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1-027-StochasticProcesses-ModelingScenario
24 Jan 2024 | Teaching Materials | Contributor(s):
By Brian Winkel
SIMIODE - Systemic Initiative for Modeling Investigations and Opportunities with Differential Equations
We build the infinite set of first order differential equations for modeling a stochastic process, the so-called birth and death equations. We will only need to use integrating factor solution...
https://qubeshub.org/publications/2975/?v=3
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1-027-StochasticProcesses-ModelingScenario
15 Oct 2023 | Teaching Materials | Contributor(s):
By Brian Winkel
SIMIODE - Systemic Initiative for Modeling Investigations and Opportunities with Differential Equations
We build the infinite set of first order differential equations for modeling a stochastic process, the so-called birth and death equations. We will only need to use integrating factor solution...
https://qubeshub.org/publications/2975/?v=2
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2009-Agnes_Rash-Brian_Winkel-Birth_and_Death_Process_Modeling_Leads_to_the_Poisson_Distribution
12 Mar 2023 | Teaching Materials | Contributor(s):
By Agnes Rash1, Brian Winkel2
1. NA 2. SIMIODE - Systemic Initiative for Modeling Investigations and Opportunities with Differential Equations
In this paper there are details of development of the general birth and death process from which we can extract the Poisson process as a special case.
https://qubeshub.org/publications/3796/?v=1
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1-039-StochasticPopModels-ModelingScenario
25 May 2022 | Teaching Materials | Contributor(s):
By Daniel Flath
Macalester College, St. Paul Mn USA
We develop strategies for creating a population model using some simple probabilistic assumptions. These assumptions lead to a system of differential equations for the probability that a system is...
https://qubeshub.org/publications/3301/?v=1
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1-027-StochasticProcesses-ModelingScenario
04 May 2022 | Teaching Materials | Contributor(s):
By Brian Winkel
SIMIODE - Systemic Initiative for Modeling Investigations and Opportunities with Differential Equations
We build the infinite set of first order differential equations for modeling a stochastic process, the so-called birth and death equations. We will only need to use integrating factor solution...
https://qubeshub.org/publications/2975/?v=1
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Beanbag Toss (Grades 6-8)
07 Jul 2018 | Teaching Materials | Contributor(s):
By Jody Britten1, Marka Carson, Jacob Cordeiro, Misael Jiminez1, Erika Villegas-Jiminez1
Pomona Unified School District, CA
The classroom lesson presents students with the task of developing a fair--yet challenging--beanbag toss game.
https://qubeshub.org/publications/693/?v=1