The population growth curve of houseflies typically follows a J-shaped curve, with a rapid increase in population numbers, reaching a peak, and then stabilizing. Initial exponential growth is followed by a plateau as resources become limited, leading to a steady-state population size. This pattern is influenced by factors such as food availability, temperature, and presence of predators.
Logistic growth curve shows a carrying capacity, where the population grows exponentially at first, then levels off as it reaches the maximum sustainable population size for the environment.
When a limiting factor is present, population growth initially follows an exponential curve as the population increases in size. However, it eventually levels off and plateaus at the carrying capacity of the environment, resulting in a logistic growth curve. This is due to the limited availability of resources, such as food or space, which constrain the population from growing indefinitely.
S-shaped curve, known as the logistic growth curve. This curve starts with exponential growth, accelerates as resources are abundant, but eventually levels off as the population stabilizes at the carrying capacity.
There are three phases in a logistic growth curve:1 - Lag phase: the initial stage on which population growth rates are slow as a result of a small population size (occurs when the population is small and is increasing slowly)2- Log phase: The stage in which population growth rates are very rapid (occurs when the population undergoes very rapid growth)3- Stationary phase: The phase in which population growth rates decrease as the population size reaches the carrying capacity and stabilizes (occurs at or close to the carrying capacity of the environment)HOPE THIS HELPS :D
s-shaped/curved
A population growth curve shows the change in the size of a population over time. It typically consists of four phases: exponential growth, plateau, decline, and equilibrium. The curve is often represented by an S-shaped logistic curve, which shows the pattern of population growth leveling off as it reaches carrying capacity.
A population's growth curve most closely resembles an "S" shaped curve, known as the logistic growth curve. Initially, the curve rises slowly as the population grows, followed by a period of rapid growth, before leveling off as the environment's carrying capacity is reached and growth stabilizes.
population growth begins to slow down
A logistic growth curve plots the number of organisms in a growing population over time. Initially, the curve shows exponential growth until reaching the carrying capacity, where population growth levels off due to limited resources. This curve is commonly used in ecology to model population dynamics.
I think the answer is realized growth because it also includes the effect of environmental resistance and causes it to become S shaped unlike the theoretical growth curve.
a population thing
An S-shaped curve for population growth suggests that the population initially grows slowly, accelerates rapidly, and then levels off as it reaches carrying capacity. This pattern is indicative of logistic growth, where resource limitations eventually constrain population growth.
Logistic growth curve shows a carrying capacity, where the population grows exponentially at first, then levels off as it reaches the maximum sustainable population size for the environment.
Logistic growth
logistic growth
Logistic growth occurs when a population's growth rate decreases as the population size approaches the carrying capacity of its environment. This type of growth involves an initial rapid increase in population size followed by a slowing down as resources become limited. Logistic growth is characterized by an S-shaped curve.
The population growth curve of humans typically follows an S-shaped curve, showing slow growth initially, followed by a period of rapid growth, and then tapering off as it reaches carrying capacity. In contrast, the population growth curve of bacteria on a petri dish shows exponential growth, where the population continuously and rapidly increases without reaching a plateau due to unlimited resources in the artificial environment.