The five-day flu is a rare disease. If contracted, on day one of the disease the infected person will sneeze exactly once. On day two, they will sneeze exactly 9 times. On day three, they will sneeze exactly 81 times. This pattern continues through day five. On day six, they are back to being healthy and stop sneezing altogether. a) How many total times does a patient infected with the five-day flu sneeze? The five-day flu is also contagious, but only for the first day of the disease. The first 5 healthy people who come in contact with an infected person will start sneezing the next day. At a particular university, one student with the five-day flu has his first sneeze on Monday. This means on Tuesday, there will be 5 new people who are infected and will begin to sneeze. b) How many new people will become infected on Wednesday? c) How many total people are infected by Wednesday? d) How many total people are sneezing due to the five-day flu on Friday?
Equations and Inequations
Equations and inequalities describe the relationship between two mathematical expressions.
Linear Functions
A linear function can just be a constant, or it can be the constant multiplied with the variable like x or y. If the variables are of the form, x2, x1/2 or y2 it is not linear. The exponent over the variables should always be 1.
The five-day flu is a rare disease. If contracted, on day one of the disease the infected person will sneeze exactly once. On day two, they will sneeze exactly 9 times. On day three, they will sneeze exactly 81 times. This pattern continues through day five. On day six, they are back to being healthy and stop sneezing altogether.
a) How many total times does a patient infected with the five-day flu sneeze?
The five-day flu is also contagious, but only for the first day of the disease. The first 5 healthy people who come in contact with an infected person will start sneezing the next day.
At a particular university, one student with the five-day flu has his first sneeze on Monday. This means on Tuesday, there will be 5 new people who are infected and will begin to sneeze.
b) How many new people will become infected on Wednesday?
c) How many total people are infected by Wednesday?
d) How many total people are sneezing due to the five-day flu on Friday?
Trending now
This is a popular solution!
Step by step
Solved in 3 steps
