Infopaket

Computer calculation packages

ВК3

Вибіркова дисципліна для ОП

First

2021/2022

5 Semester

3

Learning outcomes are knowledge of basic mathematical packages, basic data types and basic operators, methods of displaying information, differentiation and integration. Students must also be able to apply this knowledge in practice, ie to characterize basic mathematical packages, know basic data types and basic operators, be able to perform operations with numerical data, have methods of displaying information, be able to analyze parametric relationships, apply loop operators and procedures, apply optimization methods, implement numerical calculations.

Full-time form

Know the basic laws of mechanics, electricity, mathematical analysis, the ultimate differential equation, the basics of mathematical physics. Zocrema, to understand the analysis analytically and in the numerical view of the differential alignment, to analyze the functional fallacies, to remember the difference for the gradient, the divergence, the rotor and the Laplace operator. Include advanced knowledge from the course of mathematical analysis, mathematical physics, the basics of vector and tensor analysis and differential equations for the development of algebraic and differential equations. Use elementary skills to calculate similar, integrals, and operations on vectors, to graphically develop graphs of functions, to plot functions in a series and Four's integral.

The course aims to study Maple and is designed to deepen knowledge of computer mathematical packages, learn methods of mathematical calculations using modern computer tools.

[1] I. Thompson. Understanding Maple. Cambridge University Press, 2016. [2] P.A. de Saint-Aubain, P.M. Back. The Maple Syntax. Polyteknisk Forlag, 2013. [3] M. Abell, J. Braselton. Maple by Example, 3rd Edition. Academic Press, 2005. [4] B.V. Liengme. Maple: A Primer. IOP Concise Physics, 2019. [5] W.P. Fox, W.C. Bauldry. Advanced Problem Solving with Maple: A First Course. CRC Press, 2019. [6] J. Claycomb. Mathematical Methods for Physics using Matlab and Maple. Mercury Learning, 2018. [7] J. Stewart. Single Variable Calculus: Early Transcendentals. Brooks Cole, 2015.

The total amount of 90 hours, including: Lectures - 14 hours. Practical classes - 30 hours. Independent work - 45 hours. Consultations - 1 hour.

The control is carried out according to the module-rating system, which consists of 2 content modules. The knowledge assessment system includes modular and semester knowledge control. Forms of control: evaluation of tests (2 tests of 30 points). The student can get a maximum of 60 points for tests and 40 points for the exam. The exam ticket includes 2 theoretical questions (10 points each) and a task (20 points).

Ukrainian