ABOUT A PROBLEM OF FORMATION OF PROFESSIONAL COMPETENCIES OF FUTURE MATHEMATICS AND PHYSICS TEACHERS

Zhidova Lyubov Aleksandrovna, Mudruk Vladimir Ivanovich, Kholmukhammad Firdavsi

DOI: 10.23951/1609-624X-2017-4-84-88

Information About Author:

Zhidova L. A., Tomsk State Pedagogical University (ul. Kievskaya, 60, Tomsk, Russian Federation, 634061). E-mail: gidovala@yandex.ru Mudruk V. I., Bauman Moscow State Technical University (ul. 2-ya Baumanskaya, 5, Moscow, Russian Federation, 105005). E-mail: mudruk1580@mail.ru Kholmukhammad F., Tomsk State Pedagogical University (ul. Kievskaya, 60, Tomsk, Russian Federation, 634061). E-mail: shm94fs94@gmail.com

The paper presents the results of involvement of future mathematics and physics teachers in independent scientific research activity in conditions of realization of competence approach. In the case of such approach the competence is a general capability which is checked and created in activities. It is based on knowledge and allows the person to establish connection between the system of actions for successful problem solution. During the educational process, the formation of elements of competencies at implementation of curriculum is carried out by means of maintenance of the studied subject. The course of the differential equations has great opportunities for forming of professional competencies of future teachers of mathematics and physics, however the existing education guidance, according to the theory of differential equations, are obviously not oriented to form the competencies. Besides modern development of technology, chemistry, biology, ecology, geography, economics and other sciences is impossible without the use of differential equations. The solutions of Clairaut-type equations with a special right-hand part found in the paper are a new result in the theory of partial differential equations. In turn the organization of independent scientific research in the framework of the course of differential equations promotes the main goal of professional competencies of future mathematics and physics teachers, namely forming the professional competencies being ready to use theoretical and practical knowledge in science and education.

Keywords: differential equations, professional competencies

References:

1. Kharina N. V. Professional’noye obrazovaniye v Rossii: problemy, puti resheniya [Vocational education in Russia: problems and solutions] Nauchno-pedagogicheskoye obozreniye – Pedagogical Review, 2013, no. 1(1), рр. 8–15 (in Russian).

2. Salekhova L. L., Zaripov F. Sh., Khusnetdinova D. M. Proektirovaniye osnovnoy obrazovatel’noy programmy podgotovki budushchikh uchiteley matematiki i informatiki na osnove FGOS [Design of basic educational training program for future teachers of mathematics and computer science on the basis of the FSES]. Materialy Vserossiyskoy nauchno-prakticheskoy konferentsii s mezhdunarodnym uchastiem “Matematicheskoye obrazovaniye v shkole i vuze v usloviyakh perekhoda na novye obrazovatel’nye standarty” [Materials of All-Russian scientifi c-practical conference with international participation “Mathematics education in schools and universities in the transition to new educational standards”]. 2010. Pp.152–155 (in Russian).

3. Zolottseva V. V., Kozlova L. N. Sistema aktivnykh metodov obucheniya i razvitiye professional’noy kompetentnosti [The system of active methods of training and development of professional competence]. Sredneye professional’noye obrazovaniye – Secondary vocational education, 2007, no. 4, pp. 28–31 (in Russian).

4. Zhidova L. A. Umeniya kriticheskogo myshleniya kak sredstvo povysheniya kachestva professional’noy podgotovki budushchikh uchiteley matematiki [Abilities of critical thinking as a tool to raise the quality of professional training of future teachers for mathematics]. Vestnik Tomskogo gosudarstvennogo pedagogicheskogo universiteta – TSPU Bulletin, 2009, no. 4 (82), pp. 42–45 (in Russian).

5. Egorova N. L. Kompetentnostnyy podkhod v obrazovanii: khrestomatiya-putevoditel’ [Competence approach in education: a reader and guide]. Tomsk, RTsRO Publ., 2006. 88 р. (in Russian).

6. Kamke E. Differentialgleichungen lösungsmethoden und lösungen Partielle differentialgleichungen erster ordnung für eine gesuchte funktion, Leipzig, 1959, 260 p. (Russ. ed.: Kamke E. Spravochnik po differentsial‘nym uravneniyam v chastnykh proizvodnykh pervogo poryadka: per. s nem. Moscow, Nauka Publ., 1966. 260 p.) (in Russian).

7. Kurant R. Uravneniya s chastnymi proizvodnymi [Partial differential equations]. Moscow, Mir Publ., 1964. 830 p. (in Russian).

8. Stepanov V. V. Kurs differentsial’nykh uravneniy [The course of differential equations]. Moscow, Izdatel’stvo fi ziko-matematicheskoy literatury Publ., 1965. 512 p. (in Russian).

9. Zaytsev V. F., Polyanin A. D. Spravochnik po differentsial’nym uravneniyam v chastnykh proizvodnykh pervogo poryadka [Reference book on differential equations in partial derivatives]. Moscow, Izdatel’stvo fi ziko-matematicheskoy literatury Publ., 2003. 416 p. (in Russian).

10. Portal federal’nykh gosudarstvennykh obrazovatel’nykh standartov [Portal of federal state educational standards] (in Russian). URL: http://fgosvo.ru (accessed 31аugust 2015).

11. Osnovnye professional’nye obrazovatel’nye programmy [Basic professional educational programs] (in Russian). URL: http://www.tspu.edu.ru/sveden/education/obr-prog.html (accessed 31 аugust 16).

12. Lavrov P. M., Merzlikin B. S. Legendre transformations and Clairaut-type equations. Physics Letters B756 (2016) 188–193.

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Issue: 4, 2017

Series of issue: Issue 4

Rubric: ISSUES OF NATURAL-SCIENTIFIC EDUCATION

Pages: 84 — 88

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