eNUFTIR :: Перегляд за Автор "Makovetska, Svetlana"

Документ

Development of a mathematical model of transportation problem with limited time

(2016) Makovetska, Svetlana; Seidykh, Olga

This work is dedicated to the development of a mathematical model of the transport problem solution (TS) with a time limit.

Документ

Development of Recipes by Mathematical Modeling

(2013) Seidykh, Olga; Makovetska, Svetlana

This paper shows the benefits of computer-aided design formulas to create functional foods and their possible regulation by altering the chemical composition of the individual components value , taking into account properties. Designing food structure optimal methods of mathematical modeling will reduce the financial and time costs of developing food products to respond to the changing needs of the human body in a technological society, expand the product range of functional and health-care setting, which focused on individual food groups

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Expert systems in the educational process

(2016) Seidykh, Olga; Makovetska, Svetlana

In this paper, the use of expert systems in education.

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Numerical solution of hyperbolic equations by means of the package MATHCAD

(2014) Makovetska, Svetlana; Seidykh, Olga

In this paper, we discussed the solution of one-dimensional wave equation with the help of built-in function mathematics Mathcad. В даній роботі було розглянуто рішення одномірного хвильового рівняння за допомогою вбудованої функції математичного пакету Mathcad.

Документ

Solution of heat equation stationary problem

(2015) Makovetska, Svetlana; Seidykh, Olga; Fomenko, I.

This paper aims to propose the use of information technology in solving problems of mathematical physics. The paper describes the software implementation of the solution for heat equation with the use of MathCAD mathematical package. Benefits of using information technology in solving different problems of mathematical physics were analyzed in comparison with traditional methods during university course. The specificity of combination of mathematical physics problems and built-in functions of MathCAD environment makes it possible to operate with no cumbersome expressions. Promising area of future research is methodical, mathematical and algorithmic aspects of efficient software implementations of numerical methods within MathCAD environmemt.