To graph: The model by using technology which represents the population y of a bacterial culture increases with the time t (in days) is given by the logistic growth function as, y = 925 ( 1 + e − 0.3 t ) Also determine the number of days required in order that the population of the culture will reach 711 .
To graph: The model by using technology which represents the population y of a bacterial culture increases with the time t (in days) is given by the logistic growth function as, y = 925 ( 1 + e − 0.3 t ) Also determine the number of days required in order that the population of the culture will reach 711 .
Solution Summary: The author explains how to graph the population y of a bacterial culture by using the logistic growth function.
To graph: The model by using technology which represents the population y of a bacterial culture increases with the time t (in days) is given by the logistic growth function as,
y=925(1+e−0.3t)
Also determine the number of days required in order that the population of the culture will reach 711.
(b)
To determine
Whether the limit of population of bacterial culture have some value or not as t increases without bound and give reason when the population y of a bacterial culture increases with the time t (in days) is given by the logistic growth function as,
y=925(1+e−0.3t)
(c)
To determine
To calculate: The limit of population of bacterial culture and give interpretation about the type of model when the population y of a bacterial culture increases with the time t (in days) is given by the function as,
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