CD Skripsi

Model Predator-Prey Dengan Dua Kali Predasi

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This final project discusses the predator-prey model with double predation.
This model uses a system of nonlinear equation from the classic Lokta-Volterra
model by adding one compartment, namely predator II. The solutions of
the model are categorized into three categories which represent a three - plane
coordinate system. This model has two equilibrium point, namely the origin
point and point without predator II. The stability analysis is carried out
to determine the eigenvalues of the jacobian matrix system then determine
the stability point criteria using the Routh-Hurwitz method. From this, it is
obtained that the origin point is unstable because of the positive eigenvalues
and point without predator II is stable with certain conditions.
Keywords: System of nonlinear equation, classical Lokta-Volterra model,
equilibrium point, Jacobian matrix, Routh-Hurwitz criteria

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Ketersediaan

Informasi Detail

Judul Seri

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No. Panggil

03 03. 121 (0040)

Penerbit

Pekanbaru : Universitas Riau – FMIPA – Matematika., 2021

Deskripsi Fisik

xi, 42 hlm.: ill.: 29 cm

Bahasa

Indonesia

ISBN/ISSN

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Klasifikasi

03 03. 121 (0040)

Tipe Isi

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Tipe Media

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Tipe Pembawa

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Edisi

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Subjek

MATEMATIKA

Info Detail Spesifik

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Pernyataan Tanggungjawab

ELFITRA

Versi lain/terkait

Lampiran Berkas

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