The equation y(t) = A0 (1+r)^t is for Exponential growth or Exponential Decay
What is Exponential Growth
100
Growth or decay factor: .8
What is 80% decay
100
The population of Dalhart is 2,500. However, the number of citizens are increasing about 8% every year. The population will be (Number) in 4 years
What is 34,012
100
What is the initial value of y=2.1(1.04)^x
What is 2.1
100
Growth or Decay? y=(9)^x
What is Growth
200
The equation y(t) = A0 (1-r)^t is for Exponential Growth or Exponential Decay
What is Exponential Decay
200
Growth or Decay Factor: 1.8%
What is 80% growth
200
Jessie bought a farm tractor for 60,000. The value is expected to decrease at a rate of 18% for 4 years
What is 27,127
200
What is the initial value of y=3(1.8)^x
What is 3
200
Difference between logarithmic and exponential growth
What is the inverse of exponential growth and is very slow
300
what does n represent in the equation y(t) = A0 (1+r/n)^nt
What is the number or times in a year
300
Growth or Decay Factor: 1.04
What is 4% growth
300
$6,000 are invested at a 4% annual interest rate. Compounded quarterly
After 5 years how much is investment worth.
What is $7,321
300
The initial value of y=9(.8)
What is 9
300
Exponential Decay occurs.....
When the function is proportional to the current function, but has a negative rate
400
What does A0 represent in the equation y(t) = A0 (1+r)^t
What is initial value
400
Growth or Decay Factor: .94
What is 6% decay
400
A scientist stated with a culture of 20 bacteria in a dish. The number at the end of the day each successive hour increased exponentially, so that the number at the end of one day was 220. (Number) of bacteria were there after one week
What is 390,000,000
400
What is the initial value of y=2(.94)
What is 2
400
Exponential Growth occurs....
When the rate of value of a function is proportional to the current function and is positive
500
What does t represent in the equation y(t) = A0 (1+r)^t (the exponent)
What is time
500
1880.43
What is 187943% Growth
500
There were 20 rabbits on an island . After six months the number of rabbits had increased to 100 . If the number of rabbits increased exponentially , then how many rabbits will there be at the end of on year ?
What is 500
500
The initial value of y=15(3.5)^x
What is 15
500
(Name) developed the concept of Exponential Growth