{"nbformat":4,"nbformat_minor":0,"metadata":{"colab":{"name":"AULA9.ipynb","provenance":[],"authorship_tag":"ABX9TyOQwEfZyb8o3YHtYAiWkH6S"},"kernelspec":{"name":"python3","display_name":"Python 3"},"language_info":{"name":"python"}},"cells":[{"cell_type":"markdown","source":["# **AULA 9: PRÁTICA R e PYTHON**"],"metadata":{"id":"hOK0qflkpHhn"}},{"cell_type":"markdown","source":["## **Vamos Praticar**"],"metadata":{"id":"45b969IBRHRi"}},{"cell_type":"markdown","source":[" * Gerando uma amostra da distribuição Normal Padrão\n","\n"],"metadata":{"id":"W6Ncx6AHsdJW"}},{"cell_type":"code","source":["import numpy as np\n","y = np.random.normal(0, 1, 1000)\n","\n","import random\n","random.seed(29)\n","y = np.random.normal(size = 1000)\n","\n","#print(y)"],"metadata":{"id":"7PSfydQCrimH"},"execution_count":null,"outputs":[]},{"cell_type":"markdown","source":["* Alterando média e desvio padrão"],"metadata":{"id":"mTMJkowlR-O4"}},{"cell_type":"code","source":["random.seed(29)\n","y2 = np.random.normal(3, 2, 1000)\n","\n","#print(y2)"],"metadata":{"id":"DG5W7hkUSC2W"},"execution_count":null,"outputs":[]},{"cell_type":"markdown","source":["* Histograma da Normal(0,1) "],"metadata":{"id":"gWcP0am8t41e"}},{"cell_type":"code","source":["import matplotlib.pyplot as plt\n","plt.hist(y)\n","plt.title('Histograma de y')"],"metadata":{"id":"nSeAa_6Mt61F"},"execution_count":null,"outputs":[]},{"cell_type":"markdown","source":["* Histograma da Normal com curva densidade"],"metadata":{"id":"3u6Yhm06yZHs"}},{"cell_type":"code","source":["import seaborn as sns\n","\n","sns.distplot(y)"],"metadata":{"id":"fe4ilyusyc_y","colab":{"base_uri":"https://localhost:8080/","height":337},"executionInfo":{"status":"ok","timestamp":1651082829390,"user_tz":180,"elapsed":1184,"user":{"displayName":"Naiara Caroline","userId":"08837491283301311393"}},"outputId":"7b9a31d7-09d1-465f-9cc2-cee626fbb8a1"},"execution_count":null,"outputs":[{"output_type":"stream","name":"stderr","text":["/usr/local/lib/python3.7/dist-packages/seaborn/distributions.py:2619: FutureWarning: `distplot` is a deprecated function and will be removed in a future version. Please adapt your code to use either `displot` (a figure-level function with similar flexibility) or `histplot` (an axes-level function for histograms).\n","  warnings.warn(msg, FutureWarning)\n"]},{"output_type":"execute_result","data":{"text/plain":["<matplotlib.axes._subplots.AxesSubplot at 0x7f163a10bfd0>"]},"metadata":{},"execution_count":6},{"output_type":"display_data","data":{"text/plain":["<Figure size 432x288 with 1 Axes>"],"image/png":"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\n"},"metadata":{"needs_background":"light"}}]},{"cell_type":"markdown","source":["* Curva densidade Normal padrão"],"metadata":{"id":"d34eJu8qyUjW"}},{"cell_type":"code","source":["import numpy as np\n","import matplotlib.pyplot as plt\n","from scipy.stats import norm\n","\n","X = np.arange(-3, 3, 0.001)\n","plt.plot(X, norm.pdf(X, 0, 1))"],"metadata":{"id":"Dzk7h9tiwTrm","colab":{"base_uri":"https://localhost:8080/","height":282},"executionInfo":{"status":"ok","timestamp":1651082949905,"user_tz":180,"elapsed":298,"user":{"displayName":"Naiara Caroline","userId":"08837491283301311393"}},"outputId":"853074bf-321d-46dd-a9e7-9fc6bae20dbc"},"execution_count":null,"outputs":[{"output_type":"execute_result","data":{"text/plain":["[<matplotlib.lines.Line2D at 0x7f1637591310>]"]},"metadata":{},"execution_count":7},{"output_type":"display_data","data":{"text/plain":["<Figure size 432x288 with 1 Axes>"],"image/png":"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\n"},"metadata":{"needs_background":"light"}}]},{"cell_type":"markdown","source":["* Curvas da Normal com diferentes médias"],"metadata":{"id":"9itij_9mUR2B"}},{"cell_type":"code","source":["X = np.arange(-6, 6, 0.001)\n","\n","plt.plot(X, norm.pdf(X, 0, 1), color = \"black\")\n","plt.plot(X, norm.pdf(X, -2, 1), color = \"red\")\n","plt.plot(X, norm.pdf(X, 2, 1), color = \"blue\")\n","\n","plt.show()"],"metadata":{"id":"8PxJTwLcTQKZ","colab":{"base_uri":"https://localhost:8080/","height":265},"executionInfo":{"status":"ok","timestamp":1651083009464,"user_tz":180,"elapsed":323,"user":{"displayName":"Naiara Caroline","userId":"08837491283301311393"}},"outputId":"d7ceb79a-1c1e-431c-8cdf-6e2ea741e408"},"execution_count":null,"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"}}]},{"cell_type":"markdown","source":["* Curvas da Normal com diferentes desvio padrão"],"metadata":{"id":"N1AZQGdO3DjE"}},{"cell_type":"code","source":["X = np.arange(-6, 6, 0.001)\n","\n","plt.plot(X, norm.pdf(X, 0, 1), color = \"black\")\n","plt.plot(X, norm.pdf(X, 0, 2), color = \"red\")\n","plt.plot(X, norm.pdf(X, 0, 0.5), color = \"blue\")\n","\n","plt.show()"],"metadata":{"id":"9oQ0ktcb4EMO","colab":{"base_uri":"https://localhost:8080/","height":265},"executionInfo":{"status":"ok","timestamp":1651083084480,"user_tz":180,"elapsed":332,"user":{"displayName":"Naiara Caroline","userId":"08837491283301311393"}},"outputId":"0658e628-763f-4dfb-83ee-06b90b619aa9"},"execution_count":null,"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"}}]},{"cell_type":"markdown","source":["* Medidas descritivas"],"metadata":{"id":"SajaRHfhUtvk"}},{"cell_type":"code","source":["import pandas as pd\n","aux = pd.DataFrame(y)\n","\n","aux.describe()"],"metadata":{"id":"94B9x9TzUvtp"},"execution_count":null,"outputs":[]},{"cell_type":"markdown","source":["## **EXERCÍCIO 1**\n","\n","X é uma v.a com distribuição Normal de média = 24 e desvio padrão = 3.8\n","\n","X = {tempo de viagem até o trabalho}"],"metadata":{"id":"kLJK3o9oV7Yh"}},{"cell_type":"code","source":["from scipy.stats import norm\n","\n","mu = 24\n","sigma = 3.8"],"metadata":{"id":"6-fzoBuzWOb7"},"execution_count":null,"outputs":[]},{"cell_type":"markdown","source":["* ALTERNATIVA (a)\n","\n","> > P(X > 15) = ?"],"metadata":{"id":"u_c9r5KuXZ2l"}},{"cell_type":"code","source":["x = 15\n","z = round((x - mu) / sigma, 2)\n","\n","Pz = 1 - norm.cdf(z) \n","print(round(Pz, 4))"],"metadata":{"id":"O-VD00AGX787","colab":{"base_uri":"https://localhost:8080/"},"executionInfo":{"status":"ok","timestamp":1651083918133,"user_tz":180,"elapsed":268,"user":{"displayName":"Naiara Caroline","userId":"08837491283301311393"}},"outputId":"a472cbcf-eff1-4260-ab50-9020206099a3"},"execution_count":null,"outputs":[{"output_type":"stream","name":"stdout","text":["0.9911\n"]}]},{"cell_type":"code","source":["# Ou podemos resolver da seguinte forma\n","\n","Px = 1 - norm.cdf(x, 24, 3.8) \n","print(round(Px, 4))"],"metadata":{"id":"73CZtbquXq-L","colab":{"base_uri":"https://localhost:8080/"},"executionInfo":{"status":"ok","timestamp":1651083937688,"user_tz":180,"elapsed":253,"user":{"displayName":"Naiara Caroline","userId":"08837491283301311393"}},"outputId":"887e8699-e071-4229-c274-4059b531f6e4"},"execution_count":null,"outputs":[{"output_type":"stream","name":"stdout","text":["0.9911\n"]}]},{"cell_type":"markdown","source":["* ALTERNATIVA (b)\n","\n","> > sigma = ?"],"metadata":{"id":"qMffxpBTYpHU"}},{"cell_type":"code","source":["sigma1 = (26 - mu) / round(norm.ppf(0.85), 2)\n","print(round(sigma1, 2))"],"metadata":{"id":"c8PkOR1qYua5","colab":{"base_uri":"https://localhost:8080/"},"executionInfo":{"status":"ok","timestamp":1651084227574,"user_tz":180,"elapsed":286,"user":{"displayName":"Naiara Caroline","userId":"08837491283301311393"}},"outputId":"0c529bc8-8706-4862-9d3f-8af14a4dfd3f"},"execution_count":null,"outputs":[{"output_type":"stream","name":"stdout","text":["1.92\n"]}]},{"cell_type":"markdown","source":["* ALTERNATIVA (c)\n","\n","> > x = ?"],"metadata":{"id":"Z0AVk6WyY9H7"}},{"cell_type":"code","source":["x = round(norm.ppf(0.80), 2)*sigma + mu\n","print(round(x, 4))"],"metadata":{"colab":{"base_uri":"https://localhost:8080/"},"id":"S6TOobN6ZB-w","executionInfo":{"status":"ok","timestamp":1651084466277,"user_tz":180,"elapsed":302,"user":{"displayName":"Naiara Caroline","userId":"08837491283301311393"}},"outputId":"0ca7ee30-48ad-4601-874f-42955991f517"},"execution_count":null,"outputs":[{"output_type":"stream","name":"stdout","text":["27.192\n"]}]},{"cell_type":"markdown","source":["* ALTERNATIVA (d)\n","\n","> > Y = {número de viagens pelo menos 30 minutos}\n","\n","> > Y ~ binomial(n = 3, p = ?)\n","\n","> > p = P(X >= 30)"],"metadata":{"id":"tKh9CXRYZNqA"}},{"cell_type":"code","source":["# Calculo do parâmetro p\n","\n","x = 30\n","p = 1 - norm.cdf(x, mu, sigma)\n","print(round(p, 4))"],"metadata":{"id":"dB4a6wEpZu5o","colab":{"base_uri":"https://localhost:8080/"},"executionInfo":{"status":"ok","timestamp":1651087047920,"user_tz":180,"elapsed":299,"user":{"displayName":"Naiara Caroline","userId":"08837491283301311393"}},"outputId":"fc0dcd10-76c0-4725-a3fd-beed3ad0bfeb"},"execution_count":21,"outputs":[{"output_type":"stream","name":"stdout","text":["0.0572\n"]}]},{"cell_type":"code","source":["# P(Y = 2) = ?\n","\n","from scipy.stats import binom\n","\n","n = 3; y = 2; p = 0.0572\n","Py = binom.pmf(y, n, p)\n","print(round(Py, 4))"],"metadata":{"id":"AjGQnzWYaHxW","colab":{"base_uri":"https://localhost:8080/"},"executionInfo":{"status":"ok","timestamp":1651087044338,"user_tz":180,"elapsed":495,"user":{"displayName":"Naiara Caroline","userId":"08837491283301311393"}},"outputId":"9092c5d4-2c89-4ae2-eda2-9de58a5529e8"},"execution_count":20,"outputs":[{"output_type":"stream","name":"stdout","text":["0.0093\n"]}]}]}