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MODEL PROBABILISTIK FUZZY MULTI OBJEKTIF BERDISTRIBUSI PARETO PADA SISTEM PENGANGKUTAN METAL CRATES

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Penilaian

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Metal crates are containers made of iron used by rubber manufacturers to package rubber. In distributing metal crates to all rubber factories, 3 types of vehicles are needed, namely HDL, engkel, and wing box. With different capacities for each vehicle, this study aims to obtain the optimal total cost and time for the distribution of metal crates along with the optimal amount of load on each vehicle. In solving the problem of distributing metal crates, the Probabilistic Fuzzy Multi-Objective Solid Transportation (PFMOST) model is used. The PFMOST model that has been formulated is solved by using Fuzzy Programming Technique Method, where the method is used to transform multi-objective fuzzy problems into deterministic single objective problems. The results of the PFMOST model with Pareto distribution is a total optimal distribution cost of Rp. 3,836,595 and the total optimal distribution time is 757.245 minutes or 13 hours. So it can be concluded that PFMOST model can be applied to metal crates transportation problem and can obtain optimum results.

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Availability

Inventory Code	Barcode	Call Number	Location	Status
2107001535	T55049	T550492021	Central Library (REFERENSI)	Available but not for loan - Not for Loan

Detail Information

Series Title

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Call Number

T550492021

Publisher

Inderalaya : Fakultas MIPA Unsri., 2021

Collation

xii, 54 hlm.; ilus., tab.: 28 cm

Language

Indonesia

ISBN/ISSN

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Classification

519.07

Content Type

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Media Type

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Carrier Type

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Edition

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Subject(s)

Matematika
Sistem Pengangkutan Metal Crates

Specific Detail Info

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Statement of Responsibility

EM

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