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Example Questions
Example Question #101 : How To Find Constant Of Proportionality Of Rate
The rate of decrease of the number of baceterium due to an introduction of soap is proportional to the population. The population decreased from 15800 to 2400 between 3:00 and 5:00. Determine the expected population at 5:30.
We're told that the rate of change of the population is proportional to the population itself, meaning that this problem deals with exponential growth/decay. The population can be modeled thusly:
Where is an initial population value, represents a measure of elapsed time relative to this population value, and is the constant of proportionality.
Since the population decreased from 15800 to 2400 between 3:00 and 5:00, we can solve for this constant of proportionality:
Now that the constant of proportionality is known, we can use it to find an expected population value relative to an initial population value due to the difference in time points. Convert minutes to decimals by dividing by 60:
Example Question #102 : How To Find Constant Of Proportionality Of Rate
The rate of decrease of the number of black lotuses is proportional to the population. The population decreased from 1100 to 85 between 1993 and 2013. Determine the expected population in 2015.
We're told that the rate of change of the population is proportional to the population itself, meaning that this problem deals with exponential growth/decay. The population can be modeled thusly:
Where is an initial population value, represents a measure of elapsed time relative to this population value, and is the constant of proportionality.
Since the population decreased from 1100 to 85 between 1993 and 2013, we can solve for this constant of proportionality:
Now that the constant of proportionality is known, we can use it to find an expected population value relative to an initial population value due to the difference in time points:
Example Question #103 : How To Find Constant Of Proportionality Of Rate
The rate of growth of the number of tree frogs is proportional to the population. The population increased from 43800 to 87215 between 1990 and 1995. Determine the expected population in 2015.
We're told that the rate of change of the population is proportional to the population itself, meaning that this problem deals with exponential growth/decay. The population can be modeled thusly:
Where is an initial population value, represents a measure of elapsed time relative to this population value, and is the constant of proportionality.
Since the population increased from 43800 to 87215 between 1990 and 1995, we can solve for this constant of proportionality:
Now that the constant of proportionality is known, we can use it to find an expected population value relative to an initial population value due to the difference in time points:
Example Question #104 : How To Find Constant Of Proportionality Of Rate
The rate of growth of the number of glowing mushrooms in a flooded cave is proportional to the population. The population increased from 110 to 310 between January and July. Determine the expected population in October.
We're told that the rate of change of the population is proportional to the population itself, meaning that this problem deals with exponential growth/decay. The population can be modeled thusly:
Where is an initial population value, represents a measure of elapsed time relative to this population value, and is the constant of proportionality.
Since the population increased from 110 to 310 between January and July, we can solve for this constant of proportionality. Use the number of the months as they're ordered in the calendar:
Now that the constant of proportionality is known, we can use it to find an expected population value relative to an initial population value due to the difference in time points:
Example Question #3825 : Calculus
The rate of growth of the number of jackals is proportional to the population. The population increased from 1500 to 5800 between 2013 and 2015. Determine the expected population 2018.
We're told that the rate of change of the population is proportional to the population itself, meaning that this problem deals with exponential growth/decay. The population can be modeled thusly:
Where is an initial population value, represents a measure of elapsed time relative to this population value, and is the constant of proportionality.
Since the population increased from 1500 to 5800 between 2013 and 2015, we can solve for this constant of proportionality:
Now that the constant of proportionality is known, we can use it to find an expected population value relative to an initial population value due to the difference in time points:
Example Question #3826 : Calculus
The rate of growth of the number of space vipers in the Milky Way is proportional to the population. The population increased from 1200 to 58000 between 2189 and 2213. Determine the expected population 2225.
We're told that the rate of change of the population is proportional to the population itself, meaning that this problem deals with exponential growth/decay. The population can be modeled thusly:
Where is an initial population value, represents a measure of elapsed time relative to this population value, and is the constant of proportionality.
Since the population increased from 1200 to 58000 between 2189 and 2213, we can solve for this constant of proportionality:
Now that the constant of proportionality is known, we can use it to find an expected population value relative to an initial population value due to the difference in time points:
Example Question #3827 : Calculus
The rate of growth of the number of yeast cells in rising dough is proportional to the population. The population increased from 1100 to 5300 between 3:30 and 3:15. At what point in time approximately will the population be 200,000?
We're told that the rate of change of the population is proportional to the population itself, meaning that this problem deals with exponential growth/decay. The population can be modeled thusly:
Where is an initial population value, represents a measure of elapsed time relative to this population value, and is the constant of proportionality.
Since the population increased from 1100 to 5300 between 3:30 and 3:15, we can solve for this constant of proportionality. Treat the minutes as decimals of an hour by dividing by 60:
Now that the constant of proportionality is known, we can use it to find the specified point in time:
Example Question #3828 : Calculus
The rate of growth of the number of bacterial cells in a culture is proportional to the population. The population increased from 24 to 313 between 3:00 and 4:00. At what point in time apprxoimately will the population be 50,000?
We're told that the rate of change of the population is proportional to the population itself, meaning that this problem deals with exponential growth/decay. The population can be modeled thusly:
Where is an initial population value, represents a measure of elapsed time relative to this population value, and is the constant of proportionality.
Since the population increased from 24 to 313 between 3:00 and 4:00, we can solve for this constant of proportionality:
Now that the constant of proportionality is known, we can use it to find the specified point in time:
Example Question #3829 : Calculus
The rate of growth of the number of bacteriophages assaulting a culture is proportional to the population. The population increased from 11 to 165 between 1:00 and 3:00. At what point in time will the population be 800,000?
We're told that the rate of change of the population is proportional to the population itself, meaning that this problem deals with exponential growth/decay. The population can be modeled thusly:
Where is an initial population value, represents a measure of elapsed time relative to this population value, and is the constant of proportionality.
Since the population increased from 11 to 165 between 1:00 and 3:00, we can solve for this constant of proportionality:
Now that the constant of proportionality is known, we can use it to find the specified point in time:
Example Question #3830 : Calculus
The rate of growth of the number of red snapper in secluded waters is proportional to the population. The population increased from 12000 to 96000 between 2011 and 2015. What is the constant of proportionality in years-1?
We're told that the rate of change of the population is proportional to the population itself, meaning that this problem deals with exponential growth/decay. The population can be modeled thusly:
Where is an initial population value, and is the constant of proportionality.
Since the population increased from 12000 to 96000 between 2011 and 2015, we can solve for this constant of proportionality: