2018-2019/PreStSauveur/Programmation/5-listes_et_fonctions_sol.ipynb

{
 "cells": [
  {
   "cell_type": "code",
   "execution_count": 7,
   "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"
    }
   ],
   "source": [
    "from math import cos, pi\n",
    "import matplotlib.pyplot as plt\n",
    "\n",
    "def f(x):\n",
    "    return x**2 - 10*x + 20\n",
    "\n",
    "images = []\n",
    "antecedants = []\n",
    "\n",
    "for x in range(10):\n",
    "    images.append(f(x))\n",
    "    antecedants.append(x)\n",
    "\n",
    "plt.plot(antecedants, images)\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 11,
   "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"
    }
   ],
   "source": [
    "from math import cos, pi\n",
    "import matplotlib.pyplot as plt\n",
    "\n",
    "def g(x):\n",
    "    return -(x - 5)**2 + 5\n",
    "\n",
    "images = []\n",
    "antecedants = []\n",
    "\n",
    "for x in range(15):\n",
    "    images.append(g(x))\n",
    "    antecedants.append(x)\n",
    "\n",
    "plt.plot(antecedants, images)\n",
    "plt.show()"
   ]
  },
  {
   "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"
    }
   ],
   "source": [
    "from math import sin, pi\n",
    "import matplotlib.pyplot as plt\n",
    "\n",
    "def f(x):\n",
    "    return sin(x*pi/2)\n",
    "\n",
    "min_x = -2\n",
    "max_x = 2\n",
    "\n",
    "images = []\n",
    "antecedants = []\n",
    "\n",
    "x = min_x\n",
    "while x <= max_x:\n",
    "    antecedants.append(x)\n",
    "    images.append(f(x))\n",
    "    x += 1\n",
    "\n",
    "plt.plot(antecedants, images)\n",
    "\n",
    "\n",
    "images = []\n",
    "antecedants = []\n",
    "\n",
    "x = min_x\n",
    "while x <= max_x:\n",
    "    antecedants.append(x)\n",
    "    images.append(f(x))\n",
    "    x += 0.5\n",
    "\n",
    "plt.plot(antecedants, images)\n",
    "\n",
    "\n",
    "images = []\n",
    "antecedants = []\n",
    "\n",
    "x = min_x\n",
    "while x <= max_x:\n",
    "    antecedants.append(x)\n",
    "    images.append(f(x))\n",
    "    x += 0.1\n",
    "\n",
    "plt.plot(antecedants, images)\n",
    "\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {},
   "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": "3.7.2"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 2
}