Published November 7, 2025
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ПРЕДПОЛОЖИМ , ЧТО ТЕМПЕРАТУРА ВНУТРИ ШАРА ОПИСЫВАЕТСЯ УРАВНЕНИЕМ ТЕПЛОПРОВОДНОСТИ СО СЛЕДУЮЩИМИ УСЛОВИЯМИ.
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- 1. Базовый докторант Гулистанского государственного университета, Учитель математики в Гулистанской частной школе Ideal Study
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References
- 1.Courant, R., Friedrichs, K. and Lewy, H. (1967) 'On the partial difference equations of mathematical physics', IBM Journal of Research and Development, 11(2), pp. 215-234. 2.LeVeque, R.J. (2002) Finite volume methods for hyperbolic problems. Cambridge: Cambridge University Press. 3.Evans, L.C. (2010) Partial differential equations. 2nd edn. Providence: American Mathematical Society. 4.Godunov, S.K. (1959) 'A difference method for numerical calculation of discontinuous solutions of the equations of hydrodynamics', Matematicheskii Sbornik, 47(3), pp. 271-306. 5.Smith, G.D. (1985) Numerical solution of partial differential equations: finite difference methods. 3rd edn. Oxford: Oxford University Press. 6.Lax, P.D. and Wendroff, B. (1960) 'Systems of conservation laws', Communications on Pure and Applied Mathematics, 13(2), pp. 217-237. 7.Strikwerda, J.C. (2004) Finite difference schemes and partial differential equations. 2nd edn. Philadelphia: SIAM. 8.Toro, E.F. (2009) Riemann solvers and numerical methods for fluid dynamics. 3rd edn. Berlin: Springer. 9.Ibragimov, G. and Tursunov, D. (2018) 'Giperbolik tenglamalarni sonli yechish usullari', O'zbekiston Matematika Jurnali, 2, pp. 45-58. 10.Самарский, А.А. и Николаев, Е.С. (1978) Методы решения сеточных уравнений. Москва: Наука.