{
 "cells": [
  {
   "cell_type": "code",
   "execution_count": 1,
   "id": "sought-poetry",
   "metadata": {},
   "outputs": [],
   "source": [
    "from sympy import Matrix, symbols, sin, cos, trigsimp, init_printing, I, dsolve, \\\n",
    "    simplify, Eq, solve, expand, lambdify, diff, solveset, exp, factor, Sum, Derivative, \\\n",
    "    Function"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "id": "consolidated-wrist",
   "metadata": {},
   "outputs": [],
   "source": [
    "init_printing()"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "id": "productive-pantyhose",
   "metadata": {},
   "outputs": [],
   "source": [
    "import numpy as np\n",
    "import matplotlib.pyplot as plt"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 4,
   "id": "natural-department",
   "metadata": {},
   "outputs": [],
   "source": [
    "%matplotlib inline"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "healthy-developer",
   "metadata": {},
   "source": [
    "The object is to model a PWM signal through a simple resistor capacitor network (perhaps not the modern definition of network) of components"
   ]
  },
  {
   "attachments": {
    "pwm.png": {
     "image/png": "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"
    }
   },
   "cell_type": "markdown",
   "id": "superb-crowd",
   "metadata": {},
   "source": [
    "![pwm.png](attachment:pwm.png)"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "broadband-ladder",
   "metadata": {},
   "source": [
    "We assume there is no load on $V_{out}$ yet so we can consider it just a measurement point and then The differential equation for this follows:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 5,
   "id": "worst-cleaning",
   "metadata": {},
   "outputs": [],
   "source": [
    "c1, rho, rl, R,C,vin,vout, vc, t, t0 = symbols('C1 rho R_L R C V_{in} V_{out} v_c t t0')"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "excellent-prior",
   "metadata": {},
   "source": [
    "First we present the specific ODE for this circuit."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 6,
   "id": "selected-impact",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": "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\n",
      "text/latex": [
       "$\\displaystyle - C \\frac{d}{d t} \\operatorname{V_{out}}{\\left(t \\right)} + \\frac{V_{in} - \\operatorname{V_{out}}{\\left(t \\right)}}{R} = 0$"
      ],
      "text/plain": [
       "    d                V_{in} - V_{out}(t)    \n",
       "- C⋅──(V_{out}(t)) + ─────────────────── = 0\n",
       "    dt                        R             "
      ]
     },
     "execution_count": 6,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "v = Function('V_{out}')\n",
    "e1 = (vin - v(t))/R - C*Derivative(v(t)); Eq(e1,0)"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "cubic-rally",
   "metadata": {},
   "source": [
    "Then we solve it for $V_{out}$ which is write it as function of the output voltage."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 7,
   "id": "patient-civilization",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": "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\n",
      "text/latex": [
       "$\\displaystyle \\operatorname{V_{out}}{\\left(t \\right)} = C_{1} e^{- \\frac{t}{C R}} + V_{in}$"
      ],
      "text/plain": [
       "                 -t          \n",
       "                 ───         \n",
       "                 C⋅R         \n",
       "V_{out}(t) = C₁⋅ℯ    + V_{in}"
      ]
     },
     "execution_count": 7,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "d1 = dsolve(e1); d1"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "charming-uruguay",
   "metadata": {},
   "source": [
    "Now we have to try and compute C1, the integration constant, from the output voltage at a given time $t_0$ which in our case we prefer to set to zero.\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 8,
   "id": "norman-integrity",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": "iVBORw0KGgoAAAANSUhEUgAAAIoAAAAVCAYAAACZt3byAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAFoElEQVRoBe2a3XEUORCAB4oAtnAGSwY+iOBwBthEAM7gqHuy3yjIAIiAwxmciQCODHAG59sMfN8npKn56dlZ7w67W5S7Sm6p1Wq1Wt0tabzVzc1NdVd+XRucnZ3Nb7u/0Zj71R38shY4Pz//g8UdrrHAeR5bD72nt20CWeBzZBSFLqm/g37RlEvb/k+UOeWKcgntFLyXgG4vUeyY8jQrqM7foEurgbbr+ZsiXlC+Uo6hW98ZMP8zJn8CftVVAtqbTPsX/IjyBprrq4G2TrYAv5e4saMoBGEz0H8UDfmbtAjo0+in4JaxI959oaHrO3TRadQ7GS3Sjb7vmcdA2Smgi/vxGdzbC2j/0PcanAI580o7ot51Fum/Q19McvQoCIEWo2oZbN1J0O0pxY1eF0r0jWU/M+TOnSQvUp118BZkO8zAdban7r7Z7vFnWlr/JI6StdEb9eQQUMhU9jrs/LlEdRrUa2xq9HZdOsAh9TAQoOuIHqv7AifoFGU/M/m3QMkv0Ayolp2yDGXNpnaUCqE9Y2baAThSMtB770gl2nrnfdbUtL0X2QQ9vJu0jpCGNT36rxvtUi385T5W6GL7TiZ3FIT2HAWal6UhI9O934DupuYF5aSrKX1e0o3IfYEjFOk5LXq2ssWAsg8DurKOpnQUL3NCy1FQ0LRcIjIx+EfFKS3eunM/K6ZydTZim+DdJUrzTZ5t1h8zWdmL5rzFCXT4IYicSVnzKR2lpC+fWwmyIzwC9zwchj8pXaP/GLiff4uzq3cTHrK+ZcZv8q5VR36Ze5XxbnZ0vKwy9iBgUtb8AUoo+DMl8qZgXCL5naB73/iamU3FBTxywqcw9EmPIuRpzOiMTZFEf/Rq6X0XKYp3MeOvKK45XWpzO8yW3bETtKN1DYl1vZHjLnOekm38rtIFE8BMR1Fo773d5R5rK4ciWzpOqG/LiEk15oscoYJu1vJL49vEuNkfX22+bpxLR/cSGwYCfZMA8n0tlo1cWyZyyv5ECaHQyqnQnCc53oMmZYK6E7kpTuyR0zu7oRkdhxS/GtZGpq5j6bB+5DE7lShSTugE8GwV0OOCYmC9BH8Ej15i4UtfOOHVJqZ2P3a5abZ1Op+l98AVWF6PNnneUrTBE4p3o/I9J42HNgRmDmVH4BUgBXKnszhidEVQ1vX9zoBNm8UjP7Gw3tECzUlN3Ub3s9yuCoam4TTIY3ks1H3HR4ujayfwF7OWTe4FQlMj9PbTvsfb+7wWM5KBUNFegFoBkHnKES6PG+cYHetVLo5bBilYBxi0r5fdLhig6hnJ1omufpajFO/vKuSkGs3jwDO/KCbdDTjM9OYGzKAtO1/p3iqUtQ0ZNinD2lyL2aKO0rxe123mGIJik6H+Mbr3KLNQD5hXu16D60cEde17QnnRG/CDkJxo6qPHaNERauM0J4eeMg7YSKpv8g26C/xYxkA39RpNmxqviNwYqyvFzaj1HxBq5EZ6S6tfhgNjNyFrPzPHELjxPjK0tZdXsf/PcU0RuAenkzoKkzUzQTRpBY8e7OS+nDyGmgpKN9UWOKZipnFcl7fwbB2ji8YeA48Q19oFj9EvXWKjHY1J3cxr39Dn+cJjpqsoob2gL2BsHXlpYPAH3nTkgy+nPnqC6XoknaGk7VrhrJSXtq7j+JOFOlX2pI0TNIxlq5DX4Tpr3alreEsKKNolw+oAFW2xmejAdgZ5Uj/YsfUdJvdHyOOxtm3EsCLNe2Y6aif5mcGKkya2bIwPNIwqXxHFWDpQ67/L9HmWa7Tv1EezFXx7B+itoU3xQu+3H/T72pNevqb6Cd77jZfXC3CVZegs6VIrbQwY40Vaeyb7jvF3+xmnUxqk6jPN71G6k9y1d28BNljH8vWZNvq2GjGu5Whbzyi3VfiOf30LsNlmBT9D+JlhZYDfTF5newf+DwyUwTtwWODXAAAAAElFTkSuQmCC\n",
      "text/latex": [
       "$\\displaystyle - V_{in} + \\operatorname{V_{out}}{\\left(0 \\right)}$"
      ],
      "text/plain": [
       "-V_{in} + V_{out}(0)"
      ]
     },
     "execution_count": 8,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "solve(d1, c1)[0].subs(t,0)"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "square-montana",
   "metadata": {},
   "source": [
    "If the voltage is growing by charging the capacitor then we expect the graph to look like the following."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 9,
   "id": "lasting-matrix",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "text/plain": [
       "Text(0.5, 1.0, '$y=e^{-x}$')"
      ]
     },
     "execution_count": 9,
     "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": [
    "fig, ax = plt.subplots()\n",
    "x = np.linspace(0,5,1000 )\n",
    "y = (1-np.exp(-x))*100\n",
    "ax.plot(x,y)\n",
    "ax.grid()\n",
    "ax.set_xlabel(\"x (RC units)\")\n",
    "ax.set_ylabel(\"y (% of max voltage)\")\n",
    "ax.set_title(\"$y=e^{-x}$\")"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "identified-ukraine",
   "metadata": {},
   "source": [
    "If the capacitor is discharging through the resistor to zero volts then we expect the following."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 10,
   "id": "wired-courage",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "text/plain": [
       "Text(0.5, 1.0, '$y=e^{-x}$')"
      ]
     },
     "execution_count": 10,
     "metadata": {},
     "output_type": "execute_result"
    },
    {
     "data": {
      "image/png": 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YX8AYoBYYH0z/Gfg1ULLHetv3t63Ro0d7c8yYMaNZ3z9YU+au9b4/ed6nzF3bqvsNq71hUpuTg9p8YID3fS9/V2O5o/l9M7vPzCYEr3uI/ro/WGuBte7+TjD9JDAK2GRmRQDB++Zm7COhfXlED4YUdeCP0z7WmEgiklBiKQpXAwuB7xPt5lkEfOdgd+juG4E1ZjY4mHVisM1ngSuCeVcQffRnu5SSYtxw6mBWbS3nMY2gKiIJZF+XpO52OnCHu/+xBfd7LfCImaUDK4AriRaox83sG8Bq4CstuL+EM2FwN8YWd+a26Us5b1QvstI1coiIhC+WI4WziF5x9PfgeQqxFJJ9cvd57j7G3Ue4+znuvt3dt7r7ie4+MHhv1yOxmhk3TDqUzTureEBPZxORBLHfouDuVwIDgCeAi4HlZnZvvIMlg7HF+ZxwaAF3zlzGjvKa/X9BRCTOYjlSwN1rgJeAyURPMp8dz1DJ5PpTBlNaWcudry4PO4qISEw3r00ysweAZURHR70X0IhuLWRojw6cO7Inf3vzE9ZuLw87jogkuViOFL4GTAEGufsV7v6iu+tJ9C3oP08dTIrBLVOXhB1FRJJcLOcULnT3Ke5e1RqBklGPTllcdewhPDd/PbNXtZsxAEWkDYrpnILE37eP709BXga/eWGRBssTkdCoKCSInIxUrj91MHNXl/DcBxvCjiMiSSqWE80FTcwb3NS60jznj+rFYT06cMtLH1FZUxd2HBFJQrEcKbxuZhfsnjCzHwNPxy9S8kpJMX5+xlDWlVRw7+srwo4jIkkolqIwAbjMzJ4ws9eAQcC4uKZKYkf178Kkw7pz+4xlrCupCDuOiCSZWK4+2gBMBY4i+qjMh9y9LM65ktovvjwUgF8/tyjkJCKSbGI5pzANGE/0ecqnA38ys7g9v1mgZ6csrj1hIFMXbmTmknY7griIJKBYuo/ucPfL3b3E3RcARwM74pwr6X3z2H4c0jWHXz67UCedRaTVxNJ9NGWP6Vp3/3XcEgkAGakRbjr7MFZtLeee13TSWURaRyzdR0ea2XtmVmZm1WZWZ2Y6UmgFxw7sxhnDi7h9xjLWbNO4SCISf7F0H90OXAQsBbKAbwJ3xDOUfObnZw4hkmL89zMLdKeziMRdrENnLwMi7l7n7vcTvUxVWkFRxyx+fMpgZizZwrPz14cdR0TauViKQnnw2Mx5ZvZ7M/shkBPnXNLI144u5ojenbjpuUVs21UddhwRacdiKQqXARHge8AuoDdwXjxDyedFUoxbzhtBaUUNv35e9y6ISPzEcvXRKnevcPdSd7/J3X8UdCdJKxrcPY/vTujP03PX6d4FEYmbWK4+OtPM5prZNjMrNbOdZlbaGuHk8645YQD9u+XwX08vYFeVnnMkIi0vlu6jW4ErgC7u3sHd89y9Q3xjSVMyUiPcct4I1u+o4JapH4UdR0TaoViKwhpgget6yIQwpjifK4/ux0OzVvH60i1hxxGRdiaWonAD8KKZ/dTMfrT7Fe9gsnc3TBpM/245/OcTH7CjvCbsOCLSjsRSFH4LlAOZQF6jl4QkMy3Cn756BFvKqvjVcwvDjiMi7UhqDOvku/spcU8iB2REr05ce8IAbn1lKacMLeS04UVhRxKRdiCWI4VXzExFIQFdM3EAw3t25GdPf8jmnZVhxxGRdiCWonANMNXMKnRJamJJi6Twp68eTnl1Hf/5xAfU1+taABFpnlhuXstz9xR3z9IlqYlnQEEevzhzKK9+vIV739AQ2yLSPDENiCeJ7ZLxfThtWHd+P3UJ89aUhB1HRNqw0IqCmUWCO6WfD6bzzWyamS0N3juHla2tMTNu/o8RFHbI5NpH51BaqctUReTg7LUomFm/OO/7OmBxo+kbgenuPhCYHkxLjDpmp3HbRSNZX1LJT//5oZ69ICIHZV9HCk8CmNn0lt6pmfUCzgDubTT7bODB4PODwDktvd/2bnTfzvz4lEG88MEGJr+3Juw4ItIG7es+hRQz+yUwqKk7mN39j83Y761E75RufBNcobtvCLa9wcwKmrH9pPWd4/oza/lWfvnsQob16MjwXh3DjiQibYjtrZvBzAYT/bX+A+CuPZe7+00HtUOzM4HT3f27ZjYBuN7dzzSzEnfv1Gi97e7+hfMKZnYVcBVAYWHh6MmTJx9MDADKysrIzc096O8nqtJq51dvVWDAr47OIi/dgPbb3n1Rm5OD2nxgJk6cONvdxzS50N33+QJO2986B/IC/g+wFlgJbCQ6hMbDwBKgKFinCFiyv22NHj3am2PGjBnN+n4im79muw/8rxf9knve9tq6endv3+3dG7U5OajNBwZ43/fydzWWq4/eMrM/mtn7wesPZnbQfRLu/lN37+XuxcCFwL/d/VLgWaJDdBO8P3Ow+5DoMBi/OXsYbyz7lP99eUnYcUSkjYhl7KO/AQuAC4Lpy4D7gf9o4Sw3A4+b2TeA1cBXWnj7SeeCsb2Zu6aEO2cu5/BeHckMO5CIJLxYikJ/d2/8TOabzGxeS+zc3WcCM4PPW4ETW2K78plfnTWURRtK+fHj87lxbHrYcUQkwcXSfVRhZl/aPWFmxwAV8YskLSkjNcJfLx1NbmYqt86u1MB5IrJPsRSF7wB3mNlKM1sJ3A58O66ppEV175jJvZePZWe1c9VDs6msqQs7kogkqFgGxJvv7ocDI4AR7j7S3T+IfzRpScN7deSqERnMW1PC9U/M1x3PItKkmMc+cvdSd9eQ2W3YmO6p3DBpMM9/sIFbX1kadhwRSUCxnGiWduTq4/uzYssu/jx9Kb3zszl/dK+wI4lIAlFRSDJmxu/OHc6GHRX85KkPyM9J44RDC8OOJSIJIubuIzMbYGYPm9lTZnZUPENJfKWnpnDXpaMZUpTHdx+Zw5zV28OOJCIJYl9DZ+95r9Ovgf8hOqT1nfEMJfGXl5nG/V8bR2GHTL7+wHss27wz7EgikgD2daTwnJld1mi6BigOXrqmsR3olpfBQ18fR2pKCpff9y4bduj2E5Fkt6+iMAnoaGZTzexY4HrgOOA04JLWCCfx17dLDg9cOZbSylouuecd3dwmkuT2WhTcvc7dbwe+SnQI7VuB+939R+7+UevEk9YwrGdH7r9yLBtLK7n03nfYWlYVdiQRCcm+zimMN7MniZ4/uB/4BfBbM/vf5oySKolpbHE+914xhlVby7n0vncpKa8OO5KIhGBf3Ud3AT8BbgH+6u7L3f1C4Dng8dYIJ63r6P5duefyMSzfXMblf3uX0sqasCOJSCvbV1GoI3pSuQ/Q8LPR3V9191PjnEtCctygbtx12SgWbyjl8vveZUeFCoNIMtlXUbgYOB04Gri8deJIIjjh0ELuuHgUi9aXctHdb+scg0gS2VdRWOruPw6elLamqRXMzOKUS0J2ymHdueeKMSzfUsaFd7/NplJdlSSSDPZVFGaY2bVm1qfxTDNLN7MTzOxBPnt8prRDxw/qxoNfH8f6kgou+Oss1m4vDzuSiMTZ/u5TqAMeNbP1ZrbIzFYAS4GLgD+5+wOtkFFCdOQhXfj7N8ezfVc1F9w1ixVbysKOJCJxtK/7FCrd/S/ufgzQl+ijMke5e193/5a7z2utkBKuUX06849vHUlVbT3n3fkWs1dprCSR9iqmAfHcvcbdN7h7SZzzSIIa1rMjT119NB2y0rj4nrd5eeHGsCOJSBzEPEqqSHHXHJ66+mgO7Z7Hdx6ezd/fXhV2JBFpYSoKckC65mbw6FVHMmFwAb+YsoDfT/2I+no92lOkvdhvUTCz75lZ59YII21Ddnoqd182movG9eYvM5dz9SOz2VVVG3YsEWkBsRwpdAfeM7PHzWyS7k0QgNRICr87dzg/P2MI0xZt4rw739IlqyLtwH6Lgrv/HBgI3Ad8DVhqZr8zs/5xziYJzsz45rGHcP+V41hXUsHZt7/Jeyu3hR1LRJoh1quPHNgYvGqBzsCTZvb7OGaTNuL4Qd2Ycs0xDVcmPfz2KqL/yYhIWxPLOYXvm9ls4PfAm8Bwd78aGA2cF+d80kb075bLlO8ew9H9u/LzKQv4wWPzdJ5BpA2K5UihK/Af7n6quz/h7jUA7l4PnBnXdNKmdMxO4/6vjeXHJw/iufnrOfuON1m6Sc9+FmlLYjmn8N/u3uQF6e6+uOUjSVuWkmJce+JAHv7GeErKqznr9jeZMndd2LFEJEa6T0Hi4ugBXXnh+8cyvGdHfvDYPP7zifmUqTtJJOGpKEjcFHbI5B/fGs/3Jg7gqTlrOf3PrzN7la5OEklkrV4UzKy3mc0ws8VmttDMrgvm55vZNDNbGrzrhrl2IDWSwvWnDuaxbx9FvTtfuWsWf5z2MTV19WFHE5EmhHGkUAv82N2HAEcC15jZUOBGYLq7DwSmB9PSTowtzuel647l3JG9uG36Us6/axbLNusktEiiafWiEIy2Oif4vBNYDPQEzgYeDFZ7EDintbNJfOVlpvGHCw7njotHsWrrLk7/8xvc/u+lOmoQSSAW5k1GZlYMvAYMA1a7e6dGy7a7+xe6kMzsKuAqgMLCwtGTJ08+6P2XlZWRm5t70N9vaxKpvaVVzsOLq3h3Yx2981L4xrB0ijtGWnw/idTm1qI2J4fmtHnixImz3X1MkwvdPZQXkAvMJnoPBEDJHsu3728bo0eP9uaYMWNGs77f1iRie6cu2OBjfzPND/npC/67Fxf5rqqaFt1+IrY53tTm5NCcNgPv+17+roZy9ZGZpQFPAY+4+z+D2ZvMrChYXgRsDiObtK5TD+vOtB8dz/mjevHXV1dw0h9e5aUPN2iYDJGQhHH1kREdXG+xu/+x0aJngSuCz1cAz7R2NglHx6w0bjl/BE985yg6ZKVx9SNzuPxv77Jcz4MWaXVhHCkcA1wGnGBm84LX6cDNwMlmthQ4OZiWJDK2OJ/nr/0Sv/ryUOatLmHSra9x80sf6aY3kVaU2to7dPc3gL09k+HE1swiiSc1ksLXjunHGSN6cPNLH3HXq8t5cvYarjtpEBeO7U1aRPdbisST/oVJQuqWl8EfLjicKdccwyFdc/nFlAWceutr/GvhRp1vEIkjFQVJaEf07sRj3z6Sey4fgwHf/vtsLvjrLD3MRyROVBQk4ZkZJw8t5F8/OI7fnjuMTz4t5yt3zeLSe9/RWEoiLUxFQdqM1EgKl4zvy+s3TOS/Th/C4g2lnHfnLC677x1mr9oedjyRdkFFQdqcrPQI3zruEF7/yUR+etqhLFxfynl3vsVl973DW8s/1TkHkWZQUZA2Kzs9lW8f35/Xb5jITyYdyuINpVx8zzucdfubPDd/PbUaU0nkgLX6JakiLS0nI5WrJ/TnymOK+eecddz7+gqufXQuvfOzOL6wjnHVtWSn6z91kVjoSEHajcy0CBeP78O0Hx3PXZeOpltuBg8vrubI303n188vYuWnu8KOKJLw9PNJ2p1IijFpWHcmDevOPU9PZ15FZx58ayX3vfEJxw3qxuVH9mXioQVEUvZ2D6VI8lJRkHZtYOcI3zp3FJtLK3n03TX8491VfPOh9+nZKYsLx/bmvNG96NEpK+yYIglDRUGSQkGHTK47aSDfndifaYs28fdZq/jDtI/54ysf86UBXTl/dC9OPaw7mWkt/0wHkbZERUGSSlokhdOHF3H68CJWby3nqTlreXL2Wq6bPI+8zFTOOrwH/zGqJyN7dyZF3UuShFQUJGn16ZLND08exHUnDuTtFVt5YvZanpqzlkfeWU3PTlmcMaKIL4/owbCeHYiO+C7S/qkoSNJLSTGOHtCVowd05X/OPoxXFm/iufkbuP/NT7j7tRX07ZLNmSOKOGN4D4YU5alASLumoiDSSF5mGueO7MW5I3uxo7yGfy3cyHMfrOeuV1dwx4zl9M7P4qQhhZw8pJCx/fI1lLe0OyoKInvRMTuNC8b25oKxvdlaVsXLizbxyqJN/OOd1dz/5ko6ZKYy8dACTh5ayHGDutEhMy3syCLNpqIgEoMuuRlcNK4PF43rQ3l1La8v/ZRpizbx748288y89URSjJG9O3HswG4cO6grI3p2JFVHEdIGqSiIHKDs9FROPaw7px7Wnbp6Z87q7by6ZAuvL93CrdM/5k+vfEyHzFSOGdCVYwd240sDutI7P0vnIqRNUFEQaYZIijG2OJ+xxflcf+pgtu2q5s1ln/L60i28vvRTXlqwEYDuHTIZ1y+f8YfkM75fPv275apISEJSURBpQfk56Xz58B58+fAeuDvLt5Qxa/lW3vlkG7NWbOXZ+esB6JKTztjifMb1y2dU384MKcojI1U3zkn4VBRE4sTMGFCQx4CCPC47qhh3Z9XWct75JFok3v1kG1MXRo8k0iMpDO3RgSN6d2p49e2SraMJaXUqCiKtxMwo7ppDcdccvjq2DwDrSyqYt6ak4fXYe2t44K2VAHTKTuPwXp0Y1rMDQ4s6MrRHB/rmZ+tOa4krFQWREPXolEWPTlmcPrwIgNq6ej7eVMa8NSXMX1PC/LUlvLHsU+rqo0+Ty06PcGj3PIb2+KxQDC7MIytdXU/SMlQURBJIatCNNLRHBy4eHz2aqKypY9nmMhatL2XRhlIWrS/lmbnrefjt1Q3f69U5iwEFuQwsyKV2ew15q7YzoCCXjlm6d0IOjIqCSILLTIswrGdHhvXs2DDP3Vm7vYKF63ewZGMZy7aUsWxz9KR2VW099y94C4BueRkMLMilf7dc+nbJpm+XHIq7ZNM7P1sjwkqTVBRE2iAzo3d+9I/7pGGfza+rd56aOoMu/Q5j2eZooVi6uYxn5q2jtLL2c9so6phJn/zshmLRt0s2ffKz6dEpiy456TrJnaRUFETakUiKUZCdwoQhhZw4pPBzy0rKq1m5tZxVW3exems5K7eWs3rbLmYs2cKWnWs/t256ago9OmY2nPPo0SmLnp0aTXfM0nmMdkpFQSRJdMpO54jsdI7o3ekLy3ZV1bJ6WznrtlewfkcF60oqop9LKnhj6ads2lmJ++e/0yEzlYIOmRTkZdAtL4OCvAwK8jIp6LB7Ovo5LyNVRx1tiIqCiJCTkcqQog4MKerQ5PKauno27qhkfUm0aKwvqWRTaSWbS6vYvLOSOau3s7m0iqra+i98NzMthW55GeRnp5Ofk07nnHS6NH7PTqdLbvCek0FeZqouuw2RioKI7FdaJKXhHMbeuDullbVs2bm7WEQLxubSKj4tq2JbeQ1byqr4eFMZW3dVUVnzxQIC0S6wztnpdM5Oo0NWGh0yU+mYtftzWvA5tdHnNDaX17OjvIbczFQiKijNoqIgIi3CzOiYFf1DPaAgb7/rV1TXsXVXFdt31UTfy6vZWlbN9vJqtu2qpqS8htLKGj4tq2b5ll2UVtZQWlFDvTe9vRteexmAvIxUcjJSyc6IkJuRSk56dDonI0JORmqjeZFgfiq5GZFG66WSlRYhMy2FzLQIGakpSdX9lXBFwcwmAX8GIsC97n5zyJFEJA6y0iP0Ss+mV+fYv1Nf7+yqrmVHRQ2lFbWUVtawo6KGd+d+SI/iAcH8Gsqra9lVVUdZVS27qmpZV1LBruBzWVVtk91ce2MGmakRstIjZKamkJkeCYpG5HPFY/d04/UyUiOkp6aQEUkhPTWFtOA9PTWF9OBzxh7TaY3nR1JavSstoYqCmUWAO4CTgbXAe2b2rLsvCjeZiCSClBQjLzONvMw0aFRMMrZ8xIQv9Yt5O7V19eyqrmsoFLs/7y4ilTX1VNbUUVFTR2Xwin6up6Kmjqpgury6lm276j+3zu71Wkpqin2hkKRHUhiYW8WECS22m8/21/KbbJZxwDJ3XwFgZpOBswEVBRFpMamRFDpmpcTtjm93p6q2nqqaeqrq6qiurY++6qLvNXX1VO2e12j+5z43ntfEOnnVW+OS3XzP68xCZGbnA5Pc/ZvB9GXAeHf/XqN1rgKuAigsLBw9efLkg95fWVkZubm5zQvdhiRbe0FtThZq84GZOHHibHcf09SyRDtSaKrz7HNVy93vBu4GGDNmjE9oxvHTzJkzac7325pkay+ozclCbW45ifYQ2bVA70bTvYD1IWUREUk6iVYU3gMGmlk/M0sHLgSeDTmTiEjSSKjuI3evNbPvAf8ieknq39x9YcixRESSRkIVBQB3fxF4MewcIiLJKNG6j0REJEQqCiIi0kBFQUREGiTUzWsHysy2AKuasYmuwKctFKctSLb2gtqcLNTmA9PX3bs1taBNF4XmMrP393ZXX3uUbO0FtTlZqM0tR91HIiLSQEVBREQaJHtRuDvsAK0s2doLanOyUJtbSFKfUxARkc9L9iMFERFpREVBREQaJGVRMLNJZrbEzJaZ2Y1h54k3M/ubmW02swVhZ2ktZtbbzGaY2WIzW2hm14WdKd7MLNPM3jWz+UGbbwo7U2sws4iZzTWz58PO0lrMbKWZfWhm88zs/RbddrKdUwieA/0xjZ4DDVzUnp8DbWbHAWXAQ+4+LOw8rcHMioAid59jZnnAbOCcdv7/swE57l5mZmnAG8B17v52yNHiysx+BIwBOrj7mWHnaQ1mthIY4+4tfsNeMh4pNDwH2t2rgd3PgW633P01YFvYOVqTu29w9znB553AYqBnuKniy6PKgsm04NWuf/WZWS/gDODesLO0F8lYFHoCaxpNr6Wd/7FIdmZWDIwE3gk5StwFXSnzgM3ANHdv722+FbgBqA85R2tz4GUzmx08t77FJGNR2O9zoKX9MLNc4CngB+5eGnaeeHP3Onc/guijbMeZWbvtLjSzM4HN7j477CwhOMbdRwGnAdcEXcQtIhmLgp4DnSSCfvWngEfc/Z9h52lN7l4CzAQmhZskro4Bzgr61ycDJ5jZw+FGah3uvj543ww8TbRbvEUkY1HQc6CTQHDS9T5gsbv/Mew8rcHMuplZp+BzFnAS8FGooeLI3X/q7r3cvZjov+N/u/ulIceKOzPLCS6ewMxygFOAFruyMOmKgrvXArufA70YeLy9PwfazB4FZgGDzWytmX0j7Eyt4BjgMqK/HucFr9PDDhVnRcAMM/uA6I+fae6eNJdpJpFC4A0zmw+8C7zg7lNbauNJd0mqiIjsXdIdKYiIyN6pKIiISAMVBRERaaCiICIiDVQURESkgYqCSCNmlmVmrwbDRRSbWUVwOesiM3souCEOM0szs5vNbKmZLQhGJz2thTK8FbwXm9nF+1k33cxeM7PUlti3iIqCyOd9Hfinu9cF08uDYSOGE737/YJg/q+J3hcwLBh59stAXksEcPejg4/FwD6LQjCo43Tgqy2xbxEVBUkKZjbWzD4InjmQEzxvoKlxgS4BntlzZlAk3gV6mlk28C3gWnevCpZvcvfHm9jvSjPrGnweY2Yzg8+/Cp5zMdPMVpjZ9xt9Z/dIpzcDxwZHKj80s8OCI5J5QVsGButNCXKLNJsOOSUpuPt7ZvYs8BsgC3jY3T83NEAw7Mkh7r5yz++bWSYwHrgOGACsboEB9g4FJhI9wlhiZne6e02j5TcC1+9+RoCZ/T/gz+7+SJA1Eqy3ABjbzCwigI4UJLn8D9GHK40Bft/E8q5AyR7z+gdDUW8lWgg+aME8L7h7VfCglM1Ehy/Yl1nAz8zsJ0Bfd6+AhqOY6t3j4Yg0h4qCJJN8IJfoL/PMJpZXNDF/9zmFAcCRZnYWsAzoE+Mf4Vo++3e257arGn2uYz9H7u7+D+CsIOe/zOyERoszgMoY8ojsk4qCJJO7gV8AjwC37LnQ3bcDkaCraM9lG4h25/zU3cuJjsB6W9CNg5kVmVlTI3SuBEYHn887wLw7aXTy2swOAVa4+21ER/YdEczvAmzZo+tJ5KCoKEhSMLPLgdrg1/bNwNg9fmnv9jLwpb1sZgqQbWbHAj8HtgCLzGxBsGxLE9+5Cfizmb1O9GjgQHwA1JrZfDP7IdErjBYE3VmHAg8F600EXjzAbYs0SaOkijRiZiOBH7n7ZWFniZWZ/ZPoEcySsLNI26cjBZFG3H0u0WcSRPa7cgIIuq+mqCBIS9GRgoiINNCRgoiINFBREBGRBioKIiLSQEVBREQaqCiIiEiD/w9535j2My2+mwAAAABJRU5ErkJggg==\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "fig, ax = plt.subplots()\n",
    "x = np.linspace(0,5,1000 )\n",
    "y = (np.exp(-x))*100\n",
    "ax.plot(x,y)\n",
    "ax.grid()\n",
    "ax.set_xlabel(\"x (RC units)\")\n",
    "ax.set_ylabel(\"y (% of max voltage)\")\n",
    "ax.set_title(\"$y=e^{-x}$\")"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "plain-foundation",
   "metadata": {},
   "source": [
    "We would expect a stable voltage is reached as the rise time and fall times become equal."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 11,
   "id": "elementary-girlfriend",
   "metadata": {
    "scrolled": false
   },
   "outputs": [],
   "source": [
    "def f(t, c, vin):\n",
    "    from numpy import exp\n",
    "    return vin + c*exp(-t)\n",
    "\n",
    "def pwmplot(period):\n",
    "    fig, ax = plt.subplots()\n",
    "    duty_cycles = [(0.2, 'r'), (0.5, \"b\"), (0.7, \"g\")]\n",
    "\n",
    "    pulse_height = 1\n",
    "    vcc = 5\n",
    "    for duty, lblcolour in duty_cycles:\n",
    "        c=-pulse_height\n",
    "        for h in range(0,int(5/period)):\n",
    "            x = np.linspace(0,duty*period, int(duty*500) )\n",
    "            y = f(x, c, pulse_height)\n",
    "            c = y[len(y)-1]\n",
    "            x = x +h*period\n",
    "            ax.plot(x,y*vcc, color=lblcolour)\n",
    "            x = np.linspace(0,(1-duty)*period, int((1-duty)*500) )\n",
    "            y = f(x, c, 0)\n",
    "            c = y[len(y)-1]-pulse_height\n",
    "            x = x+duty*period+h*period   \n",
    "            line, = ax.plot(x,y*vcc, color=lblcolour)\n",
    "            if h==0:\n",
    "                line.set_label('{}%'.format(int(duty*100)))\n",
    "\n",
    "\n",
    "\n",
    "    ax.set_title('PWM period = {:.2f} RC'.format(period))\n",
    "    ax.set_ylabel('Volts')\n",
    "    ax.set_xlabel('time (RC units)')\n",
    "    ax.grid()\n",
    "    ax.legend()\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 12,
   "id": "constant-native",
   "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": [
    "pwmplot(0.1)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 13,
   "id": "employed-furniture",
   "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": [
    "pwmplot(0.5)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 14,
   "id": "divine-burning",
   "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": [
    "pwmplot(0.05)"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "expensive-fleece",
   "metadata": {},
   "source": [
    "Now we examine to see what happens if we add a load to the output of what we had before.  What I am expecting is that it will start to discharge the capacitor and affect the voltage accross the capacitor."
   ]
  },
  {
   "attachments": {
    "pwm_load.png": {
     "image/png": 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"
    }
   },
   "cell_type": "markdown",
   "id": "annual-plasma",
   "metadata": {},
   "source": [
    "![pwm_load.png](attachment:pwm_load.png)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 15,
   "id": "digital-childhood",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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v6tUoMQGl+FqBiwVekXmjgJLlYoo8Xt52CtMzjF8Ecft/0nP70orsCoVRQHyCl2143+afnuHtAwUnA4lyjvd2WRX6Uz1k6IHiarEGqqyXEN2z8Hc9jPONVJQyzTet2tPRKaBFy8czeKWqsYn6xfxKMZtwhUqB1ShQzDF/tRnXgXZPASlK8582rE/lO795VaS7Z/EuJ3C5S6wr0reWAlKUfMvA/d5bMZYptHBHe8UoWXtRnPwKlQKrUeD/tdios8W4H6cAAAAASUVORK5CYII=\n",
      "text/latex": [
       "$\\displaystyle - C \\frac{d}{d t} \\operatorname{V_{C}}{\\left(t \\right)} - \\frac{\\operatorname{V_{C}}{\\left(t \\right)}}{R_{L}} + \\frac{V_{in} - \\operatorname{V_{C}}{\\left(t \\right)}}{R}$"
      ],
      "text/plain": [
       "    d              V_{C}(t)   V_{in} - V_{C}(t)\n",
       "- C⋅──(V_{C}(t)) - ──────── + ─────────────────\n",
       "    dt               R_L              R        "
      ]
     },
     "execution_count": 15,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "v = Function('V_{C}')\n",
    "e2 = (vin - v(t))/R  - v(t)/rl - C*Derivative(v(t)); e2"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 16,
   "id": "immune-blade",
   "metadata": {
    "scrolled": true
   },
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/latex": [
       "$\\displaystyle \\operatorname{V_{C}}{\\left(t \\right)} = \\frac{R_{L} V_{in} + e^{\\frac{\\left(R + R_{L}\\right) \\left(C C_{1} R R_{L} - t\\right)}{C R R_{L}}}}{R + R_{L}}$"
      ],
      "text/plain": [
       "                         (R + R_L)⋅(C⋅C₁⋅R⋅R_L - t)\n",
       "                         ──────────────────────────\n",
       "                                  C⋅R⋅R_L          \n",
       "           R_L⋅V_{in} + ℯ                          \n",
       "V_{C}(t) = ────────────────────────────────────────\n",
       "                           R + R_L                 "
      ]
     },
     "execution_count": 16,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "e3 = dsolve(e2); e3"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "eastern-venture",
   "metadata": {},
   "source": [
    "The constant of integration looks like it is all mixed up in the exponent but given that $e^a e^b = e^{a+b}$ then I should be able to absorb most of that jumble of symbols into a constant at the front of the exponential."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 17,
   "id": "private-pantyhose",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/latex": [
       "$\\displaystyle \\operatorname{V_{C}}{\\left(t \\right)} = \\frac{C_{1} e^{- \\frac{t \\left(R + R_{L}\\right)}{C R R_{L}}} + R_{L} V_{in}}{R + R_{L}}$"
      ],
      "text/plain": [
       "               -t⋅(R + R_L)              \n",
       "               ─────────────             \n",
       "                  C⋅R⋅R_L                \n",
       "           C₁⋅ℯ              + R_L⋅V_{in}\n",
       "V_{C}(t) = ──────────────────────────────\n",
       "                      R + R_L            "
      ]
     },
     "execution_count": 17,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "a1 = e3.args[1].args[0]  # R + RL\n",
    "a2 = e3.args[1].args[1].args[0]  #RL + Vin\n",
    "b1, b2, b3, b4, b5 = e3.args[1].args[1].args[1].args[0].args\n",
    "a3 = b5.args[1]\n",
    "e4 = Eq(v(t), a1*(a2 + c1 * exp(b1*b2*b3*b4*(-t)))); e4\n",
    "\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 18,
   "id": "sixth-intro",
   "metadata": {},
   "outputs": [],
   "source": [
    "fvc = lambdify([t, c1, R, C, rl, vin], e4.args[1], \"numpy\")"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 19,
   "id": "hydraulic-terror",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": "iVBORw0KGgoAAAANSUhEUgAAABoAAAAOCAYAAAAxDQxDAAAACXBIWXMAAA7EAAAOxAGVKw4bAAABJUlEQVQ4EZ2U/W3CMBDFE9QBUNmgjNAyQWGDlg3oHPmvYoSyQjsCG/AxAhsUZYPwe1FeiopjW5x0Ovt87z3nDlw2TVPYqqpad+tf4hRfkzv5PBVj+NJCFB0g+iT+iJA4Jii3YJ0UoyaKH3WkH8Qxxa1Il6uJ2n9pHzNwSXwrBMk7fgyQ7cjNIdLXxSyJt9AclnOAyS3TecyS+FHGbSXwOKSSi9cXmUQzGbJY67Lwbt2QgPMTL+6MEwmFZmM+31b/qyHLwmtGblmoPc75R3Ejlot367YwPN2w/M1P5zFL4i30DctLgOmZ3PHq1oGSNpXEt0IQbSg/E9/MxFptW+Kr6xz5Btdz0xv7JP6hry4K3V6P6Iyo4Su+su9fDNY1rnnt8f8WxV8AAUqEua7v5XIAAAAASUVORK5CYII=\n",
      "text/latex": [
       "$\\displaystyle 0.0$"
      ],
      "text/plain": [
       "0.0"
      ]
     },
     "execution_count": 19,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "fvc(0, -1000, 1000, 1e-6, 1000, 1)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 20,
   "id": "hybrid-october",
   "metadata": {
    "scrolled": true
   },
   "outputs": [
    {
     "data": {
      "image/png": "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\n",
      "text/latex": [
       "$\\displaystyle \\left[ \\left(R \\operatorname{V_{C}}{\\left(t \\right)} - R_{L} V_{in} + R_{L} \\operatorname{V_{C}}{\\left(t \\right)}\\right) e^{\\frac{t \\left(R + R_{L}\\right)}{C R R_{L}}}\\right]$"
      ],
      "text/plain": [
       "⎡                                          t⋅(R + R_L)⎤\n",
       "⎢                                          ───────────⎥\n",
       "⎢                                            C⋅R⋅R_L  ⎥\n",
       "⎣(R⋅V_{C}(t) - R_L⋅V_{in} + R_L⋅V_{C}(t))⋅ℯ           ⎦"
      ]
     },
     "execution_count": 20,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "e5 = solve(e4, c1); e5"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "integrated-judge",
   "metadata": {},
   "source": [
    "Therefore it seems the constant of integration at time t=0 can simply be set to $ -R_L V_{in} $ where $ V_{in} $ is simply the pulse height at every stage of evaluation and that only ever takes on one of two values."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 21,
   "id": "violent-bibliography",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": "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\n",
      "text/latex": [
       "$\\displaystyle R v_{c} - R_{L} V_{in} + R_{L} v_{c}$"
      ],
      "text/plain": [
       "R⋅v_c - R_L⋅V_{in} + R_L⋅v_c"
      ]
     },
     "execution_count": 21,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "e6 = e5[0].subs([(v(t), vc), (t,0)]); e6"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 22,
   "id": "everyday-maldives",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/latex": [
       "$\\displaystyle \\operatorname{V_{C}}{\\left(t \\right)} = \\frac{C_{1} e^{- \\frac{t \\left(R + R_{L}\\right)}{C R R_{L}}} + R_{L} V_{in}}{R + R_{L}}$"
      ],
      "text/plain": [
       "               -t⋅(R + R_L)              \n",
       "               ─────────────             \n",
       "                  C⋅R⋅R_L                \n",
       "           C₁⋅ℯ              + R_L⋅V_{in}\n",
       "V_{C}(t) = ──────────────────────────────\n",
       "                      R + R_L            "
      ]
     },
     "execution_count": 22,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "e4"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 23,
   "id": "controlled-above",
   "metadata": {},
   "outputs": [],
   "source": [
    "fe5 = lambdify([vin, vc, rl, R, C], e6.subs([(v(t), vc), (t,0)]))"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 24,
   "id": "specified-northwest",
   "metadata": {
    "scrolled": true
   },
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "-10000\n"
     ]
    },
    {
     "data": {
      "text/plain": [
       "<matplotlib.legend.Legend at 0x7ffbb458b760>"
      ]
     },
     "execution_count": 24,
     "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": [
    "fig, ax = plt.subplots()\n",
    "\n",
    "rval = 10000\n",
    "cval = 1e-5\n",
    "rlval = 10000\n",
    "\n",
    "pulse_height = 1\n",
    "\n",
    "def f(t, c1):\n",
    "    return f1(t, vin, vc)\n",
    "\n",
    "duty_cycles = [(0.5, 'r'),]\n",
    "\n",
    "c1val = fe5(pulse_height, 0, rlval, rval, cval)\n",
    "print (c1val)\n",
    "\n",
    "\n",
    "period = 0.002\n",
    "for duty, lblcolour in duty_cycles:\n",
    "    c=-pulse_height\n",
    "    for h in range(0,50):\n",
    "        x = np.linspace(0,duty*period, int(duty*500) )\n",
    "        y = fvc(x, c1val, rval, cval, rlval, pulse_height)\n",
    "        yn = y[len(y)-1]\n",
    "        #print (c1val, x[0], y[0], yn)\n",
    "        c1val = fe5(0, yn, rlval, rval, cval)\n",
    "        x = x +h*period\n",
    "        ax.plot(x,y, color=lblcolour)\n",
    "        x = np.linspace(0,(1-duty)*period, int((1-duty)*500) )\n",
    "        y = fvc(x, c1val, rval, cval, rlval, 0)\n",
    "        yn = y[len(y)-1]\n",
    "        c1val = fe5(pulse_height, yn, rlval, rval, cval)\n",
    "        x = x+duty*period+h*period   \n",
    "        #print (c1val, x[0], y[0], yn)\n",
    "        line, = ax.plot(x,y, color=lblcolour)\n",
    "        if h==0:\n",
    "            line.set_label('{}%'.format(int(duty*100)))\n",
    "        \n",
    "    \n",
    "\n",
    "ax.set_title('PWM Period = {} Hz'.format(int(1/period)))\n",
    "ax.set_ylabel('Volts')\n",
    "ax.set_xlabel('time (seconds)')\n",
    "ax.legend()\n"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "executed-possible",
   "metadata": {},
   "source": [
    "Therefore the resistance R and $ R_L $ act as a voltage divider on the PWM output"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "id": "attractive-preservation",
   "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": "3.8.6"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 5
}