Banyak fenomena dalam kehidupan dapat dianalisis dengan menggunakan pemodelan matematika. Terdapat beberapa macam model pertumbuhan populasi yang kontinu diantarnya model populasi eksponensial dan model populasi logistik.  Model populasi logistik merupakan model pertumbuhan yang memperhitungkan faktor logistik berupa ketersediaan makanan dan ruang hidup. Penelitian ini membahas perilaku solusi persamaan diferensial logistik dengan waktu delay. Metode penelitian yang digunakan dalam penulisan ini adalah penelitian deskriptif dan kepustakaan. Dengan mengamati hasil simulasi numerik dari solusi persamaan diferensial logistik dengan delay dan persamaan logistik tanpa delay. Hasil pengamatan menunjukkan bahwa fungsi dan interval delay yang diberikan berpengaruh terhadap perilaku solusi persamaan logistik. Panjang interval delay yang relatif besar menyebabkan solusinya tidak memiliki titik kesetimbangan. Namun untuk interval delay yang relatif kecil tetap menuju titik kesetimbangan y = 1 dengan cara berfluktuasi

Anna Maria Spagnuolo, Meir Shillor, L. K. A. T., 2012. A logistic delay differential equation model for Chagas disease with interrupted spraying schedules, Journal of Biological Dynamic, 6(2), 377394.

Asfiji, N. S. 2012. Analyzing the Population Growth Equation in the Solow Growth Model Including the Population Frequency:Case Study: USA, International Journal of Humanities and Social Science, 2(10), 303–328.

Doust., R. M. 2015. The Logistic Modeling Population, Having Harvesting Factor, Yugoslav Journal of Operations Research, 25(1), 107–115.

Forde, J. E. 2005. Delay Differential Equation Models in Mathematical Biology, Journal of Applied Mathematics, 2005(586454).

Haberman, R., .1998. Mathematical Models Mechanical Vibration Population Dynamics, Vol. 2, Slam Texas, New York.

Murray, J., .2011. Mathematical Biology: I. An Introduction,, Vol. 17 of 3, Interdisciplinary Applied Mathematics, Springer.

Oladotun, Matthew, O. 2015. Solution of Delay Differential Equations Using a Modified Power Series Method, Scientific Research Publishing, 6, 670–674.

Olvera, D. 2014. Approximate Solutions of Delay Differential Equations with Constant and Variable Coefficients by the Enhanced Multistage Homotopy Perturbation Method, Hindawi Publishing Corporation, 2015(7), 343–348.

Ramos., R. A. 2012. Logistic Function As A Forecasting Model: It’s Aplication To Business and Economics, International Journal of Engineering and Applied Sciences, 2(3).

Ruan, S.2006. Delay Diferential Equation In Single Species Dynamics, Delay Dierential Equations and Applications, 4, 7–12.

Sangadji .2008. Metode Numerik, 1, Graha Ilmu, Yogyakarta.

Shoja, A. 2016. The spectral iterative method for Solving Fractional-Order Logistic Equation, Int. J. Industrial Mathematics, 8(3).

Teschl, G. 2011. Ordinary Diferential Equations and Dynamical Systems, Vol. xxx, American Mathematical Society Providence Rhode Island.

Timuneno, H. M. 2007. Model Pertumbuhan Logistik Dengan Waktu Tunda 1, FMIPA Undip, Semarang.

Tveito, A., W. R. 1998. Introduction to Partial Diferential Equation: A Computational Approach, Vol. 45, Springer-Verlag, New York.

William, E. Boyce., R. C. D. 2008. Elementary Differential Equations and Boundary Value Problems, 9, Department of Mathematical Sciences Rensselaer Polytechnic Institute, New York.