Discuss how a probability plot works, and why we can draw conclusions based on the level of fit we see. If the resulting "fit" isn't perfect (which it very rarely is), what factors do you need to consider in making a decision about whether to use a particular distribution to solve your challenge? Describe how you would go about determining the best distribution for a set of data (if there actually is one).

Jayne is studying urban planning and finds that her town is decreasing in population by 3% each year the population of her town is changing by a constant rate

Based upon past experience, barry expects no overdrafts. he expects no 2nd copies of statements. barry estimates that he will use network atms about 5 times a month with either bank. barry decides in the end to choose eecu. assuming that both banks provide the necessary services equally well, and based upon the tables of fees given above, how much can barry reasonably expect to save annually by choosing eecu in this case over e-town bank? a. $72 b. $78 c. $144 d. $24

F(x) = (x^2 + 3x − 4) and g (x) = (x+4) find f/g and state the domain.