carterk/Now batting: randomness. Part 1: The coin toss. Secret

## Now batting: randomness. Part 1: The coin toss.
{
 "metadata": {
  "name": "SportsRankingPartOne"
 },
 "nbformat": 3,
 "nbformat_minor": 0,
 "worksheets": [
  {
   "cells": [
    {
     "cell_type": "code",
     "collapsed": true,
     "input": "import numpy as np\nfrom scipy import stats\nimport matplotlib.pyplot as plt\nimport matplotlib.mlab as mlab\n%pylab inline",
     "language": "python",
     "metadata": {},
     "outputs": {},
     "prompt_number": 237
    },
    {
     "cell_type": "markdown",
     "metadata": {},
     "source": "<h1>Coin toss plots</h1>\n\nThe first plot was generated by just picking samples from a probability distribution for a random process. 30 samples were picked (corresponding to the 30 coins) and the variance was calculated using 162 trials (number of times each coin was flipped).\n\nFor this type of random process:\n\n$ \\sigma^2 = 0.5*0.5/\\#trials $\n\nThe second coin flip plot is just the probability distribution using the same variance.\n\nNote: I'm using a normal approximation for this binomial distribution."
    },
    {
     "cell_type": "code",
     "collapsed": false,
     "input": "#distribution of random process\n\nmean=.5\nstddev=np.sqrt(.5*.5/162)\nsamples=30\ncoinflips=np.random.normal(loc=mean, scale=stddev, size=samples)\n\nplt.plot(coinflips,ones(len(coinflips)),'.',markersize=40, alpha=.4)\nplt.xlim(mean-3.5*stddev,mean+3.5*stddev)\nplt.yticks([])\nplt.xlabel(\"% heads\")\n\nplt.show()",
     "language": "python",
     "metadata": {},
     "outputs": [
      {
       "metadata": {},
       "output_type": "display_data",
       "png": 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       "text": "<matplotlib.figure.Figure at 0x18dbe5f0>"
      }
     ],
     "prompt_number": 254
    },
    {
     "cell_type": "code",
     "collapsed": false,
     "input": "#probability distribution for random process\n\nmean=.5\nstddev=np.sqrt(.5*.5/162) #/162)\nx = np.linspace(mean-4*stddev,mean+4*stddev,100)\nplt.plot(x,mlab.normpdf(x,mean,stddev))\nplt.xlim(mean-3.5*stddev,mean+3.5*stddev)\nplt.xlabel(\"% heads\")\n\nplt.show()",
     "language": "python",
     "metadata": {},
     "outputs": [
      {
       "metadata": {},
       "output_type": "display_data",
       "png": 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qcPWq/GAbN5YfaGiozJn29pZBCFPwF9vxOdv1ArzmotSpI7sDhoXJf+fkSOPv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\nRK5CYII=\n",
       "text": "<matplotlib.figure.Figure at 0x18880610>"
      }
     ],
     "prompt_number": 255
    },
    {
     "cell_type": "markdown",
     "metadata": {},
     "source": "<h1>Baseball wins plot</h1>\n\nThe distribution of winning percentages uses a mean of 50% and a standard deviation of .072 These numbers are from\n\nhttp://www.insidethebook.com/ee/index.php/site/comments/true_talent_levels_for_sports_leagues/"
    },
    {
     "cell_type": "code",
     "collapsed": false,
     "input": "#distribution of baseball winning percentage\n\nmean=.5\nstddev=.072\nx = np.linspace(mean-4*stddev,mean+4*stddev,100)\nplt.plot(x,mlab.normpdf(x,mean,stddev))\nplt.xlim(mean-3.5*stddev,mean+3.5*stddev)\nplt.xlabel(\"% wins\")\n\nplt.show()",
     "language": "python",
     "metadata": {},
     "outputs": [
      {
       "metadata": {},
       "output_type": "display_data",
       "png": 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W4cOHY9asWShfvjzatGmD7t27o0SJEg4Jlp4OXL4MXLggr6Qk4PRpef3xhxTk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\n",
       "text": "<matplotlib.figure.Figure at 0x18880ab0>"
      }
     ],
     "prompt_number": 240
    },
    {
     "cell_type": "markdown",
     "metadata": {},
     "source": "<h1> Both distributions on the same plot </h1>"
    },
    {
     "cell_type": "code",
     "collapsed": false,
     "input": "mean=.5\nstddev=np.sqrt(.5*.5/162)\nx = np.linspace(mean-6*stddev,mean+6*stddev,100)\nplt.plot(x,mlab.normpdf(x,mean,stddev),label=\"random\")\n\nmean=.5\nstddev=.072\nx = np.linspace(mean-4*stddev,mean+4*stddev,100)\nplt.plot(x,mlab.normpdf(x,mean,stddev),label=\"baseball\")\nplt.xlim(mean-3.5*stddev,mean+3.5*stddev)\nplt.yticks([])\n\nplt.legend()\nplt.show()",
     "language": "python",
     "metadata": {},
     "outputs": [
      {
       "metadata": {},
       "output_type": "display_data",
       "png": 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       "text": "<matplotlib.figure.Figure at 0x18deb870>"
      }
     ],
     "prompt_number": 241
    }
   ],
   "metadata": {}
  }
 ]
}