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    "# Import necessary libraries and set plot option\n",
    "%matplotlib inline\n",
    "%config InlineBackend.figure_format = 'svg'\n",
    "import numpy as np\n",
    "import matplotlib.pyplot as plt\n",
    "import math"
   ]
  },
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   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# 1D Geometry\n",
    "\n",
    "In this module you will be asked to do simple tasks on a 1D line. These are representitive of the tasks in a 1D CVT implementation."
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Simple Tasks"
   ]
  },
  {
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   "execution_count": 5,
   "metadata": {
    "collapsed": false
   },
   "outputs": [
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     "text": [
      "[[ 0.26191039]\n",
      " [ 0.15350777]]\n"
     ]
    }
   ],
   "source": [
    "# Create 2 random numbers on the line segment [0,1]\n",
    "\n",
    "x = np.random.rand(2,1)\n",
    "\n",
    "print(x)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# calculate distance between the points in x, store in d\n",
    "\n",
    "print(d)"
   ]
  },
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   "cell_type": "code",
   "execution_count": null,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# calculate centre of the two points in x, store in c\n",
    "\n",
    "print(c)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# create 5 evenly spaced points over the interval [0,1], store in x_uniform\n",
    "\n",
    "print (x_uniform)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# Find the interval that contains x[1], store in interval_uniform\n",
    "\n",
    "print (interval1)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# Find point in x_uniform closest to x[1], store in nearest_uniform\n",
    "\n",
    "print (nearest2)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# create 5 randomly spaced points over the interval [0,1], store in x_random\n",
    "\n",
    "print (x_random)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# Find the interval that contains x[2], store in interval_random\n",
    "\n",
    "print (interval_random)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# Find the point in x_random that closest to x[2], store in nearest_random\n",
    "\n",
    "print (nearest_random)"
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   "source": [
    "\n",
    "## Numerical Integration\n",
    "\n",
    "One particular task we will need to do is approximate integrals. There are numerous ways to do this. \n",
    "\n",
    "### Uniform Sampling \n",
    "\n",
    "In 1D an integral can be approximated using a quadrature rule:\n",
    "$$ \\int_0^1 f(x)dx \\approx \\sum\\limits_{i=1}^N  f(x_i)w_i$$ \n",
    "where $\\{x_i\\}$ $i=1,..., N$ are called quadrature points, and $\\{w_i\\}$, $i=1,..., N$ are called quadrature weights.\n",
    "\n",
    "Let $\\{x_i\\}$ be $N$ equally spaced points in the interval [0,1]. Then we can use a simple left Reimann sum to approximate the integral, i.e.\n",
    "$$ \\int_0^1 f(x)dx \\approx \\sum\\limits_{i=1}^{N-1} f(x_i)\\Delta x$$\n",
    "where $\\Delta x = \\frac{1}{N-1}$. "
   ]
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   "cell_type": "code",
   "execution_count": null,
   "metadata": {
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   "source": [
    "# Approximate the the integral of f(x)=x^2 on [0,1] using the points in x_uniform, store in int_reimann\n",
    "\n",
    "f = lambda x: x^2 #define inline function\n",
    "\n",
    "\n",
    "print (int_reimann)"
   ]
  },
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   "execution_count": null,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# Calculate error between your approximation and the exact integral, store in error_reimann\n",
    "\n",
    "int_exact = 1/3\n",
    "\n",
    "print (error_reimann)"
   ]
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   "execution_count": 63,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# Write a function left_reimann_sum that takes as inputs \n",
    "# a number of points N \n",
    "# a function handle \n",
    "# and returns the approximate integral from [0,1] calculated using the left Reimann sum\n",
    "\n",
    "def left_reimann_sum(N, f):\n",
    "    \n",
    "    x_list = np.linspace(0,1,N)\n",
    "    dx = 1/(N-1)\n",
    "    \n",
    "    int_approx = 0\n",
    "    \n",
    "    for i in range(0,N-2):\n",
    "        int_approx += dx*f(x_list[i])\n",
    "        \n",
    "    return int_approx"
   ]
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   "source": [
    "# Test this function on f(x)=sin(x) for N=5,9,17,33, store the errors in a list called err_reimann\n",
    "\n",
    "N_list = [5,9,17,33,65]\n",
    "err_reimann = []\n",
    "\n",
    "f = lambda x: math.sin(x)\n",
    "int_exact = -(math.cos(1) - 1)\n",
    "\n",
    "for n in N_list:\n",
    "    # call your left_reimann_sum with n and f, store in int_reimann\n",
    "    \n",
    "    int_reimann = left_reimann_sum(n, f)\n",
    "    err_reimann.append(abs(int_exact - int_reimann))\n",
    "\n",
    "# print and plot results\n",
    "print(err_reimann)\n",
    "plt.plot(N_list, err_reimann)\n",
    "plt.xlabel('N')\n",
    "plt.ylabel('error')\n",
    "plt.title('Left Reimann sum integration')"
   ]
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   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Random Sampling\n",
    "\n",
    "Another way to approximate integrals is by random sampling. This is known as Monte Carlo integration. Given $N$ random points $\\{x_i\\}$ over the interval [0,1], we can approximate an integral as:\n",
    "$$ \\int_0^1 f(x) dx \\approx \\frac{1}{N}\\sum\\limits_{i=1}^N f(x_i).$$"
   ]
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  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {
    "collapsed": true
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   "source": [
    "# Approximate the integral of f(x)=x^2 over the interval [0,1] using the points in x_random, store in int_monte_carlo\n",
    "\n",
    "f = lambda x: x^2\n",
    "\n",
    "\n",
    "print(int_monte_carlo)"
   ]
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   "cell_type": "code",
   "execution_count": null,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "# Calculate the error between the Monte Carlo approximation and the exact solution, store in error_monte_carlo\n",
    "\n",
    "int exact = 1/3\n",
    "\n",
    "\n",
    "print(error_monte_carlo)"
   ]
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  {
   "cell_type": "code",
   "execution_count": 48,
   "metadata": {
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   },
   "outputs": [],
   "source": [
    "# Write a function monte_carlo_integration that takes as inputs \n",
    "# a number of points N \n",
    "# a function handle \n",
    "# and returns the approximate integral from [0,1] calculated using Monte Carlo integration\n",
    "\n",
    "def monte_carlo_integration(N, f):\n",
    "    \n",
    "    random_list = np.random.rand(N,1)\n",
    "    \n",
    "    int_approx = 0\n",
    "    for i in range(1,N):\n",
    "        int_approx += f(random_list[i])/N\n",
    "    \n",
    "    return int_approx"
   ]
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   "source": [
    "# Test this function on f(x)=sin(x) for N=10,100,1000,10000,100000,1000000, plot the error vs N on a log-log plot\n",
    "\n",
    "N_list = [10,100,1000,10000,100000,1000000]\n",
    "err_monte_carlo = []\n",
    "f = lambda x: math.sin(x)\n",
    "\n",
    "int_exact = -(math.cos(1) - 1)\n",
    "\n",
    "for n in N_list:\n",
    "    # call your monte_carlo_integration with n and f, store in int_monte_carlo\n",
    "    \n",
    "    int_monte_carlo = monte_carlo_integration(n, f)\n",
    "    err_monte_carlo.append(abs(int_exact - int_monte_carlo))\n",
    "\n",
    "# print and plot results\n",
    "print(err_monte_carlo)\n",
    "\n",
    "plt.loglog(N_list, err_monte_carlo)\n",
    "plt.xlabel('Log(N)')\n",
    "plt.ylabel('Log(error)')\n",
    "plt.title('Monte Carlo integration')"
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