Mastering-Python-2e-code_2/CH_15_scientific_python/Untitled.ipynb

{
 "cells": [
  {
   "cell_type": "code",
   "execution_count": 1,
   "id": "c7e4522b",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "text/plain": [
       "[<matplotlib.lines.Line2D at 0x112a51700>]"
      ]
     },
     "execution_count": 1,
     "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": [
    "# The common shorthand for pyplot is plt\n",
    "import matplotlib.pyplot as plt\n",
    "import numpy as np\n",
    "\n",
    "# Enable in-line rendering for the Jupyter notebook\n",
    "%matplotlib inline\n",
    "\n",
    "a = np.arange(100) ** 2\n",
    "plt.plot(a)"
   ]
  }
 ],
 "metadata": {
  "kernelspec": {
   "display_name": "Python 3 (ipykernel)",
   "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": "3.9.6"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 5
}