Количество страниц: 7 с.
This article is about the XIV All-Russian open eld Olympiad for young geologists. Subject Olympiads are a competition of students where participants demonstrate their skills and knowledge in certain disciplines. The children’s and youth geological movement in Russia has a very rich history. Today, in the country, the promotion of geological knowledge among schoolchildren is carried out in accordance with the training program, innovative programs introduced as part of the implementation of the priority national project “Education”. The All-Russian elds Olympiads for young geologists are held by the Federal Agency for Subsoil Use in di erent regions of Russia every two years. The organizers of the Olympiad hope that thanks to the movement of young geologists, a new generation of highly professional specialists will grow up. The novelty of the article is the description of the participation in 2023 of a team of schoolchildren from Yakutia in the XIV All-Russian Field Olympiad in Geology in Tatarstan. The experience of the Yakut team Kimberlit should help the next participants of the Olympiad from the republic. Competitions and contests of the Olympiad are original, require nonstandard thinking and exibility of mind. However, many of the tasks of the Olympiad are composed by analogy with previous years. Therefore, an e ective way to prepare is to know the speci cs of the tasks of the Olympiads of previous years. Observation of the Kimberlite team during the competition allows us to state that the Geology Olympiad provides not only knowledge and skills, but also the experience of human communication, physical training, and everything that is necessary for a real geologist. Participation in the Olympiad is a great responsibility, especially for a representative of a subject of the federation.
Атласова, С. С. "Кимберлит" на XIV всероссийской открытой полевой олимпиаде юных геологов / С. С. Атласова ; Северо-Восточный федеральный университет им. М. К. Аммосова, Исторический факультет // Вестник Северо-Восточного федерального университета им. М. К. Аммосова. Серия: Науки о земле - 2023. - N 4 (32). - C. 5-11. - DOI: 10.25587/2587-8751-2023-4-5-11
DOI: 10.25587/2587-8751-2023-4-5-11
Количество страниц: 14 с.
Lazarev, N. P. Equilibrium problems for Kirchhoff–Love plates with nonpenetration conditions for known configurations of crack edges / N. P. Lazarev, H. Itou // Математические заметки СВФУ. — 2020. — Т. 27, N 3 (107), июль-сентябрь. — С. 52-65
DOI: 10.25587/SVFU.2020.75.68.005
Количество страниц: 24 с.
Shishkina, E. L. Method of Riesz potentials applied to solution to nonhomogeneous singular wave equations / E. L. Shishkina, S. Abbas // Математические заметки СВФУ. — 2018. — Т. 25, N 3 (99), июль-сентябрь. — С. 68-91.
DOI: 10.25587/SVFU.2018.99.16952
Количество страниц: 10 с.
Ivanova, I. K. Monoalkylbenzenes in oils of the Vendian-Cambrian deposits / I. K. Ivanova // Нефтегазовое дело. - 2008, N 1. - С. 23.
Количество страниц: 64 с.
- Томский Григорий Васильевич > Труды, статьи,
- Математика. Естественные науки > Математика,
- Краеведение. Археология. География. Биографии. История > Биографии. Генеалогия. Геральдика,
- НАУКА ЯКУТИИ > МАТЕМАТИКА. ЕСТЕСТВЕННЫЕ НАУКИ > Математика,
- НАУКА ЯКУТИИ > КРАЕВЕДЕНИЕ. ГЕОГРАФИЯ. БИОГРАФИИ. ИСТОРИЯ > Биографии. Генеалогия. Геральдика.
Tomski, G. V. My personal self-assessement : trace in mathematics / Grigori Tomski ; CONCORDE International Academy // Bulletin de l’Académie Internationale CONCORDE. - 2021. – N 4. – С. 3-65.
Количество страниц: 12 с.
Voin, A. M. Sur les theories scientifiques et la methode unique de leur justification / Voin Alexander, Tomski Grigori ; Institut international des problèmes de la philosophie et de la société, Académie Internationale CONCORDE // Concorde. – 2019. – N 4. – С. 3-13.
Количество страниц: 16 с.
We consider the queuing system (QS) with an infinite storage, one service device and exponential service. At the input of QS comes double stochastic Poisson flow whose intensity is a jump-like process with intervals of constancy distributed according to the exponential law. It is assumed that the input flow intensity values at the break points on the left and right are independent. In the earlier published works a sufficient condition of existence and uniqueness of the QS stationary regime was obtained. In this paper, the operator analysis of integral equations is performed with respect to the characteristics of the stationary SMO, the necessary condition of existence of the system of integral equations solution is obtained and the existence and uniqueness of the solution is proved. A stationary generating function of the solution in the form of a convergent series is found. A distinctive feature of this work is the construction of the 2nd model of QS and the use of the shift operator of coefficients of the generating function for stationary distribution of the customers number
Бондрова, О. В. Анализ уравнений СМО со скачкообразной интенсивностью входного потока / О. В. Бондрова, Т. А. Жук, Н. И. Головко // Математические заметки СВФУ. — 2018. — Т. 25, N 3 (99), июль-сентябрь. — С. 18-32.
DOI: 10.25587/svfu.2018.99.16948
Количество страниц: 1 с.
Федоров, М. Биир дойдулаахпыт академик : [академик Николай Николаевич Данилов туһунан] / М. Федорова // Олох суола. – 1995. - тохсунньу 19 күнэ
Количество страниц: 14 с.
Неустроева, Н. В. Вариационная задача для упругого тела с малыми периодически расположенными трещинами / Н. В. Неустроева, Н. М. Афанасьева, А. А. Егорова // Математические заметки СВФУ. — 2019. — Т. 26, N 2 (102), апрель-июнь. — С. 17-30
DOI: 10.25587/SVFU.2019.102.31509
Количество страниц: 2 с.
Данилов, Н. Н. Всесоюзная школа "Оптимальное управление. Геометрия и анализ" / Н. Н. Данилов, Н. Н. Козик, Н. К. Смоленцев // Успехи математических наук. - 1989. - Т. 44, Вып. 3. - С. 199-200.