In a laboratory, under favorable conditions, a bacteria population grows at an exponential rate. The number of cells C in the population is modeled by the function C(t) = ab, where a and b are constants and t is measured in hours.
t
0
1
c(t)
8
24
Which function can be used to find the number of cells of bacteria in the population at time t?
3 answers
C(t) = 8 * (3)^t
Which of the statements below are true for linear functions? Select all that apply.
The general equation is y — mx + b
The general equation is y = ax^2 + bx + c
The general equation is y = ab^X
The graph contains a vertex.
The slope of the graph is constant and can be defined as rise over run.
The general equation is y — mx + b
The general equation is y = ax^2 + bx + c
The general equation is y = ab^X
The graph contains a vertex.
The slope of the graph is constant and can be defined as rise over run.
The statements that are true for linear functions are:
- The general equation is y = mx + b
- The slope of the graph is constant and can be defined as rise over run.
- The general equation is y = mx + b
- The slope of the graph is constant and can be defined as rise over run.