Linear regression quizes

Lesson_2_Linear_Regression.ipynb

{
  "cells": [
    {
      "metadata": {},
      "cell_type": "markdown",
      "source": "# Linear Regression Lessons and Quizzes"
    },
    {
      "metadata": {
        "ExecuteTime": {
          "end_time": "2018-06-09T04:14:13.909503Z",
          "start_time": "2018-06-09T04:14:12.685046Z"
        },
        "trusted": true
      },
      "cell_type": "code",
      "source": "import pandas as pd\nimport numpy as np\nimport matplotlib.pyplot as plt\nimport seaborn as sns\n\n%matplotlib inline\n%config InlineBackend.figure_format = 'retina'",
      "execution_count": 2,
      "outputs": []
    },
    {
      "metadata": {},
      "cell_type": "markdown",
      "source": "## Plot the equation line (w1x + w2)"
    },
    {
      "metadata": {
        "ExecuteTime": {
          "end_time": "2018-05-27T05:35:47.105389Z",
          "start_time": "2018-05-27T05:35:47.073520Z"
        },
        "trusted": true
      },
      "cell_type": "code",
      "source": "def plot_linear_equation(xmin, xmax, w1, w2, point_coords):\n    '''Plots linear equation w1x + w2x using \n    x_min and x_max to limit the plotting and a point (p,q)'''\n    \n    # get the x numbers\n    x = np.linspace(xmin, xmax)\n\n    fig, ax = plt.subplots()\n\n    ax.plot(x, w1 * x + 3)\n    ax.scatter(*point_coords, color = 'orange')\n\n    #make it a grid\n    margin = 5\n    ax.set_xlim((xmin - margin, xmax + margin))\n    ax.set_ylim((xmin - margin, xmax + margin))\n    ax.axhline(0, color='black')\n    ax.axvline(0, color='black')\n    sns.despine(left= 'True', bottom='True');\n    \n    return ax",
      "execution_count": 78,
      "outputs": []
    },
    {
      "metadata": {
        "ExecuteTime": {
          "end_time": "2018-05-27T05:38:07.935107Z",
          "start_time": "2018-05-27T05:38:07.768757Z"
        },
        "trusted": true
      },
      "cell_type": "code",
      "source": "ax1 = plot_linear_equation(-13, 13, 0.5, 5, (5, 15))",
      "execution_count": 88,
      "outputs": [
        {
          "data": {
            "image/png": 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\n",
            "text/plain": "<matplotlib.figure.Figure at 0x7f26d79b5320>"
          },
          "metadata": {
            "image/png": {
              "height": 250,
              "width": 379
            }
          },
          "output_type": "display_data"
        }
      ]
    },
    {
      "metadata": {},
      "cell_type": "markdown",
      "source": "### Lesson 2 - Quiz 12 / 1\n\nCompute the mean absolute error for the following line and points:\n\nline: y = 1.2x + 2\n\npoints: (2, -2), (5, 6), (-4, -4), (-7, 1), (8, 14)\n\n$$ Mean Absolute Error = \\frac {1}{m} \\sum_{i=1}^{m} \\lvert {y - \\hat{y}} \\rvert $$"
    },
    {
      "metadata": {
        "ExecuteTime": {
          "end_time": "2018-05-28T07:26:22.081617Z",
          "start_time": "2018-05-28T07:26:22.068198Z"
        },
        "trusted": true
      },
      "cell_type": "code",
      "source": "points = [(2, -2), (5, 6), (-4, -4), (-7, 1), (8, 14)]\n\n# The number of points\nm = len(points)\n# The x coordinates of the points\nX = [point[0] for point in points]\n# The y coordinates of the points\nY = [point[1] for point in points]\n# Calculate the yhat points\nY_hat = [(1.2 * x + 2) for x in X]\n# Compute the Mean Absolute Error\nmar = (1 / m) * sum([abs(y - y_hat) for y, y_hat in zip(Y, Y_hat)])\n\nmar",
      "execution_count": 109,
      "outputs": [
        {
          "data": {
            "text/plain": "3.88"
          },
          "execution_count": 109,
          "metadata": {},
          "output_type": "execute_result"
        }
      ]
    },
    {
      "metadata": {},
      "cell_type": "markdown",
      "source": "### Lesson 2 - Quiz 12 / 2\n\nCompute the mean squared error for the following line and points:\n\nline: y = 1.2x + 2\n\npoints: (2, -2), (5, 6), (-4, -4), (-7, 1), (8, 14)\n\n$$ Mean Squared Error = \\frac {1}{2m} \\sum_{i=1}^{m} ( {y - \\hat{y}} )^2 $$"
    },
    {
      "metadata": {
        "ExecuteTime": {
          "end_time": "2018-05-28T07:26:23.286044Z",
          "start_time": "2018-05-28T07:26:23.276852Z"
        },
        "trusted": true
      },
      "cell_type": "code",
      "source": "# the points are the same, just change the calculation\nmsr = (1 / (2 * m)) * sum([(y - y_hat) ** 2 for y, y_hat in zip(Y, Y_hat)])\nmsr",
      "execution_count": 110,
      "outputs": [
        {
          "data": {
            "text/plain": "10.692000000000002"
          },
          "execution_count": 110,
          "metadata": {},
          "output_type": "execute_result"
        }
      ]
    },
    {
      "metadata": {},
      "cell_type": "markdown",
      "source": "### Lesson 2 - Quiz 16/2 : Mini-Batch Gradient Descent"
    },
    {
      "metadata": {
        "ExecuteTime": {
          "end_time": "2018-06-07T09:21:07.067555Z",
          "start_time": "2018-06-07T09:21:06.656437Z"
        },
        "trusted": true
      },
      "cell_type": "code",
      "source": "import numpy as np\n# Setting a random seed, feel free to change it and see different solutions.\nnp.random.seed(42)\n\n\n# TODO: Fill in code in the function below to implement a gradient descent\n# step for linear regression, following a squared error rule. See the docstring\n# for parameters and returned variables.\ndef MSEStep(X, y, W, b, learn_rate = 0.005):\n    \"\"\"\n    This function implements the gradient descent step for squared error as a\n    performance metric.\n    \n    Parameters\n    X : array of predictor features\n    y : array of outcome values\n    W : predictor feature coefficients\n    b : regression function intercept\n    learn_rate : learning rate\n\n    Returns\n    W_new : predictor feature coefficients following gradient descent step\n    b_new : intercept following gradient descent step\n    \"\"\"\n    \n    # Fill in code\n    \n    # first forward pass\n    y_pred = np.matmul(X, W) + b\n    error = y - y_pred\n    \n    # gradient descent step\n    W_new = W + learn_rate * np.matmul(error, X)\n    b_new = b + learn_rate * error.sum()\n    \n    \n    return W_new, b_new\n\n\n# The parts of the script below will be run when you press the \"Test Run\"\n# button. The gradient descent step will be performed multiple times on\n# the provided dataset, and the returned list of regression coefficients\n# will be plotted.\ndef miniBatchGD(X, y, batch_size = 20, learn_rate = 0.005, num_iter = 25):\n    \"\"\"\n    This function performs mini-batch gradient descent on a given dataset.\n\n    Parameters\n    X : array of predictor features\n    y : array of outcome values\n    batch_size : how many data points will be sampled for each iteration\n    learn_rate : learning rate\n    num_iter : number of batches used\n\n    Returns\n    regression_coef : array of slopes and intercepts generated by gradient\n      descent procedure\n    \"\"\"\n    n_points = X.shape[0]\n    W = np.zeros(X.shape[1]) # coefficients\n    b = 0 # intercept\n    \n    # run iterations\n    regression_coef = [np.hstack((W,b))]\n    for _ in range(num_iter):\n        batch = np.random.choice(range(n_points), batch_size)\n        X_batch = X[batch,:]\n        y_batch = y[batch]\n        W, b = MSEStep(X_batch, y_batch, W, b, learn_rate)\n        regression_coef.append(np.hstack((W,b)))\n    \n    return regression_coef\n\n\nif __name__ == \"__main__\":\n    # perform gradient descent\n    data = np.loadtxt('data.csv', delimiter = ',')\n    X = data[:,:-1]\n    y = data[:,-1]\n    regression_coef = miniBatchGD(X, y)\n    \n    # plot the results\n    import matplotlib.pyplot as plt\n    \n    plt.figure()\n    X_min = X.min()\n    X_max = X.max()\n    counter = len(regression_coef)\n    for W, b in regression_coef:\n        counter -= 1\n        color = [1 - 0.92 ** counter for _ in range(3)]\n        plt.plot([X_min, X_max],[X_min * W + b, X_max * W + b], color = color)\n    plt.scatter(X, y, zorder = 3)\n    plt.show()",
      "execution_count": 2,
      "outputs": [
        {
          "data": {
            "image/png": 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\n",
            "text/plain": "<matplotlib.figure.Figure at 0x7fe3086dc0f0>"
          },
          "metadata": {
            "image/png": {
              "height": 250,
              "width": 373
            }
          },
          "output_type": "display_data"
        }
      ]
    },
    {
      "metadata": {},
      "cell_type": "markdown",
      "source": "### Lesson 2 - Quiz 18: Linear Regression Quiz"
    },
    {
      "metadata": {
        "trusted": true,
        "ExecuteTime": {
          "start_time": "2018-06-09T09:39:44.224512Z",
          "end_time": "2018-06-09T09:39:44.475248Z"
        }
      },
      "cell_type": "code",
      "source": "# TODO: Add import statements\nimport pandas as pd\nfrom sklearn.linear_model import LinearRegression\n\n# Assign the dataframe to this variable.\n# TODO: Load the data\nbmi_life_data = pd.read_csv('bmi_and_life_expectancy.csv')\n\nbmi_life_data.head()",
      "execution_count": 2,
      "outputs": [
        {
          "output_type": "execute_result",
          "execution_count": 2,
          "data": {
            "text/plain": "       Country  Life expectancy       BMI\n0  Afghanistan             52.8  20.62058\n1      Albania             76.8  26.44657\n2      Algeria             75.5  24.59620\n3      Andorra             84.6  27.63048\n4       Angola             56.7  22.25083",
            "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>Country</th>\n      <th>Life expectancy</th>\n      <th>BMI</th>\n    </tr>\n  </thead>\n  <tbody>\n    <tr>\n      <th>0</th>\n      <td>Afghanistan</td>\n      <td>52.8</td>\n      <td>20.62058</td>\n    </tr>\n    <tr>\n      <th>1</th>\n      <td>Albania</td>\n      <td>76.8</td>\n      <td>26.44657</td>\n    </tr>\n    <tr>\n      <th>2</th>\n      <td>Algeria</td>\n      <td>75.5</td>\n      <td>24.59620</td>\n    </tr>\n    <tr>\n      <th>3</th>\n      <td>Andorra</td>\n      <td>84.6</td>\n      <td>27.63048</td>\n    </tr>\n    <tr>\n      <th>4</th>\n      <td>Angola</td>\n      <td>56.7</td>\n      <td>22.25083</td>\n    </tr>\n  </tbody>\n</table>\n</div>"
          },
          "metadata": {}
        }
      ]
    },
    {
      "metadata": {
        "trusted": true,
        "ExecuteTime": {
          "start_time": "2018-06-09T09:50:36.235448Z",
          "end_time": "2018-06-09T09:50:36.256862Z"
        }
      },
      "cell_type": "code",
      "source": "# Make and fit the linear regression model\n#TODO: Fit the model and Assign it to bmi_life_model\nmodel = LinearRegression()\nX = bmi_life_data[['BMI']]\nY = bmi_life_data[['Life expectancy']]\nbmi_life_model = model.fit(X, Y)",
      "execution_count": 18,
      "outputs": []
    },
    {
      "metadata": {
        "trusted": true,
        "ExecuteTime": {
          "start_time": "2018-06-09T09:50:36.767914Z",
          "end_time": "2018-06-09T09:50:36.779042Z"
        }
      },
      "cell_type": "code",
      "source": "# Make a prediction using the model\n# TODO: Predict life expectancy for a BMI value of 21.07931\nlaos_life_exp = bmi_life_model.predict([[21.07931]])\nlaos_life_exp ",
      "execution_count": 19,
      "outputs": [
        {
          "output_type": "execute_result",
          "execution_count": 19,
          "data": {
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