Property | Value |
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Hex Value | $BB1A |
Categories | |
Localizations |
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geometcdf(
Overview
Computes a cumulative probability at x
, the number of the trial on which the first success occurs, for the discrete geometric distribution with the specified probability of success p.
Availability: Token available everywhere.
Syntax
geometcdf(p,x)
Arguments
Name | Type | Optional |
---|---|---|
p | ||
x |
Location
2nd, distr, DISTR
, F:geometcdf(
Description
This command is used to calculate cumulative geometric probability. In plainer language, it solves a specific type of often-encountered probability problem, that occurs under the following conditions:
- A specific event has only two outcomes, which we will call "success" and "failure"
- The event is going to keep happening until a success occurs
- Success or failure is determined randomly with the same probability of success each time the event occurs
- We're interested in the probability that it takes at most a specific amount of trials to get a success.
For example, consider a basketball player that always makes a shot with 1/4 probability. He will keep throwing the ball until he makes a shot. What is the probability that it takes him no more than 4 shots?
- The event here is throwing the ball. A "success", obviously, is making the shot, and a "failure" is missing.
- The event is going to happen until he makes the shot: a success.
- The probability of a success - making a shot - is 1/4
- We're interested in the probability that it takes at most 4 trials to get a success
The syntax here is geometcdf(probability, trials). In this case:
:geometcdf(1/4,4
This will give about .684 when you run it, so there's a .684 probability that he'll make a shot within 4 throws.
Note the relationship between geometpdf( and geometcdf(. Since geometpdf( is the probability it will take exactly N trials, we can write that geometcdf(1/4,4) = geometpdf(1/4,1) + geometpdf(1/4,2) + geometpdf(1/4,3) + geometpdf(1/4,4).
Formulas
Going off of the relationship between geometpdf( and geometcdf(, we can write a formula for geometcdf( in terms of geometpdf(:
(1) \(\begin{align} \texttt{geometcdf}(p,n) = \sum_{i=1}^{n} \texttt{geometpdf}(p,i) = \sum_{i=1}^{n} p\,(1-p)^{i-1} \end{align}
\)
(If you're unfamiliar with sigma notation, \(\sum_{i=1}^{n}\) just means "add up the following for all values of i from 1 to n")
However, we can take a shortcut to arrive at a much simpler expression for geometcdf(. Consider the opposite probability to the one we're interested in, the probability that it will not take "at most N trials", that is, the probability that it will take more than N trials. This means that the first N trials are failures. So geometcdf(p,N) = (1 - "probability that the first N trials are failures"), or:
(2) \(\begin{align} \texttt{geometcdf}(p,n) = 1-(1-p)^n \end{align}
\)
Related Commands
Source: parts of this page were written by the following TI|BD contributors: burr, CloudVariable, DarkerLine, GoVegan, Joe_Young, kg583, Timothy Foster, Weregoose.
History
Calculator | OS Version | Description |
---|---|---|
TI-83 | 0.01013 | Added |