Which Situation Could Be Modeled Using a Geometric Sequence

This monthly increase creates a geometric sequence of 100. C In a paragraph Summarize your findings explain why this maymay not occur.

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Firstly we have an account that pays an annual interest rate of 4 compounded monthly so the monthly rate can be calculated by dividing 4 by 12.

. 3 Davids parents have set a limit of 50 minutes per week that he may play online games during the school year. 1 A cell phone company charges 3000 per month for 2 gigabytes of data and 1250 for each additional gigabyte of data. I like to explain why arithmetic and geometric progressions are so ubiquitous.

2 The temperature in your car is 79. The sequence allows a borrower to know the amount his bank expects him to. 10 Which situation could be modeled using a geometric sequence.

The sales question that we did in class as a group helped me to decide my scenario. You lower the temperature of your air conditioning by 2 every 3 minutes in order to find a comfortable temperature. For example population growth each couple do not decide to have another kid based on current population.

A a geometric sequence that can be modeled using an exponential function. 1 A cell phone company charges 3000 per month for 2 gigabytes of data and 1250 for each additional gigabyte of data. Functions model situations where one quantity determines another and can be represented algebraically graphically and using tables MA10-GRHS-S2-GLE1 2.

A cell phone company charges 3000 per month for 2 gigabytes of data and 1250 for each additional gigabyte of data. Using the examples other people have given. Determine whether each of following can be the first three terms ofan arithmetic or a geometric sequence and if so find the com- mon difference or common ratio and the next two terms of the 21.

The yearly salary values described form a geometric sequence because they change by a constant factor each year. Note that if a sequence starts with a 5 then increases by 3 from one term to the next this situation can be modeled using a linear equation with 5 as its y-intercept and 3 as its slope with the domain restriction that n must be a positive integer. The amount of money in your account increases by 1 each month according to the previous month.

Let latexPlatex be the student population and latexnlatex be the number of years after 2013. The yearly salary values described form a geometric sequence because they change by a constant factor each year. Using the explicit formula for a geometric sequence we get.

Just by tracking how the stadium is filling up the association can use simple normal probability distribution to decide on when they should start selling upgraded tickets. There are two parts to this question both of which can be modeled using geometric sequences. Know how to use spreadsheets and calculators to explore geometric sequences and series in various contexts.

An exponential function is a function of the form a n where a 1 and n is. 27 Which situation could be modeled using a geometric sequence. Maybe using question 1 above B a geometric sequence that can NOT be modeled using an exponential function.

Recognize and solve problems that can be modeled using finite geometric sequences and series such as home mortgage and other compound interest examples. The sequence below is an example of a geometric sequence because each term increases by a constant factor of 6. Each term of a geometric sequence increases or decreases by a constant factor called the common ratio.

The Series and Sequences Videos are where I obtained the information for the equations. Which situation could be modeled using a geometric sequence. So population growth each year is geometric.

The situation can be modeled by a geometric sequence with an initial term of 284. Many geometric sequences can me modeled with an exponential function. So they can model situations that involve a constant rate of growth but where the only inputs that make sense are integers.

Start with 101. This could be easily modeled using the normal probability distribution. If you can think of another example then using several complete.

What is the solution when the equation wx 2 w 0 is solved for x where w is a positive integer. Another real-life situation modeling for Geometric distribution is Airport security screening. Quantitative relationships in the real world can be modeled and solved using functions MA10-GRHS-S2-GLE2 3.

1 a bank account balance that grows at a rate of 5 per year compounded annually 3 the cost of cell phone service that charges a base amount plus 20 cents per minute 2 a population of bacteria that doubles every 45 hours. Which situation could be modeled using a geometric sequence. 1 A cell phone company charges 3000 per month for 2 gigabytes of data and 1250 for each additional gigabyte of data.

You lower the temperature of your air conditioning by 2 every 3 minutes in order to find a comfortable temperature. B Give an example of a situation that could be modeled using this statement. Model Families of Functions.

Annual size of a population that is growing or shrinking at a constant rate. The temperature in your car is 79. 435 Which situation could be modeled by using a linear function.

10 Which situation could be modeled using a geometric sequence. Geometric progressions happen whenever each agent of a system acts independently. The completely factored form of n 4 - 9n 2 4n 3 - 36n 12n 2 108 is.

The student population will be 104 of the prior year so the common ratio is 104. Geometric Sequences can be thought of as exponential equations with their domains restricted to integers. The sequence below is an example of a geometric sequence because each term increases by a constant factor of 6.

Mathematicians calculate a term in the series by multiplying the initial value in the sequence by the rate raised to the power of one less than the term number. Each term of a geometric sequence increases or decreases by a constant factor called the common ratio. There are many uses of geometric sequences in everyday life but one of the most common is in calculating interest earned.

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