{
 "cells": [
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Распределения выборочного среднего для норм. распр. и Коши"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 1,
   "metadata": {},
   "outputs": [],
   "source": [
    "import numpy as np\n",
    "import scipy.stats as sps\n",
    "import matplotlib.pyplot as plt\n",
    "%matplotlib inline\n",
    "\n",
    "red = '#FF3300'\n",
    "blue = '#0099CC'\n",
    "green = '#00CC66'"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Построим плотность стандартного нормального распределения и стандартного распределения Коши. Видим, что распределение Коши обладает более тяжелыми хвостами, нежели нормальное."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 720x360 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "grid = np.linspace(-7, 7, 1000)\n",
    "\n",
    "plt.figure(figsize=(10, 5))\n",
    "plt.plot(grid, sps.cauchy.pdf(grid), color=red, label='Коши', lw=3)\n",
    "plt.plot(grid, sps.norm.pdf(grid), color=blue, \n",
    "         label='$\\mathcal{N}(0, 1)$', lw=3)\n",
    "plt.xticks(fontsize=16), plt.yticks(fontsize=16)\n",
    "plt.title('Плотности распределений', fontsize=16)\n",
    "plt.legend(fontsize=16)\n",
    "plt.grid(ls=':')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Сгенерируем $10^5$ выборок размера 30 из стандартного нормального распределения"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "metadata": {},
   "outputs": [],
   "source": [
    "size = 30\n",
    "count = 10 ** 5\n",
    "sample = sps.norm.rvs(size=(count, size))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "По каждой выборке из 30 элементов посчитаем выборочное средние. Далее по ним построим гистограмму и построим плотность стандартного нормального распределения. Как видим, в подтверждении теории распределение выборочного среднего имеет меньшую дисперсию."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 4,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 720x360 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "grid = np.linspace(-3, 3, 1000)\n",
    "\n",
    "plt.figure(figsize=(10, 5))\n",
    "plt.hist(sample.mean(axis=1), bins=50, density=True, alpha=0.7, \n",
    "         color=blue, label='распр. $\\overline{X}$')\n",
    "plt.plot(grid, sps.norm.pdf(grid), color=green, lw=3,\n",
    "         label='$\\mathcal{N}(0, 1)$')\n",
    "plt.xticks(fontsize=16), plt.yticks(fontsize=16)\n",
    "plt.title('Изменение плотности при усреднении для норм. распределения', \n",
    "          fontsize=16)\n",
    "plt.legend(fontsize=16)\n",
    "plt.grid(ls=':')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Сгенерируем $10^5$ выборок размера 30 из стандартного распределения Коши"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 5,
   "metadata": {},
   "outputs": [],
   "source": [
    "size = 30\n",
    "count = 10 ** 5\n",
    "sample = sps.cauchy.rvs(size=(count, size))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Построим аналогичный график. В этом случае распределение выборочного среднего не отличается от распределения одного элемента выборки."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 6,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 720x360 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "grid = np.linspace(-10, 10, 1000)\n",
    "\n",
    "plt.figure(figsize=(10, 5))\n",
    "plt.hist(sample.mean(axis=1), bins=50, density=True, alpha=0.7, \n",
    "         color=green, label='распр. $\\overline{X}$', range=(-10, 10))\n",
    "plt.plot(grid, sps.cauchy.pdf(grid), color=red, lw=3,\n",
    "         label='Коши')\n",
    "plt.xticks(fontsize=16), plt.yticks(fontsize=16)\n",
    "plt.title('Изменение плотности при усреднении для распределения Коши', \n",
    "          fontsize=16)\n",
    "plt.legend(fontsize=16)\n",
    "plt.grid(ls=':')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "-----\n",
    "\n",
    "Статистика, прикладной поток 2019\n",
    "\n",
    "https://mipt-stats.gitlab.io/"
   ]
  }
 ],
 "metadata": {
  "kernelspec": {
   "display_name": "Python 3",
   "language": "python",
   "name": "python3"
  },
  "language_info": {
   "codemirror_mode": {
    "name": "ipython",
    "version": 3
   },
   "file_extension": ".py",
   "mimetype": "text/x-python",
   "name": "python",
   "nbconvert_exporter": "python",
   "pygments_lexer": "ipython3",
   "version": "3.7.3"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 2
}