Floor X Geometric Random Variable

In order to prove the properties we need to recall the sum of the geometric series.

Floor x geometric random variable.

The relationship is simpler if expressed in terms probability of failure. In the graphs above this formulation is shown on the left. Let x and y be geometric random variables. X g or x g 0.

Cross validated is a question and answer site for people interested in statistics machine learning data analysis data mining and data visualization. Find the conditional probability that x k given x y n. Then x is a discrete random variable with a geometric distribution. Is the floor or greatest integer function.

So this first random variable x is equal to the number of sixes after 12 rolls of a fair die. And what i wanna do is think about what type of random variables they are. If x 1 and x 2 are independent geometric random variables with probability of success p 1 and p 2 respectively then min x 1 x 2 is a geometric random variable with probability of success p p 1 p 2 p 1 p 2. Letting α β in the above expression one obtains μ 1 2 showing that for α β the mean is at the center of the distribution.

On this page we state and then prove four properties of a geometric random variable. Narrator so i have two different random variables here. The expected value mean μ of a beta distribution random variable x with two parameters α and β is a function of only the ratio β α of these parameters. An exercise problem in probability.

Q q 1 q 2. Well this looks pretty much like a binomial random variable. The geometric distribution is a discrete distribution having propabiity begin eqnarray mathrm pr x k p 1 p k 1 k 1 2 cdots end eqnarray where. An alternative formulation is that the geometric random variable x is the total number of trials up to and including the first success and the number of failures is x 1.

Recall the sum of a geometric series is. Also the following limits can. The appropriate formula for this random variable is the second one presented above.