linearregression.ipynb

{
  "cells": [
    {
      "metadata": {
        "trusted": true
      },
      "cell_type": "code",
      "source": "from sklearn.linear_model import LinearRegression\nimport matplotlib.pyplot as plt\nimport numpy as np\n#-- Preparation --\nN = 100\nx = np.array([x for x in range(N)])\nX = x.reshape((-1, 1)) #-1 infers length, 1 means 1 column. \nampl = 5.0\ny = x + ampl * np.random.randn(N)  \n\n#-- plot data --\nfig, ax = plt.subplots()\nax.plot(x, y, marker = 'o', ls=\"\", markersize=5)\n\n#-- Fit data --\nmodel = LinearRegression()\nmodel.fit(X, y)\n\n#-- Predict data --\nR2    = model.score(X, y) # Get R squared, aka the coefficient of determination \nypred = model.predict(X)\n\n#-- plot fitting result --\nax.plot(X, ypred, label=f\"{model.coef_}x+{model.intercept_}\",c=\"orange\")\nax.set_title(f\"R2 = {R2:3.3f}\")\nax.legend()\nplt.show()",
      "execution_count": 11,
      "outputs": [
        {
          "output_type": "display_data",
          "data": {
            "text/plain": "<Figure size 432x288 with 1 Axes>",
            "image/png": 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\n"
          },
          "metadata": {
            "needs_background": "light"
          }
        }
      ]
    },
    {
      "metadata": {
        "trusted": true
      },
      "cell_type": "code",
      "source": "",
      "execution_count": null,
      "outputs": []
    }
  ],
  "metadata": {
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