Pengabdian Masyarakat Sosialisasi Metris Vertikal Cara Berhitung Lebih Bervariasi

Authors

  • Stephanus Ivan Goenawan Program Studi Teknik Industri, Fakultas Teknik, Universitas Katolik Indonesia Atma Jaya
  • Wibawa Prasetya Program Studi Teknik Industri, Fakultas Teknik, Universitas Katolik Indonesia Atma Jaya
  • Angela Arella Kurniawan Program Studi Teknik Industri, Fakultas Teknik, Universitas Katolik Indonesia Atma Jaya
  • Sebastian Gunawan Program Studi Teknik Industri, Fakultas Teknik, Universitas Katolik Indonesia Atma Jaya

DOI:

https://doi.org/10.25170/charitas.v4i01.5495

Keywords:

Vertical Metris, Creativity, Arithmetics, Mathematics Economics

Abstract

Logical abilities and creativity in calculations can be applied in economics where people organize and manage a business activity
themselves and bear the risks of their business. He is responsible for his business, financial risks, material and human resources in his business. Technical economists usually act as owners or managers and also as operators of their business activities. Calculation in technical economics is a science that contains how to calculate, how to make considerations in solving a problem, including the feasibility of a business with existing alternatives based on economic factors and criteria. By studying this approach, it is hoped that someone can make the best decision from the many available alternatives. From the description of arithmetic it can be seen that calculations in technical economics involve very technical considerations. So technical economics involves technical analysis, with
emphasis on economic aspects and has the aim of assisting decision making. Therefore, in making the decision to do so, a technical
economist must be able to make the right decision. The right decision is not a decision without consideration. Of course, to make the right decision, basic considerations are needed. These basics are what are called alternatives in making decisions. This process of many alternatives can be tried to simulate through learning arithmetic calculations which can be done in various or many ways using the vertical metris method.

References

Barrio, R. (2005). Performance of the Taylor series method for ODEs/DAEs. Applied Mathematics and Computation. 163(2): 525–545.

Goenawan, S.I. (2020). Metris Vertikal Penyempurna Konvensional-Lebih umum dan kreatif. HKI.

Goenawan, S.I.(2000).Metode Horisontal. Metris.1(1): 1-8.

Kountourogiannis., D., Loya,P. (June 2003). A Derivation of Taylor’s Formula with Integral Remainder. Mathematics Magazine. 76 (3): 217-219

Kline,M. (Nov 1983). Euler and Infinite Series. Mathematics Magazine. 56(5): 307-314.

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Published

2024-07-09
Abstract views: 62 | PDF downloads: 27