In this module the student will explore the properties of data with an exponential distribution.
Student learning outcomes
The student will analyze data following the exponential distribution.
Given
Carbon-14 is a radioactive element with a half-life of about 5730 years.
Carbon-14 is said to decay exponentially. The decay rate is 0.000121 . We start with 1 gram of carbon-14. We are interested in the time (years) it takes to decay carbon-14.
Describe the data
What is being measured here?
Are the data discrete or continuous?
Continuous
In words, define the Random Variable
.
= Time (years) to decay carbon-14
What is the decay rate (
)?
= 0.000121
The distribution for
is:
~ Exp(0.000121)
Probability
Find the amount (percent of 1 gram) of carbon-14 lasting less than 5730 years. This means, find
.
Sketch the graph. Shade the area of interest.
Find the probability.
=
= 0.5001
Find the percentage of carbon-14 lasting longer than 10,000 years.
Sketch the graph. Shade the area of interest.
Find the probability.
=
= 0.2982
Thirty percent (30%) of carbon-14 will decay within how many years?