std::geometric_distribution
From cppreference.com
Defined in header <random>
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template< class IntType = int > class geometric_distribution; |
(since C++11) | |
Produces random non-negative integer values i, distributed according to discrete probability function:
- P(i|p) = p · (1 − p)i
The value represents the number of yes/no trials (each succeeding with probability p) which are necessary to obtain a single success.
std::geometric_distribution<>(p)
is exactly equivalent to std::negative_binomial_distribution<>(1, p). It is also the discrete counterpart of std::exponential_distribution.
std::geometric_distribution
satisfies RandomNumberDistribution
Contents |
[edit] Template parameters
IntType | - | The result type generated by the generator. The effect is undefined if this is not one of short, int, long, long long, unsigned short, unsigned int, unsigned long, or unsigned long long.
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[edit] Member types
Member type | Definition |
result_type
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IntType |
param_type
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the type of the parameter set, see RandomNumberDistribution .
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[edit] Member functions
constructs new distribution (public member function) | |
resets the internal state of the distribution (public member function) | |
Generation | |
generates the next random number in the distribution (public member function) | |
Characteristics | |
returns the p distribution parameter (probability of a trial generating true) (public member function) | |
gets or sets the distribution parameter object (public member function) | |
returns the minimum potentially generated value (public member function) | |
returns the maximum potentially generated value (public member function) |
[edit] Non-member functions
compares two distribution objects (function) | |
performs stream input and output on pseudo-random number distribution (function template) |
[edit] Example
geometric_distribution<>(0.5) is the default and represents the number of coin tosses that are required to get heads
Run this code
#include <iostream> #include <iomanip> #include <string> #include <map> #include <random> int main() { std::random_device rd; std::mt19937 gen(rd()); std::geometric_distribution<> d; // same as std::negative_binomial_distribution<> d(1, 0.5); std::map<int, int> hist; for(int n=0; n<10000; ++n) { ++hist[d(gen)]; } for(auto p : hist) { std::cout << p.first << ' ' << std::string(p.second/100, '*') << '\n'; } }
Output:
0 ************************************************* 1 ************************* 2 ************ 3 ****** 4 ** 5 * 6 7 8 9 10 11
[edit] External links
Weisstein, Eric W. "Geometric Distribution." From MathWorld--A Wolfram Web Resource.