{
  "nbformat": 4,
  "nbformat_minor": 0,
  "metadata": {
    "colab": {
      "provenance": []
    },
    "kernelspec": {
      "name": "python3",
      "display_name": "Python 3"
    },
    "language_info": {
      "name": "python"
    }
  },
  "cells": [
    {
      "cell_type": "code",
      "execution_count": 2,
      "metadata": {
        "colab": {
          "base_uri": "https://localhost:8080/",
          "height": 504
        },
        "id": "LXlSRBeHtETj",
        "outputId": "b4cf644c-e15e-41fb-ffe3-03ccf350d100"
      },
      "outputs": [
        {
          "name": "stdout",
          "output_type": "stream",
          "text": [
            "Introduce el tamaño del lado del cuadrado en mm: 40\n"
          ]
        },
        {
          "output_type": "display_data",
          "data": {
            "text/plain": [
              "<Figure size 500x500 with 1 Axes>"
            ],
            "image/png": 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\n"
          },
          "metadata": {}
        }
      ],
      "source": [
        "# Ejercicio Extra 3.1.2.\n",
        "\n",
        "import matplotlib.pyplot as plt\n",
        "\n",
        "# Pedir al usuario el tamaño del cuadrado\n",
        "lado = float(input(\"Introduce el tamaño del lado del cuadrado en mm: \"))\n",
        "\n",
        "# Coordenadas de los vértices (cerrando la figura con el primer punto al final)\n",
        "x = [0, lado, lado, 0, 0]\n",
        "y = [0, 0, lado, lado, 0]\n",
        "\n",
        "# Crear la figura\n",
        "plt.figure(figsize=(5,5))\n",
        "plt.plot(x, y, 'b-', linewidth=2)\n",
        "\n",
        "# Configuración del gráfico\n",
        "plt.title(f\"Cuadrado de {lado} mm de lado\")\n",
        "plt.gca().set_aspect('equal', adjustable='box')  # mantener proporción 1:1\n",
        "plt.grid(True)\n",
        "plt.xlabel(\"mm en eje X\")\n",
        "plt.ylabel(\"mm en eje Y\")\n",
        "\n",
        "# Mostrar el cuadrado\n",
        "plt.show()"
      ]
    }
  ]
}