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Suppose that you are looking for a student at your college who lives within five miles of you. You know that 55% of the 25,000 students do live within five miles of you. You randomly contact students from the college until one says he or she lives within five miles of you. What is the probability that you need to contact four people?
This is a geometric problem because you may have a number of failures before you have the one success you desire. Also, the probability of a success stays the same each time you ask a student if he or she lives within five miles of you. There is no definite number of trials (number of times you ask a student).
a. Let X = the number of ____________ you must ask ____________ one says yes.
a. Let
X = the number of
students you must ask
until one says yes.
b. What values does X take on?
b. 1, 2, 3, …, (total number of students)
You need to find a store that carries a special printer ink. You know that of the stores that carry printer ink, 10% of them carry the special ink. You randomly call each store until one has the ink you need. What are p and q ?
p = 0.1
q = 0.9
X ~ G ( p )
Read this as " X is a random variable with a geometric distribution ." The parameter is p ; p = the probability of a success for each trial.
Assume that the probability of a defective computer component is 0.02. Components are randomly selected. Find the probability that the first defect is caused by the seventh component tested. How many components do you expect to test until one is found to be defective?
Let X = the number of computer components tested until the first defect is found.
X takes on the values 1, 2, 3, ... where p = 0.02. X ~ G(0.02)
Find P ( x = 7). P ( x = 7) = 0.0177.
To find the probability that x = 7,
To find the probability that x ≤ 7, follow the same instructions EXCEPT select E:geometcdf(as the distribution function.
The probability that the seventh component is the first defect is 0.0177.
The graph of X ~ G(0.02) is:
The y -axis contains the probability of x , where X = the number of computer components tested.
The number of components that you would expect to test until you find the first defective one is the mean, .
The formula for the mean is μ = = = 50
The formula for the variance is σ 2 = = = 2,450
The standard deviation is σ = = = 49.5
The probability of a defective steel rod is 0.01. Steel rods are selected at random. Find the probability that the first defect occurs on the ninth steel rod. Use the TI-83+ or TI-84 calculator to find the answer.
P ( x = 9) = 0.0092
The lifetime risk of developing pancreatic cancer is about one in 78 (1.28%). Let X = the number of people you ask until one says he or she has pancreatic cancer. Then X is a discrete random variable with a geometric distribution: X ~ G or X ~ G (0.0128).
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