{
 "cells": [
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {
    "scrolled": false
   },
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "La soluzione è [K,L,q]= [6.25, 0.0, 25.0]\n"
     ]
    },
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x7f3a304a6b38>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "#!/usr/bin/python3\n",
    "#exec(open('/path/to/file/ConsMaxM.py').read())\n",
    "\"\"\"\n",
    "Nel problema min rK+wL sul vincolo f(K,L)=q \n",
    "trova il massimo q tale che L=0\n",
    "\"\"\"\n",
    "from sympy import *\n",
    "\n",
    "K,L,q = symbols('K L q')\n",
    "#paramteri funzione di produzione\n",
    "[a,b]=[10,1]\n",
    "#prezzi fattori\n",
    "[r,w]=[2,1]\n",
    "\n",
    "#funzione produzione\n",
    "def f(K,L):\n",
    "    return a*sqrt(K)+b*L\n",
    "#produttività marginali\n",
    "fK=diff(f(K,L),K)\n",
    "fL=diff(f(K,L),L)\n",
    "S=solve([fK/fL-r/w, f(K,L)-q,L],[K, L,q], dict=True)\n",
    "[K0,L0,q0]=[float(S[0][K]),float(S[0][L]),float(S[0][q])]\n",
    "print('La soluzione è [K,L,q]=',[K0,L0,q0])\n",
    "\n",
    "#plot\n",
    "from numpy import linspace, meshgrid\n",
    "import numpy as np\n",
    "import matplotlib\n",
    "import matplotlib.pyplot as plt\n",
    "import matplotlib.lines as lines\n",
    "\n",
    "fl=lambdify((K,L), f(K,L), 'numpy')\n",
    "F=f(K0,L0)\n",
    "C=r*K0+w*L0\n",
    "\n",
    "#fig = plt.figure(figsize=(15,10))\n",
    "fig = plt.figure(figsize=(10,6))\n",
    "xbar=2*K0\n",
    "ybar=1.2*q0/b\n",
    "plt.xlim([0, xbar])\n",
    "plt.ylim([0, ybar])\n",
    "#plot three isoquants around  level f(K0,L0)\n",
    "X = linspace(0, xbar,400)\n",
    "Y = linspace(0, ybar,400)\n",
    "x,y=meshgrid(X,Y)\n",
    "isoq=fl(x,y)\n",
    "isoc=r*x+w*y\n",
    "cs=plt.contour(x,y,isoq,levels=[0.8*F,F,1.5*F],colors='orange')\n",
    "plt.clabel(cs,fontsize=12)\n",
    "#plot isocosts\n",
    "C1=r*(0.8*F/a)**2\n",
    "S2=solve([fK/fL-r/w, f(K,L)-1.5*F],[K, L], dict=True)\n",
    "[K2,L2]=[float(S2[0][K]),float(S2[0][L])]\n",
    "C2=r*K2+w*L2\n",
    "plt.contour(x,y,isoc,levels=[C1,C,C2], colors='navy')\n",
    "\n",
    "plt.xlabel('Fattore K',fontsize=14)\n",
    "plt.ylabel('Fattore L',fontsize=14)\n",
    "plt.title('Minimizzazione costo su isoquanto f=%s'%int(F),fontsize=18)\n",
    "# save figure if you want\n",
    "#fig.savefig('ConsMaxM.pdf')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "code",
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