526 lines
18 KiB
C++
526 lines
18 KiB
C++
// Copyright Paul A. Bristow 2007, 2009, 2010
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// Copyright John Maddock 2006
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// Use, modification and distribution are subject to the
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// Boost Software License, Version 1.0.
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// (See accompanying file LICENSE_1_0.txt
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// or copy at http://www.boost.org/LICENSE_1_0.txt)
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// binomial_examples_quiz.cpp
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// Simple example of computing probabilities and quantiles for a binomial random variable
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// representing the correct guesses on a multiple-choice test.
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// source http://www.stat.wvu.edu/SRS/Modules/Binomial/test.html
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//[binomial_quiz_example1
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/*`
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A multiple choice test has four possible answers to each of 16 questions.
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A student guesses the answer to each question,
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so the probability of getting a correct answer on any given question is
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one in four, a quarter, 1/4, 25% or fraction 0.25.
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The conditions of the binomial experiment are assumed to be met:
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n = 16 questions constitute the trials;
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each question results in one of two possible outcomes (correct or incorrect);
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the probability of being correct is 0.25 and is constant if no knowledge about the subject is assumed;
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the questions are answered independently if the student's answer to a question
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in no way influences his/her answer to another question.
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First, we need to be able to use the binomial distribution constructor
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(and some std input/output, of course).
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*/
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#include <boost/math/distributions/binomial.hpp>
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using boost::math::binomial;
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#include <iostream>
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using std::cout; using std::endl;
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using std::ios; using std::flush; using std::left; using std::right; using std::fixed;
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#include <iomanip>
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using std::setw; using std::setprecision;
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#include <exception>
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//][/binomial_quiz_example1]
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int main()
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{
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try
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{
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cout << "Binomial distribution example - guessing in a quiz." << endl;
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//[binomial_quiz_example2
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/*`
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The number of correct answers, X, is distributed as a binomial random variable
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with binomial distribution parameters: questions n and success fraction probability p.
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So we construct a binomial distribution:
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*/
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int questions = 16; // All the questions in the quiz.
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int answers = 4; // Possible answers to each question.
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double success_fraction = 1. / answers; // If a random guess, p = 1/4 = 0.25.
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binomial quiz(questions, success_fraction);
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/*`
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and display the distribution parameters we used thus:
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*/
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cout << "In a quiz with " << quiz.trials()
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<< " questions and with a probability of guessing right of "
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<< quiz.success_fraction() * 100 << " %"
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<< " or 1 in " << static_cast<int>(1. / quiz.success_fraction()) << endl;
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/*`
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Show a few probabilities of just guessing:
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*/
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cout << "Probability of getting none right is " << pdf(quiz, 0) << endl; // 0.010023
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cout << "Probability of getting exactly one right is " << pdf(quiz, 1) << endl;
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cout << "Probability of getting exactly two right is " << pdf(quiz, 2) << endl;
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int pass_score = 11;
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cout << "Probability of getting exactly " << pass_score << " answers right by chance is "
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<< pdf(quiz, pass_score) << endl;
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cout << "Probability of getting all " << questions << " answers right by chance is "
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<< pdf(quiz, questions) << endl;
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/*`
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[pre
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Probability of getting none right is 0.0100226
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Probability of getting exactly one right is 0.0534538
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Probability of getting exactly two right is 0.133635
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Probability of getting exactly 11 right is 0.000247132
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Probability of getting exactly all 16 answers right by chance is 2.32831e-010
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]
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These don't give any encouragement to guessers!
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We can tabulate the 'getting exactly right' ( == ) probabilities thus:
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*/
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cout << "\n" "Guessed Probability" << right << endl;
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for (int successes = 0; successes <= questions; successes++)
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{
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double probability = pdf(quiz, successes);
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cout << setw(2) << successes << " " << probability << endl;
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}
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cout << endl;
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/*`
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[pre
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Guessed Probability
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0 0.0100226
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1 0.0534538
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2 0.133635
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3 0.207876
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4 0.225199
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5 0.180159
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6 0.110097
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7 0.0524273
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8 0.0196602
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9 0.00582526
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10 0.00135923
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11 0.000247132
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12 3.43239e-005
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13 3.5204e-006
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14 2.51457e-007
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15 1.11759e-008
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16 2.32831e-010
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]
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Then we can add the probabilities of some 'exactly right' like this:
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*/
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cout << "Probability of getting none or one right is " << pdf(quiz, 0) + pdf(quiz, 1) << endl;
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/*`
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[pre
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Probability of getting none or one right is 0.0634764
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]
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But if more than a couple of scores are involved, it is more convenient (and may be more accurate)
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to use the Cumulative Distribution Function (cdf) instead:
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*/
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cout << "Probability of getting none or one right is " << cdf(quiz, 1) << endl;
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/*`
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[pre
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Probability of getting none or one right is 0.0634764
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]
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Since the cdf is inclusive, we can get the probability of getting up to 10 right ( <= )
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*/
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cout << "Probability of getting <= 10 right (to fail) is " << cdf(quiz, 10) << endl;
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/*`
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[pre
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Probability of getting <= 10 right (to fail) is 0.999715
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]
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To get the probability of getting 11 or more right (to pass),
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it is tempting to use ``1 - cdf(quiz, 10)`` to get the probability of > 10
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*/
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cout << "Probability of getting > 10 right (to pass) is " << 1 - cdf(quiz, 10) << endl;
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/*`
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[pre
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Probability of getting > 10 right (to pass) is 0.000285239
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]
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But this should be resisted in favor of using the __complements function (see __why_complements).
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*/
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cout << "Probability of getting > 10 right (to pass) is " << cdf(complement(quiz, 10)) << endl;
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/*`
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[pre
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Probability of getting > 10 right (to pass) is 0.000285239
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]
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And we can check that these two, <= 10 and > 10, add up to unity.
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*/
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BOOST_ASSERT((cdf(quiz, 10) + cdf(complement(quiz, 10))) == 1.);
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/*`
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If we want a < rather than a <= test, because the CDF is inclusive, we must subtract one from the score.
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*/
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cout << "Probability of getting less than " << pass_score
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<< " (< " << pass_score << ") answers right by guessing is "
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<< cdf(quiz, pass_score -1) << endl;
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/*`
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[pre
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Probability of getting less than 11 (< 11) answers right by guessing is 0.999715
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]
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and similarly to get a >= rather than a > test
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we also need to subtract one from the score (and can again check the sum is unity).
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This is because if the cdf is /inclusive/,
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then its complement must be /exclusive/ otherwise there would be one possible
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outcome counted twice!
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*/
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cout << "Probability of getting at least " << pass_score
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<< "(>= " << pass_score << ") answers right by guessing is "
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<< cdf(complement(quiz, pass_score-1))
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<< ", only 1 in " << 1/cdf(complement(quiz, pass_score-1)) << endl;
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BOOST_ASSERT((cdf(quiz, pass_score -1) + cdf(complement(quiz, pass_score-1))) == 1);
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/*`
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[pre
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Probability of getting at least 11 (>= 11) answers right by guessing is 0.000285239, only 1 in 3505.83
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]
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Finally we can tabulate some probabilities:
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*/
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cout << "\n" "At most (<=)""\n""Guessed OK Probability" << right << endl;
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for (int score = 0; score <= questions; score++)
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{
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cout << setw(2) << score << " " << setprecision(10)
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<< cdf(quiz, score) << endl;
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}
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cout << endl;
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/*`
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[pre
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At most (<=)
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Guessed OK Probability
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0 0.01002259576
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1 0.0634764398
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2 0.1971110499
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3 0.4049871101
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4 0.6301861752
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5 0.8103454274
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6 0.9204427481
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7 0.9728700437
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8 0.9925302796
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9 0.9983555346
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10 0.9997147608
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11 0.9999618928
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12 0.9999962167
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13 0.9999997371
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14 0.9999999886
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15 0.9999999998
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16 1
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]
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*/
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cout << "\n" "At least (>)""\n""Guessed OK Probability" << right << endl;
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for (int score = 0; score <= questions; score++)
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{
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cout << setw(2) << score << " " << setprecision(10)
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<< cdf(complement(quiz, score)) << endl;
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}
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/*`
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[pre
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At least (>)
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Guessed OK Probability
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0 0.9899774042
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1 0.9365235602
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2 0.8028889501
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3 0.5950128899
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4 0.3698138248
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5 0.1896545726
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6 0.07955725188
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7 0.02712995629
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8 0.00746972044
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9 0.001644465374
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10 0.0002852391917
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11 3.810715862e-005
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12 3.783265129e-006
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13 2.628657967e-007
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14 1.140870154e-008
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15 2.328306437e-010
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16 0
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]
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We now consider the probabilities of *ranges* of correct guesses.
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First, calculate the probability of getting a range of guesses right,
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by adding the exact probabilities of each from low ... high.
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*/
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int low = 3; // Getting at least 3 right.
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int high = 5; // Getting as most 5 right.
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double sum = 0.;
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for (int i = low; i <= high; i++)
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{
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sum += pdf(quiz, i);
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}
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cout.precision(4);
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cout << "Probability of getting between "
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<< low << " and " << high << " answers right by guessing is "
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<< sum << endl; // 0.61323
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/*`
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[pre
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Probability of getting between 3 and 5 answers right by guessing is 0.6132
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]
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Or, usually better, we can use the difference of cdfs instead:
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*/
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cout << "Probability of getting between " << low << " and " << high << " answers right by guessing is "
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<< cdf(quiz, high) - cdf(quiz, low - 1) << endl; // 0.61323
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/*`
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[pre
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Probability of getting between 3 and 5 answers right by guessing is 0.6132
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]
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And we can also try a few more combinations of high and low choices:
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*/
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low = 1; high = 6;
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cout << "Probability of getting between " << low << " and " << high << " answers right by guessing is "
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<< cdf(quiz, high) - cdf(quiz, low - 1) << endl; // 1 and 6 P= 0.91042
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low = 1; high = 8;
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cout << "Probability of getting between " << low << " and " << high << " answers right by guessing is "
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<< cdf(quiz, high) - cdf(quiz, low - 1) << endl; // 1 <= x 8 P = 0.9825
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low = 4; high = 4;
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cout << "Probability of getting between " << low << " and " << high << " answers right by guessing is "
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<< cdf(quiz, high) - cdf(quiz, low - 1) << endl; // 4 <= x 4 P = 0.22520
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/*`
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[pre
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Probability of getting between 1 and 6 answers right by guessing is 0.9104
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Probability of getting between 1 and 8 answers right by guessing is 0.9825
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Probability of getting between 4 and 4 answers right by guessing is 0.2252
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]
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[h4 Using Binomial distribution moments]
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Using moments of the distribution, we can say more about the spread of results from guessing.
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*/
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cout << "By guessing, on average, one can expect to get " << mean(quiz) << " correct answers." << endl;
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cout << "Standard deviation is " << standard_deviation(quiz) << endl;
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cout << "So about 2/3 will lie within 1 standard deviation and get between "
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<< ceil(mean(quiz) - standard_deviation(quiz)) << " and "
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<< floor(mean(quiz) + standard_deviation(quiz)) << " correct." << endl;
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cout << "Mode (the most frequent) is " << mode(quiz) << endl;
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cout << "Skewness is " << skewness(quiz) << endl;
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/*`
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[pre
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By guessing, on average, one can expect to get 4 correct answers.
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Standard deviation is 1.732
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So about 2/3 will lie within 1 standard deviation and get between 3 and 5 correct.
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Mode (the most frequent) is 4
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Skewness is 0.2887
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]
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[h4 Quantiles]
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The quantiles (percentiles or percentage points) for a few probability levels:
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*/
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cout << "Quartiles " << quantile(quiz, 0.25) << " to "
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<< quantile(complement(quiz, 0.25)) << endl; // Quartiles
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cout << "1 standard deviation " << quantile(quiz, 0.33) << " to "
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<< quantile(quiz, 0.67) << endl; // 1 sd
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cout << "Deciles " << quantile(quiz, 0.1) << " to "
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<< quantile(complement(quiz, 0.1))<< endl; // Deciles
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cout << "5 to 95% " << quantile(quiz, 0.05) << " to "
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<< quantile(complement(quiz, 0.05))<< endl; // 5 to 95%
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cout << "2.5 to 97.5% " << quantile(quiz, 0.025) << " to "
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<< quantile(complement(quiz, 0.025)) << endl; // 2.5 to 97.5%
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cout << "2 to 98% " << quantile(quiz, 0.02) << " to "
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<< quantile(complement(quiz, 0.02)) << endl; // 2 to 98%
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cout << "If guessing then percentiles 1 to 99% will get " << quantile(quiz, 0.01)
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<< " to " << quantile(complement(quiz, 0.01)) << " right." << endl;
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/*`
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Notice that these output integral values because the default policy is `integer_round_outwards`.
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[pre
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Quartiles 2 to 5
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1 standard deviation 2 to 5
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Deciles 1 to 6
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5 to 95% 0 to 7
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2.5 to 97.5% 0 to 8
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2 to 98% 0 to 8
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]
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*/
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//] [/binomial_quiz_example2]
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//[discrete_quantile_real
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/*`
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Quantiles values are controlled by the __understand_dis_quant quantile policy chosen.
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The default is `integer_round_outwards`,
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so the lower quantile is rounded down, and the upper quantile is rounded up.
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But we might believe that the real values tell us a little more - see __math_discrete.
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We could control the policy for *all* distributions by
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#define BOOST_MATH_DISCRETE_QUANTILE_POLICY real
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at the head of the program would make this policy apply
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to this *one, and only*, translation unit.
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Or we can now create a (typedef for) policy that has discrete quantiles real
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(here avoiding any 'using namespaces ...' statements):
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*/
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using boost::math::policies::policy;
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using boost::math::policies::discrete_quantile;
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using boost::math::policies::real;
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using boost::math::policies::integer_round_outwards; // Default.
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typedef boost::math::policies::policy<discrete_quantile<real> > real_quantile_policy;
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/*`
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Add a custom binomial distribution called ``real_quantile_binomial`` that uses ``real_quantile_policy``
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*/
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using boost::math::binomial_distribution;
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typedef binomial_distribution<double, real_quantile_policy> real_quantile_binomial;
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/*`
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Construct an object of this custom distribution:
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*/
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real_quantile_binomial quiz_real(questions, success_fraction);
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/*`
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And use this to show some quantiles - that now have real rather than integer values.
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*/
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cout << "Quartiles " << quantile(quiz, 0.25) << " to "
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<< quantile(complement(quiz_real, 0.25)) << endl; // Quartiles 2 to 4.6212
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cout << "1 standard deviation " << quantile(quiz_real, 0.33) << " to "
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<< quantile(quiz_real, 0.67) << endl; // 1 sd 2.6654 4.194
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cout << "Deciles " << quantile(quiz_real, 0.1) << " to "
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<< quantile(complement(quiz_real, 0.1))<< endl; // Deciles 1.3487 5.7583
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cout << "5 to 95% " << quantile(quiz_real, 0.05) << " to "
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<< quantile(complement(quiz_real, 0.05))<< endl; // 5 to 95% 0.83739 6.4559
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cout << "2.5 to 97.5% " << quantile(quiz_real, 0.025) << " to "
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<< quantile(complement(quiz_real, 0.025)) << endl; // 2.5 to 97.5% 0.42806 7.0688
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cout << "2 to 98% " << quantile(quiz_real, 0.02) << " to "
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<< quantile(complement(quiz_real, 0.02)) << endl; // 2 to 98% 0.31311 7.7880
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cout << "If guessing, then percentiles 1 to 99% will get " << quantile(quiz_real, 0.01)
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<< " to " << quantile(complement(quiz_real, 0.01)) << " right." << endl;
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/*`
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[pre
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Real Quantiles
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Quartiles 2 to 4.621
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1 standard deviation 2.665 to 4.194
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Deciles 1.349 to 5.758
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5 to 95% 0.8374 to 6.456
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2.5 to 97.5% 0.4281 to 7.069
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2 to 98% 0.3131 to 7.252
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If guessing then percentiles 1 to 99% will get 0 to 7.788 right.
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]
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*/
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//] [/discrete_quantile_real]
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}
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catch(const std::exception& e)
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{ // Always useful to include try & catch blocks because
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// default policies are to throw exceptions on arguments that cause
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// errors like underflow, overflow.
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// Lacking try & catch blocks, the program will abort without a message below,
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// which may give some helpful clues as to the cause of the exception.
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std::cout <<
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"\n""Message from thrown exception was:\n " << e.what() << std::endl;
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}
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return 0;
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} // int main()
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/*
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Output is:
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BAutorun "i:\boost-06-05-03-1300\libs\math\test\Math_test\debug\binomial_quiz_example.exe"
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Binomial distribution example - guessing in a quiz.
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In a quiz with 16 questions and with a probability of guessing right of 25 % or 1 in 4
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Probability of getting none right is 0.0100226
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Probability of getting exactly one right is 0.0534538
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Probability of getting exactly two right is 0.133635
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Probability of getting exactly 11 answers right by chance is 0.000247132
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Probability of getting all 16 answers right by chance is 2.32831e-010
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Guessed Probability
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0 0.0100226
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1 0.0534538
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2 0.133635
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3 0.207876
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4 0.225199
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5 0.180159
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6 0.110097
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7 0.0524273
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8 0.0196602
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9 0.00582526
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10 0.00135923
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11 0.000247132
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12 3.43239e-005
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13 3.5204e-006
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14 2.51457e-007
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15 1.11759e-008
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16 2.32831e-010
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Probability of getting none or one right is 0.0634764
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Probability of getting none or one right is 0.0634764
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Probability of getting <= 10 right (to fail) is 0.999715
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Probability of getting > 10 right (to pass) is 0.000285239
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Probability of getting > 10 right (to pass) is 0.000285239
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Probability of getting less than 11 (< 11) answers right by guessing is 0.999715
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Probability of getting at least 11(>= 11) answers right by guessing is 0.000285239, only 1 in 3505.83
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At most (<=)
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Guessed OK Probability
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0 0.01002259576
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1 0.0634764398
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2 0.1971110499
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3 0.4049871101
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4 0.6301861752
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|
5 0.8103454274
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|
6 0.9204427481
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|
7 0.9728700437
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|
8 0.9925302796
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|
9 0.9983555346
|
|
10 0.9997147608
|
|
11 0.9999618928
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|
12 0.9999962167
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|
13 0.9999997371
|
|
14 0.9999999886
|
|
15 0.9999999998
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|
16 1
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At least (>)
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|
Guessed OK Probability
|
|
0 0.9899774042
|
|
1 0.9365235602
|
|
2 0.8028889501
|
|
3 0.5950128899
|
|
4 0.3698138248
|
|
5 0.1896545726
|
|
6 0.07955725188
|
|
7 0.02712995629
|
|
8 0.00746972044
|
|
9 0.001644465374
|
|
10 0.0002852391917
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|
11 3.810715862e-005
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|
12 3.783265129e-006
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|
13 2.628657967e-007
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|
14 1.140870154e-008
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|
15 2.328306437e-010
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|
16 0
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Probability of getting between 3 and 5 answers right by guessing is 0.6132
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Probability of getting between 3 and 5 answers right by guessing is 0.6132
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Probability of getting between 1 and 6 answers right by guessing is 0.9104
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Probability of getting between 1 and 8 answers right by guessing is 0.9825
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Probability of getting between 4 and 4 answers right by guessing is 0.2252
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By guessing, on average, one can expect to get 4 correct answers.
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Standard deviation is 1.732
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So about 2/3 will lie within 1 standard deviation and get between 3 and 5 correct.
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Mode (the most frequent) is 4
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|
Skewness is 0.2887
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|
Quartiles 2 to 5
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1 standard deviation 2 to 5
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|
Deciles 1 to 6
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|
5 to 95% 0 to 7
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|
2.5 to 97.5% 0 to 8
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2 to 98% 0 to 8
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If guessing then percentiles 1 to 99% will get 0 to 8 right.
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|
Quartiles 2 to 4.621
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|
1 standard deviation 2.665 to 4.194
|
|
Deciles 1.349 to 5.758
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|
5 to 95% 0.8374 to 6.456
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|
2.5 to 97.5% 0.4281 to 7.069
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|
2 to 98% 0.3131 to 7.252
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|
If guessing, then percentiles 1 to 99% will get 0 to 7.788 right.
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*/
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