Praktikum_Machine_Learning/Tugas.Regression/Ananda dwi prasetyo-202310715065-non linear regression.ipynb

{
 "cells": [
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "<p style=\"text-align:center\">\n",
    "    <a href=\"https://skills.network\" target=\"_blank\">\n",
    "    <img src=\"https://cf-courses-data.s3.us.cloud-object-storage.appdomain.cloud/assets/logos/SN_web_lightmode.png\" width=\"200\" alt=\"Skills Network Logo\">\n",
    "    </a>\n",
    "</p>\n",
    "\n",
    "\n",
    "# Non Linear Regression Analysis\n",
    "\n",
    "\n",
    "Estimated time needed: **20** minutes\n",
    "    \n",
    "\n",
    "## Objectives\n",
    "\n",
    "After completing this lab you will be able to:\n",
    "\n",
    "* Differentiate between linear and non-linear regression\n",
    "* Use non-linear regression model in Python\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "If the data shows a curvy trend, then linear regression will not produce very accurate results when compared to a non-linear regression since linear regression presumes that the data is linear. \n",
    "Let's learn about non linear regressions and apply an example in python. In this notebook, we fit a non-linear model to the datapoints corrensponding to China's GDP from 1960 to 2014. \n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "<h2 id=\"importing_libraries\">Importing required libraries</h2>\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 35,
   "metadata": {},
   "outputs": [],
   "source": [
    "import numpy as np\n",
    "import matplotlib.pyplot as plt\n",
    "%matplotlib inline"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Although linear regression can do a great job at modeling some datasets, it cannot be used for all datasets. First recall how linear regression, models a dataset. It models the linear relationship between a dependent variable y and the independent variables x. It has a simple equation, of degree 1, for example y = $2x$ + 3.\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 36,
   "metadata": {
    "tags": []
   },
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 640x480 with 1 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "x = np.arange(-5.0, 5.0, 0.1)\n",
    "\n",
    "##You can adjust the slope and intercept to verify the changes in the graph\n",
    "y = 2*(x) + 3\n",
    "y_noise = 2 * np.random.normal(size=x.size)\n",
    "ydata = y + y_noise\n",
    "#plt.figure(figsize=(8,6))\n",
    "plt.plot(x, ydata,  'bo')\n",
    "plt.plot(x,y, 'r') \n",
    "plt.ylabel('Dependent Variable')\n",
    "plt.xlabel('Independent Variable')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Non-linear regression is a method to model the non-linear relationship between the independent variables $x$ and the dependent variable $y$. Essentially any relationship that is not linear can be termed as non-linear, and is usually represented by the polynomial of $k$ degrees (maximum power of $x$).  For example:\n",
    "\n",
    "$$ \\ y = a x^3 + b x^2 + c x + d \\ $$\n",
    "\n",
    "Non-linear functions can have elements like exponentials, logarithms, fractions, and so on. For example: $$ y = \\log(x)$$\n",
    "    \n",
    "We can have a function that's even more complicated such as :\n",
    "$$ y = \\log(a x^3 + b x^2 + c x + d)$$\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Let's take a look at a cubic function's graph.\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 37,
   "metadata": {
    "tags": []
   },
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 640x480 with 1 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "x = np.arange(-5.0, 5.0, 0.1)\n",
    "\n",
    "##You can adjust the slope and intercept to verify the changes in the graph\n",
    "y = 1*(x**3) + 1*(x**2) + 1*x + 3\n",
    "y_noise = 20 * np.random.normal(size=x.size)\n",
    "ydata = y + y_noise\n",
    "plt.plot(x, ydata,  'bo')\n",
    "plt.plot(x,y, 'r') \n",
    "plt.ylabel('Dependent Variable')\n",
    "plt.xlabel('Independent Variable')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "As you can see, this function has $x^3$ and $x^2$ as independent variables. Also, the graphic of this function is not a straight line over the 2D plane. So this is a non-linear function.\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Some other types of non-linear functions are:\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Quadratic\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "$$ Y = X^2 $$\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 38,
   "metadata": {
    "tags": []
   },
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 640x480 with 1 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "x = np.arange(-5.0, 5.0, 0.1)\n",
    "\n",
    "##You can adjust the slope and intercept to verify the changes in the graph\n",
    "\n",
    "y = np.power(x,2)\n",
    "y_noise = 2 * np.random.normal(size=x.size)\n",
    "ydata = y + y_noise\n",
    "plt.plot(x, ydata,  'bo')\n",
    "plt.plot(x,y, 'r') \n",
    "plt.ylabel('Dependent Variable')\n",
    "plt.xlabel('Independent Variable')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Exponential\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "An exponential function with base c is defined by $$ Y = a + b c^X$$ where b ≠0, c > 0 , c ≠1, and x is any real number. The base, c, is constant and the exponent, x, is a variable. \n",
    "\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 39,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 640x480 with 1 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "X = np.arange(-5.0, 5.0, 0.1)\n",
    "\n",
    "##You can adjust the slope and intercept to verify the changes in the graph\n",
    "\n",
    "Y= np.exp(X)\n",
    "\n",
    "plt.plot(X,Y) \n",
    "plt.ylabel('Dependent Variable')\n",
    "plt.xlabel('Independent Variable')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Logarithmic\n",
    "\n",
    "The response $y$ is a results of applying the logarithmic map from the input $x$ to the output $y$. It is one of the simplest form of __log()__: i.e. $$ y = \\log(x)$$\n",
    "\n",
    "Please consider that instead of $x$, we can use $X$, which can be a polynomial representation of the $x$ values. In general form it would be written as  \n",
    "\\begin{equation}\n",
    "y = \\log(X)\n",
    "\\end{equation}\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 40,
   "metadata": {},
   "outputs": [
    {
     "name": "stderr",
     "output_type": "stream",
     "text": [
      "/home/jupyterlab/conda/envs/python/lib/python3.7/site-packages/ipykernel_launcher.py:3: RuntimeWarning: invalid value encountered in log\n",
      "  This is separate from the ipykernel package so we can avoid doing imports until\n"
     ]
    },
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 640x480 with 1 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "X = np.arange(-5.0, 5.0, 0.1)\n",
    "\n",
    "Y = np.log(X)\n",
    "\n",
    "plt.plot(X,Y) \n",
    "plt.ylabel('Dependent Variable')\n",
    "plt.xlabel('Independent Variable')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Sigmoidal/Logistic\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "$$ Y = a + \\frac{b}{1+ c^{(X-d)}}$$\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 41,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 640x480 with 1 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "X = np.arange(-5.0, 5.0, 0.1)\n",
    "\n",
    "\n",
    "Y = 1-4/(1+np.power(3, X-2))\n",
    "\n",
    "plt.plot(X,Y) \n",
    "plt.ylabel('Dependent Variable')\n",
    "plt.xlabel('Independent Variable')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "<a id=\"ref2\"></a>\n",
    "# Non-Linear Regression example\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "For an example, we're going to try and fit a non-linear model to the datapoints corresponding to China's GDP from 1960 to 2014. We download a dataset with two columns, the first, a year between 1960 and 2014, the second, China's corresponding annual gross domestic income in US dollars for that year. \n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 42,
   "metadata": {
    "tags": []
   },
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "2025-10-20 07:48:43 URL:https://cf-courses-data.s3.us.cloud-object-storage.appdomain.cloud/IBMDeveloperSkillsNetwork-ML0101EN-SkillsNetwork/labs/Module%202/data/china_gdp.csv [1218/1218] -> \"china_gdp.csv\" [1]\n"
     ]
    },
    {
     "data": {
      "text/html": [
       "<div>\n",
       "<style scoped>\n",
       "    .dataframe tbody tr th:only-of-type {\n",
       "        vertical-align: middle;\n",
       "    }\n",
       "\n",
       "    .dataframe tbody tr th {\n",
       "        vertical-align: top;\n",
       "    }\n",
       "\n",
       "    .dataframe thead th {\n",
       "        text-align: right;\n",
       "    }\n",
       "</style>\n",
       "<table border=\"1\" class=\"dataframe\">\n",
       "  <thead>\n",
       "    <tr style=\"text-align: right;\">\n",
       "      <th></th>\n",
       "      <th>Year</th>\n",
       "      <th>Value</th>\n",
       "    </tr>\n",
       "  </thead>\n",
       "  <tbody>\n",
       "    <tr>\n",
       "      <th>0</th>\n",
       "      <td>1960</td>\n",
       "      <td>5.918412e+10</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>1</th>\n",
       "      <td>1961</td>\n",
       "      <td>4.955705e+10</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>2</th>\n",
       "      <td>1962</td>\n",
       "      <td>4.668518e+10</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>3</th>\n",
       "      <td>1963</td>\n",
       "      <td>5.009730e+10</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>4</th>\n",
       "      <td>1964</td>\n",
       "      <td>5.906225e+10</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>5</th>\n",
       "      <td>1965</td>\n",
       "      <td>6.970915e+10</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>6</th>\n",
       "      <td>1966</td>\n",
       "      <td>7.587943e+10</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>7</th>\n",
       "      <td>1967</td>\n",
       "      <td>7.205703e+10</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>8</th>\n",
       "      <td>1968</td>\n",
       "      <td>6.999350e+10</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>9</th>\n",
       "      <td>1969</td>\n",
       "      <td>7.871882e+10</td>\n",
       "    </tr>\n",
       "  </tbody>\n",
       "</table>\n",
       "</div>"
      ],
      "text/plain": [
       "   Year         Value\n",
       "0  1960  5.918412e+10\n",
       "1  1961  4.955705e+10\n",
       "2  1962  4.668518e+10\n",
       "3  1963  5.009730e+10\n",
       "4  1964  5.906225e+10\n",
       "5  1965  6.970915e+10\n",
       "6  1966  7.587943e+10\n",
       "7  1967  7.205703e+10\n",
       "8  1968  6.999350e+10\n",
       "9  1969  7.871882e+10"
      ]
     },
     "execution_count": 42,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "import numpy as np\n",
    "import pandas as pd\n",
    "\n",
    "#downloading dataset\n",
    "!wget -nv -O china_gdp.csv https://cf-courses-data.s3.us.cloud-object-storage.appdomain.cloud/IBMDeveloperSkillsNetwork-ML0101EN-SkillsNetwork/labs/Module%202/data/china_gdp.csv\n",
    "    \n",
    "df = pd.read_csv(\"china_gdp.csv\")\n",
    "df.head(10)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "__Did you know?__ When it comes to Machine Learning, you will likely be working with large datasets. As a business, where can you host your data? IBM is offering a unique opportunity for businesses, with 10 Tb of IBM Cloud Object Storage: [Sign up now for free](http://cocl.us/ML0101EN-IBM-Offer-CC)\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Plotting the Dataset ###\n",
    "This is what the datapoints look like. It kind of looks like an either logistic or exponential function. The growth starts off slow, then from 2005 on forward, the growth is very significant. And finally, it decelerates slightly in the 2010s.\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 43,
   "metadata": {
    "tags": []
   },
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 800x500 with 1 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "plt.figure(figsize=(8,5))\n",
    "x_data, y_data = (df[\"Year\"].values, df[\"Value\"].values)\n",
    "plt.plot(x_data, y_data, 'ro')\n",
    "plt.ylabel('GDP')\n",
    "plt.xlabel('Year')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Choosing a model ###\n",
    "\n",
    "From an initial look at the plot, we determine that the logistic function could be a good approximation,\n",
    "since it has the property of starting with a slow growth, increasing growth in the middle, and then decreasing again at the end; as illustrated below:\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 44,
   "metadata": {
    "tags": []
   },
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 640x480 with 1 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "X = np.arange(-5.0, 5.0, 0.1)\n",
    "Y = 1.0 / (1.0 + np.exp(-X))\n",
    "\n",
    "plt.plot(X,Y) \n",
    "plt.ylabel('Dependent Variable')\n",
    "plt.xlabel('Independent Variable')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "\n",
    "\n",
    "The formula for the logistic function is the following:\n",
    "\n",
    "$$ \\hat{Y} = \\frac1{1+e^{-\\beta_1(X-\\beta_2)}}$$\n",
    "\n",
    "$\\beta_1$: Controls the curve's steepness,\n",
    "\n",
    "$\\beta_2$: Slides the curve on the x-axis.\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Building The Model ###\n",
    "Now, let's build our regression model and initialize its parameters. \n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 45,
   "metadata": {},
   "outputs": [],
   "source": [
    "def sigmoid(x, Beta_1, Beta_2):\n",
    "     y = 1 / (1 + np.exp(-Beta_1*(x-Beta_2)))\n",
    "     return y"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Lets look at a sample sigmoid line that might fit with the data:\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 46,
   "metadata": {
    "tags": []
   },
   "outputs": [
    {
     "data": {
      "text/plain": [
       "[<matplotlib.lines.Line2D at 0x766f7f2c4750>]"
      ]
     },
     "execution_count": 46,
     "metadata": {},
     "output_type": "execute_result"
    },
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 640x480 with 1 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "beta_1 = 0.10\n",
    "beta_2 = 1990.0\n",
    "\n",
    "#logistic function\n",
    "Y_pred = sigmoid(x_data, beta_1 , beta_2)\n",
    "\n",
    "#plot initial prediction against datapoints\n",
    "plt.plot(x_data, Y_pred*15000000000000.)\n",
    "plt.plot(x_data, y_data, 'ro')"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Our task here is to find the best parameters for our model. Lets first normalize our x and y:\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 47,
   "metadata": {
    "tags": []
   },
   "outputs": [],
   "source": [
    "# Lets normalize our data\n",
    "xdata =x_data/max(x_data)\n",
    "ydata =y_data/max(y_data)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "#### How we find the best parameters for our fit line?\n",
    "we can use __curve_fit__ which uses non-linear least squares to fit our sigmoid function, to data. Optimize values for the parameters so that the sum of the squared residuals of sigmoid(xdata, *popt) - ydata is minimized.\n",
    "\n",
    "popt are our optimized parameters.\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 48,
   "metadata": {
    "tags": []
   },
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      " beta_1 = 690.451712, beta_2 = 0.997207\n"
     ]
    }
   ],
   "source": [
    "from scipy.optimize import curve_fit\n",
    "popt, pcov = curve_fit(sigmoid, xdata, ydata)\n",
    "#print the final parameters\n",
    "print(\" beta_1 = %f, beta_2 = %f\" % (popt[0], popt[1]))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Now we plot our resulting regression model.\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 49,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 800x500 with 1 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "x = np.linspace(1960, 2015, 55)\n",
    "x = x/max(x)\n",
    "plt.figure(figsize=(8,5))\n",
    "y = sigmoid(x, *popt)\n",
    "plt.plot(xdata, ydata, 'ro', label='data')\n",
    "plt.plot(x,y, linewidth=3.0, label='fit')\n",
    "plt.legend(loc='best')\n",
    "plt.ylabel('GDP')\n",
    "plt.xlabel('Year')\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Practice\n",
    "Can you calculate what is the accuracy of our model?\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 50,
   "metadata": {
    "tags": []
   },
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Mean Absolute Error (MAE): 0.03\n",
      "Mean Squared Error (MSE): 0.00\n",
      "Root Mean Squared Error (RMSE): 0.04\n",
      "R2-score: 0.97\n"
     ]
    },
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 640x480 with 1 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "import numpy as np\n",
    "import matplotlib.pyplot as plt\n",
    "from sklearn.metrics import r2_score, mean_squared_error, mean_absolute_error\n",
    "from scipy.optimize import curve_fit\n",
    "\n",
    "# Misal fungsi sigmoid\n",
    "def sigmoid(x, beta1, beta2):\n",
    "    return 1 / (1 + np.exp(-beta1*(x-beta2)))\n",
    "\n",
    "# split data into train/test\n",
    "msk = np.random.rand(len(df)) < 0.8\n",
    "train_x = xdata[msk]\n",
    "test_x = xdata[~msk]\n",
    "train_y = ydata[msk]\n",
    "test_y = ydata[~msk]\n",
    "\n",
    "# build the model using train set\n",
    "popt, pcov = curve_fit(sigmoid, train_x, train_y)\n",
    "\n",
    "# predict using test set\n",
    "y_hat = sigmoid(test_x, *popt)\n",
    "\n",
    "# evaluation metrics\n",
    "mae = mean_absolute_error(test_y, y_hat)\n",
    "mse = mean_squared_error(test_y, y_hat)\n",
    "rmse = np.sqrt(mse)\n",
    "r2 = r2_score(test_y, y_hat)\n",
    "\n",
    "print(\"Mean Absolute Error (MAE): %.2f\" % mae)\n",
    "print(\"Mean Squared Error (MSE): %.2f\" % mse)\n",
    "print(\"Root Mean Squared Error (RMSE): %.2f\" % rmse)\n",
    "print(\"R2-score: %.2f\" % r2)\n",
    "\n",
    "# Optional: plot actual vs predicted\n",
    "plt.scatter(test_x, test_y, label='Actual', color='blue')\n",
    "plt.scatter(test_x, y_hat, label='Predicted', color='red')\n",
    "plt.xlabel('X')\n",
    "plt.ylabel('Y')\n",
    "plt.title('Sigmoid Regression: Actual vs Predicted')\n",
    "plt.legend()\n",
    "plt.show()\n",
    "\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "<details><summary>Click here for the solution</summary>\n",
    "\n",
    "```python    \n",
    "# split data into train/test\n",
    "msk = np.random.rand(len(df)) < 0.8\n",
    "train_x = xdata[msk]\n",
    "test_x = xdata[~msk]\n",
    "train_y = ydata[msk]\n",
    "test_y = ydata[~msk]\n",
    "\n",
    "# build the model using train set\n",
    "popt, pcov = curve_fit(sigmoid, train_x, train_y)\n",
    "\n",
    "# predict using test set\n",
    "y_hat = sigmoid(test_x, *popt)\n",
    "\n",
    "# evaluation\n",
    "print(\"Mean absolute error: %.2f\" % np.mean(np.absolute(y_hat - test_y)))\n",
    "print(\"Residual sum of squares (MSE): %.2f\" % np.mean((y_hat - test_y) ** 2))\n",
    "from sklearn.metrics import r2_score\n",
    "print(\"R2-score: %.2f\" % r2_score(test_y,y_hat) )\n",
    "\n",
    "```\n",
    "\n",
    "</details>\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "<h2>Want to learn more?</h2>\n",
    "\n",
    "IBM SPSS Modeler is a comprehensive analytics platform that has many machine learning algorithms. It has been designed to bring predictive intelligence to decisions made by individuals, by groups, by systems – by your enterprise as a whole. A free trial is available through this course, available here: <a href=\"https://www.ibm.com/analytics/spss-statistics-software?utm_source=skills_network&utm_content=in_lab_content_link&utm_id=Lab-IBMDeveloperSkillsNetwork-ML0101EN-SkillsNetwork\">SPSS Modeler</a>\n",
    "\n",
    "Also, you can use Watson Studio to run these notebooks faster with bigger datasets. Watson Studio is IBM's leading cloud solution for data scientists, built by data scientists. With Jupyter notebooks, RStudio, Apache Spark and popular libraries pre-packaged in the cloud, Watson Studio enables data scientists to collaborate on their projects without having to install anything. Join the fast-growing community of Watson Studio users today with a free account at <a href=\"https://www.ibm.com/cloud/watson-studio?utm_source=skills_network&utm_content=in_lab_content_link&utm_id=Lab-IBMDeveloperSkillsNetwork-ML0101EN-SkillsNetwork\">Watson Studio</a>\n",
    "\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Thank you for completing this lab!\n",
    "\n",
    "\n",
    "## Author\n",
    "\n",
    "Saeed Aghabozorgi\n",
    "\n",
    "\n",
    "### Other Contributors\n",
    "\n",
    "<a href=\"https://www.linkedin.com/in/joseph-s-50398b136/\" target=\"_blank\">Joseph Santarcangelo</a>\n",
    "\n",
    "\n",
    "## <h3 align=\"center\"> © IBM Corporation 2020. All rights reserved. <h3/>\n",
    "\n",
    "<!--## Change Log\n",
    "\n",
    "\n",
    "|  Date (YYYY-MM-DD) |  Version | Changed By  |  Change Description |\n",
    "|---|---|---|---|\n",
    "| 2020-11-03  | 2.1 | Lakshmi |  Made changes in URL |\n",
    "| 2020-08-27  | 2.0  | Lavanya  |  Moved lab to course repo in GitLab |\n",
    "|   |   |   |   |\n",
    "|   |   |   |   | --!>\n",
    "\n",
    "\n",
    "\n"
   ]
  }
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