{
 "cells": [
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Liquid/liquid equilibrium : ternary diagram and extraction\n",
    "\n",
    "The code allow to create the ternary diagram (in weight %) for the isopropyl ether (diluant D), acetic acid (solute A) and water (solvent S). It plots the binodal curve and the tie lines (conodales in French). It is then possible to calculate the extraction for a given mixture  i.e. the composition and the weight of the extract and the rafinate phases. "
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 6,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 864x864 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "import numpy as np\n",
    "import matplotlib.pyplot as plt\n",
    "#S for solvent, A for solute and D for diluant\n",
    "#SP for solvent phase DP for diluant phase\n",
    "# Equilibrium data \n",
    "xA_SP=np.array([0.69,  1.41,2.89,6.42,13.3,25.5,36.7,44.3,46.4])\n",
    "xS_SP=np.array([98.1 , 97.1,95.5,91.7,84.4,71.1,58.9,45.1,37.1])\n",
    "xA_DP=np.array([0.18,  0.37,0.79,1.93,4.82,11.4,21.6,31.1,36.2])\n",
    "xS_DP=np.array([0.5,0.7,0.8,1,1.9,3.9,6.9,10.8,15.1])\n",
    "\n",
    "#functions to change the coordinate from x,y plot to a ternary diagram\n",
    "def tri(xA,xS):\n",
    "    X=xS+xA/2\n",
    "    Y=xA*np.sqrt(3)/2\n",
    "    return X,Y\n",
    "def detri(X,Y):\n",
    "    xA=Y*2/np.sqrt(3)\n",
    "    xS=X-xA/2\n",
    "    return xA,xS\n",
    "#calcul of the position of data point in the x,y plot\n",
    "XSP,YSP=tri(xA_SP,xS_SP)\n",
    "XDP,YDP=tri(xA_DP,xS_DP)\n",
    "#plot of ternary diagram\n",
    "def ter_diag():\n",
    "    #Coordinates of based line\n",
    "    xA_line=np.array([100,  0,0,100])\n",
    "    xS_line=np.array([0,100,0,0])\n",
    "    #Coordinates of intermediate line\n",
    "    xA_uline=np.array([80, 80, 0,20,20, 0,80,60,60,0,40,40,0,60])\n",
    "    xS_uline=np.array([0,  20,20,0 ,80,80, 0,0,40,40,0,60,60,0])\n",
    "    #plot\n",
    "    bbox_props = dict(boxstyle=\"round,pad=0.3\", fc=\"white\", ec=\"white\", lw=1)\n",
    "    fig, ax = plt.subplots(figsize = (12, 12))   \n",
    "    plt.plot(XSP,YSP,color='green', marker='o', linestyle='dashed')\n",
    "    plt.plot(XDP,YDP,color='red', marker='o', linestyle='dashed')\n",
    "    X,Y=tri(xA_uline,xS_uline)\n",
    "    plt.plot(X,Y,'--', color='silver')\n",
    "    X,Y=tri(xA_line,xS_line)\n",
    "    plt.plot(X,Y)\n",
    "    for i in range(len(xA_SP)):\n",
    "        X=np.array([XSP[i],XDP[i]])\n",
    "        Y=np.array([YSP[i],YDP[i]])\n",
    "        plt.plot(X,Y, color='grey')\n",
    "    ax.axis(\"off\")\n",
    "    plt.text(-5, 0, \"D\", ha=\"center\", va=\"center\", size=20, bbox=bbox_props)\n",
    "    plt.text(105, 0, \"S\", ha=\"center\", va=\"center\", size=20, bbox=bbox_props)\n",
    "    plt.text(50, 90, \"A\", ha=\"center\", va=\"center\", size=20, bbox=bbox_props)\n",
    "    return\n",
    "\n",
    "ter_diag()\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "One realizes 100 g of a mixture water/acid/ether with 29 g in acid and 40 g in ether. \n",
    "\n",
    "**How many phases will be observed ?**\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 1,
   "metadata": {
    "scrolled": true
   },
   "outputs": [
    {
     "ename": "NameError",
     "evalue": "name 'ter_diag' is not defined",
     "output_type": "error",
     "traceback": [
      "\u001b[1;31m---------------------------------------------------------------------------\u001b[0m",
      "\u001b[1;31mNameError\u001b[0m                                 Traceback (most recent call last)",
      "Input \u001b[1;32mIn [1]\u001b[0m, in \u001b[0;36m<cell line: 9>\u001b[1;34m()\u001b[0m\n\u001b[0;32m      7\u001b[0m XS_M\u001b[38;5;241m=\u001b[39m\u001b[38;5;241m100\u001b[39m\u001b[38;5;241m*\u001b[39mm_S\u001b[38;5;241m/\u001b[39mm_M\n\u001b[0;32m      8\u001b[0m \u001b[38;5;66;03m#plot ternary diagram\u001b[39;00m\n\u001b[1;32m----> 9\u001b[0m \u001b[43mter_diag\u001b[49m()\n\u001b[0;32m     10\u001b[0m \u001b[38;5;66;03m#plot the mixture point\u001b[39;00m\n\u001b[0;32m     11\u001b[0m X_M,Y_M\u001b[38;5;241m=\u001b[39mtri(XA_M,XS_M)\n",
      "\u001b[1;31mNameError\u001b[0m: name 'ter_diag' is not defined"
     ]
    }
   ],
   "source": [
    "m_M=100\n",
    "m_A=29\n",
    "m_D=40\n",
    "#calculation of mass fraction\n",
    "m_S=m_M-m_A-m_D\n",
    "XA_M=100*m_A/m_M\n",
    "XS_M=100*m_S/m_M\n",
    "#plot ternary diagram\n",
    "ter_diag()\n",
    "#plot the mixture point\n",
    "X_M,Y_M=tri(XA_M,XS_M)\n",
    "plt.scatter(X_M,Y_M, color='red', marker='x')\n",
    "#find the two tie lines bordering the mixture \n",
    "c1=0\n",
    "c2=0\n",
    "for i in range(len(xA_SP)):\n",
    "    if Y_M < YDP[i]+(YSP[i]-YDP[i])*(X_M-XDP[i])/(XSP[i]-XDP[i]):\n",
    "        c1=i-1\n",
    "        c2=i\n",
    "        print ('There will be 2 phases and the mixure is located between the tie lines', c1,'and',c2)\n",
    "        break\n",
    "if c2==0 : print ('There is only one phase : the separation is impossible')\n",
    "\n",
    "#determination of the tie line for the mixture \n",
    "\n",
    "#function to find the intersection point between two lines AB and CD\n",
    "def intersec(xA,yA,xB,yB,xC,yC,xD,yD):\n",
    "    #slope of line A B\n",
    "    AB=(yB-yA)/(xB-xA)\n",
    "    #slope of line A B\n",
    "    CD=(yD-yC)/(xD-xC)\n",
    "    x=-(CD*xC-yC-AB*xA+yA)/(AB-CD)\n",
    "    y=AB*(x-xA)+yA\n",
    "    return x,y\n",
    "\n",
    "#find the intersection point I between the two bordering tie line\n",
    "X_I,Y_I=intersec(XDP[c1],YDP[c1],XSP[c1],YSP[c1],XDP[c2],YDP[c2],XSP[c2],YSP[c2])\n",
    "#find the intersection point between IM and the binodal curve (diluant side)\n",
    "X_DC,Y_DC=intersec(X_I,Y_I,X_M,Y_M,XDP[c2],YDP[c2],XDP[c1],YDP[c1])\n",
    "#find the intersection point between IM and the binodal curve (solvant side)\n",
    "X_SC,Y_SC=intersec(X_I,Y_I,X_M,Y_M,XSP[c2],YSP[c2],XSP[c1],YSP[c1])\n",
    "plt.scatter(X_DC,Y_DC, color='red', marker='x')\n",
    "plt.scatter(X_SC,Y_SC, color='red', marker='x')\n",
    "plt.plot([X_SC,X_DC],[Y_SC,Y_DC], color='red', marker='x')\n",
    "plt.show()\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    ">The mixture is below the spinodal curve : there will be two phases. The extraction is then possible by separating the two phases.\n",
    "    \n",
    "**Determine the composition of the phases and their weight.**\n",
    ">The plot of the tie line that pass through the mixture point allow to determine the composition of the two phases.\n",
    ">The weight of the two phases (the mass of the raffinate rich in diluant, $m_R$ and the mass of the extract rich in solvant, $m_E$) can be determined by a global mass balance and a partial mass balance on the solute :\n",
    ">$$m_M=m_R+m_E$$\n",
    ">$$m_M x_{MA} = m_R x_{RA} + m_E x_{EA}$$\n",
    "It leads to the following relationship for the mass of extract :\n",
    ">$$m_E=m_M\\frac{ x_{MA}-x_{RA}}{x_{EA}-x_{RA}}$$\n",
    "\n",
    "\n",
    "\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 8,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "The composition of the raffinate phase, R, is :\n",
      "x_A= 21.96 % x_S= 7.05 % x_D= 71.0 %\n",
      "The composition of the extract phase, E, is :\n",
      "y_A= 37.03 % y_S= 58.3 % y_D= 4.67 %\n",
      "The mass of extract is : 46.73 g and the mass of raffinate is :  53.27 g \n",
      "X= 0.30924217687377703    Y= 0.6351193422819925\n"
     ]
    }
   ],
   "source": [
    "print ('The composition of the raffinate phase, R, is :')\n",
    "xA,xS=detri(X_DC,Y_DC)\n",
    "print ('x_A=', round(xA,2),'% x_S=', round(xS,2),'% x_D=', round(100-xS-xA,2),'%')\n",
    "print ('The composition of the extract phase, E, is :')\n",
    "yA,yS=detri(X_SC,Y_SC)\n",
    "print ('y_A=', round(yA,2),'% y_S=', round(yS,2),'% y_D=', round(100-yS-yA,2),'%')\n",
    "m_E=m_M*(XA_M-xA)/(yA-xA)\n",
    "m_R=m_M-m_E\n",
    "print ('The mass of extract is :', round(m_E,2), 'g and the mass of raffinate is : ', round(m_R,2), 'g ')\n",
    "print ('X=', xA/(100-xS-xA),'   Y=', yA/yS)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "> Now you can **play** with the code to find the composition of the phases (if any) by changing of m_A and m_D. You should then be able to fell the ternary graphical construction and the link with the mass balance.\n",
    "\n",
    "The liquid/liquid equilibrium can also be represented as the mass ratio of solute in the extract phase, Y, as a function of the mass ratio of solute in the raffinate, X. This way to represent the liq/liq equilibrium (close to the one used in lid/gaz equilibrium) relies on the assumption that the diluant and the solvent are non miscible (the quantities of diluant (solvent) in solvent (diluant) phases are considered as neglegible). \n",
    "\n",
    "Another assumption is to consider that the distribution (or partition) curve is linear. One can thenn define a partition coefficient, m, that is defined as :\n",
    "$$Y=m X$$\n",
    "**When the assumptions can be done**, it is usefull (it speeds calculation !) to represent the liq/liq equilibrium with this simple and single parameter.\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 9,
   "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"
    },
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "The partition coefficient for the whole concentration range is [1.78837618]\n"
     ]
    }
   ],
   "source": [
    "#calculation of mass ratio\n",
    "Y=xA_SP/xS_SP\n",
    "X=xA_DP/(100-xS_DP-xA_DP)\n",
    "#plot the distribution curve\n",
    "plt.plot(X,Y, marker='x')\n",
    "plt.xlabel('X')\n",
    "plt.ylabel('Y')\n",
    "\n",
    "#regression lineaire \n",
    "def fit(x,m):\n",
    "    return m*x\n",
    "from scipy.optimize import curve_fit\n",
    "m,p=curve_fit(fit, X[:], Y[:])\n",
    "plt.plot(X, fit (X,m), 'r--')\n",
    "plt.show()\n",
    "print ('The partition coefficient for the whole concentration range is', m)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {},
   "outputs": [],
   "source": []
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {},
   "outputs": [],
   "source": []
  }
 ],
 "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": "3.9.12"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 2
}