. A. Zaslavskii, “O zadache Malfatti”, Kvant, 1994, no. 4
[6] V. F. Ochkov, A. Nori, “Puteshestvie v mir nauki i iskusstva na stopokhodyaschei mashine Chebysheva”, Informatika v shkole, 2018, no. 8, 53—61 http://twt.mpei.ac.ru/ochkov/Tcheb.pdf
[7] V. F. Ochkov, A. V. Bobryakov, S. N. Khorkov, “Gibridnoe reshenie zadach na kompyutere”, Cloud of Science, 4:2 (2017), 5–26 http://twt.mpei.ac.ru/ochkov/Hybrid.pdf
[8] Valery Ochkov, $2^5$ Problems for STEM Education, Chapman and Hall/CRC, 2020 https://www.routledge.com/2-Problems-for-STEM-Education/Ochkov/p/book/9780367345259 | Zbl
[9] V. F. Ochkov, S. Gerk, “Aktivnost na forumakh — vazhnaya chast ucheby i posleduyuschei inzhenernoi deyatelnosti studenta”, Otkrytoe obrazovanie, 2014, no. 5, 93–101 http://twt.mpei.ac.ru/ochkov/Ochkov-Gurke-OE-5-2014.pdf
[10] V. F. Ochkov, E. P. Bogomolova, “Puteshestvie okruzhnosti v treugolnike, a treugolnika v lozhbine ili Sam sebe kompyuternyi rezhisser”, Otkrytoe obrazovanie, 2015, no. 2, 24–32 http://twt.mpei.ac.ru/ochkov/TrianglInCircle.pdf