alesolano/Robotics1718_First_Lab_Session.ipynb

## Robotics1718_First_Lab_Session.ipynb
{
 "cells": [
  {
   "cell_type": "code",
   "execution_count": 1,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "import numpy as np\n",
    "import matplotlib.pyplot as plt"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# 1. The normal distribution"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Write a script to draw a gaussian for values μ=2 and σ=1, within the interval $x\\in [-5, 5]$ and with steps of 0.1. For that, implement your own $f(x)$.\n",
    "\n",
    "$$f(x) = \\frac{1}{\\sqrt{2\\pi \\sigma^{2}}}\\cdot  e^{-\\frac{(x - \\mu )^{2}}{2\\sigma^{2}}}$$\n",
    "Which also could be expressed as:\n",
    "$$f(x) = \\eta \\cdot  e^{-\\frac{D_m}{2}}$$"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "def f(μ, σ, xmin, xmax, step=0.1):\n",
    "    \n",
    "    x = np.arange(xmin, xmax, step)\n",
    "    \n",
    "    D = ((x - μ)**2)/σ # Mahalanobis distance\n",
    "    η = 1/np.sqrt(2*σ*np.pi) # normalizer\n",
    "    gaussian = η*np.exp(-D/2)\n",
    "    \n",
    "    return x, gaussian"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "metadata": {},
   "outputs": [
    {
     "data": {
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PAav9G6hqmar2XWO9A++i6saYIKtv7aSq8SJLpsbuME+fJVOzqWxop6G10+lSYk4gwV8A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\nAAAAAElFTkSuQmCC\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a9c45a58>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "x, gaussian = f(2, 1, -5, 5)\n",
    "\n",
    "plt.figure() # create figure\n",
    "plt.plot(x, gaussian) # associate plot with figure\n",
    "plt.show() # show figure"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": []
  },
  {
   "cell_type": "code",
   "execution_count": 4,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "def evaluate_gaussian(μ, σ, xmin, xmax, step=0.1):\n",
    "    \n",
    "    x, gaussian = f(μ, σ, xmin, xmax, step=0.1)\n",
    "\n",
    "    plt.figure()\n",
    "    plt.plot(x, gaussian)\n",
    "    plt.show()"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 5,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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PAav9G6hqmar2XWO9A++i6saYIKtv7aSq8SJLpsbuME+fJVOzqWxop6G10+lSYk4gwV8A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\nAAAAAElFTkSuQmCC\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a6636748>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "evaluate_gaussian(2, 1, -5, 5)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": []
  },
  {
   "cell_type": "code",
   "execution_count": 6,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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Lsj/JjlnzP5Jkb5KjSXpzxnyyq9+X5IpR+pQkjW7UM4wdwP1VtQm4v5t+gyQTwC3AlcBm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\nYII=\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a6583898>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "n_samples = 200\n",
    "μ = 2\n",
    "σ = 2\n",
    "\n",
    "samples = σ*np.random.randn(n_samples) + μ\n",
    "y = np.zeros_like(samples)\n",
    "\n",
    "plt.figure()\n",
    "plt.scatter(samples, y)\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": []
  },
  {
   "cell_type": "code",
   "execution_count": 7,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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Tgjd6T+TWbcvoc3ir7Tg+R4tfVbthGWncvH05/+h7KweirzwlRCnX/L3/JA7X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\n4FgAAAAASUVORK5CYII=\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a6492c50>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "x, gaussian = f(μ, σ, samples.min(), samples.max()) # generate gaussian\n",
    "\n",
    "plt.figure() # create figure\n",
    "\n",
    "plt.plot(x, gaussian, 'r') # plot gaussian\n",
    "\n",
    "plt.hist(samples, 20, [samples.min(), samples.max()], normed=1) # plot normalized histogram\n",
    "\n",
    "plt.show() # show figure"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# 2. Properties of normal distributions"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## 2.1 Central limit theorem"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Write a script which generates an array of samples of an uniform distribution. Repeat this N times. Show graphically how the addition of those N arrays has a gaussian-shaped histogram."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 8,
   "metadata": {},
   "outputs": [
    {
     "data": {
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      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a64e7e48>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    },
    {
     "data": {
      "image/png": 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      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a6316748>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    },
    {
     "data": {
      "image/png": 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      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a64432e8>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    },
    {
     "data": {
      "image/png": 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BU1z6DeeJGNeeWSdCN1bf6Dav6n4u/oBuUsa1T9YtaTsWet9bFry4+2fhh5L85MZEG9pW\nu/3CRI1pkt3Ai1iaoS03ceN6mawwIeOa5IokDwALwImqmthx7ZEVJmRch7EdC72P+4EbquqngD8H\n/mmT87RgosY0ybXAe4HXV9WTm5llkAFZJ2Zcq+p7VXUTS98avyXJCzYryyA9sk7MuA5jOxb6wFsW\nVNWTF/5JVkvX2l+V5PqNi9hbr9svTIJJGtMkV7FUkO+qqvetcMjEjOugrJM0rssyfRW4B7j9opcm\nZlwvWC3rJI5rH9ux0AfesiDJjyRJt34LS+P0xIYnHew48Cvd1QO3Al+rqrObHWolkzKmXYa3A6eq\n6q2rHDYR49on6wSN61SS67r1p7P0nIRHLjpsUsZ1YNZJGddhbbtH0NUqtyxI8uvd638N/DLwG0me\nAr4N3FndR98bKcldLH3afn2Sx4A3s/QBzoWcH2TpyoHPAd8CXrvRGS/okXUixhR4CfAa4DPdOVSA\nNwE3LMs6KePaJ+ukjOsuYC5LD775AeBoVd190f9XkzKufbJOyrgOxW+KSlIjtuMpF0lqkoUuSY2w\n0CWpERa6JDXCQpekRljoktQIC12SGmGhS1Ij/g8MAZ8flQwmnAAAAABJRU5ErkJggg==\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a61b3e80>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    },
    {
     "data": {
      "image/png": "iVBORw0KGgoAAAANSUhEUgAAAXQAAAD8CAYAAABn919SAAAABHNCSVQICAgIfAhkiAAAAAlwSFlz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\nRK5CYII=\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a6242e10>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "n_samples = 1000\n",
    "N = 5\n",
    "\n",
    "samples = np.zeros([n_samples])\n",
    "\n",
    "for n in range(N):\n",
    "    samples += np.random.rand(n_samples)\n",
    "    \n",
    "    plt.figure()\n",
    "    plt.hist(samples, 30, [samples.min(), samples.max()])\n",
    "    plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## 2.2 Sum of two random variables"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Generate `n_samples` of random numbers coming from the distributions $N(1,1)$ and $N(4,2)$. Sum this two arrays and plot its histogram. Check that the result is the normal distribution $N(5,3)$ plotting its gaussian. "
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 20,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# Not completely convinced of this one. Samples seem to have more variance than the gaussian"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 19,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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3I/4+osepf4/+hAWGHWvnX7IETjvNpBGX775rNIl4YSRPc0KT8wE6XevnT38y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\nPZl53dM+mfTBWLI5uu5maqwbORqw0Nv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      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a63c2f60>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "n_samples = 10000\n",
    "\n",
    "μ1 = 1; σ1 = 1\n",
    "μ2 = 4; σ2 = 2\n",
    "\n",
    "# Generate samples\n",
    "samples1 = σ1*np.random.randn(n_samples) + μ1 # samples of X1 ~ N(μ1, σ1)\n",
    "samples2 = σ2*np.random.randn(n_samples) + μ2 # samples of X2 ~ N(μ2, σ2)\n",
    "\n",
    "μ3 = μ1 + μ2\n",
    "σ3 = σ1 + σ2\n",
    "samples3 = samples1 + samples2 # sum of samples\n",
    "\n",
    "# Generate gaussians\n",
    "x, gaussian1 = f(μ1, σ1, samples3.min(), samples3.max()) # generate gaussian N(μ1, σ1)\n",
    "_, gaussian2 = f(μ2, σ2, samples3.min(), samples3.max()) # generate gaussian N(μ2, σ2)\n",
    "_, gaussian3 = f(μ3, σ3, samples3.min(), samples3.max()) # generate gaussian N(μ3, σ3)\n",
    "\n",
    "# Plots\n",
    "plt.figure()\n",
    "\n",
    "plt.hist(samples3, 100, [samples3.min(), samples3.max()], normed=1) # plot normalized histogram\n",
    "\n",
    "plt.plot(x, gaussian1, 'g') # plot gaussian N(μ1, σ1)\n",
    "plt.plot(x, gaussian2, 'b') # plot gaussian N(μ2, σ2)\n",
    "plt.plot(x, gaussian3, 'r') # plot gaussian N(μ3, σ3)\n",
    "\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 10,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# TODO: convolution does not work as expected\n",
    "# np.convolve(gaussian_N11, gaussian_N42, 'same')  "
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## 2.3 Product of gaussians"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": []
  },
  {
   "cell_type": "code",
   "execution_count": 21,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# Does not work at all as it should. Don't really understand if I should do the product, the average, or something else"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 12,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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nmsIdhdhPXngzbrdbq3FeUKDNFPHXPPv59OihpWg+/lhbyaoYTwV3L1ToKGTx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\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a664f630>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "n_samples = 10000\n",
    "\n",
    "μ1 = 1; σ1 = 1\n",
    "μ2 = 4; σ2 = 2\n",
    "\n",
    "# Generate samples\n",
    "s1 = σ1*np.random.randn(n_samples) + μ1 # sampes of X1 ~ N(μ1,σ1)\n",
    "s2 = σ2*np.random.randn(n_samples) + μ2 # samples of X2 ~ N(μ2,σ2)\n",
    "\n",
    "# TODO: Understand this properly\n",
    "μ3 = (μ1*σ2**2 + μ2*σ1**2)/(σ1**2 + σ2**2)\n",
    "σ3 = (σ1**2)*(σ2**2)/(σ1**2 + σ2**2)\n",
    "s3 = (s1+s2)/2 # ???? or s1*s2 ?????\n",
    "\n",
    "# Generate gaussians\n",
    "x, gaussian1 = f(μ1, σ1, s3.min(), s3.max()) # generate gaussian N(μ1,σ1)\n",
    "_, gaussian2 = f(μ2, σ2, s3.min(), s3.max()) # generate gaussian N(μ2,σ2)\n",
    "_, gaussian3 = f(μ3, σ3, s3.min(), s3.max()) # generate gaussian N(μ3,σ3)\n",
    "\n",
    "plt.figure()\n",
    "\n",
    "# Does not work as it should\n",
    "#plt.hist(s3, 100, [s3.min(), s3.max()], normed=1) # plot normalized histogram\n",
    "\n",
    "plt.plot(x, gaussian1, 'g') # plot gaussian N(μ1,σ1)\n",
    "plt.plot(x, gaussian2, 'b') # plot gaussian N(μ2,σ2)\n",
    "plt.plot(x, gaussian3, 'm') # plot gaussian N(μ3,σ3)\n",
    "\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## 2.4 Linear combination of normal random variables"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": []
  },
  {
   "cell_type": "code",
   "execution_count": 13,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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aM4a/znsFlzjglVcOLT5SlXhXF1yST4VE+eysItx39mQoLITbbrO6GhWBImSo\nSOQxxpC+I51xqeOsLqVOzs/4kWG/LuWhERN5qEOHY+4b5+oKuG/wxpjkUJRnW5tatOe5Ey/iTzM/\n4OqKnvzYacChz3R8v6orveK3qc17N7O3eG949+/n5fHgN9P5pXV3ZvSvPqxiTQoYR9T383u9cvIl\nbGrejr9+9Qr1S4utLkdFEA1+m/Le2D2xzYkWV1IHd9xB45ICpo66GZfDWe3uDuKJNcdF/cger9KY\nWO47ezLt83dx64L3rS5HRRANfptK35FOvDM+fBdf+fprmDGDaSeNY31Sit/N9Abv4RZ3OJ6Zfc7i\n+iWfkbor+uYyUsGhwW9TS3YsoV+rfsQ6Y60upcZ63v5vtl58JZuat+WlU44+iqcq8a6uuGQ/5bIr\nSNWFn8eGTWBv/cb8bd6LOFwVVpejIoDe3LUhl3GxbOcyrup7ldWl1MqfFrxPh/xdXHrZY5TExB3a\n7s9yifGuHgCUOtYRW9EqaDWGk/z6jXhkxPW88J+nufKXucD5Vpekwpxe8dtQRm4GB0oPhGf//rJl\nXL/kM97vezaLOxxf4+ax5jjE1KPEsT4IxYWvWT2H8lPKCdz10wzIyrK6HBXm/Ap+ERkpIutFJFNE\nplbxeQ8R+VlESkTkzpq0VUdauG0hAKe0P8XiSmqovByuv57dDZrw+LAJtTqE4CTO1ZUSx7oAFxfm\nRLj/7Mk4XS64+Warq1FhrtrgFxEn8DIwCkgFLhOR1Eq77QFuAZ6uRVtVycKshSQ2SKRL8y5Wl1Iz\nzz4Lv/zCg2fcyP56DWt9mHhXd0plMy5KAlhc+NvWtBXPD77MvUzjZ59ZXY4KY/5c8Q8EMo0xm40x\npcBMYIzvDsaYHGPMEqDyROLVtlVH+nnbz5zS/pTwWmM3MxMefBDGjOGL7oPrdKh4V0+QCh3WWYXX\nT7wA+vSBKVNg/36ry1Fhyp/gbwv4zhGb5dnmj7q0jUp5hXms372eU9qFUTePy+WeeTM2Fl5++ZjT\nMvgj3uVedEa7e45U7oyB6dNhxw544AGry1FhyjY3d0Vkooiki0h6bm70ztWyKGsREB79+94plx8Y\ndTP8+CM88wy0rfvPdSdNiXG1olRv8FbtpJNg8mR46SVYvNjqalQY8if4twPtfd6382zzh99tjTHT\njTFpxpi0pKQkPw8feRZuW0iMIyZspmpom5/D1B/e4r/H9SNlQ0u/hmz6I97VgxLHOn2Q62gefdT9\nQ/baa6E5aEQkAAAXMklEQVRE74WomvEn+JcAXUWko4jEAeOBWX4evy5to9LCbQs5odUJ4TEjpzE8\n9uWLiDHcO+rmOnfx+Ip39aRC9uiDXEfTuLG7y2ftWnjkEaurUWGm2uA3xpQDU4B5QAbwkTFmjYhM\nEpFJACLSSkSygNuBB0QkS0QaH61tsL6YcFdWUcaSHUsY1G6Q1aX45eJV33Dall94fNg1ZDVpGdBj\nx7vcU1WUOFYF9LgRZdQouPpqePxxWLbM6mpUGPHryV1jzFxgbqVt03xeZ+PuxvGrrapa+o50CssK\nOe2406wupXo7dvB/373O4na9ePeEcwJ++FjTAYdpTLFjFQ0rzgz48SPGM8/AvHkwYQIsWQJxcdW3\nUVHPNjd3FXy/5XsAhqYMtbiSahgDf/wjcRVl3DPqFowE/ttIEOq5elPsWB3wY4c77031lKlz3MtY\nTpsGK1e6r/yV8oMGv418v+V7jk8+nsQGiVaXcmwffgizZvH0kCvY0jx4o3PjK3pT4cihXHKCdo6I\nMGYMXHYZ/PWv7h8ASlVDg98mSspLWLB1AcNThltdyrHt3Ol+eGjgQN5MC+6zePU8/fzF2s9fvRde\ncF/9X3GFjvJR1dLgt4klO5ZQVF7E8I42Dn5j4LrroKAA3n7br8VV6iLWpOAwDbW7xx+JifDGG7Bq\nFfzf/1ldjbI5nZbZJr7/9XsEsfeN3X/8A774gj+fcSMz3gn+oiCCg3hXbx3ZcwyVn5vYcuON8PTT\nMHo0KXMP/L5d1+lVPvSK3ya+3/I9fVv1pXn95laXcoSUqXM4/YZXKbr1dn7s2J8Z/UeH7Nz1Ko6n\n3JFNmWSH7JzhLLXBGfzatBVZ511Mw5JCq8tRNqXBbwNFZUX8nPUzw44bZnUpVYqpKOfZ2X+nOCaO\nu0bdGtAHtapT3zUAgGKHjlP3R2FcfW4/9w5aH3AvdK9UVTT4beCHLT9QXF7MyC4jrS6lSjcvnEnf\n7I3cO3IKOY1ahPTcMaYtTlcyRU4Nfn/90rYHL598MRev/oZz1s23uhxlQxr8NvBF5hfUj6lvz/H7\n333HzQs/5OPeI/iyjtMt14Yg1Hf1p9ixAkN5yM8frl4YfBnL2nTn8S9eoMPenVaXo2xGg98G5m6c\ny/COw6kXU8/qUg6XnQ2XX87m5m3585mTLCujfkV/jBTpNM01UO6M4Zbz78aI8NKsJ3SIpzqMBr/F\nNu7eyKa9mzinS+CnPaiTigr3mPD9+7npgqkUxlk3aVw9V18wDoocSy2rIRxlNWnJXef8iT7ZmXDP\nPVaXo2xEg99iX2R+AcCorqMsruRwfx92NXz7LXcNu4ENSSmW1uIggXhXT4q1n7/Gvuo2iLcGnAfP\nP6/LNapDdBy/xeZunEv3Ft3p1KyT1aX87vvv+dOCD/ik13D+dbw9Jkir70pjX+w7lEsuMSZ612uo\njceGXcsEs909kVvfvqS8uvbQZzq+PzrpFb+FDpQc4IctPzCqi42u9rduhfHj2dKsDQ+cdVNIh24e\nS4MK94pkhY5FFlcSfkpjYjkt7Y/kF5WRcdLp1C8ttrokZTENfgvN3jCbkooSLkq9yOpS3AoL4YIL\noLiYiRfeb2m/fmWxpi2xrg4UOhdaXUpY2tqsNbecfzfd8rby1Nzn3NNvqKilwW+hjzM+pnXD1vZY\nX9c7D8/y5fD++2xq0b76NiHWoOIUShxrqCDf6lLC0o+dBvDk0KsYvX4+Ny36l9XlKAtp8FvkYOlB\n5m6cy0U9L8IRhPnsa+yJJ2DmTPjb3+Bce/b7NqgYBOKi0KkLjNfWqwMv4vOeQ7nzp38yfNMSq8tR\nFvErcURkpIisF5FMEZlaxeciIi94Pl8pIv19PtsiIqtEZLmIpAey+HA2d+NcisuLGZc6zupSYPZs\nuO8+ZvU8jZS9vQO2YHqgxZpOOF0tKdLuntoT4Z5RN5OR3JHnZz0Fq3Xm02hUbfCLiBN4GRgFpAKX\niUhqpd1GAV09fyYC/6j0+XBjTD9jTFrdS44MH6/9mJYJLTm1w6mW1jHmqmcovHAcq5I7cfeoW2xz\nM7cqgpBQMZgix3Lt7qmD4th63HDRAxTF1XOv25uVZXVJKsT8ueIfCGQaYzYbY0qBmUDlFTjGADOM\n2yKgqYi0DnCtESO/OJ/ZG2ZzYc8LcQZ5Tvtj2riRNz/+C3kNmnLtuIcojrXZk8NVSKgYDlJOgfMn\nq0sJazsaJ3PNxQ9Bfr47/Pfts7okFUL+BH9bYJvP+yzPNn/3McA3IrJURCbWttBI8uGaDykqL2JC\nvwnWFZGdDWefDcBVlzxMbsNm1tVSA3GmI7GuThTEfGd1KWEvI7kTfPoprF8PY8fqtA5RJBR3FU81\nxvTD3R00WUSqXGlERCaKSLqIpOfm5oagLOu8+cub9E7uTVoba3q+et/2L1b3O5XCrB1MuPihoK6b\nGwwNy0dQ6thIqWy1upTwN2IEvPUW/PADXH21e6oOFfH8Cf7tgO/YvnaebX7tY4zx/p0DfIq76+gI\nxpjpxpg0Y0xaUlLkPpm5JmcNi7cv5tp+1yJW9KcfPMgb/36Y7rlb+OMF97GydbfQ11BHCRVDwTgp\ncH5rdSlhL2XqHFJWNeVvwybAhx/Ctddq+EcBf4J/CdBVRDqKSBwwHphVaZ9ZwFWe0T0nA/nGmJ0i\nkiAijQBEJAE4C4jqYQRvLX+LGEcMV/S5IvQnP3gQzjmHAVlruW30HfzYaUDoawgAJ02p7xrAwZhv\nMZRZXU5EmH7SRfDwwzBjBlx/vYZ/hKs2+I0x5cAUYB6QAXxkjFkjIpNExDtX71xgM5AJvAbc5Nne\nEpgvIiuA/wFzjDFfBvhrCBtFZUW8s+Idzu9+PkkJIf6t5sAB9028hQu59by7mN3Txmv7+qFR+bm4\nZB8FTl1oJFBSCvrz7ODL4e234YYbwOWyuiQVJH5N0maMmYs73H23TfN5bYDJVbTbDPStY40RY8aK\nGeQV5nHrSbeG5Hze8fgJJYWsWfI8LFoEH3zAnKUNQnL+YKrn6k+sqz0HYj4joWIYgn2HoYaT50+9\nHIcx3PrWW+4N06dDjM7lGGls8MhodHAZF88seoa0NmkM6TAkZOdNOriXmR/ceyj0ufjikJ07mASh\nUfl5lDo2UeJYW30D5bdnT70cHnzQfdP3wgvdczipiKLBHyKzN8xmw+4N3DnozpDd1O2ct41P/3kH\nnfdkMWHsA6QsbWDbp3JrI6HidBymIQdiPre6lMgiQkrxifzfmZNw/We2e+RPXp7VVakA0uAPAWMM\nTy54kuOaHBe6mTh/+ol/v3cX8RWlXHrZ43zf+cTQnDeEHNSjUfm5FDoXUiqbrS4n4vyz/2j+OPZe\n98R9gwfDr79aXZIKEA3+EJizcQ4Lti1g6qlTiXGEoL/07bfhzDPZ3aApY694mlWtuwb/nBZpVD4W\nMQnsi33P6lIi0rxup3DRRQ+zb+sOdvfqB9/qENpIoMEfZBWuCu799l66Nu/KdSdcF9yTFRW5h+JN\nmACDB3PhFU+R1bRVcM9pMScNaVJ+IUXOxZTIeqvLiUhL26Uy9sq/k5fQFM46Cx57TEf8hDkN/iB7\nd+W7rM5ZzaOnP0qsMzZ4J8rMhEGD4I034P774euvya/fKHjns5FG5efhMI3ZG/sWBl1gJBh+bd6W\nsVf+nc+7D4H77uPr7qfo/D5hTIM/iPYV7+O+7+7jxDYnBm/6ZWPgn/+EAQNg61auGfcgKeWDSLk/\neh6XcNCApmVXUOJcTYHze6vLiViFcfW59bw7efCMGxm2OR369oVvvrG6LFULGvxBdPfXd7Pr4C6m\njZ4W8JE8KVPncPJN7/Bdl4Fw1VUsadSOwZf+nR8i8CauPxpWjCTO1Z29sa9TwX6ry4lcIrwz4Dwu\n/sOTUL8+nHkm/PGP7gcEVdjQ4A+S7379jteWvcYdg+6gf+v+1TeoCZeLS1fM46s3buLkbat4aMRE\nLr38MbY3SQ7secKI4KBF6RRcHGRv7GtWlxPxlrfpDr/8AnfcAa++Sla7Llx1ycMRNVw4komx4aLL\naWlpJj09fBfryinIYcD0AdSLqcfKSSupHxvARcvnz4fbb4clS/i5w/HcM/IWtjbTpQ+89sW8R37s\nB7QovZWGFWdaXU5U6J+VwVNfPEfnPdv5tvOJjJg9A3r0sLqsqCMiS/1d7Eqv+AOs3FXOpR9fSl5h\nHh+N+yhwoZ+ZCRddBEOGwI4d3H7ubVw+/lEN/UqalI8nvqIPe2KnUSpbrC4nKixr15NRE17i0WHX\ncuK2NZT16s1baefT79YPrC5NHYVe8QeQMYYpc6fwSvorzLhgBlf2vbLuB83IgCefhHffpUBimHbS\nRbw2cGxYrJZllQr2srPeLWBiaVXyJDEkWl1S1GhRsI/b57/L+BVfURwTR8Itk92/obZpY3VpEa8m\nV/wa/AFijOHur+/m6Z+f5q5T7uLJM5+sy8Fg8WJ44gn47DOKYuKZ2fcsXjn5YnIbNg9c0RGsRDLZ\nFX8vTtOCViVP4KSJ1SVFlS55W7lp0b+4cN1P4HS6ny257Tbo3t3q0iKWBn+IVbgquPOrO3lu8XNM\nPnEyL456sXajePbsgffec4/FX7ECmjXj+Z4jeXvAaPY20OCqqWLHanLi/ozTJJNc+hCxJrIfZrOj\nLRN7un9jfestKC2FoUPhhhvo/ksDSmLi3Ps8fq7FVUYG7eMPoX3F+xj9wWieW/wctwy8hRdGvVCz\n0D94kD9ecC//6XkaJcmt4JZb3NPgvvIK/PYbzw75g4Z+LdVz9Sa59C+4ZB/Z8XdQ7IjqNYCs0akT\nTJsGW7fy+NBr2LJiA1xxBYtevpq/ffkip21eCmW6mE6o6RV/HczdOJcbZ99I9sFsXhr1Ejem3ehf\nw99+c8958vnn8NVXUFzM7vqNmd1zCB/2OZu1LTsFt/AoUyZZ5MT9hXLJpnH5WJqWX4EQZ3VZUUmM\ni0G/reTSlV8zYtP/aFhaBM2awfnnw8iRcPrpkBy9w5LrQrt6gmxF9goe/OFBPl//OalJqbx5/puc\n1O6kqnd2uWDjRliyBH76yR34m90zSW5vlMRX3U7my26nkN4ulQqHM4RfRXRxUcje2Dc5GPMlTlcS\nTcuv8Czgov/mVokvL2XIr78wasMCzti4mCYlBe4P+vZ1TwU9aBAMHAjt24MV61OHmYAHv4iMBJ4H\nnMDrxpjHK30uns/PAQqBa4wxy/xpWxU7Bn9xeTGzN8zmtWWv8dWmr2gS34S7TrmLO0+5k/iYeFKm\nzqFhSSFddm/js+HNYO1aWLaM/QsW09j7Dd2kCQwbBqefzlkrnGxIPE6/oUOs2LGSvbFvUerYiNOV\nRKOKUSRUDCfGhHgpTHUYp6uC3tmZfN6j2H1xtGABlJS4P2zVCk48EXr3hl693H969IB6OrLNV0CD\nX0ScwAbgTCAL9+Lrlxlj1vrscw5wM+7gPwl43hhzkj9tq2KH4M8vzueX7F9YtnMZ//3tJxZmfE2D\n/EJ6k8wfkkZwfv2+NNiR6+62+e03ctdsJKnw90mrSpyxbEjswMrWXVneuhsrW3djY4v2uPSq3nIG\nQ5FjEQdi/kOxcyUAca6u1KvoRz1XL2JdHXHSXJdztFBceRk9cn+l784N9Nu5gYtc2bBhA5SX/75T\nmzZw3HGQkvL7n/bt3V1FSUnuv6Poh0Ogg38Q8JAx5mzP+3sBjDGP+ezzKvCDMeYDz/v1wDAgpbq2\nVal18O/ciSkupqKkiIriIsqLCqgoKaK8uBBXcTEVxYWHPispOkBJwX7K8vdQlr+P0n15lOXvwbU/\nH3NgP3KwkCYlkFQAyUVCvbIj/52KY+LY3jiZ7Y2TyGqSzLamrdjYogMbE9uzrUlLDfkwUCY7KHQu\npMixiBLHRpAKAMQ0INa0I9bVFqdpjpMmOExTnKYxQj3ExCHEI8TjMPEIsbjHSjhwLwz5+2v3e/0h\nUlexFWWk7NlBt7ytdN6TRbv8XbTdn0O7/Bza7M8l1lVxZKNGjdw/BJo3h8aN3e8bNTrydf36EB/v\n/hMX9/vryu+dTvcfh6Pmfwf5t/uaBL8/q4K0Bbb5vM/CfVVf3T5t/WwbMEUd2lC/3P1FxQDxNWhb\nGAMH4oWDcTEUxMVREJfMngZN2NyiFXsaJLGnQWP21G/C7gZNyEtoyvbGyexu0ES7asJcrGlDk/Jx\nNGEcLoopdWygTLZS5siiTLIodqymQvaClFd/sGMxwuE/FOz4fWO3mo6sZ1MCfNv+yD0drljaHIih\n/X5DUgEkFRqSCwxJBYUkFf5G831baLQLGpUaGpdCoxJDoxKIr+JnRTC58HwreP72Xk4aICfBQbv9\noSkoBMtB+UdEJgITgUTgoOe3htApB8oNFJQBZUABkANs9N0rEbDz4qN2ri/KazNAxaFXNRDl/27+\nqcB9helzlWmb2o5gPLVV/kY44KrrheRx/u7oT/BvB3x/xrbzbPNnn1g/2gJgjJkOTBeRdGNMih91\nhZynNr9+lbKCnevT2mpHa6sdre3Y/HmAawnQVUQ6ikgcMB6YVWmfWcBV4nYykG+M2elnW6WUUiFU\n7RW/MaZcRKYA83APyXzTGLNGRCZ5Pp8GzMU9oicT93DOCcdqG5SvRCmllF/86uM3xszFHe6+26b5\nvDbAZH/bVmN6DfYNNTvXBvauT2urHa2tdrS2Y7Dlk7tKKaWCRydpU0qpKGPr4BeRO0TEiIhtVtIQ\nkadEZJ2IrBSRT0WkqQ1qGiki60UkU0SmWl2Pl4i0F5HvRWStiKwRkVutrqkyEXGKyC8iMtvqWioT\nkaYi8rHn+y3D8zClLYjIbZ7/pqtF5AMRsewRWRF5U0RyRGS1z7bmIvK1iGz0/N3MRrVZniG2DX4R\naQ+cBWy1upZKvgZ6G2P64J6O4l4ri/FMi/EyMApIBS4TkVQra/JRDtxhjEkFTgYm26g2r1uBDKuL\nOIrngS+NMT2AvtikThFpC9wCpBljeuMeuDHewpLeBkZW2jYV+NYY0xX41vPeCm9zZG2WZ4htgx94\nFribGj/vElzGmK+MMd7HOBfhfjbBSgOBTGPMZmNMKTATGGNxTQAYY3Z6J+szxhzAHVxtra3qdyLS\nDjgXeN3qWioTkSbAacAbAMaYUmPMvmO3CqkYoL6IxAANgB1WFWKM+QnYU2nzGOAdz+t3gAtCWpRH\nVbXZIUNsGfwiMgbYboxZYXUt1bgW+MLiGo42XYatiEgKcAKw2NpKDvMc7osLl9WFVKEjkAu85emK\nel1EEqwuCsAYsx14Gvdv4ztxP7fzlbVVHaGl51kigGygpZXFHIMlGWJZ8IvIN57+wcp/xgD3AX+2\naW3efe7H3ZXxnlV1hgsRaQj8G/iTMWa/1fUAiMhoIMcYs9TqWo4iBugP/MMYcwLuOURscf/G018+\nBvcPpzZAgohcYW1VR+cZbm6rngOwNkMsm6vHGHNGVdtF5Hjc31ArPEsYtgOWichAY0y2lbV5icg1\nwGhghLF+PKw/U2pYRkRicYf+e8aYT6yux8dg4HzPlOL1gMYi8q4xxi4BlgVkGWO8vyF9jE2CHzgD\n+NUYkwsgIp8ApwDvWlrV4XaJSGtjzE4RaY174i3bsDpDbNfVY4xZZYxJNsakeObsyQL6hyr0q+NZ\nWOZu4HxjTKHV9WDjaTHE/ZP7DSDDGPOM1fX4Msbca4xp5/keGw98Z6PQx/P9vk1Euns2jQCOuY5F\nCG0FThaRBp7/xiOwyY1nH7OAqz2vrwY+t7CWw9ghQ2wX/GHgJaAR8LWILBeRadU1CCbPTSLvtBgZ\nwEc2mhZjMHAlcLrn32q55wpb+edm4D0RWQn0A/5mcT0AeH4L+RhYBqzCnSOWPY0qIh8APwPdRSRL\nRK4DHgfOFJGNuH9DqXblvxDWZnmG6JO7SikVZfSKXymloowGv1JKRRkNfqWUijIa/EopFWU0+JVS\nKspo8CulVJTR4FdKqSijwa+UUlHm/wHSiYlgxDGeOwAAAABJRU5ErkJggg==\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a6159438>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "n_samples = 10000\n",
    "\n",
    "μ1 = 1; σ1 = 1\n",
    "a = 2; b = 2\n",
    "\n",
    "s1 = σ1*np.random.randn(n_samples) + μ1 # sampes of X1 ~ N(μ1,σ1)\n",
    "\n",
    "μ2 = a*μ1 + b\n",
    "σ2 = σ1*a**2\n",
    "s2 = a*s1 + b # linear transformation: y = a*x + b\n",
    "\n",
    "x, gaussian1 = f(μ1, σ1, s2.min(), s2.max()) # generate gaussian N(μ1, σ1)\n",
    "_, gaussian2 = f(μ2, σ2, s2.min(), s2.max()) # generate gaussian N(μ2, σ2)\n",
    "\n",
    "plt.figure()\n",
    "\n",
    "plt.hist(s2, 100, [s2.min(), s2.max()], normed=1) # plot normalized histogram\n",
    "\n",
    "plt.plot(x, gaussian1, 'g') # plot gaussian N(1,1)\n",
    "plt.plot(x, gaussian2, 'r') # plot gaussian N(4,4)\n",
    "\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 14,
   "metadata": {},
   "outputs": [
    {
     "data": {
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      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a65820f0>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "samples_nonlinear = s1**2 + 2 # nonlinear transformation: y = x^2 + 2\n",
    "\n",
    "plt.figure()\n",
    "plt.hist(samples_nonlinear, 100, [samples_nonlinear.min(), samples_nonlinear.max()], normed=1) # plot normalized histogram\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# 3. Bivariate normal distribution"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## 3.1 Sum of two bivariate random variables"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": []
  },
  {
   "cell_type": "code",
   "execution_count": 15,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "def plotEllipse(μ, Σ, nσ=2, color='', plot=True):\n",
    "    \n",
    "    D, V = np.linalg.eig(Σ)\n",
    "    \n",
    "    angs = np.arange(0, 2*np.pi, 0.1)\n",
    "    y = nσ*np.array([np.cos(angs), np.sin(angs)])\n",
    "    \n",
    "    import scipy.linalg as la\n",
    "    axes = V.dot(la.sqrtm(np.diag(D)))\n",
    "    \n",
    "    el = axes.dot(y)\n",
    "    el += μ.reshape([2, 1])\n",
    "    \n",
    "    if plot:\n",
    "        plt.figure()\n",
    "        plt.plot(el[0], el[1], color+'-')\n",
    "        plt.show()\n",
    "    else:\n",
    "        return el"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 16,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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LhaGjpPOZy6ISdcMQwfAKHb8RbuqtxPTB+sLgB8TWYKOQlOkTfnNDbPqPL0fU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\nQogqQ45dCCGqjP8H/zdNrwCarmsAAAAASUVORK5CYII=\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a619d470>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "n_samples = 500\n",
    "\n",
    "μ1 = np.array([1, 0])\n",
    "Σ1 = np.array([[3, 2], [2, 3]])\n",
    "\n",
    "μ2 = np.array([2, 3])\n",
    "Σ2 = np.array([[2, 0], [0, 1]])\n",
    "\n",
    "# Generate samples\n",
    "x1 = np.random.multivariate_normal(μ1, Σ1, n_samples).T # X1 ~ N(μ1, Σ1)\n",
    "x2 = np.random.multivariate_normal(μ2, Σ2, n_samples).T # X2 ~ N(μ2, Σ2)\n",
    "\n",
    "# Generate ellipses\n",
    "el1 = plotEllipse(μ1, Σ1, plot=False)\n",
    "el2 = plotEllipse(μ2, Σ2, plot=False)\n",
    "el3 = plotEllipse(μ1 + μ2, Σ1 + Σ2, plot=False) # Sum of the two gaussians \n",
    "\n",
    "# Plot samples\n",
    "plt.plot(x1[0], x1[1], 'g+')\n",
    "plt.plot(x2[0], x2[1], 'b.')\n",
    "\n",
    "# Plot ellipses\n",
    "plt.plot(el1[0], el1[1], 'g-')\n",
    "plt.plot(el2[0], el2[1], 'b-')\n",
    "plt.plot(el3[0], el3[1], 'm-')\n",
    "\n",
    "plt.axis('equal')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## 3.2 Product of gaussians"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": []
  },
  {
   "cell_type": "code",
   "execution_count": 17,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# TODO: product of gaussians -> average"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## 3.3 Linear combination of normal random variables"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": []
  },
  {
   "cell_type": "code",
   "execution_count": 18,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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FGYVkl2Sz5JklxOgYGlQDWbdnscfYg80ITJdZxT/mcWdumsnqnNV8/pfPw44b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\nZ1l5d9TrawAAAABJRU5ErkJggg==\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x7fd2a62a82e8>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "A = np.array([[-1, 2], [2, 1.5]])\n",
    "b = np.array([[3], [0]])\n",
    "\n",
    "# Generate new samples\n",
    "# x5 is a linear combination of x1\n",
    "x5 = A.dot(x1) + b\n",
    "\n",
    "# Generate new ellipse\n",
    "# update gaussian parameters\n",
    "μ5 = A.dot(μ1.reshape([2, 1])) + b # μ5 = A·μ1 + b\n",
    "Σ5 = A.dot(Σ1.dot(A.T)) # Σ5 = A·Σ1·A'\n",
    "el5 = plotEllipse(μ5, Σ5, plot=False)\n",
    "\n",
    "# Plot samples\n",
    "plt.plot(x1[0], x1[1], 'g+')\n",
    "plt.plot(x5[0], x5[1], 'm.')\n",
    "\n",
    "# Plot ellipses\n",
    "plt.plot(el1[0], el1[1], 'g-')\n",
    "plt.plot(el5[0], el5[1], 'm-')\n",
    "\n",
    "plt.axis('equal')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": []
  }
 ],
 "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": "3.6.1"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 2
}