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Jamalov Madamin Habibulla ugli , Department of Mathematics, University of Economics and Pedagogy Assistant

Abstract

 The article briefly discusses higher-order linear differential equations with constant coefficients and their solution methods.

Keywords

Higher-order linear differential equation, constant coefficients, characteristic equation.

References

Rosen K. H. Discrete Mathematics and Its Applications. — New York: McGraw-Hill, 2012.

Grimaldi R. P. Discrete and Combinatorial Mathematics: An Applied Introduction. — Boston: Pearson, 2004.

Coleman B., Busby R., Ross S. Discrete Mathematical Structures. — New Jersey: Prentice Hall, 2009.

Halmos P. R. Naive Set Theory. — New York: Springer, 1974.

Lipschutz S., Lipson M. Schaum's Outline of Discrete Mathematics. — New York: McGraw-Hill, 2009.

Meiliyev H.J., Eshankulov J.C., Jamolov.M.Kh. ``Traektorii kvalrptichnie stochasticheskie operatory na lekartnogo proezvelenie S1*S1. Scientific reports of Bukhara State University. 79-86 c.

M. Kh. Jamolov. "Configurations on the Grid", Military Aviation Institute "Actual problems and solutions of science education", conference materials collection, 2025 p.379-383.

M.Kh. Jamolov, "Application of Gibbs Measurements in Lattice Systems", "World Scientific and Methodological Journal of Research", 61(6), p. 162-165.

Teshabayev A.T., Khudoyberganov G'A. Ordinary differential equations. - Tashkent: Teacher, 2000.

Rasulov H.R. Theory of ordinary differential equations. - Tashkent: Science, 2005.

Pontryagin L.S. Ordinary differential equations. - Moscow: Nauka, 1970.

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