{
 "cells": [
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## This notebook shows an application of kneed in selecting the optimal number of clusters from kmeans clustering algorithm."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 1,
   "metadata": {},
   "outputs": [],
   "source": [
    "%matplotlib inline"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Look at the K means tutorial posted [here](https://pythonprogramminglanguage.com/kmeans-elbow-method/)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    },
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "# clustering dataset\n",
    "# determine k using elbow method\n",
    " \n",
    "from sklearn.cluster import KMeans\n",
    "from sklearn import metrics\n",
    "from scipy.spatial.distance import cdist\n",
    "import numpy as np\n",
    "import matplotlib.pyplot as plt\n",
    " \n",
    "x1 = np.array([3, 1, 1, 2, 1, 6, 6, 6, 5, 6, 7, 8, 9, 8, 9, 9, 8])\n",
    "x2 = np.array([5, 4, 5, 6, 5, 8, 6, 7, 6, 7, 1, 2, 1, 2, 3, 2, 3])\n",
    " \n",
    "plt.plot()\n",
    "plt.xlim([0, 10])\n",
    "plt.ylim([0, 10])\n",
    "plt.title('Dataset')\n",
    "plt.scatter(x1, x2)\n",
    "plt.show()\n",
    " \n",
    "# create new plot and data\n",
    "plt.plot()\n",
    "X = np.array(list(zip(x1, x2))).reshape(len(x1), 2)\n",
    "colors = ['b', 'g', 'r']\n",
    "markers = ['o', 'v', 's']\n",
    " \n",
    "# k means determine k\n",
    "distortions = []\n",
    "K = range(1,10)\n",
    "for k in K:\n",
    "    kmeanModel = KMeans(n_clusters=k).fit(X)\n",
    "    kmeanModel.fit(X)\n",
    "    distortions.append(sum(np.min(cdist(X, kmeanModel.cluster_centers_, 'euclidean'), axis=1)) / X.shape[0])\n",
    "\n",
    "# Plot the elbow\n",
    "plt.plot(K, distortions, 'bx-')\n",
    "plt.xlabel('k')\n",
    "plt.ylabel('Distortion')\n",
    "plt.title('The Elbow Method showing the optimal k')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## focus on the second plot showing the distortion as a function of k clusters"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "range(1, 10) \n",
      " [3.4577032384495707, 1.7687413573405673, 0.8819889697423957, 0.7587138847606585, 0.6760729098960964, 0.6046508654312025, 0.5001764545028053, 0.41652236641410356, 0.3529411764705882]\n"
     ]
    }
   ],
   "source": [
    "print(K, '\\n', distortions)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Use kneed to determine best k"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 4,
   "metadata": {},
   "outputs": [],
   "source": [
    "import sys\n",
    "sys.path.append('..')\n",
    "\n",
    "from kneed import KneeLocator"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 5,
   "metadata": {},
   "outputs": [],
   "source": [
    "kn = KneeLocator(list(K), distortions, S=1.0, curve='convex', direction='decreasing')"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 6,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "text/plain": [
       "3"
      ]
     },
     "execution_count": 6,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "kn.knee"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 7,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "text/plain": [
       "<matplotlib.collections.LineCollection at 0x123aeb908>"
      ]
     },
     "execution_count": 7,
     "metadata": {},
     "output_type": "execute_result"
    },
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "plt.xlabel('k')\n",
    "plt.ylabel('Distortion')\n",
    "plt.title('The Elbow Method showing the optimal k')\n",
    "plt.plot(K, distortions, 'bx-')\n",
    "plt.vlines(kn.knee, plt.ylim()[0], plt.ylim()[1], linestyles='dashed')\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {},
   "outputs": [],
   "source": []
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {},
   "outputs": [],
   "source": []
  }
 ],
 "metadata": {
  "kernelspec": {
   "display_name": "kneed",
   "language": "python",
   "name": "kneed"
  },
  "language_info": {
   "codemirror_mode": {
    "name": "ipython",
    "version": 3
   },
   "file_extension": ".py",
   "mimetype": "text/x-python",
   "name": "python",
   "nbconvert_exporter": "python",
   "pygments_lexer": "ipython3",
   "version": "3.7.13"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 2
}