## Central Asian Problems of Modern Science and Education

#### Article Title

#### Abstract

This article provides information on the elements of combinatorics in the school mathematics course and solutions to some problems related to the Newtonian binomial. This article is also aimed at solving problems related to the indepth study of the elements of combinatorics in the school course, the creation of a sufficient basis for the study of probability theory and mathematical statistics in the future.

#### First Page

68

#### Last Page

77

#### References

[1] Alimov Sh.O., Kolyagin Y.M., Sidorov Y.V., Fedorova N.E., Shabunin M.I. Algebra, Textbook for 8th Grade, T. Teacher, 1996 300 pages. [2] V.E. Gmurman. A Guide to Solving Problems from Probability Theory and Mathematical Statistics .T. Teacher, 1980,365 p. [3] Valutse I.I., Diligul G.D. Mathematics for technical schools. M.Nauka, 1980 496 p. [4] Melikulov A., Qurbonov P., Ismoilov P. Mathematics Part 1 -2, Textbook for Vocational Colleges, T. Teacher, 2003 Pp. 319-343. [5] Podred. V. T. Shorina "Economics - mathematical methods and models of the plan of management and management", "Knowledge" .- M., 1973. [6] Abduxamidov A. U., Nasimov H. A., Nosirov U. M., Xusanov J. H. Fundamentals of Algebra and Mathematical Analysis Part 2, For Academic Lyceums textbook, T. Teacher, 2003 [7] Adler, Irving / Mathematics Doubleday, 1990. [8. Kline, Morris. Mathematics and the Search for knowledge. Oxford, 1985. [9] R.H. Vafoev, J.H. Xusanov, K.H. Fayziev, Yu. Y. Hamroev Fundamentals of Algebra and Analysis 2nd edition For academic lyceums and vocational colleges textbook, T. Teacher, 2003

[10] G.Gaymnazarov. Combinatorics and binomial Newton. Methodical development for students of junior courses, Leninabad, 1990 [11] O. Gaymnazarov. Examples of solving practical problems in teaching mathematics. Teaching methods for academic lyceums and professional colleges Manual, Tashkent, “Fan” publishing house, 2006. [12] Bezdudnyy F. F., Pavlov, A. P. Mathematical methods of modeling in the planning of textile and light industry. Light industry. - M., 1979. [13] Kuboniva M. Mathematical economics on a personal computer. - M., 1991. [14] Kobalev N. B. Practice of application of economic-mathematical methods and models. - M., ZAO Finstat, 2000. [15] Sh. R. Mo`minov. Mathematical programming. Techno-image. -Buxoro, 2003. [16] K. Safayeva, Sh. Ikramov. "Mathematical Programming: A Collection of Lecture Notes." - T., T.M .I, 2001.256 [17] Fedosiv V. V, Ernashvili N. D. Economic and mathematical methods and models in marketing. Yu niti. - M., 2001. [18] Sh. R. Muminov. "Mathematical Modeling and Programming in Computer Science", "Text of lectures". - Bukhara, 2001. [19] Shinin E.. V., Chxartishvili A. G. Mathematical methods and models in management. - M., Delo, 2000. [20] Berenskaya E. V., Berejnoy V. I. Mathematical methods of modeling economic systems, M: Finance and statistics. - M., 2001.

#### Recommended Citation

Okbayeva, Nilufar
(2021)
"INNOVATIVE APPROACH TO SOLVING COMBINATIC ELEMENTS AND SOME PROBLEMS OF NEWTON BINOMY IN SCHOOL MATHEMATICS COURSE,"
*Central Asian Problems of Modern Science and Education*: Vol. 2021
:
Iss.
1
, Article 4.

Available at:
https://uzjournals.edu.uz/capmse/vol2021/iss1/4