In your journal, you identified careers that involve irrational numbers. You brainstormed or researched jobs that use pi or Euler’s number to do their work.
Imagine that your friend loves to plan parties, and he wants to be an event planner someday. He does not think he needs to know how to find a number between two rational numbers. He also says he will never use pi again in his life after math class. You think of some of the tasks he might need to do as an event planner:
Decide how many cakes to order when a party could have as few as 50 people and as many as 100 people.
Choose a round table that is the correct size to fit six people.
Make a prediction about how much to budget for the decorations at a party when the customer is still deciding between $10 floral arrangements and $30 floral arrangements.
In your post, explain to your friend how he will use the skill of finding a number between two rational numbers in his dream career:
Choose one of the examples from the list above, and represent the example with a mathematical statement.
Summarize to your friend why he will need both rational and irrational numbers as an event planner.
write this in a simpler format and less words
As an event planner, your friend will need to use the skill of finding a number between two rational numbers. This skill is necessary when deciding how many cakes to order for a party that could have as few as 50 people and as many as 100 people. By finding a number between the two rational numbers, your friend can ensure that there are enough cakes for all the guests without overordering.
For example, if there are 50-100 people expected at a party, your friend would need to find a number between 50 and 100, such as 75. This way, he can order an appropriate number of cakes to accommodate the most likely number of guests.
In addition to this, your friend will also need to use rational numbers when choosing a round table that can fit six people. Rational numbers, which include whole numbers and fractions, will help him determine the correct size of the table that is suitable for the gathering.
While your friend may not think he will use pi or other irrational numbers after math class, he will still need rational numbers and occasional estimates in his career as an event planner. Rational numbers will help him make accurate calculations and decisions, such as determining budgets for decorations. These numbers are essential for planning and organizing successful events.
As an event planner, you will need to use the skill of finding a number between two rational numbers. This will come in handy when you have to make decisions about quantities, sizes, and budgets for events. For example, when deciding how many cakes to order for a party, you will need to find a number between the minimum of 50 people and the maximum of 100 people attending the event.
In addition to rational numbers, you may also need to use irrational numbers like pi and Euler’s number in your career as an event planner. While you may not use pi extensively, it can still be useful for tasks like determining the size of a round table to ensure it can accommodate a certain number of people, such as six in this case. Furthermore, making predictions about budgeting for decorations might involve considering factors like different pricing options for floral arrangements, which might require the use of irrational numbers.
Overall, both rational and irrational numbers have practical applications in the field of event planning, and having an understanding of how to work with these numbers will enable you to make informed decisions and create successful events.
As an event planner, your friend might need to make decisions based on various factors, such as the number of attendees, the size of tables, and the budget for decorations. To make informed decisions, he will need to use mathematical skills, including finding numbers between two rational numbers.
For example, let's consider the task of deciding how many cakes to order for a party that could have 50 to 100 people. To ensure there is enough cake for all attendees, your friend may want to find a number between the minimum and maximum number of people expected. This will help him determine the appropriate quantity of cakes to order, avoiding wastage or shortage.
A mathematical statement for this example could be:
Number of cakes = (Maximum number of people + Minimum number of people) / 2
Moreover, using both rational and irrational numbers will be essential as an event planner. Rational numbers, which are numbers that can be expressed as fractions, will help your friend with calculations involving quantities, costs, and measurements. On the other hand, irrational numbers, like pi and Euler’s number, might not be directly applicable to every task but can still play a role in specific situations, such as calculating circular table sizes or making precise estimates.
In summary, by understanding how to find numbers between two rational numbers and recognizing the utility of both rational and irrational numbers, your friend will be better equipped to plan successful and efficient events as an event planner.