{
 "cells": [
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Chapter 10: Inequalities and limit theorems\n",
    " \n",
    "This Jupyter notebook is the Python equivalent of the R code in section 10.6 R, pp. 447 - 450, [Introduction to Probability, 1st Edition](https://www.crcpress.com/Introduction-to-Probability/Blitzstein-Hwang/p/book/9781466575578), Blitzstein & Hwang.\n",
    "\n",
    "----"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 1,
   "metadata": {},
   "outputs": [],
   "source": [
    "import matplotlib.pyplot as plt\n",
    "import numpy as np\n",
    "\n",
    "%matplotlib inline"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Jensen's inequality\n",
    "\n",
    "Python/NumPy/SciPy make it easy to compare the expectations of $X$ and $g(X)$ for a given choice of $g$, and this allows us to verify some special cases of Jensen's inequality. For example, suppose we simulate 10<sup>4</sup> times from the $Expo(1)$ distribution:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {},
   "outputs": [],
   "source": [
    "np.random.seed(24157817)\n",
    "\n",
    "from scipy.stats import expon\n",
    "\n",
    "x = expon.rvs(size=10**4)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "According to Jensen's inequality, $\\mathbb{E}(log \\, X) \\leq log \\, \\mathbb{E} \\, X$. The former can be approximated by `numpy.mean(numpy.log(x))` and the latter can be approximated by `numpy.log(numpy.mean(x))`, so compute both"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "numpy.mean(numpy.log(x)) = -0.5600958563379892\n",
      "numpy.log(numpy.mean(x)) = 0.00800014338803644\n"
     ]
    }
   ],
   "source": [
    "meanlog = np.mean(np.log(x))\n",
    "print('numpy.mean(numpy.log(x)) = {}'.format(meanlog))\n",
    "\n",
    "logmean = np.log(np.mean(x))\n",
    "print('numpy.log(numpy.mean(x)) = {}'.format(logmean))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "For the $Expo(1)$ distribution, we find that `numpy.mean(numpy.log(x))` is approximately −0.56 (the true value is around −0.577), while `numpy.log(numpy.mean(x))` is approximately 0 (the true value is 0). This indeed suggests $\\mathbb{E}(log \\, X) \\leq log \\, \\mathbb{E} \\, X$. We could also compare `numpy.mean(x**3)` to `numpy.mean(x)**3`, or `numpy.mean(numpy.sqrt(x))` to `numpy.sqrt(numpy.mean(x))` - the possibilities are endless."
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Visualization of the law of large numbers\n",
    "\n",
    "To plot the running proportion of Heads in a sequence of independent fair coin tosses, we first generate the coin tosses themselves:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 4,
   "metadata": {},
   "outputs": [],
   "source": [
    "np.random.seed(39088169)\n",
    "\n",
    "from scipy.stats import binom\n",
    "\n",
    "nsim = 300\n",
    "p = 1/2\n",
    "x = binom.rvs(1, p, size=nsim)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Then we compute $\\bar{X}_n$ for each value of $n$ and store the results in `xbar`:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 5,
   "metadata": {},
   "outputs": [],
   "source": [
    "# divide by sequence from 1 to nsim, inclusive\n",
    "xbar = np.cumsum(x) / np.arange(1, nsim+1)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "The above line of code performs element-wise division of the two arrays `numpy.cumsum(x)` and `np.arange(1, nsim+1)`. Finally, we plot `xbar` against the number of coin tosses:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 6,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 864x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "x = np.arange(1, nsim+1)\n",
    "y = xbar\n",
    "\n",
    "plt.figure(figsize=(12, 4))\n",
    "\n",
    "plt.plot(x, y, '-', label=r'$\\bar{x}$')\n",
    "plt.hlines(p, 0, nsim, \n",
    "           linestyle='dotted', lw=1.1, alpha=0.5, label=r'$p={}$'.format(p))\n",
    "\n",
    "plt.xlim([0.0, nsim])\n",
    "plt.xlabel(r'$n$: number of coin tosses')\n",
    "plt.yticks([0.0, 0.5, 1.0])\n",
    "plt.ylabel(r'$\\bar{x}_{n}$: proportion of H to $n$')\n",
    "plt.title('Visualizing the Law of Large Numbers')\n",
    "\n",
    "plt.legend()\n",
    "\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "You should see that the values of `xbar` approach `p`, by the law of large numbers."
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Monte Carlo estimate of $\\pi$\n",
    "\n",
    "A famous example of Monte Carlo integration is the Monte Carlo estimate of $\\pi$. The unit disk ${(x, y): x^2 +y^2 ≤ 1}$ is inscribed in the square $[−1, 1] \\times [−1, 1]$, which has area 4. If we generate a large number of points that are Uniform on the square, the proportion of points falling inside the disk is approximately equal to the ratio of the disk's area to the square’s area, which is $\\pi/4$. Thus, to estimate $\\pi$ we can take the proportion of points inside the circle and multiply by 4.\n",
    "\n",
    "In `matplotlib.pyplot`, to generate Uniform points on the 2D square, we can independently generate the $x$-coordinate and the $y$-coordinate as $Unif(−1, 1)$ r.v.s, using the results of Example 7.1.22:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 7,
   "metadata": {},
   "outputs": [],
   "source": [
    "np.random.seed(63245986)\n",
    "\n",
    "from scipy.stats import uniform\n",
    "\n",
    "nsim = 10**6\n",
    "a = -1\n",
    "b = 1\n",
    "\n",
    "x = uniform.rvs(loc=a, scale=b-a, size=nsim)\n",
    "y = uniform.rvs(loc=a, scale=b-a, size=nsim)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Let's try graphing a small portion of those $x$- and $y$-coordinates."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 8,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 576x576 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "inside = x**2 + y**2 < 1.0\n",
    "outside = ~inside\n",
    "\n",
    "_, ax = plt.subplots(figsize=(8,8))\n",
    "\n",
    "# we'll graph the first n co-ordinate pairs\n",
    "# for points inside and points outside of \n",
    "# x**2 + y**2 = 1.0\n",
    "n = 5000\n",
    "\n",
    "ax.plot(x[inside][0:n], y[inside][0:n], '.', color='#fc8d59')\n",
    "ax.plot(x[outside][0:n], y[outside][0:n], '.', color='#91bfdb')\n",
    "\n",
    "ax.set_xlim([-1.0, 1.0])\n",
    "ax.set_xlabel('x')\n",
    "ax.set_ylim([-1.0, 1.0])\n",
    "ax.set_ylabel('y')\n",
    "\n",
    "ax.set_title(r'Monte Carlo estimate of $\\pi$: {} / {} points'.format(n, nsim))\n",
    "\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "To count the number of points _in_ the disk, we use `numpy.sum(x**2 + y**2 < 1.0)`. The array `x**2 + y**2 < 1.0` is effectively an indicator vector whose i<sup>th</sup> element is `True` (equivalent to 1) if the i<sup>th</sup> point falls _inside_ the disk, and `False` (equivalent to 0) otherwise, so the sum of the boolean elements is the number of points in the disk. To get our estimate of $\\pi$, we convert the sum into a proportion and multiply by 4. Altogether, we have"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 9,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "estimated value for pi: 3.143172\n"
     ]
    }
   ],
   "source": [
    "num_points_inside = np.sum(x**2 + y**2 < 1.0)\n",
    "est_pi = 4.0 * num_points_inside / nsim\n",
    "\n",
    "print('estimated value for pi: {}'.format(est_pi))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "How close was your estimate to the actual value of $\\pi$?"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Visualizations of the central limit theorem\n",
    "\n",
    "One way to visualize the central limit theorem for a distribution of interest is to plot the distribution of $\\bar{X}_{n}$ for various values of $n$, as in Figure 10.5. To do this, we first have to generate i.i.d. $X_{1}, \\, \\ldots, \\, X_{n}$ a bunch of times from our distribution of interest. For example, suppose that our distribution of interest is $Unif(0, 1)$, and we are interested in the distribution of $\\bar{X}_{12}$, i.e., we set $n = 12$. In the following code, we create a matrix of i.i.d. standard Uniforms. The matrix has 12 columns, corresponding to $X_{1}$ through $X_{12}$. Each row of the matrix is a different realization of $X_{1}$ through $X_{12}$."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 10,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "matrix x has shape: (10000, 12)\n"
     ]
    }
   ],
   "source": [
    "np.random.seed(102334155)\n",
    "\n",
    "nsim = 10**4\n",
    "n = 12\n",
    "\n",
    "x = uniform.rvs(size=n*nsim).reshape((nsim, n))\n",
    "\n",
    "print('matrix x has shape: {}'.format(x.shape))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Now, to obtain realizations of $\\bar{X}_{12}$, we simply take the average of each row of the matrix `x`; we can do this by calling the [`numpy.ndarray.mean`](https://docs.scipy.org/doc/numpy/reference/generated/numpy.ndarray.mean.html) method on `numpy.array` object `x`, specifying `axis=1` to take the average of each row of matrix `x`:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 11,
   "metadata": {},
   "outputs": [],
   "source": [
    "xbar = x.mean(axis=1)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Finally, we create a histogram:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 12,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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AC9vu5wIHAauAO4CXAlTVzUneBnyt7ffWqpq84EGSJGlOGFpwq6rDNrBr3z59Czh6A+9zCnDKDJYmSZLUSbNlcYIkSZKmYXCTJEnqCIObJElSRxjcJEmSOsLgJkmS1BEGN0mSpI4wuEmSJHWEwU2SJKkjDG6SJEkdYXCTJEnqiIGCW5InDrsQSZIkTW3Qe5W+P8nmwKnAR6rq1uGVJEkatkXLzxnJcVYff/BIjiPNFQPNuFXV7wIvBhYCK5N8JMl+Q61MkiRJ9zHwNW5VdTXwZuBY4BnAiUm+k+QPhlWcJEmSfm3Qa9x2T3ICcCXwbOB5VfWE9vkJQ6xPkiRJrUGvcXsP8EHgjVV150RjVa1N8uahVCZJkqT7GDS4HQTcWVX3AiR5EPCQqrqjqj40tOokSZL0K4Ne4/Y54KE921u2bZIkSRqRQYPbQ6rqZxMb7fMth1OSJEmS+hk0uN2eZK+JjSRPBu6cor8kSZJm2KDXuL0G+HiSte32jsAfD6ckSZIk9TNQcKuqryX5LWBXIMB3quoXG3vQJH8BvAwo4HLgpTRh8ExgO+AbwEuq6u4kWwCnA08Gfgz8cVWt3thjS5IkddX9ucn8U4DdgT2Bw5IcvjEHTLIAeDWwpKqeCGwGvAh4B3BCVS0GbgGOal9yFHBLVf0mzXfGvWNjjitJktR1g34B74eAdwK/SxPgngIs2YTjzgMemmQezSKH62m+zPesdv9pwKHt80Pabdr9+ybJJhxbkiSpkwa9xm0JsFtV1aYesKp+mOSdwLU0Cxz+A/g6cGtV3dN2WwMsaJ8vAK5rX3tPktuARwI39b5vkmXAMoCdd955U8uUJEmadQY9Vfot4NEzccAk29LMou0C/AawFXBgn64TIbHf7Np6AbKqTqqqJVW1ZP78+TNRqiRJ0qwy6Izb9sAVSb4K3DXRWFVLN+KYzwG+X1XrAJJ8AvgfwDZJ5rWzbjsBEytY1wALgTXtqdVHADdvxHElSZI6bdDg9pYZPOa1wD5JtqQ5VbovsBL4AvCHNCtLjwDObvuvaLe/0u7//EycspUkSeqaQb8O5ItJHgMsrqrPtaFrs405YFVdnOQsmq/8uAe4BDgJOAc4M8nb27aT25ecDHwoySqambYXbcxxJUmSum6g4Jbk5TQX/m8HPI5mwcD7aWbL7reqOg44blLzNcDeffr+HHjhxhxHkiTpgWTQxQlHA08HfgJQVVcDOwyrKEmSJK1v0OB2V1XdPbHRLhLwOjNJkqQRGjS4fTHJG2m+NHc/4OPAp4dXliRJkiYbNLgtB9bR3Ff0T4FzgTcPqyhJkiStb9BVpb8EPtg+JEmSNAaDrir9Pv3vVvDYGa9IkiRJfd2fe5VOeAjN13NsN/PlSJqwaPk54y5BkjTLDHSNW1X9uOfxw6p6N/DsIdcmSZKkHoOeKt2rZ/NBNDNwWw+lIkmSJPU16KnSd/U8vwdYDfzRjFcjSZKkDRp0Vemzhl2IJEmSpjboqdLXTrW/qv5hZsqRJEnShtyfVaVPAVa0288DvgRcN4yiJEmStL5Bg9v2wF5V9VOAJG8BPl5VLxtWYZIkSbqvQW95tTNwd8/23cCiGa9GkiRJGzTojNuHgK8m+STNHRSeD5w+tKokSZK0nkFXlf51ks8Cv9c2vbSqLhleWZIkSZps0FOlAFsCP6mqfwTWJNllSDVJkiSpj4GCW5LjgGOBN7RNDwb+dVhFSZIkaX2Dzrg9H1gK3A5QVWvxlleSJEkjNWhwu7uqimZhAkm22pSDJtkmyVlJvpPkyiRPS7JdkvOTXN3+3LbtmyQnJlmV5LJJ902VJEmaMwYNbh9L8gFgmyQvBz4HfHATjvuPwL9X1W8BewBXAsuBC6pqMXBBuw1wILC4fSwD3rcJx5UkSeqsQVeVvjPJfsBPgF2B/1tV52/MAZM8HPifwJHte98N3J3kEOCZbbfTgAtprqs7BDi9nfG7qJ2t27Gqrt+Y40uSJHXVtMEtyWbAeVX1HGCjwtokjwXWAf+SZA/g68CfA4+aCGNVdX2SHdr+C7jvrbXWtG0GN0mSNKdMe6q0qu4F7kjyiBk65jxgL+B9VbUnzYKH5VP0T7+y1uuULEuyMsnKdevWzUylkiRJs8igd074OXB5kvNpV5YCVNWrN+KYa4A1VXVxu30WTXC7YeIUaJIdgRt7+i/sef1OwNrJb1pVJwEnASxZsmS9YCdJktR1gwa3c9rHJquqHyW5LsmuVXUVsC9wRfs4Aji+/Xl2+5IVwDFJzgSeCtzm9W2SJGkumjK4Jdm5qq6tqtNm+LivAj6cZHPgGuClNKdtP5bkKOBa4IVt33OBg4BVwB1tX0lSByxaPiP/55/S6uMPHvoxpNliuhm3T9Fcj0aSf6uqF8zEQavqUmBJn1379ulbwNEzcVxJkqQum25xQu/CgMcOsxBJkiRNbbrgVht4LkmSpBGb7lTpHkl+QjPz9tD2Oe12VdXDh1qdJEmSfmXK4FZVm42qEEmSJE1t0HuVSpIkacwMbpIkSR1hcJMkSeoIg5skSVJHGNwkSZI6wuAmSZLUEQY3SZKkjjC4SZIkdYTBTZIkqSMMbpIkSR1hcJMkSeoIg5skSVJHGNwkSZI6wuAmSZLUEfPGXYDURYuWnzPuEiRJc5AzbpIkSR1hcJMkSeqIsQW3JJsluSTJZ9rtXZJcnOTqJB9NsnnbvkW7vardv2hcNUuSJI3TOGfc/hy4smf7HcAJVbUYuAU4qm0/Crilqn4TOKHtJ0mSNOeMJbgl2Qk4GPjndjvAs4Gz2i6nAYe2zw9pt2n379v2lyRJmlPGNeP2buD1wC/b7UcCt1bVPe32GmBB+3wBcB1Au/+2tr8kSdKcMvLgluT3gRur6uu9zX261gD7et93WZKVSVauW7duBiqVJEmaXcYx4/Z0YGmS1cCZNKdI3w1sk2Tie+V2Ata2z9cACwHa/Y8Abp78plV1UlUtqaol8+fPH+5vIEmSNAYjD25V9Yaq2qmqFgEvAj5fVS8GvgD8YdvtCODs9vmKdpt2/+erar0ZN0mSpAe62fQ9bscCr02yiuYatpPb9pOBR7btrwWWj6k+SZKksRrrLa+q6kLgwvb5NcDeffr8HHjhSAuTJEmahbxXqSSp00Zx7+DVxx889GNIg5hNp0olSZI0BYObJElSRxjcJEmSOsLgJkmS1BEGN0mSpI4wuEmSJHWEwU2SJKkjDG6SJEkdYXCTJEnqCIObJElSRxjcJEmSOsLgJkmS1BEGN0mSpI4wuEmSJHWEwU2SJKkjDG6SJEkdYXCTJEnqiHnjLkCaSYuWnzPuEiRJGhpn3CRJkjrC4CZJktQRIw9uSRYm+UKSK5N8O8mft+3bJTk/ydXtz23b9iQ5McmqJJcl2WvUNUuSJM0G45hxuwd4XVU9AdgHODrJbsBy4IKqWgxc0G4DHAgsbh/LgPeNvmRJkqTxG3lwq6rrq+ob7fOfAlcCC4BDgNPabqcBh7bPDwFOr8ZFwDZJdhxx2ZIkSWM31mvckiwC9gQuBh5VVddDE+6AHdpuC4Drel62pm2b/F7LkqxMsnLdunXDLFuSJGksxvZ1IEkeBvwb8Jqq+kmSDXbt01brNVSdBJwEsGTJkvX2S5K0sUb1VUOrjz94JMdRd41lxi3Jg2lC24er6hNt8w0Tp0Dbnze27WuAhT0v3wlYO6paJUmSZotxrCoNcDJwZVX9Q8+uFcAR7fMjgLN72g9vV5fuA9w2cUpVkiRpLhnHqdKnAy8BLk9yadv2RuB44GNJjgKuBV7Y7jsXOAhYBdwBvHS05UqSJM0OIw9uVfVl+l+3BrBvn/4FHD3UoiRJkjrAOydIkiR1hMFNkiSpIwxukiRJHWFwkyRJ6giDmyRJUkcY3CRJkjrC4CZJktQRBjdJkqSOMLhJkiR1xDhueaU5atHyc8ZdgiRJneaMmyRJUkc44yZJ0iwxijMTq48/eOjH0PA44yZJktQRBjdJkqSOMLhJkiR1hMFNkiSpI1ycIMCv6pAkqQuccZMkSeoIg5skSVJHeKpUkqQ5xO+K67bOzLglOSDJVUlWJVk+7nokSZJGrRMzbkk2A94L7AesAb6WZEVVXTHeyobPRQOSJGlCV2bc9gZWVdU1VXU3cCZwyJhrkiRJGqlOzLgBC4DrerbXAE8dUy2/4myYJEnrG9W/j3PxWrquBLf0aav7dEiWAcvazZ8luWoIdWwP3DSE952rHM+Z5XjOLMdzZjmeM8vxBPKOGXurcY/nYwbt2JXgtgZY2LO9E7C2t0NVnQScNMwikqysqiXDPMZc4njOLMdzZjmeM8vxnFmO58zq0nh25Rq3rwGLk+ySZHPgRcCKMdckSZI0Up2Ycauqe5IcA5wHbAacUlXfHnNZkiRJI9WJ4AZQVecC5465jKGeip2DHM+Z5XjOLMdzZjmeM8vxnFmdGc9U1fS9JEmSNHZducZNkiRpzjO49THd7bWSvDbJFUkuS3JBkoGX8c5FA4znK5JcnuTSJF9Osts46uyKQW//luQPk1SSTqyUGpcBPp9HJlnXfj4vTfKycdTZFYN8PpP8Uft36LeTfGTUNXbJAJ/PE3o+m99Ncus46uyKAcZz5yRfSHJJ+2/8QeOoc0pV5aPnQbP44XvAY4HNgW8Cu03q8yxgy/b5nwEfHXfds/Ux4Hg+vOf5UuDfx133bH0MMp5tv62BLwEXAUvGXfdsfQz4+TwSeM+4a+3CY8DxXAxcAmzbbu8w7rpn62PQP+89/V9Fs3hv7LXPxseAn8+TgD9rn+8GrB533ZMfzritb9rba1XVF6rqjnbzIprvlVN/g4znT3o2t2LSlyvrPga9/dvbgL8Dfj7K4jrI2+nNrEHG8+XAe6vqFoCqunHENXbJ/f18HgacMZLKummQ8Szg4e3zRzDpO2NnA4Pb+vrdXmvBFP2PAj471Iq6baDxTHJ0ku/RhI1Xj6i2Lpp2PJPsCSysqs+MsrCOGvTP+wva0yZnJVnYZ78ag4zn44HHJ/mvJBclOWBk1XXPwP8etZfs7AJ8fgR1ddUg4/kW4E+SrKH5JotXjaa0wRnc1jft7bV+1TH5E2AJ8PdDrajbBhrPqnpvVT0OOBZ489Cr6q4pxzPJg4ATgNeNrKJuG+Tz+WlgUVXtDnwOOG3oVXXXIOM5j+Z06TNpZoj+Ock2Q66rqwb+94jmi+nPqqp7h1hP1w0ynocBp1bVTsBBwIfav1dnjVlVzCwx7e21AJI8B3gTsLSq7hpRbV000Hj2OBM4dKgVddt047k18ETgwiSrgX2AFS5Q2KBBbqf3454/4x8Enjyi2rpokD/va4Czq+oXVfV94CqaIKf13Z+/P1+Ep0mnM8h4HgV8DKCqvgI8hOY+prOGwW19095eqz0V9QGa0Ob1GVMbZDx7/9I+GLh6hPV1zZTjWVW3VdX2VbWoqhbRXIO5tKpWjqfcWW+Qz+eOPZtLgStHWF/XDHJ7wk/RLPAiyfY0p06vGWmV3THQ7R6T7ApsC3xlxPV1zSDjeS2wL0CSJ9AEt3UjrXIanblzwqjUBm6vleStwMqqWkFzavRhwMeTAFxbVUvHVvQsNuB4HtPOYP4CuAU4YnwVz24DjqcGNOB4vjrJUuAe4GaaVabqY8DxPA/YP8kVwL3AX1XVj8dX9ex1P/68HwacWe1SSPU34Hi+Dvhgkr+gOY165GwbV++cIEmS1BGeKpUkSeoIg5skSVJHGNwkSZI6wuAmSZLUEQY3SZKkjvDrQCRpAEn+k+YLju+pKr/QWNJY+HUgkiRJHeGpUkmSpI4wuEnSNJJ8Icl+7fO3Jzlx3DVJmpu8xk2Spncc8NYkOwB70tyzVJJGzmvcJGkASb5Ic4/iZ1bVT8ddj6S5yVOlkjSNJE8CdgTuMrRJGieDmyRNIcmOwIeBQ4Dbkzx3zCVJmsMMbpK0AUm2BD4BvK6qrgTeBrxlrEVJmtO8xk2SJKkjnHGTJEnqCIObJElSRxjcJEmSOsLgJkmS1BEGN0mSpI4wuEmSJHWEwU2SJKkjDG6SJEkdYXCTJEnqiP8GesZZnFZiiggAAAAASUVORK5CYII=\n",
      "text/plain": [
       "<Figure size 720x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "plt.figure(figsize=(10, 4))\n",
    "\n",
    "plt.hist(xbar, bins=20)\n",
    "\n",
    "plt.title(r'Histogram of $\\bar{X}_{12}$, $X_i \\sim Unif(0,1)$')\n",
    "plt.xlabel(r'$\\bar{x}$')\n",
    "plt.ylabel(r'Frequency')\n",
    "\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "You should see a histogram that looks Normal. Because the $Unif(0, 1)$ distribution is symmetric, the CLT kicks in quickly and the Normal approximation for $\\bar{X}_{n}$ works quite well, even for $n = 12$. Changing `scipy.stats.uniform` to `scipy.stats.expon`, we see that for $X_j$ generated from the $Expo(1)$ distribution, the distribution of $\\bar{X}_{n}$ remains skewed when $n = 12$, so a larger value of $n$ is required before the Normal approximation is adequate."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 13,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 1008x360 with 3 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "np.random.seed(165580141)\n",
    "\n",
    "from scipy.stats import expon\n",
    "\n",
    "n1, n2, n3 = 12, 32, 256\n",
    "\n",
    "x1 = expon.rvs(size=n1*nsim).reshape((nsim, n1))\n",
    "x2 = expon.rvs(size=n2*nsim).reshape((nsim, n2))\n",
    "x3 = expon.rvs(size=n3*nsim).reshape((nsim, n3))\n",
    "\n",
    "xbar1 = x1.mean(axis=1)\n",
    "xbar2 = x2.mean(axis=1)\n",
    "xbar3 = x3.mean(axis=1)\n",
    "\n",
    "_, (ax1, ax2, ax3) = plt.subplots(1, 3, sharey=True, figsize=(14, 5))\n",
    "\n",
    "ax1.hist(xbar1, bins=40, color='#1b9e77')\n",
    "ax1.set_ylabel('Frequency')\n",
    "ax1.set_title(r'Histogram of $\\bar{X}_{12}$, $X_j \\sim \\, Expo(1)$')\n",
    "\n",
    "ax2.hist(xbar2, bins=40, color='#d95f02')\n",
    "ax2.set_title(r'Histogram of $\\bar{X}_{32}$, $X_j \\sim \\, Expo(1)$')\n",
    "\n",
    "ax3.hist(xbar3, bins=40, color='#7570b3')\n",
    "ax3.set_title(r'Histogram of $\\bar{X}_{256}$, $X_j \\sim \\, Expo(1)$')\n",
    "\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Have a look at Appendix A below for another neat visualization of the CLT."
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Chi-Square and Student-$t$ distributions\n",
    "Although the Chi-Square is just a special case of the Gamma (refer to [`scipy.stats.gamma`](https://docs.scipy.org/doc/scipy/reference/generated/scipy.stats.gamma.html)), it still has its own functions in [`scipy.stats.chi2`](https://docs.scipy.org/doc/scipy/reference/generated/scipy.stats.chi2.html): `chi2.pdf(x, n)` and `chi2.cdf(x, n)` return the values of the $\\chi^2_{n}$ PDF and CDF at `x`; and `chi2.rvs(n, size=nsim)` generates `nsim` $\\chi^2_{n}$ r.v.s.\n",
    "\n",
    "The graph below illustrates Theorem 10.4.2:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 14,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 1008x432 with 2 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "from scipy.stats import chi2, gamma\n",
    "\n",
    "_, (ax1, ax2) = plt.subplots(1, 2, sharey=True, figsize=(14, 6))\n",
    "\n",
    "x = np.linspace(0, 20, 1000)\n",
    "\n",
    "n_vals = [1, 2, 4, 8, 16]\n",
    "alphas = [1.0, .7, .5, .3, .2]\n",
    "\n",
    "# graph for Chi-Square\n",
    "for i,n in enumerate(n_vals):\n",
    "    ax1.plot(x, chi2.pdf(x, n), lw=3.2, alpha=alphas[i], color='#33aaff', label='n={}'.format(n))\n",
    "ax1.set_title(r'$X \\sim \\chi^2_{n}$')\n",
    "ax1.set_xlim((0, 20.0))\n",
    "ax1.set_ylim((0.0, 0.5))\n",
    "ax1.legend()\n",
    "\n",
    "# graph for Gamma\n",
    "lambd = 0.5\n",
    "for i,n in enumerate(n_vals):\n",
    "    ax2.plot(x, gamma.pdf(x, n/2, scale=1/lambd), \n",
    "             lw=3.2, alpha=alphas[i], color='#ff9933', label='n={}'.format(n))\n",
    "ax2.set_title(r'$X \\sim Gamma(\\frac{n}{2}, \\frac{1}{2})$')\n",
    "ax2.set_xlim((0, 20.0))\n",
    "ax2.set_ylim((0.0, 0.5))\n",
    "ax2.legend()\n",
    "\n",
    "plt.suptitle((r'Theorem 10.4.2: $\\chi^2_{n}$ distribution is the $Gamma(\\frac{n}{2},'\n",
    "              r' \\, \\frac{1}{2})$ distribution'))\n",
    "\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "The Student-$t$ distribution is supported in [`scipy.stats.t`](https://docs.scipy.org/doc/scipy/reference/generated/scipy.stats.t.html). To evaluate the PDF or CDF of the $t_n$ distribution at $x$, we use `t.pdf(x, n)` or `t.cdf(x, n)`. To generate `nsim` r.v.s from the $t_{n}$ distribution, we use `t.rvs(n, size=nsim)`. Of course, `t.pdf(x, 1)` is the same as [`scipy.stats.cauchy`](https://docs.scipy.org/doc/scipy/reference/generated/scipy.stats.cauchy.html)'s `cauchy.pdf(x)`."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 15,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 1008x432 with 2 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "from scipy.stats import t, cauchy\n",
    "\n",
    "_, (ax1, ax2) = plt.subplots(1, 2, sharey=True, figsize=(14, 6))\n",
    "\n",
    "x = np.linspace(0, 20, 1000)\n",
    "\n",
    "# graph for Student-t \n",
    "y1 = t.pdf(x,1)\n",
    "ax1.plot(x, y1, lw=3.2, alpha=0.8, color='#33aaff')\n",
    "ax1.set_title(r'Student-$t$: $\\tt{t.pdf(x, 1)}$')\n",
    "\n",
    "# graph for Cauchy\n",
    "y2 = cauchy.pdf(x)\n",
    "ax2.plot(x, y2, lw=3.2, alpha=0.8, color='#ff9933')\n",
    "ax2.set_title(r'Cauchy: $\\tt{cauchy.pdf(x)}$')\n",
    "\n",
    "plt.suptitle(r'Student-$t$ vs. Cauchy')\n",
    "\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "----\n",
    "\n",
    "## Appendix A: Quincunx - an interactive visualization\n",
    "\n",
    "Statistician and geneticist [Francis Galton](https://en.wikipedia.org/wiki/Francis_Galton) invented the _quincunx_, or _bean machine_,  to illustrate the Normal distribution. Here is an implementation built with IPython and [D3.js](https://d3js.org/) (version 5.7.0), embedded right in this notebook.\n",
    "\n",
    "In this interactive visualization of the CLR, you can:\n",
    "\n",
    "* alter the animation by controlling the time between redraws with the `delay` control (from 50 to 1000 milliseconds, changes are immediately effective without restarting the animation)\n",
    "* change the number of bins with the `num. bins` control (from 1 to 25, board is redrawn upon completion of change)\n",
    "* change the probability $p$ that the ball will go to the right (slider moves left to 0.00, right to 1.00, board is redrawn upon completion of change)\n",
    "* as the balls drop into the bins below, the heights of the bins will increase to form a histogram\n",
    "* the running percentage of balls per bin is displayed on each bin and updated in real-time (`Math.floor` is used, so some accuracy is lost)\n",
    "\n",
    "First, we import `display`, `Javascript` and `HTML` from the [`IPython.display`](https://ipython.readthedocs.io/en/stable/api/generated/IPython.display.html) module.\n",
    "\n",
    "Next we use `display` to load the D3.js file from the [Google Hosted Libraries content delivery network](https://developers.google.com/speed/libraries/#d3js). We also load the main JavaScript code in `assets/quincunx.js` and Cascading Style Sheet definitions in `assets/quincunx.html`.\n",
    "\n",
    "Lastly, we embed a small JavaScript snippet into the code cell below to provide an entry point to the `quincunx` module in `assets/quincunx.js`."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 16,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "application/javascript": [
       "\n",
       "require.config({\n",
       "    paths: {\n",
       "        d3: 'https://ajax.googleapis.com/ajax/libs/d3js/5.7.0/d3.min'\n",
       "    }\n",
       "});\n"
      ],
      "text/plain": [
       "<IPython.core.display.Javascript object>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    },
    {
     "data": {
      "application/javascript": [
       "require.undef('quincunx');\n",
       "\n",
       "define('quincunx', ['d3'], function (d3) {\n",
       "    /*\n",
       "     * Creates HTML form controls for manipulating the visualization,\n",
       "     * sets up the initial visualization state, and then kicks off\n",
       "     * the animation.\n",
       "     *\n",
       "     * This module was built with D3.js, v5.7.0.\n",
       "     */\n",
       "    function draw(outputarea) {\n",
       "\n",
       "        var def_bins = 7,\n",
       "            def_speed = 500,\n",
       "            def_p = 0.50;\n",
       "\n",
       "        /*\n",
       "         * Calculate level in pyramid of triangles\n",
       "         * for given triangle (path) element index \n",
       "         * (zero-index)\n",
       "         */\n",
       "        function lvl(d) {\n",
       "            d = d + 1;\n",
       "            var i = 0, n = 1;\n",
       "            while (i + n < d) {\n",
       "                i += n;\n",
       "                n++;\n",
       "            }\n",
       "            return n - 1;\n",
       "        }\n",
       "        \n",
       "        /*\n",
       "         * Calculate index for first triangle (path)\n",
       "         * in pyramid of triangles, given the level \n",
       "         * (zero-index)\n",
       "         */\n",
       "        function pos(l) {\n",
       "            l = l + 1;\n",
       "            var n = 0, i = 0;\n",
       "            while (n < l) {\n",
       "                i += n;\n",
       "                n++;\n",
       "            }\n",
       "            return i;\n",
       "        }\n",
       "        \n",
       "        var speed = def_speed,\n",
       "            step,\n",
       "            histogram_height = 100;\n",
       "          \n",
       "        function init(bins, p, width) {\n",
       "            var p = p ? p : def_pp / 100.0;\n",
       "            var margin = { left : width/10, right : width/10, top : 10 , bottom : 30 },\n",
       "                height = 450,\n",
       "                sx = (width - margin.left - margin.right) / bins,\n",
       "                sy = (height - histogram_height - margin.bottom -  100 ) / bins,\n",
       "                histogram_y = height - histogram_height - margin.bottom,\n",
       "                values = [],\n",
       "                ts = sy/3,\n",
       "                bs = sy/2,\n",
       "                dropping = true;\n",
       "        \n",
       "            var container = d3.select('#quincunx');\n",
       "            container.selectAll('svg').remove();\n",
       "            var svg = container.append('svg')\n",
       "                .attr('viewBox', '0 0 '+width+' '+height)\n",
       "                .attr('preserveAspectRatio', 'xMinYmin meet');\n",
       "            var g = svg.append('g')\n",
       "                .attr('transform', 'translate(' + (width / 2) + ',20)');\n",
       "        \n",
       "            var path = g.selectAll('path');\n",
       "            path.data(d3.range(0, pos(bins + 1)))\n",
       "                .enter()\n",
       "              .append('g')\n",
       "                // position the triangles\n",
       "                .attr('transform', function(d){\n",
       "                        var x = 0;\n",
       "                        var y = 0;\n",
       "                        var l = 0;\n",
       "                        y = lvl(d);\n",
       "                        x = d - pos(y) + 1;\n",
       "                        l = (y + 2) * sx / 2;\n",
       "                        return 'translate(' + (sx * x - l) + ', ' +  (sy *  y ) + ')';\n",
       "                })\n",
       "                // draw the triangles\n",
       "                .append('path')\n",
       "                  .attr('class', 'triangle')\n",
       "                  .attr('d', 'M -' + (ts) + ' ' + (ts) + ' L ' + (ts) + ' ' + (ts) + ' L 0 -' + (ts/2) +' Z');\n",
       "        \n",
       "            step = function(){\n",
       "                // drop a ball\n",
       "                g.append('circle')\n",
       "                 .datum({lvl: -1, pos: 0})\n",
       "                 .attr('class', 'ball')\n",
       "                 .attr('r', (bs) + 'px')\n",
       "                 .attr('cx', function(d){ return (d.pos * sx / 2) + 'px' })\n",
       "                 .attr('cy', function(d){ return (d.lvl * sy - 50) + 'px' })\n",
       "                 .style('display', 'none')\n",
       "                 .transition()\n",
       "                 .style('display','block')\n",
       "                 .on('end', animate)\n",
       "            }\n",
       "        \n",
       "            function animate() {\n",
       "                var c = d3.select(this);\n",
       "                var d = c.datum();\n",
       "                if (d.lvl > bins - 2) {\n",
       "                    // drop the ball into its histogram bin\n",
       "                    c.transition()\n",
       "                     .duration(speed / 2)\n",
       "                     .attr('cy', function(d){ return (d.lvl * sy + 20 + histogram_height) + 'px'})\n",
       "                     .style('opacity', '0.0')\n",
       "                     .remove(); // remove the balls once they're invisible\n",
       "                    values.push( bins / 2 + d.pos / 2);\n",
       "                    update();\n",
       "                    return;\n",
       "                }\n",
       "                if (d.lvl === -1) d.pos = 0; // when the ball drops into the first position\n",
       "                else (Math.random() > p) ? d.pos-- : d.pos++;\n",
       "                d.lvl++;\n",
       "                c.datum(d);\n",
       "                c.transition()\n",
       "                 .ease(d3.easeBounce)\n",
       "                 .attr('cx', function(d){ return (d.pos * sx / 2) + 'px' })\n",
       "                 .attr('cy', function(d){ return (d.lvl * sy + sy) + 'px' })\n",
       "                 .on('end', animate)\n",
       "                 .duration(speed);\n",
       "            }\n",
       "        \n",
       "            var x = d3.scaleLinear()\n",
       "                .domain([0, bins])\n",
       "                .range([0, width - margin.left - margin.right]);\n",
       "            var formatCount = d3.format(\",.0f\");\n",
       "            var data = d3.histogram().domain(x.domain()).thresholds(bins)(values);\n",
       "            var histogram = d3.select('#quincunx').select('svg')\n",
       "                .append('g')\n",
       "                .attr('transform','translate(' + margin.left + ',' + histogram_y + ')');\n",
       "\n",
       "            var xAxis = d3.axisBottom(x).ticks(bins);\n",
       "        \n",
       "            var bars = histogram.selectAll('.bar')\n",
       "                .data(data)\n",
       "                .enter().append('g')\n",
       "                .attr('class', 'bar');\n",
       "        \n",
       "            bars.append('rect')\n",
       "                .attr('x', 1)\n",
       "                .attr('width', x(data[0].x1-data[0].x0) - 1);\n",
       "        \n",
       "            bars.append('text')\n",
       "                .attr('dy', '.5em')\n",
       "                .attr('y', 10)\n",
       "                .attr('x', x(data[0].x1-data[0].x0) / 2)\n",
       "                .attr('text-anchor', 'middle');\n",
       "        \n",
       "            histogram.append('g')\n",
       "                .attr('class', 'x axis')\n",
       "                .attr('transform', 'translate(0,' + (histogram_height) + ')')\n",
       "                .call(xAxis);\n",
       "        \n",
       "            function update() {\n",
       "                data = d3.histogram().domain(x.domain()).thresholds(bins)(values);\n",
       "                var bars = histogram.selectAll('.bar');\n",
       "                var y = d3.scaleLinear()\n",
       "                    .domain([0, d3.max(data.map(function(d){ return d.length }))])\n",
       "                    .range([histogram_height, 0]);\n",
       "                bars.data(data)\n",
       "                   .transition()\n",
       "                   .duration(speed)\n",
       "                   .attr('transform', function(d){ return 'translate(' + x(d.x0) + ',' + y(d.length) + ')' })\n",
       "                   .select('rect')\n",
       "                   .attr('height', function(d){ return (histogram_height - y(d.length)) });\n",
       "                bars.select('text')\n",
       "                   .text(function(d){ return Math.floor(d.length / values.length * 100) + '%' });\n",
       "            }\n",
       "            update()\n",
       "        };\n",
       "          \n",
       "        (function interval(){\n",
       "             if (step) step();\n",
       "             setTimeout(interval, speed);\n",
       "        })();\n",
       "          \n",
       "          \n",
       "        // setup event-handlers for controls\n",
       "        document.getElementById('qxspeed').onchange = function(e){\n",
       "            speed = e.target.value;\n",
       "        }\n",
       "        document.getElementById('qxbins').onchange = restart;\n",
       "        document.getElementById('qxp').oninput = function() {\n",
       "            var newp = (Number(document.getElementById('qxp').value) / 100.0).toFixed(2);\n",
       "            document.getElementById('qxpval').innerHTML = newp;\n",
       "            restart(newp);\n",
       "        }\n",
       "\n",
       "        function restart(e) {\n",
       "            var b = def_bins;\n",
       "            var p = def_p;\n",
       "            var w = Number(document.getElementById('quincunx').offsetWidth);\n",
       "            if (e) {\n",
       "                b = Number(document.getElementById('qxbins').value);\n",
       "                p = (Number(document.getElementById('qxp').value) / 100.0 ).toFixed(2);\n",
       "            };\n",
       "            init(b, p, w);\n",
       "        }\n",
       "        \n",
       "        restart();\n",
       "    }\n",
       "    return draw;\n",
       "});\n"
      ],
      "text/plain": [
       "<IPython.core.display.Javascript object>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    },
    {
     "data": {
      "text/html": [
       "<style type='text/css'>\n",
       "    .qxtable {\n",
       "        display:table;\n",
       "        border-spacing: 2px;\n",
       "        width:25%;\n",
       "    }\n",
       "\n",
       "    .qxrow {\n",
       "        display:table-row;\n",
       "    }\n",
       "\n",
       "    .qxcell {\n",
       "        display:table-cell;\n",
       "        vertical-align: baseline;\n",
       "    }\n",
       "\n",
       "    .qxcell input {\n",
       "        width: 5em;\n",
       "    }\n",
       "\n",
       "    #quincunx .ball {\n",
       "        fill: #d6604d;\n",
       "        opacity: 1;\n",
       "        stroke: #d6604d;\n",
       "    }\n",
       "\n",
       "    #quincunx .bar rect {\n",
       "        fill: #d6604d;\n",
       "        shape-rendering: crispEdges;\n",
       "    }\n",
       "\n",
       "    #quincunx .bar text {\n",
       "        fill: #fff;\n",
       "    }\n",
       "\n",
       "    #quincunx .axis path, #quincunx .axis line {\n",
       "        fill: none;\n",
       "        shape-rendering: crispEdges;\n",
       "        stroke: #000;\n",
       "    }\n",
       "\n",
       "    #quincunx .triangle {\n",
       "        fill: #4d4d4d;\n",
       "        stroke: #4d4d4d;\n",
       "        stroke-linejoin: round;\n",
       "        stroke-width: 4;\n",
       "    }\n",
       "</style>\n",
       "\n",
       "<div class='qxtable'>\n",
       "    <div class='qxrow'>\n",
       "        <div class='qxcell'>\n",
       "            <label for='speed'> delay (ms) </label>\n",
       "        </div>\n",
       "        <div class='qxcell'>\n",
       "            <input id='qxspeed' name='speed' type='number' name='speed' min='50' max='1000' step='50' value='500'>\n",
       "        </div>\n",
       "    </div>\n",
       "    <div class='qxrow'>\n",
       "        <div class='qxcell'>\n",
       "             <label for='bins'> num. bins </label>\n",
       "        </div>\n",
       "        <div class='qxcell'>\n",
       "            <input id='qxbins' name='bins' type='number' min='1' max='25' value='7'>\n",
       "        </div>\n",
       "    </div>\n",
       "    <div class='qxrow'>\n",
       "        <div class='qxcell'>\n",
       "            <label for='pvalue'> p = <span id='qxpval'>0.50</span></label>\n",
       "        </div>\n",
       "        <div class='qxcell'>\n",
       "            <input id='qxp' name='pvalue' type='range' min='0' max='100' value='50'>\n",
       "        </div>\n",
       "    </div>\n",
       "</div>\n",
       "\n",
       "<div id='quincunx'/>\n"
      ],
      "text/plain": [
       "<IPython.core.display.HTML object>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    },
    {
     "data": {
      "application/javascript": [
       "\n",
       "(function(element){\n",
       "    require(['quincunx'], function(quincunx) {\n",
       "        quincunx(element.get(0))\n",
       "    });\n",
       "})(element);\n"
      ],
      "text/plain": [
       "<IPython.core.display.Javascript object>"
      ]
     },
     "execution_count": 16,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "from IPython.display import display, Javascript, HTML\n",
    "\n",
    "display(Javascript(\"\"\"\n",
    "require.config({\n",
    "    paths: {\n",
    "        d3: 'https://ajax.googleapis.com/ajax/libs/d3js/5.7.0/d3.min'\n",
    "    }\n",
    "});\n",
    "\"\"\"))\n",
    "display(Javascript(filename=\"./assets/quincunx.js\"))\n",
    "display(HTML(filename=\"./assets/quincunx.html\"))\n",
    "\n",
    "Javascript(\"\"\"\n",
    "(function(element){\n",
    "    require(['quincunx'], function(quincunx) {\n",
    "        quincunx(element.get(0))\n",
    "    });\n",
    "})(element);\n",
    "\"\"\")"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "_Can you use the central limit theorem to explain why the distribution of particles at the bottom is approximately Normal?_\n",
    "\n",
    "#### References\n",
    "\n",
    "This interactive visualization extends ideas from the following blogposts:\n",
    "\n",
    "* [Central Limit Theorem Visualized in D3](http://blog.vctr.me/posts/central-limit-theorem.html)\n",
    "* [Custom D3.js Visualization in a Jupyter Notebook](https://www.stefaanlippens.net/jupyter-custom-d3-visualization.html)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "----\n",
    "\n",
    "&copy; Blitzstein, Joseph K.; Hwang, Jessica. Introduction to Probability (Chapman & Hall/CRC Texts in Statistical Science)."
   ]
  }
 ],
 "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",
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