Questions LLC
Login
or
Sign Up
Ask a New Question
Science
Biology
Bacteria Growth
The population of a bacteria colony after t hours can be modeled by the function P(t)=9,000(1.5)t.
What does the number 9,000 represent?
1 answer
The number 9,000 represents the initial population of the bacteria colony at time t=0, before any growth or decay has occurred.
You can
ask a new question
or
answer this question
.
Related Questions
The initial size of a culture of bacteria is 1500. After 1 hour the bacteria count is 12000.
(a) Find a function n(t) = n0e^rt
The population of bacteria present after t hours is given by the function P(t) = 2530e^(0.24t)
. (a) What is the initial
The population of a colony of bacteria is modeled by the function p(x)=50(e^-x - e^-x^2)+10 , for 0 ≤ x, where population P is
Under ideal conditions, a population of e. coli bacteria can double every 20 minutes. This behavior can be modeled by the
The population, p in thousands of bacteria colony can be modelled by the function p(t)=200+20t-t^2, where t is the time, in
A certain strain of bacteria divides every four hours. If a colony is started with 10 bacteria, then the time t (in hours)
Laboratory technicians recorded the population of a species of bacteria each hour for 7 hours. The population in
thousands after
A bacteria culture starts with 260 bacteria and grows at a rate proportional to its size. After 4 hours there will be 1040
5 of 235 of 23 Items
Question Bacteria is known to grow exponentially. The function B(h)=82(1.25)^h represents the number of
Which situation could be modeled by a linear function
A a bank account that grows at a rate of 5% per year compounded annually B