{"id":6122,"date":"2018-08-02T20:29:24","date_gmt":"2018-08-03T02:29:24","guid":{"rendered":"http:\/\/mattdturner.com\/wordpress\/?p=6122"},"modified":"2018-08-07T12:31:05","modified_gmt":"2018-08-07T18:31:05","slug":"create-a-buffett-indicator-plot-in-python","status":"publish","type":"post","link":"https:\/\/mattdturner.com\/wordpress\/2018\/08\/create-a-buffett-indicator-plot-in-python\/","title":{"rendered":"Create a Buffett Indicator Plot in Python"},"content":{"rendered":"<div id=\"notebook\" class=\"border-box-sizing\" tabindex=\"-1\">\n<div id=\"notebook-container\" class=\"container\">\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>I was recently listening to an episode of the Jason Stapleton Show (I believe this is the episode <a href=\"https:\/\/jasonstapleton.com\/822-45-of-nc-school-teachers-failed-their-math-exam\/\" class=\"broken_link\">https:\/\/jasonstapleton.com\/822-45-of-nc-school-teachers-failed-their-math-exam\/<\/a>). In the episode, he discussed the Buffett Indicator, which is basically a ratio of U.S. Market Cap to the U.S. GDP. Apperently, Warren Buffett thinks that the combined value of all domestic stocks should be less than the Gross Domestic Product (GDP) of the U.S. economy. More information about the Buffett Indicator can be found at:<\/p>\n<ul>\n<li><a href=\"http:\/\/www.buffettindicator.com\/\">http:\/\/www.buffettindicator.com\/<\/a><\/li>\n<li><a href=\"https:\/\/www.gurufocus.com\/stock-market-valuations.php\">https:\/\/www.gurufocus.com\/stock-market-valuations.php<\/a><\/li>\n<\/ul>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>After listening to the podcast, I decided that I would like to create an iOS app that just shows the Buffet Indicator on a line graph. I don&#8217;t (yet) know how to create iOS apps, so I decided to implement it in Python for the time being. In this post, I&#8217;ll walk you through what I did in order to create the Buffet Indicator Graph.<\/p>\n<p><!--more--><\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<h1 id=\"Buffett-Indicator-in-Python\">Buffett Indicator in Python<a class=\"anchor-link\" href=\"#Buffett-Indicator-in-Python\">\u00b6<\/a><\/h1>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing code_cell rendered\">\n<div class=\"input\">\n<div class=\"prompt input_prompt\">In\u00a0[1]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\" highlight hl-ipython2\">\n<pre><span class=\"c1\"># Import necessary packages<\/span>\r\n<span class=\"kn\">import<\/span> <span class=\"nn\">datetime<\/span>\r\n<span class=\"kn\">import<\/span> <span class=\"nn\">pandas<\/span> <span class=\"kn\">as<\/span> <span class=\"nn\">pd<\/span>\r\n<span class=\"kn\">import<\/span> <span class=\"nn\">pandas_datareader.data<\/span> <span class=\"kn\">as<\/span> <span class=\"nn\">web<\/span>\r\n<span class=\"kn\">from<\/span> <span class=\"nn\">dateutil.relativedelta<\/span> <span class=\"kn\">import<\/span> <span class=\"n\">relativedelta<\/span>\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\"><\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>In order to access the stock information in Python, we use the pandas_datareader module. When getting the stock information, we need to specify a range of dates that we want for the stocks. In this case, we will have the range of dates be between 10 years ago and now. In order to subtract 10 years from a date, we will use the relativedelta function.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing code_cell rendered\">\n<div class=\"input\">\n<div class=\"prompt input_prompt\">In\u00a0[2]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\" highlight hl-ipython2\">\n<pre><span class=\"n\">end<\/span> <span class=\"o\">=<\/span> <span class=\"n\">datetime<\/span><span class=\"o\">.<\/span><span class=\"n\">datetime<\/span><span class=\"o\">.<\/span><span class=\"n\">now<\/span><span class=\"p\">()<\/span>\r\n<span class=\"n\">start<\/span> <span class=\"o\">=<\/span> <span class=\"n\">end<\/span> <span class=\"o\">-<\/span> <span class=\"n\">relativedelta<\/span><span class=\"p\">(<\/span><span class=\"n\">years<\/span><span class=\"o\">=<\/span><span class=\"mi\">10<\/span><span class=\"p\">)<\/span>\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\"><\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>Now we will pull the stock information from the web. For the U.S. Market Cap data, we will be using the Wilshire 5000 Price Index from the FED website (<a href=\"https:\/\/fred.stlouisfed.org\/series\/WILL5000PR\">https:\/\/fred.stlouisfed.org\/series\/WILL5000PR<\/a>). For GDP, we will be using the GDP data from the FED website (<a href=\"https:\/\/fred.stlouisfed.org\/series\/GDP\">https:\/\/fred.stlouisfed.org\/series\/GDP<\/a>).<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing code_cell rendered\">\n<div class=\"input\">\n<div class=\"prompt input_prompt\">In\u00a0[3]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\" highlight hl-ipython2\">\n<pre><span class=\"n\">gdp<\/span> <span class=\"o\">=<\/span> <span class=\"n\">web<\/span><span class=\"o\">.<\/span><span class=\"n\">DataReader<\/span><span class=\"p\">(<\/span><span class=\"s1\">'GDP'<\/span><span class=\"p\">,<\/span> <span class=\"s1\">'fred'<\/span><span class=\"p\">,<\/span> <span class=\"n\">start<\/span><span class=\"p\">,<\/span> <span class=\"n\">end<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">wilshire<\/span> <span class=\"o\">=<\/span> <span class=\"n\">web<\/span><span class=\"o\">.<\/span><span class=\"n\">DataReader<\/span><span class=\"p\">(<\/span><span class=\"s1\">'WILL5000PR'<\/span><span class=\"p\">,<\/span><span class=\"s1\">'fred'<\/span><span class=\"p\">,<\/span><span class=\"n\">start<\/span><span class=\"p\">,<\/span><span class=\"n\">end<\/span><span class=\"p\">)<\/span>\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\"><\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>Now lets take a look at the most recent 5 fields for both GDP and Wilshire 5000. The data obtained by using <code>web.DataReader<\/code> is stored in a Pandas dataframe, so we can use the <code>tail()<\/code> function.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing code_cell rendered\">\n<div class=\"input\">\n<div class=\"prompt input_prompt\">In\u00a0[4]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\" highlight hl-ipython2\">\n<pre><span class=\"k\">print<\/span><span class=\"p\">(<\/span><span class=\"n\">gdp<\/span><span class=\"o\">.<\/span><span class=\"n\">tail<\/span><span class=\"p\">())<\/span>\r\n<span class=\"k\">print<\/span><span class=\"p\">(<\/span><span class=\"n\">wilshire<\/span><span class=\"o\">.<\/span><span class=\"n\">tail<\/span><span class=\"p\">())<\/span>\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"output_wrapper\">\n<div class=\"output\">\n<div class=\"output_area\">\n<div class=\"prompt\"><\/div>\n<div class=\"output_subarea output_stream output_stdout output_text\">\n<pre>                  GDP\r\nDATE                 \r\n2017-04-01  19359.123\r\n2017-07-01  19588.074\r\n2017-10-01  19831.829\r\n2018-01-01  20041.047\r\n2018-04-01  20402.502\r\n            WILL5000PR\r\nDATE                  \r\n2018-07-26    29364.79\r\n2018-07-27    29135.80\r\n2018-07-30    28957.26\r\n2018-07-31    29117.38\r\n2018-08-01    29093.76\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\"><\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>It will be easier to work with the data if both GDP and the Wilshire 5000 are in the same dataframe, so lets combine them and view the contents.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing code_cell rendered\">\n<div class=\"input\">\n<div class=\"prompt input_prompt\">In\u00a0[5]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\" highlight hl-ipython2\">\n<pre><span class=\"n\">combined<\/span> <span class=\"o\">=<\/span> <span class=\"n\">pd<\/span><span class=\"o\">.<\/span><span class=\"n\">concat<\/span><span class=\"p\">([<\/span><span class=\"n\">gdp<\/span><span class=\"p\">,<\/span><span class=\"n\">wilshire<\/span><span class=\"p\">],<\/span><span class=\"n\">axis<\/span><span class=\"o\">=<\/span><span class=\"mi\">1<\/span><span class=\"p\">)<\/span>\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing code_cell rendered\">\n<div class=\"input\">\n<div class=\"prompt input_prompt\">In\u00a0[6]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\" highlight hl-ipython2\">\n<pre><span class=\"k\">print<\/span><span class=\"p\">(<\/span><span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">tail<\/span><span class=\"p\">())<\/span>\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"output_wrapper\">\n<div class=\"output\">\n<div class=\"output_area\">\n<div class=\"prompt\"><\/div>\n<div class=\"output_subarea output_stream output_stdout output_text\">\n<pre>            GDP  WILL5000PR\r\nDATE                       \r\n2018-07-26  NaN    29364.79\r\n2018-07-27  NaN    29135.80\r\n2018-07-30  NaN    28957.26\r\n2018-07-31  NaN    29117.38\r\n2018-08-01  NaN    29093.76\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\"><\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>Well, the dataframes were combined into 1 but it appears that we have a lot of <code>NaN<\/code> values in the dataframe. This is because the GDP data is only given once per quarter, whereas the stock data is given daily. We will fill the GDP column with the value from the previous quarter.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing code_cell rendered\">\n<div class=\"input\">\n<div class=\"prompt input_prompt\">In\u00a0[7]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\" highlight hl-ipython2\">\n<pre><span class=\"c1\"># Get a list of dates available in the GDP dataframe<\/span>\r\n<span class=\"n\">gdp_dates<\/span> <span class=\"o\">=<\/span> <span class=\"n\">gdp<\/span><span class=\"o\">.<\/span><span class=\"n\">index<\/span><span class=\"o\">.<\/span><span class=\"n\">values<\/span>\r\n\r\n<span class=\"c1\"># Loop through the dgp dates and fill the GDP column in the combined dataframe<\/span>\r\n<span class=\"n\">prev_date<\/span> <span class=\"o\">=<\/span> <span class=\"bp\">None<\/span>\r\n<span class=\"k\">for<\/span> <span class=\"n\">date<\/span> <span class=\"ow\">in<\/span> <span class=\"n\">gdp_dates<\/span><span class=\"p\">:<\/span>\r\n    <span class=\"k\">if<\/span> <span class=\"n\">prev_date<\/span> <span class=\"o\">==<\/span> <span class=\"bp\">None<\/span><span class=\"p\">:<\/span>\r\n        <span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">loc<\/span><span class=\"p\">[:<\/span><span class=\"n\">date<\/span><span class=\"p\">,<\/span><span class=\"s1\">'GDP'<\/span><span class=\"p\">]<\/span> <span class=\"o\">=<\/span> <span class=\"n\">gdp<\/span><span class=\"o\">.<\/span><span class=\"n\">loc<\/span><span class=\"p\">[<\/span><span class=\"n\">date<\/span><span class=\"p\">,<\/span><span class=\"s1\">'GDP'<\/span><span class=\"p\">]<\/span>\r\n    <span class=\"k\">else<\/span><span class=\"p\">:<\/span>\r\n        <span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">loc<\/span><span class=\"p\">[<\/span><span class=\"n\">date_prev<\/span><span class=\"p\">:<\/span><span class=\"n\">date<\/span><span class=\"p\">,<\/span><span class=\"s1\">'GDP'<\/span><span class=\"p\">]<\/span> <span class=\"o\">=<\/span> <span class=\"n\">gdp<\/span><span class=\"o\">.<\/span><span class=\"n\">loc<\/span><span class=\"p\">[<\/span><span class=\"n\">date_prev<\/span><span class=\"p\">,<\/span><span class=\"s1\">'GDP'<\/span><span class=\"p\">]<\/span>\r\n    <span class=\"n\">date_prev<\/span> <span class=\"o\">=<\/span> <span class=\"n\">date<\/span>\r\n    \r\n<span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">loc<\/span><span class=\"p\">[<\/span><span class=\"n\">date<\/span><span class=\"p\">:,<\/span><span class=\"s1\">'GDP'<\/span><span class=\"p\">]<\/span> <span class=\"o\">=<\/span> <span class=\"n\">gdp<\/span><span class=\"o\">.<\/span><span class=\"n\">loc<\/span><span class=\"p\">[<\/span><span class=\"n\">date<\/span><span class=\"p\">,<\/span><span class=\"s1\">'GDP'<\/span><span class=\"p\">]<\/span>\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing code_cell rendered\">\n<div class=\"input\">\n<div class=\"prompt input_prompt\">In\u00a0[8]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\" highlight hl-ipython2\">\n<pre><span class=\"k\">print<\/span><span class=\"p\">(<\/span><span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">tail<\/span><span class=\"p\">())<\/span>\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"output_wrapper\">\n<div class=\"output\">\n<div class=\"output_area\">\n<div class=\"prompt\"><\/div>\n<div class=\"output_subarea output_stream output_stdout output_text\">\n<pre>                  GDP  WILL5000PR\r\nDATE                             \r\n2018-07-26  20402.502    29364.79\r\n2018-07-27  20402.502    29135.80\r\n2018-07-30  20402.502    28957.26\r\n2018-07-31  20402.502    29117.38\r\n2018-08-01  20402.502    29093.76\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\"><\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>We now have both GDP and Wilshire 5000 in the same dataframe, so we can now calculate the Buffett Indicator and store it in a new column.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing code_cell rendered\">\n<div class=\"input\">\n<div class=\"prompt input_prompt\">In\u00a0[9]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\" highlight hl-ipython2\">\n<pre><span class=\"n\">combined<\/span><span class=\"p\">[<\/span><span class=\"s1\">'Buffett_Indicator'<\/span><span class=\"p\">]<\/span> <span class=\"o\">=<\/span> <span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">WILL5000PR<\/span> <span class=\"o\">\/<\/span> <span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">GDP<\/span> <span class=\"o\">*<\/span> <span class=\"mi\">100<\/span>\r\n<span class=\"k\">print<\/span><span class=\"p\">(<\/span><span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">tail<\/span><span class=\"p\">())<\/span>\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"output_wrapper\">\n<div class=\"output\">\n<div class=\"output_area\">\n<div class=\"prompt\"><\/div>\n<div class=\"output_subarea output_stream output_stdout output_text\">\n<pre>                  GDP  WILL5000PR  Buffett_Indicator\r\nDATE                                                \r\n2018-07-26  20402.502    29364.79         143.927397\r\n2018-07-27  20402.502    29135.80         142.805034\r\n2018-07-30  20402.502    28957.26         141.929946\r\n2018-07-31  20402.502    29117.38         142.714751\r\n2018-08-01  20402.502    29093.76         142.598981\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\"><\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>Alright, now that we have all of the data, all that is left to do is to plot it.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing code_cell rendered\">\n<div class=\"input\">\n<div class=\"prompt input_prompt\">In\u00a0[11]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\" highlight hl-ipython2\">\n<pre><span class=\"kn\">import<\/span> <span class=\"nn\">matplotlib.pyplot<\/span> <span class=\"kn\">as<\/span> <span class=\"nn\">plt<\/span>\r\n<span class=\"n\">fig<\/span> <span class=\"o\">=<\/span> <span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">figure<\/span><span class=\"p\">(<\/span><span class=\"n\">figsize<\/span><span class=\"o\">=<\/span><span class=\"p\">(<\/span><span class=\"mi\">12<\/span><span class=\"p\">,<\/span><span class=\"mi\">8<\/span><span class=\"p\">))<\/span>\r\n\r\n<span class=\"c1\"># Get the starting and ending date<\/span>\r\n<span class=\"n\">min_date<\/span> <span class=\"o\">=<\/span> <span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">index<\/span><span class=\"o\">.<\/span><span class=\"n\">values<\/span><span class=\"p\">[<\/span><span class=\"mi\">0<\/span><span class=\"p\">]<\/span>\r\n<span class=\"n\">max_date<\/span> <span class=\"o\">=<\/span> <span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">index<\/span><span class=\"o\">.<\/span><span class=\"n\">values<\/span><span class=\"p\">[<\/span><span class=\"o\">-<\/span><span class=\"mi\">1<\/span><span class=\"p\">]<\/span>\r\n<span class=\"n\">num_dates<\/span> <span class=\"o\">=<\/span> <span class=\"nb\">len<\/span><span class=\"p\">(<\/span><span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">index<\/span><span class=\"o\">.<\/span><span class=\"n\">values<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">quarter_date<\/span> <span class=\"o\">=<\/span> <span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">index<\/span><span class=\"o\">.<\/span><span class=\"n\">values<\/span><span class=\"p\">[<\/span><span class=\"nb\">int<\/span><span class=\"p\">(<\/span><span class=\"n\">num_dates<\/span><span class=\"o\">\/<\/span><span class=\"mi\">4<\/span><span class=\"p\">)]<\/span>\r\n<span class=\"n\">three_quarter_date<\/span> <span class=\"o\">=<\/span> <span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">index<\/span><span class=\"o\">.<\/span><span class=\"n\">values<\/span><span class=\"p\">[<\/span><span class=\"nb\">int<\/span><span class=\"p\">(<\/span><span class=\"mi\">3<\/span><span class=\"o\">*<\/span><span class=\"n\">num_dates<\/span><span class=\"o\">\/<\/span><span class=\"mi\">4<\/span><span class=\"p\">)]<\/span>\r\n\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">index<\/span><span class=\"o\">.<\/span><span class=\"n\">values<\/span><span class=\"p\">,<\/span><span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">Buffett_Indicator<\/span><span class=\"p\">)<\/span>\r\n\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">show<\/span><span class=\"p\">()<\/span>\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"output_wrapper\">\n<div class=\"output\">\n<div class=\"output_area\">\n<div class=\"prompt\"><\/div>\n<div class=\"output_png output_subarea \"><img decoding=\"async\" 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\" \/><\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\"><\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>The figure looks OK, but lets clean it up a bit and add some labels to the axes. While we&#8217;re at it, lets add a horizontal line at 100% and 80%. I chose these values because the podcast that I was listening to (or perhaps it was a website I read&#8230;) mentioned that Warren Buffett suggests that if the Buffett Indicator is greater than 100% it means that the stocks are overvalued. However, if the Buffett Indicator is less than 80% it means that the stocks are undervalued. From this information, it would suggest that we should invest when the value is less than 80% and stop investing when the value is greater than 100%.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\"><\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p><strong>Note:<\/strong> I have little to no knowledge about investing. This post is just an exercise for me to learn to get stock information in Python. <strong>DO NOT<\/strong> invest based on the information in this post.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing code_cell rendered\">\n<div class=\"input\">\n<div class=\"prompt input_prompt\">In\u00a0[12]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\" highlight hl-ipython2\">\n<pre><span class=\"n\">fig<\/span> <span class=\"o\">=<\/span> <span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">figure<\/span><span class=\"p\">(<\/span><span class=\"n\">figsize<\/span><span class=\"o\">=<\/span><span class=\"p\">(<\/span><span class=\"mi\">12<\/span><span class=\"p\">,<\/span><span class=\"mi\">8<\/span><span class=\"p\">))<\/span>\r\n\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">index<\/span><span class=\"o\">.<\/span><span class=\"n\">values<\/span><span class=\"p\">,<\/span><span class=\"n\">combined<\/span><span class=\"o\">.<\/span><span class=\"n\">Buffett_Indicator<\/span><span class=\"p\">)<\/span>\r\n\r\n<span class=\"n\">ax<\/span> <span class=\"o\">=<\/span> <span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">gca<\/span><span class=\"p\">()<\/span>\r\n\r\n<span class=\"kn\">import<\/span> <span class=\"nn\">matplotlib.dates<\/span> <span class=\"kn\">as<\/span> <span class=\"nn\">mdates<\/span>\r\n<span class=\"n\">myFmt<\/span> <span class=\"o\">=<\/span> <span class=\"n\">mdates<\/span><span class=\"o\">.<\/span><span class=\"n\">DateFormatter<\/span><span class=\"p\">(<\/span><span class=\"s1\">'%Y%m<\/span><span class=\"si\">%d<\/span><span class=\"s1\">'<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">ax<\/span><span class=\"o\">.<\/span><span class=\"n\">xaxis<\/span><span class=\"o\">.<\/span><span class=\"n\">set_major_formatter<\/span><span class=\"p\">(<\/span><span class=\"n\">myFmt<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">ax<\/span><span class=\"o\">.<\/span><span class=\"n\">set_xlabel<\/span><span class=\"p\">(<\/span><span class=\"s1\">'Date'<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">ax<\/span><span class=\"o\">.<\/span><span class=\"n\">set_ylabel<\/span><span class=\"p\">(<\/span><span class=\"s1\">'Percentage'<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">ax<\/span><span class=\"o\">.<\/span><span class=\"n\">set_title<\/span><span class=\"p\">(<\/span><span class=\"s1\">'Buffett Indicator'<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">ax<\/span><span class=\"o\">.<\/span><span class=\"n\">set_xlim<\/span><span class=\"p\">(<\/span><span class=\"n\">min_date<\/span><span class=\"p\">,<\/span><span class=\"n\">max_date<\/span><span class=\"p\">)<\/span>\r\n\r\n<span class=\"c1\"># Rotate the x-tick labels so that they are more legible<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">xticks<\/span><span class=\"p\">(<\/span><span class=\"n\">rotation<\/span><span class=\"o\">=<\/span><span class=\"mi\">45<\/span><span class=\"p\">)<\/span>\r\n\r\n<span class=\"c1\"># Add the horizontal lines<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">hlines<\/span><span class=\"p\">(<\/span><span class=\"mi\">100<\/span><span class=\"p\">,<\/span><span class=\"n\">min_date<\/span><span class=\"p\">,<\/span><span class=\"n\">max_date<\/span><span class=\"p\">,<\/span><span class=\"n\">colors<\/span><span class=\"o\">=<\/span><span class=\"s1\">'r'<\/span><span class=\"p\">,<\/span><span class=\"n\">linestyle<\/span><span class=\"o\">=<\/span><span class=\"s1\">'dashed'<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">hlines<\/span><span class=\"p\">(<\/span><span class=\"mi\">80<\/span><span class=\"p\">,<\/span><span class=\"n\">min_date<\/span><span class=\"p\">,<\/span><span class=\"n\">max_date<\/span><span class=\"p\">,<\/span><span class=\"n\">colors<\/span><span class=\"o\">=<\/span><span class=\"s1\">'g'<\/span><span class=\"p\">,<\/span><span class=\"n\">linestyle<\/span><span class=\"o\">=<\/span><span class=\"s1\">'dashed'<\/span><span class=\"p\">)<\/span>\r\n\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">text<\/span><span class=\"p\">(<\/span><span class=\"n\">quarter_date<\/span><span class=\"p\">,<\/span><span class=\"mi\">100<\/span><span class=\"p\">,<\/span><span class=\"s1\">'Over-valued'<\/span><span class=\"p\">,<\/span><span class=\"n\">ha<\/span><span class=\"o\">=<\/span><span class=\"s1\">'center'<\/span><span class=\"p\">,<\/span><span class=\"n\">va<\/span><span class=\"o\">=<\/span><span class=\"s1\">'center'<\/span><span class=\"p\">,<\/span><span class=\"n\">color<\/span><span class=\"o\">=<\/span><span class=\"s1\">'r'<\/span><span class=\"p\">,<\/span><span class=\"n\">backgroundcolor<\/span><span class=\"o\">=<\/span><span class=\"s1\">'white'<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">text<\/span><span class=\"p\">(<\/span><span class=\"n\">three_quarter_date<\/span><span class=\"p\">,<\/span><span class=\"mi\">80<\/span><span class=\"p\">,<\/span><span class=\"s1\">'Under-valued'<\/span><span class=\"p\">,<\/span><span class=\"n\">ha<\/span><span class=\"o\">=<\/span><span class=\"s1\">'center'<\/span><span class=\"p\">,<\/span><span class=\"n\">va<\/span><span class=\"o\">=<\/span><span class=\"s1\">'center'<\/span><span class=\"p\">,<\/span><span class=\"n\">color<\/span><span class=\"o\">=<\/span><span class=\"s1\">'g'<\/span><span class=\"p\">,<\/span><span class=\"n\">backgroundcolor<\/span><span class=\"o\">=<\/span><span class=\"s1\">'white'<\/span><span class=\"p\">)<\/span>\r\n\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">show<\/span><span class=\"p\">()<\/span>\r\n<\/pre>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"output_wrapper\">\n<div class=\"output\">\n<div class=\"output_area\">\n<div class=\"prompt\"><\/div>\n<div class=\"output_png output_subarea \"><img decoding=\"async\" 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\/><\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\"><\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>And there we have it. We now have a figure showing the Buffett Index for the past 10 years. Obviously the Buffett Index alone isn&#8217;t a definitive predictor of the market, since it shows the stocks as over-values for the past few years, yet the market is still increasing.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n","protected":false},"excerpt":{"rendered":"<p>I was recently listening to an episode of the Jason Stapleton Show (I believe this is the episode https:\/\/jasonstapleton.com\/822-45-of-nc-school-teachers-failed-their-math-exam\/). In the episode, he discussed the Buffett Indicator, which is basically a ratio of U.S. Market Cap to the U.S. GDP. Apperently, Warren Buffett thinks that the combined value of all domestic stocks should be less [&hellip;]<\/p>\n","protected":false},"author":1,"featured_media":6125,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_monsterinsights_skip_tracking":false,"_monsterinsights_sitenote_active":false,"_monsterinsights_sitenote_note":"","_monsterinsights_sitenote_category":0,"footnotes":""},"categories":[233,20],"tags":[255,257,238,259,80,258,256],"class_list":["post-6122","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-python","category-scripting","tag-buffett-indicator","tag-investing","tag-pandas","tag-pandas_datareader","tag-python","tag-trading","tag-warren-buffet"],"_links":{"self":[{"href":"https:\/\/mattdturner.com\/wordpress\/wp-json\/wp\/v2\/posts\/6122"}],"collection":[{"href":"https:\/\/mattdturner.com\/wordpress\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/mattdturner.com\/wordpress\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/mattdturner.com\/wordpress\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/mattdturner.com\/wordpress\/wp-json\/wp\/v2\/comments?post=6122"}],"version-history":[{"count":7,"href":"https:\/\/mattdturner.com\/wordpress\/wp-json\/wp\/v2\/posts\/6122\/revisions"}],"predecessor-version":[{"id":6148,"href":"https:\/\/mattdturner.com\/wordpress\/wp-json\/wp\/v2\/posts\/6122\/revisions\/6148"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/mattdturner.com\/wordpress\/wp-json\/wp\/v2\/media\/6125"}],"wp:attachment":[{"href":"https:\/\/mattdturner.com\/wordpress\/wp-json\/wp\/v2\/media?parent=6122"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/mattdturner.com\/wordpress\/wp-json\/wp\/v2\/categories?post=6122"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/mattdturner.com\/wordpress\/wp-json\/wp\/v2\/tags?post=6122"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}