Research two satellite phone plans with a specific number of minutes a month. Create a linear equation to represent the monthly bill based on both the flat fee and the per minute cost. Which one is the better option? Why?
is there anymore data? Or are you suppose to make up your own pricing?
makeup pricing
Let:
x=number of minutes
y= monthly bill
Made up information:
AT&T charges $15 as a flat fee and 10cents per minute
y=15+0.10x
Verizon charges $18 flat fee and 5cents per minute
y=18+0.05x
Set both equation equal to each other:
15+0.10=18+.05x
x=60mins
Now we know that at 60mins, both the company's monthly bill will be the same
If x > 60, Verizon is cheaper
Plug in whatever value you want for x to find out.
To research two satellite phone plans with a specific number of minutes a month, you can start by examining the websites or contacting the customer service departments of satellite phone service providers. Look for providers that offer plans with the desired number of minutes per month. Some well-known satellite phone providers include Iridium, Globalstar, and Inmarsat.
Once you have identified two plans, you will need to gather the necessary information to create a linear equation to represent the monthly bill based on the flat fee and the per minute cost. The equation will be in the form of y = mx + b, where y represents the monthly bill, x represents the number of minutes used, m represents the per minute cost, and b represents the flat fee.
For example, let's say we have Plan A with a per minute cost of $0.50 and a flat fee of $20, and Plan B with a per minute cost of $0.30 and a flat fee of $30. The linear equations would be:
Plan A: y = 0.50x + 20
Plan B: y = 0.30x + 30
Now, to determine which plan is the better option, you need to consider factors like the desired number of minutes per month and the total monthly cost.
Compare the two equations to analyze the cost implications. For instance, if you plan to use 100 minutes per month, you can evaluate the total cost for each plan:
Plan A: y = 0.50(100) + 20 = 70
Plan B: y = 0.30(100) + 30 = 60
Based on these calculations, Plan B appears to be the better option, as it results in a lower monthly bill for 100 minutes of usage. However, it's important to note that you should compare the plans for various usage scenarios to get a more comprehensive understanding of which plan would be the most cost-effective for your specific needs.
In summary, compare the linear equations representing the monthly bills of the satellite phone plans based on their flat fees and per minute costs to determine which option is better in terms of cost.