Calculus AB : Calculus AB

Study concepts, example questions & explanations for Calculus AB

varsity tutors app store varsity tutors android store

Example Questions

Example Question #621 : Calculus Ab

Which of the following is the logistic growth model?

Possible Answers:

Correct answer:

Explanation:

Logistic growth model is very similar to the exponential growth model except now we are taking into account a carrying capacity.  At some point, a population will grow so large the surrounding resources can no longer support it.  Before it reaches that point, there is a stable equilibrium where the population can be supported by the resources available if it stays at a constant number of individuals.  The equilibrium is defined by the carrying capacity.

Example Question #6 : Use Exponential Models With Differential Equations

Derive the general solution of the logistic growth model from the following differential equation .  (Note that at , )

Possible Answers:

Correct answer:

Explanation:

We will use separation of variables to solve this differential equation.

 

We use partial fractions for the left hand side:

 

It is clear that  so then  so our partial fraction decomposition:

 

Plugging back into our separation of variables:

                            Let 

                       Let 

 

We will evaluate at  in order to solve for .  Evaluating at  gives .  We will substitute this in for  into the equation we are solving.

 

Example Question #77 : Differential Equations

True or False: The logistic growth model imposes a carrying capacity on the population it is modeling.

Possible Answers:

False

True

Correct answer:

True

Explanation:

The logistic growth model models a population taking into account a carrying capacity; that is, how large a population can grow and still survive off of available resources.  If the population is below this carrying capacity, it will grow to meet it.  If the population is higher than this carrying capacity, it will decrease to the carrying capacity.  This makes the carrying capacity a stable equilibrium point of the population.

Example Question #622 : Calculus Ab

Consider the following example:

 

Model the population for 20 time steps if the population starts with 50 people and grows at a rate of 0.52 but has a carrying capacity of 230.

 

This is an example of:

 

Possible Answers:

Not enough information

Logistic growth

Exponential growth

Correct answer:

Logistic growth

Explanation:

This example states a carrying capacity for the population.  Since exponential growth does not take into account carrying capacity, we cannot use this model for the population.  So we must use logistic growth.

Example Question #78 : Differential Equations

Consider the following example:

 

Model the population for 20 time steps if the population starts with 20 people and grows at a rate of 0.04.

 

This is an example of:

Possible Answers:

Exponential growth

Logistic growth

Not enough information

Correct answer:

Exponential growth

Explanation:

This example only gives use a growth rate and a starting point for the population.  There is no limiting factor or carrying capacity so we must use exponential growth to model this population.

Example Question #75 : Differential Equations

Which of the following is a graph on the logistic growth model.

Possible Answers:

Q10 a

Q10 b

Correct answer:

Q10 b

Explanation:

Notice how the graph grows exponentially until it reaches a certain equilibrium.  This tells us that the population is approaching a carrying capacity so this graph shows logistic growth.  The other graph depicts exponential growth.

Example Question #623 : Calculus Ab

Which of the following is the differential equation for exponential growth model

Possible Answers:

Correct answer:

Explanation:

The exponential growth model is used to show how populations grow over time.  This model shows a population growing exponentially without a carrying capacity limiting the population at some point.   is the growth constant and  is the population.

Example Question #1 : Use Exponential Models With Differential Equations

Derive the general solution of the exponential growth model from the differential equation 

Possible Answers:

Correct answer:

Explanation:

We will use separation of variables to derive the general solution for the exponential growth model.

                          Let 

                                      is just a constant so  will also just be some constant.  We let .

 

 

 

 

Example Question #624 : Calculus Ab

When the exponent is negative for the exponential growth model, what does this mean in terms of the population’s growth?

Possible Answers:

The population is increasing

The population is zero

The population is decreasing

The population is negative

Correct answer:

The population is decreasing

Explanation:

In the exponential growth model (in this case it would be called the exponential decay model), .  But the entire exponent can be negative;  causing an exponentially decreasing population until that population reaches zero.  In theory, it would continue into negative values but biologically we know this is not feasible.

Example Question #621 : Calculus Ab

Which of the following is the logistic growth model?

Possible Answers:

Correct answer:

Explanation:

Logistic growth model is very similar to the exponential growth model except now we are taking into account a carrying capacity.  At some point, a population will grow so large the surrounding resources can no longer support it.  Before it reaches that point, there is a stable equilibrium where the population can be supported by the resources available if it stays at a constant number of individuals.  The equilibrium is defined by the carrying capacity.

Learning Tools by Varsity Tutors