{"id":341,"date":"2015-04-17T13:38:05","date_gmt":"2015-04-17T13:38:05","guid":{"rendered":"http:\/\/drsfenner.org\/blog\/?p=341"},"modified":"2016-02-05T16:20:44","modified_gmt":"2016-02-05T16:20:44","slug":"some-iron-condor-heuristics-2","status":"publish","type":"post","link":"https:\/\/drsfenner.org\/blog\/2015\/04\/some-iron-condor-heuristics-2\/","title":{"rendered":"Some Iron Condor Heuristics"},"content":{"rendered":"<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>In the world of Iron Condors (an option position composed of short, higher strike (bear) call spread and a short, lower strike (bull) put spread), there are two heuristics that are bandied about without much comment. I&#8217;m generally unwilling to accept some Internet author&#8217;s word for something (unless it completely gels with everything I know), so I set out to convince myself that these heuristics held. Here are some demonstrations (I hesitate to use the word <em>proof<\/em>) that convinced me. <!--more--><\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<h2 id=\"Introduction-and-Some-Preliminaries\">Introduction and Some Preliminaries<a class=\"anchor-link\" href=\"#Introduction-and-Some-Preliminaries\">&#182;<\/a><\/h2>\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&nbsp;[54]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"kn\">import<\/span> <span class=\"nn\">numpy<\/span> <span class=\"kn\">as<\/span> <span class=\"nn\">np<\/span>\r\n<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=\"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\">scipy.stats<\/span> <span class=\"kn\">as<\/span> <span class=\"nn\">ss<\/span>\r\n\r\n<span class=\"k\">def<\/span> <span class=\"nf\">labelIt<\/span><span class=\"p\">(<\/span><span class=\"n\">ax<\/span><span class=\"p\">,<\/span> <span class=\"n\">title<\/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=\"n\">title<\/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=\"s\">&quot;Spot&quot;<\/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=\"s\">&quot;Position Value&quot;<\/span><span class=\"p\">)<\/span>\r\n\r\n\r\n<span class=\"n\">pd<\/span><span class=\"o\">.<\/span><span class=\"n\">set_option<\/span><span class=\"p\">(<\/span><span class=\"s\">&#39;display.mpl_style&#39;<\/span><span class=\"p\">,<\/span> <span class=\"s\">&#39;default&#39;<\/span><span class=\"p\">)<\/span> <span class=\"c\"># Make the graphs a bit prettier<\/span>\r\n<span class=\"o\">%<\/span><span class=\"k\">pylab<\/span> <span class=\"n\">inline<\/span> <span class=\"o\">--<\/span><span class=\"n\">no<\/span><span class=\"o\">-<\/span><span class=\"n\">import<\/span><span class=\"o\">-<\/span><span class=\"nb\">all<\/span>\r\n<span class=\"n\">figsize<\/span><span class=\"p\">(<\/span><span class=\"mi\">15<\/span><span class=\"p\">,<\/span> <span class=\"mi\">5<\/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>\r\nPopulating the interactive namespace from numpy and matplotlib\r\n\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\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>An Iron Condor is composed of four options: long put, short put, short call, long call. The Iron Condor is equivalent to two other, non-primitive, positions.<\/p>\n<p>The first is a position that is short one (credit) put spread (a bull put spread) and short one (credit) call spread (a bear call spread).<\/p>\n<p>We can also describe it as being short one strangle (the inner, short, put and call &#8211; also called the body) and long one strangle (the outer, long, put and call &#8211; also called the wings) with the long strangle being wider than the short strangle.<\/p>\n<p>In the following scenario, we&#8217;re going to assume we have an Iron Condor at 90\/100 and 150\/160 and we receive $1 for each spread we sell. The underlying stock price is $125. Our spread widths are $10. In one Iron Condor we sell two spreads, so we receive $2.<\/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&nbsp;[3]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"n\">stockP<\/span> <span class=\"o\">=<\/span> <span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">linspace<\/span><span class=\"p\">(<\/span><span class=\"mi\">75<\/span><span class=\"p\">,<\/span><span class=\"mi\">175<\/span><span class=\"p\">,<\/span><span class=\"mi\">200<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">zs<\/span>     <span class=\"o\">=<\/span> <span class=\"n\">stockP<\/span> <span class=\"o\">*<\/span> <span class=\"mf\">0.0<\/span>\r\n<span class=\"n\">width<\/span> <span class=\"o\">=<\/span> <span class=\"mf\">10.0<\/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\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<h3 id=\"The-Standalone-Spreads\">The Standalone Spreads<a class=\"anchor-link\" href=\"#The-Standalone-Spreads\">&#182;<\/a><\/h3>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>Here we have the strike, premium, and value of the put side of the Iron Condor.<\/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&nbsp;[33]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"n\">shortPutStrike<\/span> <span class=\"o\">=<\/span> <span class=\"mf\">100.0<\/span>\r\n<span class=\"n\">longPutStrike<\/span> <span class=\"o\">=<\/span> <span class=\"n\">shortPutStrike<\/span> <span class=\"o\">-<\/span> <span class=\"n\">width<\/span>\r\n\r\n<span class=\"n\">longPutPrem<\/span> <span class=\"o\">=<\/span> <span class=\"mf\">3.00<\/span>\r\n<span class=\"n\">shortPutPrem<\/span> <span class=\"o\">=<\/span> <span class=\"mf\">4.00<\/span>\r\n\r\n<span class=\"n\">longPutV<\/span>  <span class=\"o\">=<\/span> <span class=\"o\">-<\/span><span class=\"n\">longPutPrem<\/span> <span class=\"o\">+<\/span> <span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">maximum<\/span><span class=\"p\">(<\/span><span class=\"n\">longPutStrike<\/span> <span class=\"o\">-<\/span> <span class=\"n\">stockP<\/span><span class=\"p\">,<\/span> <span class=\"n\">zs<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">shortPutV<\/span> <span class=\"o\">=<\/span> <span class=\"n\">shortPutPrem<\/span> <span class=\"o\">-<\/span> <span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">maximum<\/span><span class=\"p\">(<\/span><span class=\"n\">shortPutStrike<\/span> <span class=\"o\">-<\/span> <span class=\"n\">stockP<\/span><span class=\"p\">,<\/span> <span class=\"n\">zs<\/span><span class=\"p\">)<\/span>\r\n\r\n<span class=\"n\">bullPutSpreadV<\/span> <span class=\"o\">=<\/span> <span class=\"n\">longPutV<\/span> <span class=\"o\">+<\/span> <span class=\"n\">shortPutV<\/span>\r\n<span class=\"k\">print<\/span> <span class=\"s\">&quot;put spread (max loss, max gain): (<\/span><span class=\"si\">%s<\/span><span class=\"s\">, <\/span><span class=\"si\">%s<\/span><span class=\"s\">)&quot;<\/span><span class=\"o\">%<\/span> <span class=\"p\">(<\/span><span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">min<\/span><span class=\"p\">(<\/span><span class=\"n\">bullPutSpreadV<\/span><span class=\"p\">),<\/span> <span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">max<\/span><span class=\"p\">(<\/span><span class=\"n\">bullPutSpreadV<\/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>\r\nput spread (max loss, max gain): (-9.0, 1.0)\r\n\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\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>And likewise, here we have the strike, premium, and value of the call side of the Iron Condor.<\/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&nbsp;[38]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"n\">shortCallStrike<\/span> <span class=\"o\">=<\/span> <span class=\"mf\">150.0<\/span>\r\n<span class=\"n\">longCallStrike<\/span> <span class=\"o\">=<\/span> <span class=\"n\">shortCallStrike<\/span> <span class=\"o\">+<\/span> <span class=\"mf\">10.0<\/span>\r\n\r\n<span class=\"n\">longCallPrem<\/span> <span class=\"o\">=<\/span> <span class=\"mf\">2.50<\/span>\r\n<span class=\"n\">shortCallPrem<\/span> <span class=\"o\">=<\/span> <span class=\"mf\">3.50<\/span>\r\n\r\n<span class=\"n\">shortCallV<\/span> <span class=\"o\">=<\/span> <span class=\"n\">shortCallPrem<\/span> <span class=\"o\">-<\/span> <span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">maximum<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span> <span class=\"o\">-<\/span> <span class=\"n\">shortCallStrike<\/span><span class=\"p\">,<\/span> <span class=\"n\">zs<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">longCallV<\/span> <span class=\"o\">=<\/span> <span class=\"o\">-<\/span><span class=\"n\">longCallPrem<\/span> <span class=\"o\">+<\/span> <span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">maximum<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span> <span class=\"o\">-<\/span> <span class=\"n\">longCallStrike<\/span><span class=\"p\">,<\/span> <span class=\"n\">zs<\/span><span class=\"p\">)<\/span>\r\n\r\n<span class=\"n\">bearCallSpreadV<\/span> <span class=\"o\">=<\/span> <span class=\"n\">longCallV<\/span> <span class=\"o\">+<\/span> <span class=\"n\">shortCallV<\/span>\r\n<span class=\"k\">print<\/span> <span class=\"s\">&quot;call spread (max loss, max gain): (<\/span><span class=\"si\">%s<\/span><span class=\"s\">, <\/span><span class=\"si\">%s<\/span><span class=\"s\">)&quot;<\/span><span class=\"o\">%<\/span> <span class=\"p\">(<\/span><span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">min<\/span><span class=\"p\">(<\/span><span class=\"n\">bearCallSpreadV<\/span><span class=\"p\">),<\/span> <span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">max<\/span><span class=\"p\">(<\/span><span class=\"n\">bearCallSpreadV<\/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>\r\ncall spread (max loss, max gain): (-9.0, 1.0)\r\n\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&nbsp;[60]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"n\">ax1<\/span> <span class=\"o\">=<\/span> <span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">subplot<\/span><span class=\"p\">(<\/span><span class=\"mi\">121<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">ax2<\/span> <span class=\"o\">=<\/span> <span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">subplot<\/span><span class=\"p\">(<\/span><span class=\"mi\">122<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">ax1<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">,<\/span> <span class=\"n\">bullPutSpreadV<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">ax2<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">,<\/span> <span class=\"n\">bearCallSpreadV<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">labelIt<\/span><span class=\"p\">(<\/span><span class=\"n\">ax1<\/span><span class=\"p\">,<\/span> <span class=\"s\">&quot;Put Spread&quot;<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">labelIt<\/span><span class=\"p\">(<\/span><span class=\"n\">ax2<\/span><span class=\"p\">,<\/span> <span class=\"s\">&quot;Call Spread&quot;<\/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 \">\n<img decoding=\"async\" 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tzxXJ2yXb+GLLXq9ncGCaG7HkVTRPovR+T\n9DpJT+r+utR777IdFbLWaLVVq3AmEIBt1EgAMdszXdLhI8e1sJRkPRSkFE0TKOlMSdeGEOZCCHOS\nrpf0wIzHFB1ra5+bs\/fcHsJa\/pXIbpf1\/JBEjUzF8lyxnF2ynT+G7JPjY9o1NalbW6NdEhpD9rya\nyHoAK+ySdKf3\/u3d47sknSjpuuyGhKw1W23VqqXNnwgAxUaNBBC15SWhJ5\/ACq48iKkJPCxpp6SX\nSHKS3i3pR+s9+eDBgz\/u\/pfXA1s4Xrn2OYbxDPP4Zx7xc1pYSnT1\/\/uKnLOXf\/Xx8mOxjGeUx1dd\ndZUuvvjiaMZD\/tEd48dS10ir9VGS3vOe9+icc86JZjz8+4D8ozhe\/TPIajzu6B06+LXD+o+n\/NzI\n3t9yfTx48KCmpqbUK5ckcazd9d6PS7pC0hPVKXCXhRAes9ZzDxw4kOzbt2+Uw4vGyuJedNf+6Kje\ndsVNeu8v\/IcfP2Yp\/2pkt5ldsp1\/ZmZG+\/fvN3\/tW9oaabk+SrbniuXsku38sWQPX79Vdx5b0K8\/\n8uSRvWcs2bPST42M5prAEMKiOhe9XybpM5IuzXRAkbL0P3pztq36qqWglvKvRna7rOcHNTIty3PF\ncnbJdv5YsteqZTVGvFdgLNnzaCLrAawUQviMOsUNUGOWO4MCwDJqJICY1aulTDaMR2+iOROIdFau\n\/y665hobxVvKvxrZ7bKeH0jL8lyxnF2ynT+W7LVKWc3WvEZ5qVks2fOIJhDRarbuvRwUAAAA8Zkq\njas8MaY75hayHgpSoAnMGUtrnxuz7XudCbSUfzWy22U9P5CW5bliObtkO39M2WuV0S4JjSl73tAE\nIkrzi0u6c25Be3ZwJhAAACAPatWyGi2uC8wDmsCcsbL2+VBrXrunJzU+ds+73lrJvxay22U9P5CW\n5bliObtkO39M2evVspqz8yN7v5iy5w1NIKLU5M6gAAAAuVKrlEa+TQR6QxOYM1bWPjdb974zqGQn\n\/1rIbpf1\/EBalueK5eyS7fwxZa9Xy2qOcDloTNnzhiYQUWrOtlWvcD0gAABAXnQ2jB\/dclD0jiYw\nZ6ysfV7rzqCSnfxrIbtd1vMDaVmeK5azS7bzx5R91\/YJHVtY0tH5xZG8X0zZ84YmEFFqtuZVX6MJ\nBAAAQJycc51tIrhDaPRoAnPGwtrnpSTRoVZbe9dYDmoh\/3rIbpf1\/EBalueK5eyS7fyxZa+N8A6h\nsWXPE5pAROfw0eOaLo1r++R41kMBAADAFtQrJfYKzAGawJyxsPa5uc71gJKN\/Oshu13W8wNpWZ4r\nlrNLtvPHlr1zJnA0TWBs2fOEJhDRacyuvT0EAAAA4larcIfQPKAJzBkLa587G8WvvT2EhfzrIbtd\n1vMDaVmeK5azS7bzx5a9Xh3djWFiy54nNIGITqPVVq3CmUAAAIC82TNd0uEjx7WwlGQ9FGyAJjBn\nLKx9bs6uvz2EhfzrIbtd1vMDaVmeK5azS7bzx5Z9cnxMu6YmdWtr+EtCY8ueJzSBiE6z1VatuvZy\nUAAAAMRtlEtC0RuawJwp+trnu9sLWlhKtHPbxJpfL3r+jZDdLuv5gbQszxXL2SXb+WPMXquW1RjB\nHUJjzJ4XNIGISqM1r1qlLOdc1kMBAABAD+qVsg6NYDkoekcTmDNFX\/vcnG2rvsFS0KLn3wjZ7bKe\nH0jL8lyxnF2ynT\/G7KM6Exhj9rygCURUGrPcGRQAACDP6tXSyDaMR29oAnOm6Gufm5tsFF\/0\/Bsh\nu13W8wNpWZ4rlrNLtvPHmH1vpaxma15JMtxtImLMnhc0gYhKs7XxclAAAADEbUdpXOWJMd0xt5D1\nULAOmsCcKfra58Zse8MzgUXPvxGy22U9P5CW5bliObtkO3+s2WuV4S8JjTV7HtAEIhrzi0u6c25B\ne3ZwJhAAACDPatWyGuwVGC2awJwp8trnQ6157Z6e1PjY+ttDFDn\/Zshul\/X8QFqW54rl7JLt\/LFm\nr1fLas4Od5uIWLPnAU0gotHkzqAAAACFUKuURrJNBHpDE5gzRV773GxtfGdQqdj5N0N2u6znB9Ky\nPFcsZ5ds5481e71aVnPIy0FjzZ4HNIGIRnO2rXqF6wEBAADyrrNh\/HCXg6J3NIE5U+S1z5vdGVQq\ndv7NkN0u6\/mBtCzPFcvZJdv5Y82+a\/uEji0s6ej84tDeI9bseUATiGg0W\/Oqb9IEAgAAIH7Ouc42\nEdwhNEo0gTlT1LXPS0miQ6229m6yHLSo+dMgu13W8wNpWZ4rlrNLtvPHnL025DuExpw9djSBiMLh\no8c1XRrX9snxrIcCAACAAahVSuwVGCmawJwp6trnZorrAaXi5k+D7HZZzw+kZXmuWM4u2c4fc\/bO\nXoHDawJjzh47mkBEoTG7+fYQAAAAyI9ahTuExoomMGeKuva5s1H85ttDFDV\/GmS3y3p+IC3Lc8Vy\ndsl2\/piz16vDvTFMzNljRxOIKDRabdUqnAkEAAAoij3TJR0+clwLS0nWQ8EqNIE5U9S1z83ZdNtD\nFDV\/GmS3y3p+IC3Lc8Vydsl2\/pizT46PadfUpG5tDWdJaMzZYzeR9QBW8t6\/V9LZ6jSnLwgh3JDx\nkDAizVZbtermy0EBwCLqI4C8Wl4SevIJrPiKSaozgd77B3jvL1hxPD2MwYQQXhxCeLyk10l65TDe\nI++KuPb57vaCFpYS7dy2+WcSRcyfFtntsp4\/dqOokdTHdCzPFcvZJdv5Y89eq5bVGNIdQmPPHrNN\nm0Dv\/XMkfUjSG7rHTtKnhjyuliRuJWREozWvWqUs51zWQwGALcmgRlIfAeRKvTLcbSLQmzTLQV8i\n6XGS\/lmSQgiJ976vN\/Xeny\/pVasefnkI4Rvd3\/+qpHf29SYFVcS1z83Ztuopl4IWMX9aZLfLev7I\nDbRGUh\/7Y3muWM4u2c4fe\/Zataxv3XZkKK8de\/aYpWkCF0II7eWi1l3msr2fNw0hXCbpsrW+5r1\/\nqqRrQgjf2eg1Dh48+OM\/+OVTwRzn8\/hfrrpWi4uSdHoU4+GYY47jOc6BgdZI6iPHHHNctOP6g\/ap\nOduOZjxFOp6amlKvXJJsfMtW7\/2bJS1JOl\/SJep8QvnREMLben7X9d\/r4ZKeFUJ4xUbPO3DgQLJv\n375Bv30urCzuRfG2K27SWbundOGD7rvpc4uYPy2y28wu2c4\/MzOj\/fv3R7tWfFQ1kvqYjuW5Yjm7\nZDt\/7NmPzC\/qWR+6Wh973kMHfulP7NmHrZ8amebGML8r6UZJ35P0bEnvHkYD2PURSY\/w3l\/uvf\/j\nIb0HItNspV8OCgCRGVWNpD4CyKUdpXGVJ8Z0x9xC1kPBCpueCYyR9U86i+ZXPny13nLhmWwWD+Be\nYj8TGBvqI4AYvexj1+hFjzxZD947lA0GzBr2mUBgaOYXl3Tn3IL27OBMIAAAQBHVqmU1WtwhNCYT\nmz3Be3+3pNWnC5MQQnU4Q8JGirb2+VBrXrunJzU+lu5DjKLl3wqy28wukT9m1Mi4WJ4rlrNLtvPn\nIXu9WlZzdvC72+Qhe6w2bQJDCPc4b+u9f7Skhw9tRDClOdtmGSiA3KJGAsDmapWSZm5pZT0MrLDl\n5aAhhCslnTWEsSCFon3a0WzNq1ZN3wQWLf9WkN0u6\/nzhBqZLctzxXJ2yXb+PGSvV8tqDmE5aB6y\nxyrNctCH655LXU6S9MihjQimNGfbqle4HhBAPlEjAWBztWpZjSEsB0Xv0pwJfOuqXy9U55bYyMDy\nRpFF0Zhtb+lMYNHybwXZ7bKeP3LUyIhYniuWs0u28+ch+67tEzq2sKSj84sDfd08ZI9VmmsCHzeC\nccCoZmte9S00gQAQE2okAGzOOadapaRmq60zTpzKejgQW0TkTpHWPi8liQ612tq7heWgRcq\/VWS3\ny3p+IC3Lc8Vydsl2\/rxkr1UGf4fQvGSPUU9NoPf+Zwc9ENhz+OhxTZfGtX1yPOuhAMDAUCMB4N5q\n1RJ7BUak1zOBbxnoKJBakdY+N7d4PaBUrPxbRXa7rOfPIWpkRizPFcvZJdv585K9s1fgYJvAvGSP\n0brXBHrvP7HB9z14CGOBMY3ZrW0PAQCxoEYCwNbUKmV96Xt3ZT0MdG10Y5jTJL1Uklvja3zKmZEi\nrX3ubBS\/te0hipR\/q8hul\/X8kaJGRsjyXLGcXbKdPy\/Z69XSwPcKzEv2GG3UBH4jhPCFkY0E5jRa\nbT3y1BOyHgYA9IIaCQBbsGe6pMNHjmthKdHE2Fqfn2GU1r0mMITw7FEOBOkUae1zc3br20MUKf9W\nkd0u6\/ljRI2Mk+W5Yjm7ZDt\/XrJPjo9p19Skbm0N7g6heckeI7aIQGaarbZq1a0tBwUAAEA+DWNJ\nKHqz6Wbx3vttkp4hqabOtQ9O0kkhhFcOeWxYQ1HWPt\/dXtDCUqKd2zb9X\/AeipK\/F2S3y3r+mFEj\n42J5rljOLtnOn6fstWpZjQHeITRP2WOT5l\/gfy\/puKQdkq6T9DBJnx\/imGBAozWvWqUs51gTDiDX\nqJEAkFK9MvhtItCbNMtB6yGEp0v6iDrF7gJJ5wx1VFhXUdY+N2fbqvewFLQo+XtBdrus548cNTIi\nlueK5eyS7fx5yl6rltXgmsAopGkCb+v+91pJjw4h3Cnp1OENCRY0ZtuqVdgjEEDuUSMBIKVapaRD\nnAmMQpom8Mve+92SDkp6mvf+SknfGu6wsJ6irH1u9rhRfFHy94LsdlnPHzlqZEQszxXL2SXb+fOU\nvVYtq9maV5IkA3m9PGWPzabXBIYQLln+vff+sZLOlvTvwxwUiq\/ZautxZ+zMehgA0BdqJACkt6M0\nrvLEmO6YW9Cuqcmsh2PaumcCvff3+loI4UgIYSaEsDTcYWE9RVn73Jht93QmsCj5e0F2u6znjxE1\nMk6W54rl7JLt\/HnLXquUBnZzmLxlj8lGZwJv9t5\/QlKQ9LkQwmDO28K8+cUl3Tm3oD072CMQQG5R\nIwGgB52bw7T14L3TWQ\/FtI2awIdIerqkl0t6\/4pi93mKXXaKsPb5UGteu6cnNT629e0hipC\/V2S3\ny3r+SFEjI2R5rljOLtnOn7fs9WpZzdnB3CE0b9ljsu5y0BDC7SGEvwohPEWdYnelpN+SdIP3\/l2j\nGiCK51CLO4MCyDdqJAD0plYpDXTDePQmzd1B1b3l9ccl\/YOk70t62jAHhfUVYe1zo8c7g0rFyN8r\nsttlPX\/sqJHxsDxXLGeXbOfPW\/Z6taxmi2sCs7bh3UG99\/dRZ7nLL0l6sDpF7rWSvjT8oaGomrNt\n1StcDwgg36iRALB1tWpZjQEtB0Xv1m0CvfefVqeofULSmyRdwR3PsleEtc+N2bYeWuvtYuAi5O8V\n2e2ynj9G1Mg4WZ4rlrNLtvPnLfuu7RM6trCko\/OLmiqN9\/Vaecsek43OBL5FnTueLY5qMLCh2ZpX\nvcfloAAQCWokAPTAOdfZJqLV1hknTmU9HLM2ujHMZRS3+OR97fNSkuhQq629PS4HzXv+fpDdLuv5\nY0SNjJPluWI5u2Q7fx6z1yqDuUNoHrPHItWNYYBBOXz0uKZL49o+2d\/pfwAAAORTrVpSY0A3h0Fv\naAJzJu9rn5uz7Z7vDCrlP38\/yG6X9fxAWpbniuXsku38ecze2Suw\/yYwj9ljQROIkepnewgAAADk\nX63CHUKzRhOYM3lf+9ycbavWx\/YQec\/fD7LbZT0\/kJbluWI5u2Q7fx6z16ulgewVmMfssaAJxEg1\nWm3VKpwJBAAAsGrPdEmHjxzXwlKS9VDMognMmbyvfT7U5\/YQec\/fD7LbZT0\/kJbluWI5u2Q7fx6z\nT46PadfUpG5t9bckNI\/ZY0ETiJFqzLZVq\/a+HBQAAAD5N6gloejNRpvFS5K894+WdLGknSseTkII\nFw1tVFjXwYMHc\/upx93tBS0sJdq5bdP\/7daV5\/z9IrvN7BL5Y0aNjIvluWI5u2Q7f16z16plNfq8\nQ2hes8cgzb\/G3y\/pDyV9b8VjQ1nA670vS7pW0ptCCO8axnsgO43WvGqVspxzWQ8FAAaFGgkAPahX\nBrNNBHqTpgm8PoTwvmEPpOvFkv5NQyqgRZDnTzuas23V+1wKmuf8\/SK7XdbzR44aGRHLc8Vydsl2\n\/rxm31st6Zu3HenrNfKaPQZprgn8B+\/904c9EO\/9lKTzJX1MEqeKCqgxy51BARQONRIAesCZwGyl\nORP4Nkll7\/2xFY8lIYRqL2\/ovT9f0qtWPfxySRdI+lNJJ\/Xyulbkee1zc3ZeZ+2e6us18py\/X2S3\nmV0if+R+4c5fAAAfxUlEQVSokRGxPFcsZ5ds589r9lq1rGZrXkmS9HypUF6zx2DTJjCEMD3INwwh\nXCbpspWPee9PkHReCOGPvPfPT\/M6K\/\/QlzeK5Dju42brJD3ujJ3RjCdvx8tiGc8oj6+66qqoxkP+\n0R3HLsYaabk+XnXVVVGNh2OOR3G8LJbxpD3+2lf\/RePJlO6YW9CuqUnqYw\/HU1O9n1xxSZL9pQXe\n+6dI+h1JP5T0AHWa0+eGEL611vMPHDiQ7Nu3b4QjxCD8yoev1lsuPJMloQBSm5mZ0f79+00vf9xK\njaQ+AsiTl33sGr3okSfrwXsH+nmaGf3UyInNnuC93ybp99RZipJI+idJbwwhDGwRbwjhk5I+2X2\/\n50nasV4DiHyaX1zSnXML2rODPQIBFAc1EgB6V6uW1Wi1aQIzkObGMO+QVJX0y5KeI2m3pHcOa0Ah\nhPeHEN49rNfPu9Wn\/vPiUGteu6cnNT7W3wf6ec0\/CGS3y3r+yFEjI2J5rljOLtnOn+fs9WpZzdn5\nnr8\/z9mztumZQEk\/HUJ41Irj3\/Tef3lYA0IxHWpxZ1AAhUSNBIAe1SolzdzSynoYJqU5EzjmvZ9c\nPuhuVpvm+zAEeblZwmqN2XnVqv03gXnNPwhkt8t6\/shRIyNiea5Yzi7Zzp\/n7PVqWc1W76vn85w9\na2nOBP6NpM9579+nTmF7vqQPDXFMKKDmbFv1CtcDAigcaiQA9KhWLavRx3JQ9G7TTytDCG+X9AeS\nHiTpbEn\/M4TwjmEPDGvL69rnxmx7IGcC85p\/EMhul\/X8MaNGxsXyXLGcXbKdP8\/Zd22f0LGFJR2d\nX+zp+\/OcPWtpzgSuuW8RsBXN1rzqA2gCASA21EgA6I1zTnsrJTVbbZ1xYu973mHruG4hZ\/K49nkp\nSXSo1dbeASwHzWP+QSG7XdbzA2lZniuWs0u28+c9e73S+5LQvGfPEk0ghu7w0eOaLo1r++R41kMB\nAABARGrVUl83h0Fv1l0O6r1\/XQjhEu\/9J9b4chJCuGiI48I6Dh48mLtPPZoDuh5Qymf+QSG7zewS\n+WNEjYyT5bliObtkO3\/es9erZd14+1xP35v37Fna6JrAD3b\/e5qkl0pauct3MrQRoXAGtT0EAESE\nGgkAA1CrlPWl792V9TDMWbcJDCFc2\/3tXSGEL4xoPNhEHj\/taM62VRvQ9hB5zD8oZLfLev4YUSPj\nZHmuWM4u2c6f9+z1PpaD5j17ltJcE3j+0EeBQmu02qpVOBMIoJCokQDQhz3TJR0+clwLSyyiGKU0\n+wQeG8VAkE4e90M5NMDtIfKYf1DIbpf1\/DGjRsbF8lyxnF2ynT\/v2SfHx7RralK3trZ+h9C8Z89S\nT3cH9d6zkQdS62wUP5jloAAQO2okAGxNP0tC0ZtNm0Dv\/SWrjsck\/f3QRoQN5W3t893tBS0sJdq5\nbaN7EKWXt\/yDRHa7rOePGTUyLpbniuXsku38Rcheq5bVmN16E1iE7FlJcybwiSsPQghLkqrDGQ6K\nptGaV61SlnNu8ycDQP5QIwGgT7VKWc0emkD0bqN9Ai+Q9BRJp3vv\/1g\/uf31HkksdclI3vZDac62\nVR\/gUtC85R8kstvMLpE\/RtTIOFmeK5azS7bzFyF7rVrSt247suXvK0L2rGy0Rq8h6d8kPan7X6fO\n3kfHJH12+ENDETRmuTMogEKiRgLAgNQ5EzhyLkk2vh2r9\/43QgjvGtF4Ujlw4ECyb9++rIeBFN52\nxU06a\/eULnzQfbMeCoAcmpmZ0f79+6NdTx5bjaQ+AsijI\/OLeuaHrtbHn\/dQLiHagn5qZJotIqIp\nbsifZmuwy0EBICbUSADo347SuLZNjOmOuYWsh2JGT1tEIDt52w+lsz3E4JaD5i3\/IJHdLuv5gbQs\nzxXL2SXb+YuSvVYpbXlJaFGyZ4EmEEMzv7ikO+cWtGcHZwIBAACwvlq1rAZ7BY7MRncHPTuEcI33\n\/uHqXOx+DyGEmaGODGvK0x2QDrXmtXt6UuNjg1vbnaf8g0Z2u6znjxE1Mk6W54rl7JLt\/EXJXq+W\n1Zyd39L3FCV7Fja6O+gzJb1O0gFJX1vj648fyohQGIda3BkUQGFRIwFggGqVkmZuaWU9DDPWbQJD\nCK\/r\/vaqEALFLBJ52g+lMTs\/0OsBpXzlHzSy28wukT9G1Mg4WZ4rlrNLtvMXJXu9WtY\/fedHW\/qe\nomTPQpprAj889FGgkJqzbdUrXA8IoNCokQAwALVqWY0tLgdF7zbdJzBG7IOUD6\/99PV68tkn6jH3\n35n1UADkVOz7BMaG+gggr5Ik0UXv+7r+9lfO0VRpPOvh5MJQ9wkEetVszas+4OWgAAAAKB7nnPZW\ny2pyh9CR2FIT6L1\/gPf+Au89n8pmJC\/7oSwliQ612to74OWgeck\/DGS3y3r+vKBGZs\/yXLGcXbKd\nv0jZ65WtLQktUvZR27QJ9N5\/pvvf+0r6rKSXSXrTkMeFnDt89LimS+PaPsnpfADFRY0EgMGpVbe+\nYTx6k+ZM4HT3v8+U9OYQwgWSHje0EWFDebkDUnO2PfA7g0r5yT8MZLfLev7IUSMjYnmuWM4u2c5f\npOz1LS4HLVL2UUvTBE547yckXSTpo93Hjg1vSCiCYWwPAQARokYCwIDUtrgcFL1L0wT+jaSGpGYI\n4Vbv\/bikheEOC+vJy9rn5mxbtSFsD5GX\/MNAdrus548cNTIilueK5eyS7fxFyl6vlrZ0JrBI2Udt\n0yYwhPA2SWeFEJ7XPV6U9IRhDwz51mi1VatwJhBAsVEjAWBw9kyXdPjIcS0s5W8Lu7xhn0AMxUs\/\ndo0u\/rlT9FMn7ch6KAByjH0Ct4b6CCDvnvM339QbL3igTj6Bkwmb6adGTqR5kvf+CZIukJRI+mQI\n4fO9vBnsaMy2VasOfjkoAMSGGgkAg7O8JJQmcLjSbBHxUkl\/KOlaSddL+iPv\/W8Oe2BYWx7WPt\/d\nXtDCUqKd21J9xrAlecg\/LGS3y3r+mFEj42J5rljOLtnOX7TseytlNVJuE1G07KOU5l\/pz5H0n0II\nxyTJe\/8BSV+Q9KfDHBjyq9GaV61SlnOs4AJQeNRIABigerXMXoEjkObuoAvLxU2SQghHxZ3PMpOH\n\/VCas23Vh7QUNA\/5h4XsdlnPHzlqZEQszxXL2SXb+YuWvVYtqdFKt01E0bKPUpozgd\/03r9J0p+p\n0zS+WNJVQx0Vcq0xy51BAZhBjQSAAapXOBM4CmnOBP6WpOOS\/lbShyUd7T42UN77U7z3l3vvv+i9\nf9ugX78o8rD2uTnEjeLzkH9YyG6X9fyRo0ZGxPJcsZxdsp2\/aNlr1bKarXml2cGgaNlHadMzgd2l\nLa\/p\/hqmt0h6TQjhyiG\/D4as2WrrcWfszHoYADB01EgAGKwdpXFtmxjTHXML2jU1mfVwCmvDJtB7\nv13SqZJuCCEM7RoH7\/24pDMobpvLw9rnzvYQwzkTmIf8w0J2u6znjxU1Mj6W54rl7JLt\/EXMXquU\n1Jxtb9oEFjH7qKzbBHrvnyzpryT9QNIJ3vtfCiH0fZ2D9\/58Sa9a9fD\/krTNe\/+PkqqS\/iSE8NF+\n3wujN7+4pDvnFrRnB3sEAiguaiQADE+tWlaj1daD905nPZTC2uhM4B9IenQI4Xve+7MlvUnS0\/p9\nwxDCZZIuW\/mY935C0l2S\/oukcUlf8t7\/cwhhbr3XOXjw4I+7\/+X1wBaOV659jmE8q48PteY1Pb6o\nf7nySybzD\/N49c8g6\/GM8viqq67SxRdfHM14yD+644hFWyOt1kdJes973qNzzjknmvHw7wPyj+J4\n9c8g6\/EM4rheLesrV39X22\/9NvVxg+OpqSn1yq130aX3\/mAI4dwVx58PITyu53fahPf+w5JeEUK4\nxXt\/UNL56xW4AwcOJPv27RvWUKK2srjH6Ks\/uEsfvfqHesMFDxzK68eef5jIbjO7ZDv\/zMyM9u\/f\nH92mo7HWSMv1UbI9Vyxnl2znL2L2z1x7WDO3tPS7j7\/\/hs8rYvat6KdGbtQE3qDOZrfLL3yxpHd3\nj5MQwkDvTua9v5+k90o6QVIIIbxzvedaL3Ix+8dv\/lA33XlML3vMqVkPBUABRNwERlkjqY8AiuDq\nQ3frz796i9550dlZDyVq\/dTIiQ2+9n8kVVYc\/\/Wq44EKIdwk6SnDen2MRnO2rXqF6wEBFB41EgCG\npFYpqzGbbsN49GbdJjCEcOkIx4GUYj\/t3Zht66G14V3EG3v+YSK7zewS+WNEjYyT5bliObtkO38R\ns++amtCx44s6Or+oqdL4us8rYvZRSbNZPJBaszWv+pC2hwAAAEDxOee0t1pWs9XOeiiFRROYMzF\/\n2rGUJDrUamvvEJeDxpx\/2Mhul\/X8QFqW54rl7JLt\/EXNXk+xJLSo2UeBJhADc\/jocU2XxrV9cv3T\n9gAAAMBmatXOhvEYDprAnFm5J0xsmrNt1Ya8FDTm\/MNGdrus5wfSsjxXLGeXbOcvavZ6d8P4jRQ1\n+yjQBGJgGrPzQ28CAQAAUHy1SllN7hA6NDSBORPz2udRbA8Rc\/5hI7td1vMDaVmeK5azS7bzFzV7\nvVra9MYwRc0+CjSBGJhGq629Fc4EAgAAoD97pks6fOS4FpaSrIdSSDSBORPz2udDI9geIub8w0Z2\nu6znB9KyPFcsZ5ds5y9q9snxMe2amtStrfWXhBY1+yjQBGJgGrNt1arDXQ4KAAAAG2oploSiNzSB\nORPr2ue72wtaWEq0c9vEUN8n1vyjQHa7rOcH0rI8Vyxnl2znL3L2WqWsxgbbRBQ5+7DRBGIgGq15\n1SplOeeyHgoAAAAKoF4ts1fgkNAE5kysa5+bs23VR7AUNNb8o0B2u6znB9KyPFcsZ5ds5y9y9lq1\npAbXBA4FTSAGojHbVo07gwIAAGBA6hXOBA4LTWDOxLr2uTmijeJjzT8KZLfLen4gLctzxXJ2yXb+\nImevVctqtuaVJGtvE1Hk7MNGE4iBaLZGsxwUAAAANuwojWvbxJhun1vIeiiFQxOYM7Gufe5sDzH8\nM4Gx5h8FsttlPT+QluW5Yjm7ZDt\/0bPXKiUdWmdJaNGzDxNNIPo2v7ikO+cWtGcHZwIBAAAwOLVq\nWQ32Chw4msCciXHt86HWvHZPT2p8bPjbQ8SYf1TIbpf1\/EBalueK5eyS7fxFz97ZJmLtO4QWPfsw\n0QSib4da3BkUAAAAg1erlDbcMB69oQnMmRjXPjdGdGdQKc78o0J2u6znB9KyPFcsZ5ds5y969s4d\nQrkmcNBoAtG35mxb9QrXAwIAAGCw6pWyGussB0XvaAJzJsa1z6O6M6gUZ\/5RIbtd1vMDaVmeK5az\nS7bzFz37rqkJHTu+qKPzi\/f6WtGzDxNNIPrWbM2rPqImEAAAAHY457R3gyWh6A1NYM7EtvZ5KUl0\nqNXW3hEtB40t\/yiR3S7r+YG0LM8Vy9kl2\/ktZF9vSaiF7MNCE4i+HD56XNOlcW2fHM96KAAAACig\nWrWkJncIHSiawJyJbe1zc4TXA0rx5R8lsttlPT+QluW5Yjm7ZDu\/hez1dTaMt5B9WGgC0ZdRbg8B\nAAAAe2qVMmcCB4wmMGdiW\/s86u0hYss\/SmS3y3p+IC3Lc8Vydsl2fgvZ69WSmi2uCRwkmkD0pdlq\na2+FM4EAAAAYjj3TJR0+clwLS0nWQykMmsCciW3t86i3h4gt\/yiR3S7r+YG0LM8Vy9kl2\/ktZJ8c\nH9OuqUnduupsoIXsw0ITiL50Noof3XJQAAAA2FOrltgrcIBoAnMmprXPd7cXtLCUaOe2iZG9Z0z5\nR43sdlnPD6Rlea5Yzi7Zzm8le61SVmPVzWGsZB8GmkD0rNGaV61SlnMu66EAAACgwOpV7hA6SDSB\nORPT2ufmbFv1ES8FjSn\/qJHdLuv5gbQszxXL2SXb+a1kr1VLanBN4MDQBKJnjdm2atwZFAAAAENW\nZ6\/AgaIJzJmY1j43M9goPqb8o0Z2u6znB9KyPFcsZ5ds57eSvVYtq9maV5L8ZJsIK9mHgSYQPWu2\nRr8cFAAAAPbsKI1r28SYbp9byHoohTC62zpuwnv\/XEm\/IWlB0u+HEC7PeEhRimntc2d7iNGeCYwp\n\/6iR3S7r+UGNTMvyXLGcXbKd31L2WqWk5mxbJ05NSrKVfdCiaQIlvULSwyTtkPRpSY\/KdjjYyPzi\nku6cW9CeHZwJBIARoEYCMK+zJLSth+ydznoouRfTctBvSXqspAslfTnjsUQrlrXPt7bmtXt6UuNj\no90eIpb8WSC7XdbzQxI1MhXLc8Vydsl2fkvZO9tE\/OQOoZayD9rIzwR678+X9KpVD79c0mck\/bak\nkqR3jXpc2JpmizuDAsCgUSMBYH21Skkzt7SyHkYhuJV32MmK9\/50SW8JIfxC9\/gKSf85hDC31vMP\nHDiQHD169MfrgJc\/BeB4dMdfvX1CEyeerJc95tQoxsMxxxwX83hmZkb79+8f7ZKDyGylRlIfOeaY\n4yIff\/\/omL567ES986KzoxhP1sdTU1M918hYmsAzJb01hHCR995J+qqk80IIx9Z6\/oEDB5J9+\/aN\ndIy4p\/f8y83avWNSv\/jQk7IeCoACowncWo2kPgIossNHjuvFH\/2OPvLsc7IeShT6qZFRXBMYQrhO\n0pe995+U9ClJ71qvAbRu+VOArGVxZ1ApnvxZILtd1vNbR41Mz\/JcsZxdsp3fUvZdUxM6dnxRR+cX\nJdnKPmgTWQ9gWQjh9VmPAek1W\/OqZ9AEAoBF1EgAkJxz2tu9Q+gZJ05lPZxci+JMINJbXgecpaUk\n0aFWW3sro98eIob8WSG7XdbzA2lZniuWs0u281vLXq+U1ejeIdRa9kGiCcSWHT56XNOlcW2fHM96\nKAAAADCkVu1sGI\/+0ATmTAxrn5sZXQ8oxZE\/K2S3y3p+IC3Lc8Vydsl2fmvZ69WyGq1OE2gt+yDR\nBGLLGrPzmTWBAAAAsKtWKXMmcABoAnMmhrXPzdm26hlcDyjFkT8rZLfLen4gLctzxXJ2yXZ+a9nr\n1RLXBA4ATSC2rNlqa2+FM4EAAAAYrT3TJd1+9LgWlrLf6zzPaAJzJoa1z1luDxFD\/qyQ3S7r+YG0\nLM8Vy9kl2\/mtZZ8cH9OuqUnd2po3l32QaAKxZZ2N4rNZDgoAAADbatWSmi2uC+wHTWDOZL32+e72\nghaWEu3cNpHJ+2edP0tkt8t6fiAty3PFcnbJdn6L2WuVshqzbZPZB4UmEFvSaM2rVinLOZf1UAAA\nAGBQvcodQvtFE5gzWa99bs62Vc9wKWjW+bNEdrus5wfSsjxXLGeXbOe3mL1WLanBNYF9oQnEljRm\n26pxZ1AAAABkpM5egX2jCcyZrNc+NzPeKD7r\/Fkiu13W8wNpWZ4rlrNLtvNbzF6rltVszesxj3lM\n1kPJLZpAbEmzle1yUAAAANi2ozSubRNjun1uIeuh5BZNYM5kvfa5sz1EdmcCs86fJbLbZT0\/kJbl\nuWI5u2Q7v9XstUpJnz74r1kPI7doApHa\/OKS7pxb0J4dnAkEAABAdmrVsu44TivTq2w2e0PPslz3\nfWtrXrunJzU+lt32EBbXvS8ju13W8wNpWZ4rlrNLtvNbzV6rlDRWPS3rYeQW7TNSu+aHR1XPcCko\nAAAAIHX2Crzmh0eVJEnWQ8klmsCcyWrd93U\/Oqo\/+8oteuZP783k\/ZdZXfcukd0y6\/mBtCzPFcvZ\nJdv5rWY\/9\/479YMf3qEPfu1Q1kPJJZaDjtBtd8\/rhX\/\/7b5eY3FxSuPXf31AI0pvaSnRqx9\/fz20\nNj3y9wYAAABWmiqN65dPbetvv3uHPnLVbVkPpyfPedhe\/eJDT8rkvV0eT6EeOHAg2bdvX9bD2LKl\nJNGx40tZD6Mn42NO5QlOHAMYrZmZGe3fvz+7C5FzJq\/1EQB6tbiUqL2Qz39fT4w7lcZ7\/\/d1PzWS\nM4EjNOacpkrjWQ8DAAAAKITxMf593QtO7eSM1XXfyyznJ7td1vMDaVmeK5azS7bzkx29oAkEAAAA\nAEO4JhAAEC2uCdwa6iMA2NFPjeRMIAAAAAAYQhOYM9bXPlvOT3a7rOcH0rI8Vyxnl2znJzt6QRMI\nAAAAAIZwTSAAIFpcE7g11EcAsINrAgEAAAAAqdAE5oz1tc+W85PdLuv5gbQszxXL2SXb+cmOXtAE\nAgAAAIAhXBMIAIgW1wRuDfURAOzgmkAAAAAAQCo0gTljfe2z5fxkt8t6fiAty3PFcnbJdn6yoxc0\ngQAAAABgCNcEAgCixTWBW0N9BAA7uCYQAAAAAJAKTWDOWF\/7bDk\/2e2ynh9Iy\/JcsZxdsp2f7OjF\nxKjf0Ht\/nqS3SvpCCOGVKx5\/oqRLuoeXhBA+N+qxAQCQJWokAGAUsjgTWJb0hpUPeO\/HJL1O0pO6\nvy713nMNyBrOPffcrIeQKcv5yW6X9fzGUCP7YHmuWM4u2c5PdvRi5E1gCOGzkm5f9fCZkq4NIcyF\nEOYkXS\/pgaMeGwAAWaJGAgBGYWjLQb3350t61aqHXx5C+MYaT98l6U7v\/du7x3dJOlHSdcMaX14d\nPHjQ9KcelvOT3WZ2ifxFRI0cDstzxXJ2yXZ+stvM3q+hNYEhhMskXZby6Ycl7ZT0EklO0rsl\/Wij\nb5iZmelrfHk1NTVlNrtkOz\/ZbWaXyF9Ew6yRlv9fsTxXLGeXbOcnu83s\/Rr5jWG6Vl\/LcL2ks1Yc\nnxlC+O5638yeUQCAAuu5RlIfAQBpjPyaQO\/9qyVdKump3vs\/k6QQwqI6F71fJukz3a8DAGAKNRIA\nMAouSZKsxwAAAAAAGBE2iwcAAAAAQ2gCAQAAAMCQrG4MsyXe+1MkfUCd8X41hPBy7\/0TJV3Sfcol\nIYTPZTbAIfLeP1fSb0hakPT7IYTLi5zde3+epLdK+kII4ZXdx9bMW7SfwzrZ3yvpbHU+sHlBCOGG\n7uOFz959vCzpWklvCiG8q\/tYobJL6\/7Zr\/x7719DCL\/TfbxQ+dfJfq+\/97qPFyr7IFiuj5KtGmm5\nPkrUSBmtkZbrozTcGpmXM4FvkfSaEMJ53QI3ps5F8k\/q\/rrUe1\/UO6K9QtKjJV0g6fXdnEXOXpb0\nhuWDtf6s13u8AD+He2SXpBDCi0MIj1cn6\/LkN5G968WS\/m35oKDZpbXzr\/x7b7nAFTH\/Wtnv8fee\nVNjsg2C5Pkq2aqTl+ihRI63WSMv1URpijYy+CfTej0s6I4Rw5YqHz5R0bQhhLoQwp87tsx+YyQCH\n71uSHivpQklfVsGzhxA+K+n2FQ\/dK6\/3\/sy1HlfOfw5rZF+pJWm++3sT2b33U5LOl\/SxFQ8XLrt0\n7\/zr\/L0nFTD\/Ov\/fr\/57Typg9n5RHyUZqpGW66NEjZTRGmm5PkrDrZF5WA66W9I27\/0\/SqpK+hNJ\nhyTd6b1\/e\/c5d0k6UdJ12QxxqD4j6bclTaqzQfCJspNdknZp7bxunceL+nP4VUnv7P5+vZ9J0bK\/\nTNKfSjppxWNWst\/r770QwkdlJ\/\/y33slSe\/qPmYl+1ZYr4+S7RpJffwJamSHhezW66M0oBqZhybw\nsDpB\/oukcUlfkvTfJO2U9BJ1\/rJ7t6QfZTXAYfHeny7pwhDCRd3jKyT9pgxkX+Gw1s47ts7jheO9\nf6qka0II3+k+tN7PpDC89ydIOjeE8Ebv\/fNXfKnw2bvu9fee9\/6fZSD\/Wn\/vee8\/KwPZe2C2PkrU\nSFEfJVEjDdZIs\/VRGmyNjH45aAjhuKQfSNobQpiX1Jb0XUlnrXjamSGE72YxviEbV7dR767r3S4b\n2VeuYb5ea+dd7\/G8u8f6be\/9wyU9NoTwjhUPW8j+GHU+6fuwOtc8vMB7\/1MqbnZpRf51\/t6Tipt\/\n5Z\/9hO79916i4mbvmfH6KNmskZbro0SNXGatRlquj9KQamT0TWDXqyX9uff+S5I+EkI4qs7Fj5ep\nc0r00gzHNjQhhOskfdl7\/0lJn5L0rqJn996\/Wp1MT\/Xe\/1kIYVFr5F3v8Txbnb378EckPcJ7f7n3\n\/o8lG9lDCJ8MITwxhPAsSe+R9FchhG8VMbu07p\/96r\/35oqYf40\/+2t177\/3jhUx+4CYrI+SvRpp\nuT5K1EgZrZGW66M03BrpkiQZ2sABAAAAAHHJy5lAAAAAAMAA0AQCAAAAgCE0gQAAAABgCE0gAAAA\nABhCEwgAAAAAhtAEAgAAAIAhE1kPALDIe79D0nslPVDSoqS\/DSH8yQBe92mSrg0hfLvf1wIAYNSo\nj8Bo0AQC2XilpO+HEJ4z4Nd9hqRPSKLIAQDyiPoIjABNIJCd+6x+wHt\/qaTTJO2VVJd0RQjhpSu+\n\/t8lPVPSkqSvS\/rtEMKx7tf+QtKTJf2s9\/63Jb05hPDxYYcAAGDAqI\/AkHFNIJCNN0uqeu9nvPcr\nP+1MJO2WdKGkfZJ+2nv\/85LkvT9f0i9IOjeE8ChJxyT93vI3hhB+TdKnJP1+COE8ChwAIIeoj8AI\n0AQCGQghHOkudXmGpKd67\/9yxZc\/F0JYDCEsSvo7SY\/uPv5kSe8LIRzvHr9L0gVrvLwb1rgBABgm\n6iMwGjSBQIZCCN9XZ\/nKRd77ye7DK4vUmKR29\/eJ7jlnx7qPrbbWYwAA5Ab1ERgumkAgA977qRWH\nD5J0a\/cTTCfpad77kve+JOlZkj7Xfd6nJD3fe1\/uHr9U0j+teuljkk7qvgfzGwCQK9RHYDS4MQyQ\njYu896+UdETSUUm\/1H08kfQdSf8o6RRJHw0hHJSkEMIB7\/05kr7ovV+S9O+S3rjqdT8o6X3eey\/p\nanUKIQAAeUF9BEbAJQlnxoFYeO8vkXR3COGtWY8FAIBYUB+BweJ0OBAfPpkBAODeqI\/AgHAmEAAA\nAAAM4UwgAAAAABhCEwgAAAAAhtAEAgAAAIAhNIEAAAAAYAhNIAAAAAAYQhMIAAAAAIb8\/206AvUW\n16+2AAAAAElFTkSuQmCC\n\"\n>\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\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<h3 id=\"The-Iron-Condor\">The Iron Condor<a class=\"anchor-link\" href=\"#The-Iron-Condor\">&#182;<\/a><\/h3>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>Now, we can literally add those two positions and get the equivalent Iron Condor.<\/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&nbsp;[41]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"c\">#icV_longhand = (shortCallPrem - np.maximum(stockP - 150.0, zs) - <\/span>\r\n<span class=\"c\">#                longCallPrem + np.maximum(stockP - 160.0, zs) +<\/span>\r\n<span class=\"c\">#                -longPutPrem + np.maximum(90.0 - stockP, zs) + <\/span>\r\n<span class=\"c\">#                shortPutPrem - np.maximum(100.0 - stockP, zs))<\/span>\r\n\r\n<span class=\"n\">icV<\/span> <span class=\"o\">=<\/span> <span class=\"n\">bullPutSpreadV<\/span> <span class=\"o\">+<\/span> <span class=\"n\">bearCallSpreadV<\/span>\r\n\r\n<span class=\"c\"># max loss, max gain<\/span>\r\n<span class=\"c\"># max loss = premium received - spread width (2 - 10 for current example) <\/span>\r\n<span class=\"k\">print<\/span> <span class=\"s\">&quot;iron condor (max loss, max gain): (<\/span><span class=\"si\">%s<\/span><span class=\"s\">, <\/span><span class=\"si\">%s<\/span><span class=\"s\">)&quot;<\/span><span class=\"o\">%<\/span> <span class=\"p\">(<\/span><span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">min<\/span><span class=\"p\">(<\/span><span class=\"n\">icV<\/span><span class=\"p\">),<\/span> <span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">max<\/span><span class=\"p\">(<\/span><span class=\"n\">icV<\/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>\r\niron condor (max loss, max gain): (-8.0, 2.0)\r\n\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&nbsp;[62]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">,<\/span> <span class=\"n\">icV<\/span><span class=\"p\">,<\/span> <span class=\"s\">&quot;b&quot;<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">,<\/span> <span class=\"n\">zs<\/span><span class=\"p\">,<\/span> <span class=\"s\">&#39;k&#39;<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">ylim<\/span><span class=\"p\">(<\/span><span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">min<\/span><span class=\"p\">(<\/span><span class=\"n\">icV<\/span><span class=\"p\">)<\/span><span class=\"o\">-<\/span><span class=\"mi\">1<\/span><span class=\"p\">,<\/span> <span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">max<\/span><span class=\"p\">(<\/span><span class=\"n\">icV<\/span><span class=\"p\">)<\/span><span class=\"o\">+<\/span><span class=\"mi\">1<\/span><span class=\"p\">)<\/span>\r\n\r\n<span class=\"c\"># since we received $2, we have $2 of insurance<\/span>\r\n<span class=\"c\"># thus, $2 more extreme than our short strikes is our break even point<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">shortPutStrike<\/span> <span class=\"o\">-<\/span> <span class=\"mf\">2.0<\/span><span class=\"p\">,<\/span>  <span class=\"mf\">0.0<\/span><span class=\"p\">,<\/span> <span class=\"s\">&#39;rx&#39;<\/span><span class=\"p\">)<\/span>   <span class=\"c\"># total premium received = 2.0<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">shortCallStrike<\/span> <span class=\"o\">+<\/span> <span class=\"mf\">2.0<\/span><span class=\"p\">,<\/span> <span class=\"mf\">0.0<\/span><span class=\"p\">,<\/span> <span class=\"s\">&#39;rx&#39;<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">labelIt<\/span><span class=\"p\">(<\/span><span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">gca<\/span><span class=\"p\">(),<\/span> <span class=\"s\">&quot;Iron Condor&quot;<\/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 \">\n<img decoding=\"async\" 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JPyzp8VgrAQA0Gj\/jkQRP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\n\"\n>\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\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<h3 id=\"An-Inferred-Normal\">An Inferred Normal<a class=\"anchor-link\" href=\"#An-Inferred-Normal\">&#182;<\/a><\/h3>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>Let&#8217;s assume that our positions, which are $25 from the current stock price, are <span class=\"math\">\\(10\\delta\\)<\/span> positions. This means that the (risk-neutral) probability of a 25 point move is 10%. There are two side-notes here.<\/p>\n<ol style=\"list-style-type: decimal\">\n<li>We don&#8217;t expect <span class=\"math\">\\(10\\delta\\)<\/span> to be symmetric about the stock price. Puts generally run at a premium to calls because folks want more insurance against bad events than they want opportunity for riches.<\/li>\n<li>The equivalence of <span class=\"math\">\\(10\\%= 10\\delta\\)<\/span> is a (commonly used) approximation. See the discussion of <em>Heuristic 2<\/em>.<\/li>\n<\/ol>\n<p>So, based on random walk (normal distribution outcomes), we need a standard normal curve with a mean of 125 and variance such that P(x&gt;150) = P(x&lt;100) = .1. To graph this, we need to figure out the appropriate standard deviation (or variance) that will match this.<\/p>\n<p>Recalling that a z-score is the distance to a point from the mean of a standard normal distribution, we can ask what z-score gives us 10% of the distribution further to the right. For the standard normal distribution, the &quot;percentile point function&quot; gives the z-score (<span class=\"math\">\\(\\sigma\\)<\/span> distance) for a given cumulative percent of the standard normal distribution:<\/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&nbsp;[47]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"n\">ss<\/span><span class=\"o\">.<\/span><span class=\"n\">norm<\/span><span class=\"o\">.<\/span><span class=\"n\">ppf<\/span><span class=\"p\">(<\/span><span class=\"o\">.<\/span><span class=\"mi\">9<\/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 output_prompt\">Out[47]:<\/div>\n<div class=\"output_text output_subarea output_pyout\">\n<pre>\r\n1.2815515655446004\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\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>The prior cell says that &quot;90% of the mass of the standard normal lives to the left of 1.28155&#8230;&quot;. Then, since <span class=\"math\">\\(z=\\frac{x-\\mu}{\\sigma}\\)<\/span>, we have <span class=\"math\">\\(\\sigma=\\frac{25.0}{ss.norm.ppf(.9)}\\)<\/span><\/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&nbsp;[8]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"n\">sigma<\/span> <span class=\"o\">=<\/span> <span class=\"mf\">25.0<\/span> <span class=\"o\">\/<\/span> <span class=\"n\">ss<\/span><span class=\"o\">.<\/span><span class=\"n\">norm<\/span><span class=\"o\">.<\/span><span class=\"n\">ppf<\/span><span class=\"p\">(<\/span><span class=\"o\">.<\/span><span class=\"mi\">9<\/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\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>And we can graph that normal distribution:<\/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&nbsp;[48]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">,<\/span> <span class=\"n\">ss<\/span><span class=\"o\">.<\/span><span class=\"n\">norm<\/span><span class=\"p\">(<\/span><span class=\"n\">loc<\/span><span class=\"o\">=<\/span><span class=\"mf\">125.0<\/span><span class=\"p\">,<\/span><span class=\"n\">scale<\/span><span class=\"o\">=<\/span><span class=\"n\">sigma<\/span><span class=\"p\">)<\/span><span class=\"o\">.<\/span><span class=\"n\">pdf<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/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 \">\n<img decoding=\"async\" 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HTB8AIGg0dfbqrudrFOFw6MZTxyg1LtrqkhBC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\nAADYGE0fAAAAANjY\/wc2wH35Wuwh3gAAAABJRU5ErkJggg==\n\"\n>\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\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<h3 id=\"Breakeven\">Breakeven<a class=\"anchor-link\" href=\"#Breakeven\">&#182;<\/a><\/h3>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>For yucks, we can overlay the probability and payoff graphs:<\/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&nbsp;[64]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"n\">ax1<\/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<span class=\"n\">ax2<\/span> <span class=\"o\">=<\/span> <span class=\"n\">ax1<\/span><span class=\"o\">.<\/span><span class=\"n\">twinx<\/span><span class=\"p\">()<\/span>\r\n<span class=\"n\">ax1<\/span><span class=\"o\">.<\/span><span class=\"n\">set_ylim<\/span><span class=\"p\">(<\/span><span class=\"o\">-<\/span><span class=\"mi\">10<\/span><span class=\"p\">,<\/span> <span class=\"mi\">4<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">ax2<\/span><span class=\"o\">.<\/span><span class=\"n\">set_ylim<\/span><span class=\"p\">(<\/span><span class=\"o\">-.<\/span><span class=\"mo\">005<\/span><span class=\"p\">,<\/span> <span class=\"o\">.<\/span><span class=\"mo\">030<\/span><span class=\"p\">)<\/span>\r\n\r\n<span class=\"c\"># we have two dollars of insurance, so we breakeven at <\/span>\r\n<span class=\"c\"># $2 more extreme than the short strikes <\/span>\r\n<span class=\"n\">p1<\/span> <span class=\"o\">=<\/span> <span class=\"n\">shortPutStrike<\/span>  <span class=\"o\">-<\/span> <span class=\"mf\">2.0<\/span>\r\n<span class=\"n\">p2<\/span> <span class=\"o\">=<\/span> <span class=\"n\">shortCallStrike<\/span> <span class=\"o\">+<\/span> <span class=\"mf\">2.0<\/span>\r\n\r\n<span class=\"n\">ax1<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">,<\/span> <span class=\"n\">icV<\/span><span class=\"p\">,<\/span> <span class=\"s\">&#39;g&#39;<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">ax1<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">p1<\/span><span class=\"p\">,<\/span> <span class=\"mf\">0.0<\/span><span class=\"p\">,<\/span> <span class=\"s\">&#39;rx&#39;<\/span><span class=\"p\">)<\/span>   <span class=\"c\"># total premium received = 2.0<\/span>\r\n<span class=\"n\">ax1<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">p2<\/span><span class=\"p\">,<\/span> <span class=\"mf\">0.0<\/span><span class=\"p\">,<\/span> <span class=\"s\">&#39;rx&#39;<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">labelIt<\/span><span class=\"p\">(<\/span><span class=\"n\">ax1<\/span><span class=\"p\">,<\/span> <span class=\"s\">&quot;Iron Condor&quot;<\/span><span class=\"p\">)<\/span>\r\n\r\n<span class=\"n\">ourNorm<\/span> <span class=\"o\">=<\/span> <span class=\"n\">ss<\/span><span class=\"o\">.<\/span><span class=\"n\">norm<\/span><span class=\"p\">(<\/span><span class=\"n\">loc<\/span><span class=\"o\">=<\/span><span class=\"mf\">125.0<\/span><span class=\"p\">,<\/span><span class=\"n\">scale<\/span><span class=\"o\">=<\/span><span class=\"n\">sigma<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">ax2<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">,<\/span> <span class=\"n\">ourNorm<\/span><span class=\"o\">.<\/span><span class=\"n\">pdf<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">))<\/span>\r\n<span class=\"n\">ax2<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">p1<\/span><span class=\"p\">,<\/span> <span class=\"n\">ourNorm<\/span><span class=\"o\">.<\/span><span class=\"n\">pdf<\/span><span class=\"p\">(<\/span><span class=\"n\">p1<\/span><span class=\"p\">),<\/span> <span class=\"s\">&#39;rx&#39;<\/span><span class=\"p\">)<\/span>   <span class=\"c\"># total premium received = 2.0<\/span>\r\n<span class=\"n\">ax2<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">p2<\/span><span class=\"p\">,<\/span> <span class=\"n\">ourNorm<\/span><span class=\"o\">.<\/span><span class=\"n\">pdf<\/span><span class=\"p\">(<\/span><span class=\"n\">p2<\/span><span class=\"p\">),<\/span> <span class=\"s\">&#39;rx&#39;<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">ax2<\/span><span class=\"o\">.<\/span><span class=\"n\">set_ylabel<\/span><span class=\"p\">(<\/span><span class=\"s\">&quot;Probability&quot;<\/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 \">\n<img decoding=\"async\" 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43UoIiLSgPi4eMYNHEdBcYHXoYhIGFIBK1FNc0kEYMaqGYzqO4rE1on19lO+SKCUKxIM5UvwctNz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v7cWrXdiGKrmUZ1nUYftfPJzs\/YUiXIV6H8xW6t0iU+9Rau+BkT1LvKsQiIs2lqKSI7aXbOa\/n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\na7hngV1N0Lcx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ur1qqAFRkHI96FOFBpBlY8VVFRQXFxsb+HEXJ+uvWntPW28eOLf+zV7+1r6eY\/3zhATWMn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\nqIAVERERERGRoKACVkRERERERILC\/wc4QSMnbxr4AAAAAABJRU5ErkJggg==\n\"\n>\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&nbsp;[53]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"c\"># the options must not be priced fairly!<\/span>\r\n<span class=\"c\">#    either there is an inefficiency in the market<\/span>\r\n<span class=\"c\">#    or, in this case,<\/span>\r\n<span class=\"c\">#    my example numbers, made for ease of reading, don&#39;t make for<\/span>\r\n<span class=\"c\">#    a realistic scenario<\/span>\r\n<span class=\"c\"># or, better yet, <\/span>\r\n<span class=\"c\">#    the expectd value is the risk-free rate of return for this time frame<\/span>\r\n<span class=\"k\">print<\/span> <span class=\"s\">&quot;Expected value of the option: <\/span><span class=\"si\">%s<\/span><span class=\"s\">&quot;<\/span> <span class=\"o\">%<\/span> <span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">sum<\/span><span class=\"p\">(<\/span><span class=\"n\">icV<\/span> <span class=\"o\">*<\/span> <span class=\"n\">ss<\/span><span class=\"o\">.<\/span><span class=\"n\">norm<\/span><span class=\"p\">(<\/span><span class=\"n\">loc<\/span><span class=\"o\">=<\/span><span class=\"mf\">125.0<\/span><span class=\"p\">,<\/span><span class=\"n\">scale<\/span><span class=\"o\">=<\/span><span class=\"n\">sigma<\/span><span class=\"p\">)<\/span><span class=\"o\">.<\/span><span class=\"n\">pdf<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/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>\r\nExpected value of the option: 1.58790908775\r\n\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\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<h2 id=\"Heuristic-1:-The-Probability-of-Profit-for-an-Iron-Condor-Profits-is-\\(MaxLoss-\/-SpreadWidth\\)\">Heuristic 1: The Probability of Profit for an Iron Condor Profits is <span class=\"math\">\\(MaxLoss \/ SpreadWidth\\)<\/span><a class=\"anchor-link\" href=\"#Heuristic-1:-The-Probability-of-Profit-for-an-Iron-Condor-Profits-is-\\(MaxLoss-\/-SpreadWidth\\)\">&#182;<\/a><\/h2>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>We&#8217;re now in position to look at the first heuristic. You may see this (e.g., <link>):<\/p>\n<p><span class=\"math\">\\[<br \/>\nProbabilityOfProfit = PoP = MaxLoss \/ Width = \\frac{(SpreadWidth &#8211; Premium)}{SpreadWidth}<br \/>\n\\]<\/span><\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p><span class=\"math\">\\(MaxLoss\\)<\/span> is a positive quantity indicating how much you can lose (e.g., <span class=\"math\">\\(MaxLoss=8\\)<\/span> means you can lose $8).<\/p>\n<p>Now, we know that the profitable area of the trade is the region between the red Xs on the probability plot. So, let&#8217;s define two probabilities: <span class=\"math\">\\(P_g\\)<\/span> and <span class=\"math\">\\(P_b\\)<\/span> as the probability of a good (profitable &#8211; non-loss) event and a bad event. These sum to 1, so <span class=\"math\">\\(P_g + P_b = 1\\)<\/span>. For us, a bad result is in the tails of our normal distribution. Specifically, it is the red area below. We need to determine an expression for that area (our <span class=\"math\">\\(PoP=P_g=1-RedArea\\)<\/span>).<\/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&nbsp;[52]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"n\">extremeMask<\/span> <span class=\"o\">=<\/span> <span class=\"n\">np<\/span><span class=\"o\">.<\/span><span class=\"n\">logical_or<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span> <span class=\"o\">&lt;<\/span> <span class=\"n\">p1<\/span><span class=\"p\">,<\/span> <span class=\"n\">stockP<\/span> <span class=\"o\">&gt;<\/span> <span class=\"n\">p2<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">,<\/span> <span class=\"n\">ourNorm<\/span><span class=\"o\">.<\/span><span class=\"n\">pdf<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">))<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">fill_between<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">,<\/span> <span class=\"n\">ourNorm<\/span><span class=\"o\">.<\/span><span class=\"n\">pdf<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">),<\/span> <span class=\"n\">where<\/span><span class=\"o\">=<\/span><span class=\"n\">extremeMask<\/span><span class=\"p\">,<\/span> <span class=\"n\">color<\/span><span class=\"o\">=<\/span><span class=\"s\">&#39;r&#39;<\/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 \">\n<img decoding=\"async\" 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rKjVk4tyFeZw6MGLe6hty0irS0IQ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\niFVL+0EhdKUAAAAASUVORK5CYII=\n\"\n>\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\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>Now, in a purely efficient market with &quot;correctly&quot; priced options, we have <span class=\"math\">\\(\\mathbb{E}(Position)=0\\)<\/span>. So, with <span class=\"math\">\\(w=SpreadWidth\\)<\/span> and <span class=\"math\">\\(g=Premium\\)<\/span> we have a good result <span class=\"math\">\\(g\\)<\/span> and a bad result (<span class=\"math\">\\(MaxLoss=SpreadWidth &#8211; Premium = w-g\\)<\/span>). And some unknown probabilities that these events happen (<span class=\"math\">\\(P_b\\)<\/span> and <span class=\"math\">\\(P_g\\)<\/span>).<\/p>\n<p><span class=\"math\">\\[<br \/>\n\\mathbb{E}(Position) = 0 = g P_g + -(w &#8211; g) P_b<br \/>\n\\]<\/span><\/p>\n<p>One quick note. Strictly speaking, <span class=\"math\">\\(g\\)<\/span> is really not a constant over the profitable region. However, we could solve for a &quot;new&quot; <span class=\"math\">\\(g\\)<\/span> value that accounts for the trapezoid shape of the profitable area of the IC. The end result would be the same, we&#8217;d just have three different regions to work with (two tails, two triangles, and one center &#8212; but the tails and triangles are symmetric).<\/p>\n<p>This means that:<\/p>\n<p><span class=\"math\">\\[<br \/>\ngP_g = (w-g)P_b = (w-g)(1-P_g)<br \/>\n\\]<\/span><\/p>\n<p>and<\/p>\n<p><span class=\"math\">\\[<br \/>\n\\begin{eqnarray}<br \/>\n\\frac{g}{w-g} &amp;=&amp; \\frac{1-P_g}{P_g} = \\frac{1}{P_g} &#8211; 1 \\\\<br \/>\n\\frac{g}{w-g} + \\frac{w-g}{w-g} &amp;=&amp; \\frac{1}{P_g} \\\\<br \/>\n\\frac{w}{w-g} &amp;=&amp; \\frac{1}{P_g} \\\\<br \/>\nP_g &amp;=&amp; \\frac{w-g}{w} = 1 &#8211; \\frac{g}{w}<br \/>\n\\end{eqnarray}<br \/>\n\\]<\/span><\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>This says that <span class=\"math\">\\(P_g\\)<\/span> (the probability of a good event), given our assumptions of market-neutrality (is this better said as &quot;no arbitrage&quot;?), is maximum loss divided by spread width which is <span class=\"math\">\\(\\frac{SpreadWidth &#8211; Premium}{SpreadWidth}\\)<\/span>.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<h2 id=\"Heuristic-2:-\\(\\Delta-=-P(ITM)\\)\">Heuristic 2: <span class=\"math\">\\(\\Delta = P(ITM)\\)<\/span><a class=\"anchor-link\" href=\"#Heuristic-2:-\\(\\Delta-=-P(ITM)\\)\">&#182;<\/a><\/h2>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>See pg 14 of http:\/\/cfe.cboe.com\/education\/TradingVolatility.pdf<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p><span class=\"math\">\\(\\Delta\\)<\/span> is the rate of change of the value of an option given a unit change in the underlying asset. In other words, if the stock moves by <span class=\"math\">\\(s\\)<\/span>, &#8230;<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>In the &quot;usual&quot; discussion of the Black-Scholes formula (see http:\/\/en.wikipedia.org\/wiki\/Black%E2%80%93Scholes_model), two variables are defined <span class=\"math\">\\(d_1\\)<\/span> and <span class=\"math\">\\(d_2\\)<\/span>. <span class=\"math\">\\(d_2 = d_1 &#8211; \\sigma \\sqrt{T}\\)<\/span> so, <span class=\"math\">\\(d_2 &lt; d_1\\)<\/span>. We&#8217;ll use the usual notation <span class=\"math\">\\(\\Phi\\)<\/span> as the cumulative normal distribution. Take as a given that <span class=\"math\">\\(\\Phi(d_1) = \\Delta_{Call}\\)<\/span>. By put-call parity, we also have <span class=\"math\">\\(\\Delta_{Call} &#8211; \\Delta_{Put} = 1\\)<\/span>, so <span class=\"math\">\\(\\Delta_{Put} = \\Delta_{Call} &#8211; 1 = \\Phi(d_1) &#8211; 1\\)<\/span>. Lastly, if a call and put are struck at the same value, one of them will finish ITM. Thus, <span class=\"math\">\\(P_{CallITM} + P_{PutITM} = 1\\)<\/span>. So, we have:<\/p>\n<p><span class=\"math\">\\[<br \/>\n\\begin{eqnarray}<br \/>\n\\Phi(d_1) &amp;=&amp; \\Delta_{Call} \\\\<br \/>\n\\Phi(d_1) &#8211; 1 &amp;=&amp; \\Delta_{Put} \\\\<br \/>\n\\Phi(d_2) &amp;=&amp; P_{CallITM} \\\\<br \/>\n1 &#8211; \\Phi(d_2) &amp;=&amp; P_{PutITM}<br \/>\n\\end{eqnarray}<br \/>\n\\]<\/span><\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>A few comments. Since the normal cumulative distribution is monotonically increasing, for <span class=\"math\">\\(d_2 &lt; d_1\\)<\/span> we have <span class=\"math\">\\(\\Phi(d_2) &lt; \\Phi(d_1)\\)<\/span>. Thus, <span class=\"math\">\\(P_{CallITM} = \\Phi(d_2) &lt; \\Phi(d_1) = \\Delta_{Call}\\)<\/span>.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>Next, for <span class=\"math\">\\(0&lt;x&lt;1\\)<\/span>, we have <span class=\"math\">\\(x-1 &lt; 0\\)<\/span>. Then, if we factor out a <span class=\"math\">\\(-1\\)<\/span>, <span class=\"math\">\\(x-1 = -1 (-x + 1)\\)<\/span>. But, <span class=\"math\">\\(abs(-1(1-x)) = 1-x\\)<\/span>. So we have a useful result that <span class=\"math\">\\(abs(x-1) = 1-x\\)<\/span>.<\/p>\n<p>So, <span class=\"math\">\\(abs(\\Delta_{Put}) = abs(\\Delta_{Call} &#8211; 1) = 1 &#8211; \\Delta_{Call} &lt; 1-P_{Call} = P_{Put}\\)<\/span><\/p>\n<p>In short, <span class=\"math\">\\(P_{Call} &lt; \\Delta_{Call}\\)<\/span> and <span class=\"math\">\\(abs(\\Delta_{Put}) &lt; P_{Put}\\)<\/span><\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>The difference, <span class=\"math\">\\(\\Delta_{Call} &#8211; P_{Call} = \\Phi(d_1) &#8211; \\Phi(d_2) = \\Phi(d_1) &#8211; \\Phi(d_1 &#8211; \\sigma\\sqrt{T})\\)<\/span> will be small when <span class=\"math\">\\(\\sigma\\sqrt{T}\\)<\/span> is small. So, for short time periods and lower volatility, the heuristic is more accurate.<\/p>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<h2 id=\"Visually\">Visually<a class=\"anchor-link\" href=\"#Visually\">&#182;<\/a><\/h2>\n<\/div>\n<\/div>\n<\/div>\n<div class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<p>Recall that we were working with <span class=\"math\">\\(10\\Delta\\)<\/span> positions. We&#8217;ll also set <span class=\"math\">\\(\\sigma\\sqrt{T} = 5\\)<\/span>. So,<\/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&nbsp;[19]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"k\">print<\/span> <span class=\"n\">ourNorm<\/span><span class=\"o\">.<\/span><span class=\"n\">ppf<\/span><span class=\"p\">(<\/span><span class=\"o\">.<\/span><span class=\"mi\">1<\/span><span class=\"p\">),<\/span> <span class=\"n\">ourNorm<\/span><span class=\"o\">.<\/span><span class=\"n\">ppf<\/span><span class=\"p\">(<\/span><span class=\"o\">.<\/span><span class=\"mi\">9<\/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>\r\n100.0 150.0\r\n\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&nbsp;[67]:<\/div>\n<div class=\"inner_cell\">\n<div class=\"input_area\">\n<div class=\"highlight\">\n<pre><span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">ylim<\/span><span class=\"p\">(<\/span><span class=\"o\">-<\/span><span class=\"mf\">0.1<\/span><span class=\"p\">,<\/span> <span class=\"mf\">1.0<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">,<\/span> <span class=\"n\">ourNorm<\/span><span class=\"o\">.<\/span><span class=\"n\">cdf<\/span><span class=\"p\">(<\/span><span class=\"n\">stockP<\/span><span class=\"p\">))<\/span>\r\n\r\n<span class=\"k\">for<\/span> <span class=\"n\">deltaPoint<\/span><span class=\"p\">,<\/span> <span class=\"n\">label<\/span><span class=\"p\">,<\/span> <span class=\"n\">position<\/span> <span class=\"ow\">in<\/span> <span class=\"nb\">zip<\/span><span class=\"p\">([<\/span><span class=\"mf\">100.0<\/span><span class=\"p\">,<\/span> <span class=\"mf\">150.0<\/span><span class=\"p\">],<\/span>\r\n                             <span class=\"p\">[<\/span><span class=\"s\">&quot;$\\Delta_{Call} = \\Phi(d_1)$&quot;<\/span><span class=\"p\">,<\/span> <span class=\"s\">&quot;$abs(\\Delta_{Put}) = 1-\\Phi(d_1)$&quot;<\/span><span class=\"p\">],<\/span>\r\n                             <span class=\"p\">[(<\/span><span class=\"mi\">25<\/span><span class=\"p\">,<\/span> <span class=\"mi\">15<\/span><span class=\"p\">),<\/span> <span class=\"p\">(<\/span><span class=\"o\">-<\/span><span class=\"mi\">5<\/span><span class=\"p\">,<\/span> <span class=\"mi\">5<\/span><span class=\"p\">)]):<\/span>\r\n    <span class=\"n\">pt<\/span> <span class=\"o\">=<\/span> <span class=\"n\">deltaPoint<\/span><span class=\"p\">,<\/span> <span class=\"n\">ourNorm<\/span><span class=\"o\">.<\/span><span class=\"n\">cdf<\/span><span class=\"p\">(<\/span><span class=\"n\">deltaPoint<\/span><span class=\"p\">)<\/span>\r\n    <span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">pt<\/span><span class=\"p\">[<\/span><span class=\"mi\">0<\/span><span class=\"p\">],<\/span> <span class=\"n\">pt<\/span><span class=\"p\">[<\/span><span class=\"mi\">1<\/span><span class=\"p\">],<\/span> <span class=\"s\">&#39;ro&#39;<\/span><span class=\"p\">)<\/span>\r\n    <span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">annotate<\/span><span class=\"p\">(<\/span><span class=\"n\">label<\/span><span class=\"p\">,<\/span> <span class=\"n\">xy<\/span><span class=\"o\">=<\/span><span class=\"n\">pt<\/span><span class=\"p\">,<\/span> <span class=\"n\">xytext<\/span> <span class=\"o\">=<\/span> <span class=\"n\">position<\/span><span class=\"p\">,<\/span> \r\n                 <span class=\"n\">textcoords<\/span><span class=\"o\">=<\/span><span class=\"s\">&#39;offset points&#39;<\/span><span class=\"p\">,<\/span> <span class=\"n\">ha<\/span><span class=\"o\">=<\/span><span class=\"s\">&quot;right&quot;<\/span><span class=\"p\">,<\/span> <span class=\"n\">fontsize<\/span> <span class=\"o\">=<\/span> <span class=\"mi\">18<\/span><span class=\"p\">)<\/span>\r\n\r\n<span class=\"n\">sigmaRootT<\/span> <span class=\"o\">=<\/span> <span class=\"mi\">5<\/span>\r\n<span class=\"k\">for<\/span> <span class=\"n\">itmPoint<\/span><span class=\"p\">,<\/span> <span class=\"n\">label<\/span><span class=\"p\">,<\/span> <span class=\"n\">position<\/span> <span class=\"ow\">in<\/span> <span class=\"nb\">zip<\/span><span class=\"p\">([<\/span><span class=\"mf\">100.0<\/span><span class=\"o\">-<\/span><span class=\"n\">sigmaRootT<\/span><span class=\"p\">,<\/span> <span class=\"mf\">150.0<\/span><span class=\"o\">+<\/span><span class=\"n\">sigmaRootT<\/span><span class=\"p\">],<\/span>\r\n                                     <span class=\"p\">[<\/span><span class=\"s\">&quot;$\\Phi(d_2)=P_{CallITM}$&quot;<\/span><span class=\"p\">,<\/span> <span class=\"s\">&quot;$1-\\Phi(d_2)=P_{PutITM}$&quot;<\/span><span class=\"p\">],<\/span>\r\n                                     <span class=\"p\">[(<\/span><span class=\"o\">-<\/span><span class=\"mi\">25<\/span><span class=\"p\">,<\/span> <span class=\"o\">-<\/span><span class=\"mi\">25<\/span><span class=\"p\">),<\/span> <span class=\"p\">(<\/span><span class=\"mi\">0<\/span><span class=\"p\">,<\/span><span class=\"o\">-<\/span><span class=\"mi\">20<\/span><span class=\"p\">)]):<\/span>\r\n    <span class=\"n\">pt<\/span> <span class=\"o\">=<\/span> <span class=\"n\">itmPoint<\/span><span class=\"p\">,<\/span> <span class=\"n\">ourNorm<\/span><span class=\"o\">.<\/span><span class=\"n\">cdf<\/span><span class=\"p\">(<\/span><span class=\"n\">itmPoint<\/span><span class=\"p\">)<\/span>\r\n    <span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">plot<\/span><span class=\"p\">(<\/span><span class=\"n\">pt<\/span><span class=\"p\">[<\/span><span class=\"mi\">0<\/span><span class=\"p\">],<\/span> <span class=\"n\">pt<\/span><span class=\"p\">[<\/span><span class=\"mi\">1<\/span><span class=\"p\">],<\/span> <span class=\"s\">&#39;ro&#39;<\/span><span class=\"p\">)<\/span>\r\n    <span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">annotate<\/span><span class=\"p\">(<\/span><span class=\"n\">label<\/span><span class=\"p\">,<\/span> <span class=\"n\">xy<\/span><span class=\"o\">=<\/span><span class=\"n\">pt<\/span><span class=\"p\">,<\/span> <span class=\"n\">xytext<\/span> <span class=\"o\">=<\/span> <span class=\"n\">position<\/span><span class=\"p\">,<\/span> \r\n                 <span class=\"n\">textcoords<\/span><span class=\"o\">=<\/span><span class=\"s\">&#39;offset points&#39;<\/span><span class=\"p\">,<\/span> <span class=\"n\">fontsize<\/span> <span class=\"o\">=<\/span> <span class=\"mi\">18<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">xlabel<\/span><span class=\"p\">(<\/span><span class=\"s\">&quot;Spot&quot;<\/span><span class=\"p\">)<\/span>\r\n<span class=\"n\">plt<\/span><span class=\"o\">.<\/span><span class=\"n\">ylabel<\/span><span class=\"p\">(<\/span><span class=\"s\">&quot;Cumulative Probability&quot;<\/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 \">\n<img decoding=\"async\" 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ReENsrevjVr1vDOO++wdetW\/Pz8ePDBBxkwYADjx4\/n5ptvPu\/7z58\/nxUrVpCU\nlISfnx+\/+93vGDBgALfeeitjxow55\/wbbriBxMTECoVb+\/btmTVrFn\/\/+9\/p1q0bLVu25MMPP2Tq\n1Kn87W9\/Y+LEiUBpoXlmq4WtW7eSmZlZXthU5ocffuCmm24673\/jL+3cuZNXXnmFLVu24Ofnx8cf\nf8y+fft4+eWXq71u+\/btBAQEsGTJEhwOBzk5OXTv3p17772X4cOHM2\/ePIqLiwkICCAxMZG4uDj6\n9OnD9u3bueaaa7jzzjsr3G\/Lli00b978nAVukpOTz1mVFGDv3r10796d4uJikpKSAMjMzMTf359j\nx47RqlUrWrdufZ6vjveoAJQGzdc\/cRXfonwRq5Qr4gpfyxeH08mGwzl8vv0ke9MLGNFbc\/sABg0a\nZHnj9dqYMGFC+YImVTk7V8aPH88dd9zBE088UWHY5JgxY84pGBctWlTp\/QoKCnj55Zf55JNPCA4O\nrvQch8PB119\/zcKFC63+Uyzr06cP\/\/rXv1y+Ljk5mWuuueacuX75+fns3r2b6OhoQkJCOHToEO3b\ntycwMLD8ul\/\/+teV3q+yQi85OZkZM2acc\/zHH39k9OjRHD58mIMHDwKlm9jfcsstvPfee1x55ZUu\n\/5t8SeNauklERESkkcovtrN4Rxp\/+GQn8388ytBurfj37f249\/KOjb7480WdOnUiNjaWxYsX1\/oe\ncXFxTJs2jS5duvDzzz9Xes4XX3xBbGwsHTt2rPXz1LWkpCQGDhx4zvGQkBCWL19ePv9u3bp1XHHF\nFWRnZ1NUVMSBAwfo3r07p06dqnBdcnLyOUVbeno6Bw4cqHRF0vz8fEJCQujSpQupqals27aNiy66\nqMp71TcqAKVBS0xM9HYIUo8oX8Qq5Yq4wtv5cjK3mLfXHOa3C7ez+Wguj13dhdljYrihVwRNA\/Sn\noC\/5Za48\/fTTfPzxx+cUNFa8++673HDDDQQGBnL06NEKG82fkZ6ezieffMLUqVNrHbM7rF27tsqt\nIk6cOEHnzp2B0pVUL7vsMpYsWcLOnTvp168fQIX5j06nk7Vr157Tu7tmzRouuuiic3pG7XZ7+TzQ\noKAgAgIC2L17N926dSu\/zp09xZ6gIaAiIiIiDdC+U\/l8vOUk6w9nM7xXBLPH9KZdqHr66pPg4GDi\n4uJ45ZVXeOmllyxft2bNGp544onyQgbgvffeO+e8uLg44uLiqhwe6mnr169n4cKFpKWlsXjxYrp0\n6UKrVq0qnDNu3Dg+\/\/xzMjIy6NOnD5s2beLaa68lOjqa4OBgFixYwKhRo4DSrSc++eQTTp8+zaJF\ni2jbti1Hjx5l2bJlLFu2jLy8PKZPn84dd9xB586d2bBhAy+\/\/DKnT5+mT58+XHXVVVx33XWMHDmS\njRs3snDhQo4fP058fDyPPPIIQUFB3niZzpuf0+n0dgwuW7FihfPM3h0iIiIiUsrpdLL5WC4fbznB\nz6cLGNupVhmGAAAgAElEQVQvkpt7R9CimT7zF2loNm7cyLBhw1xesUnvBiIiIiL1nN3hJPFAJuaW\nExSWOBh\/cTuevb4bTf01xFNEKtK7gjRo3p53IfWL8kWsUq6IK9yZL4U2B4t3pDHh4x0s2p7GXZd1\nYN64PtwYE6Hirx7Se4t4gnoARUREROqZvGI7X2xPY9H2NPq2a84TQ6Po166Ft8MSkXpAcwBFRERE\n6oncIhufb09j8Y50Bl4Qyu2XtKdLq\/q5EIWInB\/NARQRERFpoHKKbHy+LY3FO9L4vy4teW1UTzq1\nVOEnIq7T4HBp0DSWXlyhfBGrlCviivPJl+xCG+\/9eJR7zR2k5RXz+ugYpsRGqfhroPTeIp7g1h5A\nwzCuA54paz5jmuZ31Zx7N\/AQYAP+n2maK90Zm4iIiIivyiq08enWk3y1K53BXcN585YYOoQ183ZY\nItIAuG0OoGEYTYAE4LqyQ8uAWNM0K31CwzC2AJcBzYFlpmleUdW9NQdQREREGqLsQhsfbz3J17vS\nuTo6nNsvaUf7UBV+InIuX5wD2BNIMU2zAMAwjH1AD2BPFefvAGKB9sAaN8YlIiIi4lMKSux8vi2N\nz7ad5Kqu4cwe05t2oU29HZaINEDunAPYGsg0DGOmYRgzgSwgoprzlwN\/Au4GqhwqKuIKjaUXVyhf\nxCrliriiunwpsTv4Ynsa95o72J9RwOuje\/HY1V1U\/DVSem8RT3BnAXgKCAeeBqaWPU6v7ETDMLoB\nI03THG2a5o3AFMMwgqu7+dn\/gSQmJqqtttpqq6222mrXm7bd4WT2V2u489+bWJuaxfPDuxPb9Aj7\nt\/7oE\/Gp7Z321q1bfSoetX27XVvunAPoD6ymdA6gH\/CtaZpXVXFuTyDONM3RhmH4AeuAq03TLKzs\nfM0BFBERkfrI6XSy5lA27\/54lJBAfyYM7MDFHUK9HZaI1EM+NwfQNE27YRjPAd+WHXr2zM8MwxgP\n5Jum+VXZuXsMw1hjGMbXlPZKzqqq+BMRERGpj7Ycy2H++mPkl9i59\/KODOoShp+fy3+7iYicF7f1\nALqTegDFqsTERAYPHuztMKSeUL6IVcoVccXnK35gg609hzILubt\/B67p3gr\/Jir85Fx6bxFX+FwP\noIiIiEhjlllQwgcbj7PiUDC\/vTyUZ66LJtDfncsviIjUTD2AIiIiInWo2O5g0fY0zJ9OcG2P1tx1\nWXvCgvSZu4jULfUAioiIiHiR0+kkYX8m\/1x\/lOhWwcwc1YvO4UHeDktEpAKNQ5AG7XyWyJXGR\/ki\nVilX5Jd2nszjsSV7iN98gseu7sJzN3QrL\/6UL2KVckU8QT2AIiIiIrV0MreYf60\/ypZjudxzeQeu\n69FaC7yIiE\/THEARERERFxXZHJhbTrBoexqj+7bFuDiS4EB\/b4clIo1IbecA1jgE1DCMG2oXkoiI\niEjD4nQ6STqYyR8+2cmBjELmjO3N7wZ0UPEnIvWGlTmADxmGscswjL8YhtHW7RGJ1CGNpRdXKF\/E\nKuVK43Q4q5Cpy\/bxr3VHeezqzvx1WDSRLZrWeJ3yRaxSrogn1FgAmqZ5CxAL2IBlhmEsNAzjGrdH\nJiIiIuIDCkrs\/Gv9Uf60OIX+HUN5+9be9O8U5u2wRERqxfIcQMMwgoBxwPPACaAIeMg0za3uC69y\nmgMoIiIi7uZ0Olm9P5O5a49wSYcW\/GFgJyKaB3o7LBERwI37ABqG8X\/AvcB1wBfAcNM0dxuG0Rn4\nFPiVq08qIiIi4ssOZBQwK+kwOUU2nrqmKxe1b+HtkERE6oSVOYDTgNVAP9M0\/2ya5m4A0zRTgTR3\nBidyvjSWXlyhfBGrlCsNV0GJnXfWHmHKV3sZ3DWcWWN6n3fxp3wRq5Qr4gk19gCapjm0mh+PrLtQ\nRERERLwn+WAWs5JTubh9C965rTetgjXcU0QanlrtA2gYRohpmvluiMcSzQEUERGRupKWV8yc5MPs\nP13II1d15rJOod4OSUSkRu7cB\/CZX7SbUDr3T0RERKTesjucfL7tJA98touurYKZe2tvFX8i0uBZ\nmQN43dkN0zQdgNY+lnpBY+nFFcoXsUq5Uv\/tSc\/n0cUpJB7I4tVRvbh7QAeaBlj5s8h1yhexSrki\nnlDlHEDDMEYANwHdDMN4AzjTvRgJhHggNhEREZE6lV9sZ8HGY6zcm8EfftWR63u2xs\/P5RFUIiL1\nVnWLwBwFNgA3lH33A5xAIfBf94cmcv4GDx7s7RCkHlG+iFXKlfop6WAms5IOc2nHUN65rTfhHlrk\nRfkiVilXxBOqLABN0\/wJ+MkwjOamaS7wYEwiIiIidSYjv4S3kg\/z86kCpsRGcWlHzfMTkcarxsHu\npmnO8kQgIu6gsfTiCuWLWKVcqR+cTif\/3XOa+z\/bRcewZrx9a2+vFH\/KF7FKuSKeUOM+gCIiIiL1\nzcncYl5PTOVUfgnP39idXm20fIGICNRyH0Bv0z6AIiIiUhmH08mXO9N5f8Mxxl4Yya8vaUdAEy3y\nIiINT233AaxuFdAY0zR3G4YxgNLFXyowTXOjq08mIiIi4i5Hsgp5NSEVm8NB3MieRLUK9nZIIiI+\np7o5gLeXfV8BxFXyJeLzNJZeXKF8EauUK77F7nBibjnBo4tTGNy1Ja+O7OVTxZ\/yRaxSrognVLcK\n6HNlD7eapnmNh+IRERERsWz\/6QLiVh+iedMmvHlLDB3Cmnk7JBERn2ZlEZiP3B6FiJtoPx1xhfJF\nrFKueJ\/d4WThTyf4fHsaEy7vwI0xET67obvyRaxSrogn1FgAmqY52xOBiIiIiFhxKKOQGasPEhLo\nz6wxMUS2aOrtkERE6o0a9wEUqc80ll5coXwRq5Qr3mF3OPl4ywkmf5nCDT1b8\/KI7vWi+FO+iFXK\nFfGEWhWAhmEE1nUgIiIiIlU5klXI41\/tYc2hbN68JYZRfdv67JBPERFfVtuN4FcAQ+oyEBF30Fh6\ncYXyRaxSrniOw+lk8Y50\/r3xGHde1p5b+rWlST0r\/JQvYpVyRTyhun0A\/1zNdRe4IRYRERGRcsdz\niohbfYhiu4PXRvfigpZB3g5JRKTeq24I6CNAiyq+Frg\/NJHzp7H04grli1ilXHEvp9PJV7vSmfRF\nCgMvCOPVkfW7+FO+iFXKFfGE6oaApp61F6CIiIiI253OL2FmwiFO5Zcw4+YedPWhDd1FRBqC6grA\nUR6LQsRNNJZeXKF8EauUK+6RdDCTNxJTGR4Twd+uiybQv2EsVq58EauUK+IJVRaApmlmeDIQERER\naZwKSuzMST7CT8dy+OuwaPq1b+HtkEREGqyG8dGaSBU0ll5coXwRq5QrdWfHiTwe+HwXTpzMGdu7\nQRZ\/yhexSrkinlDbbSBEREREas3mcPLhpuN8vSudSVd1ZnDXcG+HJCLSKPg5nc5Kf2AYxnOmaT5j\nGMaSSn7sNE1ztHtDq9qKFSuc\/fv399bTi4iIyHlIzSxk+vcHCW3mz5+HRBEREujtkERE6p2NGzcy\nbNgwlzdGra4H8MOy71HAJODsm1deNYqIiIhUwel08uXOdN7feJzf9m\/PqD5t8Ktnm7qLiNR31S0C\nk1L2MMs0ze89FI9InUpMTNSKWmKZ8kWsUq647nR+Ca8mHCKjoIS4kT3pEl5\/9\/VzlfJFrFKuiCdY\nmQN4vdujEBERkQbrzPYON8ZEcFf\/bgQ0Ua+fiIi3VDkH0JdpDqCIiIjvO3t7hyeGRtGvXcNb4VNE\nxFvcMQewnGEYbYFLgUJgo2maea4+kYiIiDQeKen5vPTdAfq1a86csb0Jaerv7ZBERAQL+wAahjEB\n2AJMBP4M7DQMY6SVmxuGcZ1hGAllX9fWcO4FhmGsLDv3VSv3F6mJ9tMRVyhfxCrlStUcTicfbznB\n1KX7+N2ADjweG9Xoiz\/li1ilXBFPsNID+DhwiWmaJwEMw+gMfA18Wd1FhmE0AZ4Dris7tMwwjJWm\naVY15vQVYKppmkmWIhcRERGfciq\/hBnfH6SwxMGbt\/SifWgzb4ckIiK\/UGMPIHDyTPEHYJpmKpBm\n4bqeQIppmgWmaRYA+4AelZ1oGIY\/0F3Fn9Q1raQlrlC+iFXKlXOtPZTFQ5\/vom9kc+JG9lTxdxbl\ni1ilXBFPqLIH0DCMAWUPfzAM42lgKaV7ARqAlf7p1kCmYRgzy9pZQASwp5Jz2wJBhmEsAsKAN03T\n\/Ly6m5+9TO6Z7nK11VZbbbXVVtuzbZsDtgd0JflQJqPa5hBVkIV\/kw4+E5\/aaqutdkNth4SEUBtV\nrgJqGMYqKt\/w3Q9wmqZ5TXU3NgyjF\/AU8GDZNbOB503T3FvJuYHASiAW8Ad+AIaU9RyeQ6uAilWJ\nidpPR6xTvohVypVSBzMKePG7A1wQHsSfBncmtFmAt0PyScoXsUq5Iq6o81VATdMcel4RlQ757HVW\nu2dlxV\/Zc5UYhpEKtDdN84hhGEXn+dwiIiLiJk6nk692nWLBhmNMGNiRG3u1xs9Pe\/uJiNQHbt0H\n0DCMG4C\/lTWfM03z27Lj44F80zS\/OuvcLsDbQEvANE3z9aruqx5AERER78gutPFqwiFO5Bbz1DVd\n6RIe5O2QREQapdr2ANZYABqGEQNMBjpQOpTTD2hnmubA2gRaF1QAioiIeN7mozlM\/\/4gsdHh3Duw\nI039rawlJyIi7lDbAtDKO\/dHwE7gCPAFkAp84OoTiXjDmQmzIlYoX8SqxpYrNoeTd9cf5eVVB3hs\ncBfuH3SBij8XNLZ8kdpTrognWHn3zjdN8zUgGTgKPATc4taoRERExCecyCnm8S\/3sOdUPnPG9GZg\n5zBvhyQiIufBynJdOWXftwCPAt8Bnd0WkUgd0kpa4grli1jVWHLlhwOZvJ6YyriLIxl3USRNtNBL\nrTSWfJHzp1wRT7DSAzjfMIwI0zQ3l7WPUrpYi4iIiDRAxXYHs5IO8\/aaIzx3QzeMi9up+BMRaSDc\nugqou2gRGLFK++mIK5QvYlVDzpUjWYW88N0B2oc25bGru2hvvzrQkPNF6pZyRVxR5\/sAioiISOPy\n3d7TzFlzhN\/2b8+oPm20t5+ISANkZRuICOBpYBBQBPwXmGmaZoH7w6ucegBFRETqTkGJndnJh9l+\nIo+p13ale0SIt0MSEZEauHMbiP8AxcBE4M9AO+B9V59IREREfM\/+0wVM+iIFm8PJW7fEqPgTEWng\nrBSALU3TfMo0za2maW4yTfNRIMrdgYnUBe2nI65QvohVDSFXnE4nX+9K54mv92JcHMkTsVGENPX3\ndlgNUkPIF\/EM5Yp4gpUCcKdhGO3PNAzDiKJ0Y3gRERGph\/KK7by48gBfbE8j7uae3NArQvP9REQa\niSrnABqGsaTsYUugC7C1rP0rYIdpmte4P7zKaQ6giIhI7aSk5fPiyv307xjG\/YM60SzAymfBIiLi\na9yxCmhcNT+rf3tHiIiINGJOp5PPt6fx0eYTTLryAoZ0a+XtkERExAuqLABN01zlwThE3EL76Ygr\nlC9iVX3LlexCG6+sPsjpfBtvjO5Fh7Bm3g6pUalv+SLeo1wRT7C0D6BhGNcCIwAH8I2KQxERkfph\n2\/FcXlp5gCHR4fx1WDSB\/hryKSLSmFnZB3AS8BtgPqWLxkwAPjBN8y33h1c5zQEUERGpnt3hZOFP\nJ\/hiRxqTr+7C\/3Vp6e2QRESkDrljDuAZvwWGmKZZCGAYxgfA94DXCkARERGp2un8EqatOkiJw8Fb\nY2Jo27ypt0MSEREfYWUciO1M8QdgmmY+YHNfSCJ1R\/vpiCuUL2KVL+fKhsPZPLhoF33bNWfGTT1V\n\/PkAX84X8S3KFfEEKz2A2w3DmA7MpbRgnMj\/toQQERERH2B3OFmw4Rjf7jnNX2K7clmnUG+HJCIi\nPshKAfgoMBVYWNb+Bvh\/botIpA5pJS1xhfJFrPK1XDmZW8yL3x0gOLAJs8fE0Cok0NshyVl8LV\/E\ndylXxBNqLADLhnxOLfsSERERH5J8MIuZCYe47aJIxl8cSRM\/l9cDEBGRRkRrQUuDprH04grli1jl\nC7lSbHcwO\/kws5MP88z10fz6knYq\/nyUL+SL1A\/KFfGEGgtAwzC+80QgIiIiYs2RrCL+tDiFk7nF\nzBoTQ792LbwdkoiI1BNW5gA2d3sUIm6isfTiCuWLWOXNXFm57zSzk49w52XtuaVvG\/zU6+fz9N4i\nVilXxBOsDAFdZhjGeLdHIiIiIlUqtDmYmXCIBRuO8+KN3RnTr62KPxERcZmVAvBW4APDMLae9bXF\n3YGJ1AWNpRdXKF\/EKk\/nyoGMAiZ9sZtCm4PZY2Lo2SbEo88v50fvLWKVckU8wcoQ0JFuj0JERETO\n4XQ6WZpymn+tO8IfftWJ4b1aq9dPRETOi5\/T6fR2DC5bsWKFs3\/\/\/t4OQ0RExG3yiu288UMqP58u\nYOq1XenaKtjbIYmIiA\/ZuHEjw4YNc\/lTQW0DISIi4mP2pOfz0KLdBAU04c1bYlT8iYhInamyADQM\no4dhGN8ZhnHMMIyFhmG09mRgInVBY+nFFcoXscpdueJ0Ovl820meXrqP3w3owGNXdyEoQJ\/V1nd6\nbxGrlCviCdXNAXwbmA18DYwFpgN\/8ERQIiIijU12oY1XEw6RllfMa6N60allM2+HJCIiDVB1BWCQ\naZqflD3+0DCM+zwRkEhd0n464grli1hV17my\/UQuL608wFVdw3n62q409VevX0Oi9xaxSrkinlBd\nAdjcMIwzK634AS3K2n6A0zTNjW6PTkREpAFzOJ2YW07w2dY0Hru6C1dEtfR2SCIi0sBV9xFjFhBX\n9vUKkHPW4zj3hyZy\/jSWXlyhfBGr6iJXMvJLmLp0H2sPZfPWmBgVfw2Y3lvEKuWKeEKVPYCmaQ71\nYBwiIiKNxqajOUxfdZAberbm7gEd8G+ivf1ERMQztA+giIiIh9gdTv696Tjf7E5nypAoBlwQ5u2Q\nRESknqrtPoDVzQEUERGROpKeV8xLKw8S0ARmj+lN65BAb4ckIiKNkJYZkwZNY+nFFcoXscrVXFl7\nKIuHFu1mQKdQXryxh4q\/RkbvLWKVckU8QT2AIiIiblJsdzB\/\/VES9mfy\/4ZFc1H7Ft4OSUREGjnN\nARQREXGDw1mFvPjdASJbNGXy1V0IC9JnriIiUnc0B1BERMQHOJ1Ovt1zmnnrjnJ3\/\/aM7NMGPz+t\n8ikiIr5BcwClQdNYenGF8kWsqipX8ortvLTyAB9vPcn0m3owqm9bFX+i9xaxTLkinqACUEREpA7s\nPJnHA5\/vokWzAN66JYbo1sHeDklEROQcluYAGoYRDfQ2TfObsnYL0zRzLVx3HfBMWfMZ0zS\/q+H8\nZkAKMN00zVlVnac5gCIi4ivsDifmlhN8vi2NRwZ3ZnDXcG+HJCIijUBt5wDW2ANoGMZvgXjgpbK2\nH\/CNheuaAM8BN5R9PVt2bXUmAhuA+rcyjYiINDqn8kp4aulefjycw1tjYlT8iYiIz7MyBPRBYCiQ\nAWCaptXirCeQYppmgWmaBcA+oEdVJxuGEQJcD3wBaMKE1AmNpRdXKF\/EqsTERJIPZvHgol1c3CGU\n6Tf1ILJFU2+HJT5K7y1ilXJFPMHKKqA20zSLDMMASod\/AlYmNrQGMg3DmFnWzgIigD1VnP8I8BbQ\nzsK9RUREvKLY5mDpiaYcPHyYvw2Lpp\/29hMRkXrESg\/gGsMwpgEtDcMYRenwz3gL150CwoGngall\nj9MrO9EwjJbAYNM0l2Kx9+\/sT0gSExPVVrvS9uDBg30qHrV9u618Ubum9ucrfuD3H20kKLwts8fG\nkLF3s0\/Fp7ZvtgcPHuxT8ajtu+2z+UI8avt2u7ZqXATGMAx\/4D5K5\/GVAItM0\/yophuXXbcauI7S\nou5b0zSvquLcm4DJQBoQTWnP5N2mae6o7HwtAiMiIp7kdDr5atcpFmw4xoTLO3BjTIS2dxAREa+q\n7SIwllYBrS3DMG4A\/lbWfM40zW\/Ljo8H8k3T\/KqSa34HNDdNc3ZV91UBKFYlJv7vk1eRmihfpDIZ\nBSXMTDhEel4JT17TlS7hQcoVcYnyRaxSrogralsABtR0gmEY4aZpZtYmKNM0lwPLKzn+cTXXLKjN\nc4mIiNS1dalZvJpwiOt7RvDXYdEE+mv7XBERqd+sDAE9CCQC803TXOGRqGqgHkAREXGnQpuDeWuP\nsDY1iydio7i4Q6i3QxIREanAbT2AQHdgOHCfYRhvAh8B75mmmerqk4mIiPi6ven5vLzqIN0jgnl7\nbG9aNLPyv0oREZH6ocaxLKZp2kzT\/Mo0zduBm8q+9ro9MpE6cD4rJEnjo3xp3OwOJwt\/OsFTS\/fx\nm0vb8dQ1Xass\/pQr4grli1ilXBFPsDIHsClwM\/BboBelW0CMd3NcIiIiHnMyt5jpqw7iwMlbt8TQ\nLlSbuouISMNkZVzLPmAF8BqQYJqm+5YNFaljWklLXKF8aZxW7stgdvJhbruoLeMvaod\/k5qnUyhX\nxBXKF7FKuSKeYKUA7GuaZo7bIxEREfGgvGI7b\/6QSkp6Pi\/c2J1ebUK8HZKIiIjbWZkDqOJP6i2N\npRdXKF8aj63Hc5n42S5CAv2ZNSbG5eJPuSKuUL6IVcoV8QQtbSYiIo1Gsd3BBxuO8e2e0zw6uAtX\nRLX0dkgiIiIeVeU+gIZhxJimudswjAHAOSeZprnR3cFVRfsAioiIq\/adymfaqoN0DGvGo4M70yo4\n0NshiYiI1Jo79gG8HXiO0gVgNlXy82tcfTIRERFPszuc\/OenEyzansb9\/9eJYT1a4efn8v8vRURE\nGoQqC0DTNJ8re7jVNE0Ve1IvJSYmakUtsUz50vAcyixkxvcHad60dK5fZIu62d5BuSKuUL6IVcoV\n8QQrcwA\/cnsUIiIidcjhdPLF9jQ+3HScuwd0YFSfNur1ExERoZo5gL5McwBFRKQqx3OKiFt9iBK7\nkymxUXRq2czbIYmIiNQ5d8wBFBERqTecTidLU04zf\/1Rxl8UyW0XRVra1F1ERKQxqXEfQMMwOv+i\n7WcYxh\/cF5JI3dF+OuIK5Uv9lZ5XzN+W\/8ziHWlMv6kHxiXt3Fr8KVfEFcoXsUq5Ip5QYwEIxJ\/d\nME3TSekKoSIiIl7ldDpZuvsUD3y+m15tQ3hjdC+iWwd7OywRERGfVeUQUMMwgoEQIMAwjNZn\/agd\nEOXuwETqglbSElcoX+qXk7nFzEw4RFahjWkjetAtwnOFn3JFXKF8EauUK+IJ1c0BvB94FGgPbDjr\neCHwpjuDEhERqYrD6eTrXadYsOEYt17YlvEXtyNAc\/1EREQsqW4fwNeA1wzDSDRNUx9HSL2k\/XTE\nFcoX33csu4hXEw5RaHMw4+YedG3lneGeyhVxhfJFrFKuiCdYWQX0OrdHISIiUg2H08niHen8e+Mx\njEvacduFWuFTRESkNrQPoIiI+LQjWYXEJRzC6YTJV3ehc3iQt0MSERHxOrfuA2gYRgdK5wL6lX21\nN03zK1efTERExCqbw8ln205i\/nSCOy9rz+i+bdXrJyIicp6s7AP4AvAj8CkwB\/gGuNfNcYnUCe2n\nI65QvviO3Wl5PLxoNxuP5PDGLTGM9bEhn8oVcYXyRaxSrognWOkBHAf0AH4PbAKygcnuDEpERBqn\nghI77204xqp9Gdz3q04M69EKPz\/fKfxERETqOysbwR80TbMAOABcZJrmVqC3W6MSqSNaSUtcoXzx\nrrWHsrjv053kFtl557Y+XNeztc8Wf8oVcYXyRaxSrognWOkBPFK2EfxqIMEwjC5YKxxFRERqdDq\/\nhDnJh9lzKp8\/Xx3FZZ1CvR2SiIhIg2WlkHvENM3TpmlmA78F0oAx7g1LpG5oLL24QvniWaUbuqdz\n\/2e7aB\/WjLm39qk3xZ9yRVyhfBGrlCviCTX2AJqmmXPW4y3AFrdGJCIiDd6hzEJeT0yl2O5g2oge\ndIvwzobuIiIijY32ARQREY8pKLHz0eYTfL0rnbv6d2BUnzY+tbqniIhIfVHbfQBrNZfPMIz7a3Od\niIg0Tk6nkx8OZPLHT3dxIreYubf2YUw\/7esnIiLiabVdzOWuOo1CxE00ll5coXxxj6PZRfx1+c\/M\nX3+UyUO68NQ1XYloHujtsM6LckVcoXwRq5Qr4glVzgE0DCOnqp8BmqwhIiLVKrI5WPjTCRbvSMO4\nuB3PXBdNoL8WkRYREfGm6haB2Wya5tUei0TEDbSfjrhC+VJ31h7KYnbyYbpHhDB7bG8iWzT1dkh1\nSrkirlC+iFXKFfGE6grARR6LQkREGoTjOUXMWXOEQxmFTLqqM5dfEObtkEREROQsVY7FMU0zzpOB\niLiDxtKLK5QvtVdoc\/Dvjcd4aNFuerUJYe5tvRt08adcEVcoX8Qq5Yp4Qo37AIqIiFTF6XSy6ucM\n\/rnuKH0imzNrTAztQ5t5OywRERGpQo37ABqGsaSSw07TNEe7J6SaaR9AERHv252Wx5zkIxTbHUwc\ndAEXd2jh7ZBEREQajdruA2ilB\/CXQ0GvBPR\/eRGRRupUXgn\/+vEoG49kc8+Ajlzfs7X28xMREakn\naiwATdNc9YtDqwzDeMM94YjUrcTERK2oJZYpX6pXZHPw6daTfLrtJDfFRPCvcX1p3tTf22F5hXJF\nXKF8EauUK+IJLs8BNAyjOdDPDbGIiIgPcjqdJOzPZN66o\/RsE8ybt8TQMUzz\/EREROqjGgtAwzBy\ngbMnChYD09wWkUgd0qdo4grly7l2nsxj3roj5Bfb+fOQLlzaMdTbIfkE5Yq4QvkiVilXxBOsDAHV\nfD8RkUYmNbOQd388yq60fH7bvwM3aJ6fiIhIg1DlPoAiDYH20xFXKF\/gVH4JryceYvKXe+jdtjnv\nju\/LiJgIFX+\/oFwRVyhfxCrliniClSGgc4BbgZCzDjtN07S0w69hGNcBz5Q1nzFN87tqzn0biKG0\nML3XNM2frTyHiIicn7xiO+aWE3y5M53hvSL417g+hAVpq1gREZGGxso+gKuAsaZpZrh6c8MwmgAJ\nwOzATsUAACAASURBVHVlh5YBsaZpVvukhmFcC4w3TfOByn6ufQBFpK7k5OQwb948Jk+eXKf3nTFj\nBg8\/\/DDBwcF1et+6Vmx38NXOdD7afIJfdQ7j7gEdiGzR1NthiYiISA3cuQ\/gXOBzwzC2AGeewGma\n5iMWru0JpJimWQBgGMY+oAewp4brcihdbEZExG1sNhuTJ0\/mhRdeqPa8kpISFi9ezLvvvsuUKVOI\njY2t8d6GYTBp0iTmzZuHn5\/vDZ90OJ2s3JfBez8eI6pVENNu6kF0a98uVkVEROT8WZkD+A\/gc2AD\n8GPZ1waL928NZBqGMdMwjJlAFhBh4boJwByLzyFSJY2lr1xqaio9e\/Zk79693g6lzsyfP5977rmH\nCy+8kIiICAYNGsSECRNYtGhRldfMmzePYcOGERkZCVSdL9988w1z584lOTmZNm3aWIonKiqK2NhY\n3nzzTdf\/MW7kcDpJ3J\/JxM92sWh7Go8P6cLzw7ur+HOR3lvEFcoXsUq5Ip5gpQD8D5ANbPvFlxWn\ngHDgaWBq2eP06i4wDGMUsNs0zV3VnXf2fyCJiYlqq622C+0pU6aQkZHB888\/7xPx1EV7woQJvPfe\ne4wfPx6AuXPnMn\/+fNq0aVPp+VlZWcTHx9OhQ4ca79+6dWvuuece2rRpQ0ZGhuX4br\/9dt59912W\nLl3q9dfH6XSSdDDz\/7d35\/FRVff\/x1\/ZJwlZIBD2QEBRtiKggiFAq5af+JXVeouPVrD4g1oF+UoL\nsvTrwld+gBipKCAqIFhpuYAgbRFZBEJYXFgqiLIGGpQlIWQl2yy\/P5KMWSYwA9lI3s\/How\/mnDn3\nzhn89HI\/c849hyf\/up\/3Ek4y+p4WzB\/cgczT\/64V\/\/1UVllllVVO4PDhw7WqPyrX7vKNcvcZwHKN\nTNP8xfVObhiGDxBP4TOAXsAW0zT7XKN9T+Bx0zT\/dK3z6hlAkRt39OhR1q1bx+nTp1m\/fj1bt26l\ne\/fuNd2tm5Kfn8\/KlSs5evQo58+fZ+PGjYwYMQKAPn36YBgGvr6+pY5ZuHAhaWlpTJs2za3PGDt2\nLDabjSVLlnjUtxkzZtCkSRP+8AeXjzRXOYfDwZdJGaw4cB6bHUb2bMZ9UWG1clqqiIiIuK\/KngE0\nTfPnN9SjwmNthmG8Amwpqnq5+D3DMB4Drpqm+a8Sh6wGkgzD2A4cdvM5QxHxwIIFC5g1axYpKSn8\n85\/\/ZMaMGaxbt66mu3XDLly4wPDhw+nVqxfz5s1j5cqVbNy4kbFjx9KlSxcmTJjA4sWLWbt2banp\nm1u2bGH8+PFufYbD4SA+Pp6pU6d63L+YmBjmzZtX7Qmgw+Hg63OZrDhwnjyrnSd6NKdP2zC8lfiJ\niIjUa9dNAA3DcDnUZprmAXc+wDTNzcBmF\/WrXdS1c+ecIu5KSEggNja2prtRa+zbt4\/OnTsTGhpK\naGgoI0eOZOnSpWzfvp1f\/OK6g\/q10sSJEzlx4kSpaZbFfHx8mDlzJu3bt+f555\/nww8\/BApHDPft\n28fy5ctLtS+Ol8zMTObMmUNQUBBWq5U2bdqQnJzs1uIvZfXs2ZODBw9it9vx9q76rVcdDgcHf8xk\nxf4LZOXbeKJHM\/pGhyvxq2S6tognFC\/iLsWKVIfrJoDAG5SeAtoOuATcUyU9EpEqs3TpUt5++21n\nedKkSaxatYr\/\/d\/\/vWUTwPj4eJo0aUJoqOutScPCwoiIiGDnzp3OukuXLuHl5eXymKysLIYNG8aw\nYcN49tlnARg8eDCtW7embdu2HvcvPDwcq9XK2bNniY6O9vh4dzkcDr46l8HfD10kLdfKEz2a0S+6\noTZwFxERkVI8ngJqGEZTYEJVdUikMulXtJ9s2rSJ+++\/H3\/\/n\/Z4i4yM5OmnnyYuLo5169YxbNiw\nGunbM888Q3JyslttGzduzKJFPy0SfMcdd3DkyBGsVmu55\/ygcLQvNTW11HOOycnJLpO\/2NhYpkyZ\nQk5OjjP5A7BYLPTr18+Tr+Tk5eVFeHg4V65cqZIE0GZ3sCsxjVXfXMRud\/Drbk3p306JX1XTtUU8\noXgRdylWpDq4MwJYimmaFw3DaFQVnRGRqmG32\/n444959913y703fvx4PvjgA2bNmsXgwYPx8fEp\n9f7x48dZsmQJQUFBhIeH4+vrS0xMDIcPH2bkyJEVfuaaNWuYPHkyO3bsICoqqly5pIULF97wd5s\/\nfz5Dhw5l2bJljBkzptz777\/\/PqGhobzxxhvOOrvd7nIRlPT0dJYvX86f\/vTTOlRWq5V9+\/Yxb968\nUm0TExOJi4srNaJaER8fn0pfdCXfZmfLiVRWf3ORcIsfo3o2p1frUC3uIiIiItfkzjOAfyxTFQl0\nq5ruiFQuzaUvZJqmc3uEskJCQpg4cSLTp0\/nww8\/5Mknnyx13IoVK1i2bBlNmjQB4OLFi8TExPDx\nxx9f8zMHDRrE7Nmzncle2XJl6dy5M5s3b+a1115jypQp2O12AHbs2MGKFSuw2+3s3LmTVq1aOY9p\n3LgxaWlp5c61bNky8vPzS432HTx4kOzsbPr27euse++99zh06BBJSUlu9fHKlSvOv7+bdTXfxr++\nT+HjI8m0axTIH\/u1oWuzBpVybnGfri3iCcWLuEuxItXBnRHAEEo\/A\/gDMLxquiMilS0\/P59du3ax\nYMGCCts89dRTLF68mLlz5zJixAgsFgvx8fG88sorJCQk0LBhQ2fbpk2bEhsbS7du1\/4d6MCBA9x1\n110Vlku6mSmgANHR0SxatIiCggLnxustW7ZkzJgxBAUFlTtHZGQkNpuN7OxsgoODnfX5+fkA3Hnn\nnc66Xbt2ceeddxIZGcmbb77JhAkTGDNmDLt372bOnDnX7W9GRgY2m8252fyNSs+1sv7bZP75XQp3\ntWjAq\/+nHe0jyn83ERERkWtx5xnAl6uhHyJVQr+iFS78ApRLmsrq0KEDW7duZfHixTz33HNMmjSJ\ncePGlUr+io0dOxYoXDDl9ddf52c\/+xmJiYmkpKQwa9YsAHbv3k2fPj9t+1m2XNLNTAEtyc\/Pz7nV\nQ9u2bV0mfwCBgYHcfffdHDp0qFSfRo4cyZtvvklWVhYhISEcOXKEFStWEBsbS0FBAVlZWc6219tD\ntdihQ4fo3LlzqWcvPfFDeh7rv73E56eu0Dc6nL8M6kDLsIAbOpdUHl1bxBOKF3GXYkWqQ4UJoGEY\nXqZpurzDMQwjzDTN9KrrlohUhtzcXObNm0dKSopb7b28vJg\/fz69evXi5MmTPProoy7bFSdNY8eO\nZdy4ccTExDi3Wyi2Z88eZs6cWWG5si1dupRt27axZ88evLy8GDVqFD179mT48OEMHTq0XPsBAwaQ\nkJBQKgFs1qwZCxYsYMaMGbRr146wsDA++ugjpk+fzosvvsjTTz\/tcb92797Nww8\/7NExDoeDwxey\nWHs4maOXsnn4jgjeHd6RiGA\/jz9fREREpKRrjQCuMwxjpGmaGSUrDcNoR+HWEOXvqERqmfo+l95i\nsXDs2DGPj1u7di0REREupy2mpKRgsVg4fvw4p0+fJiYmBoBjx44xaNAgAAoKCjhx4gQdO3Z0Wa4K\no0ePZvTo0W63f+yxx3j88ceZPHmyc+GUhIQEhg4dWi5hXL9+\/Q31yW63s3HjRlatWuVW+wKbnZ2n\n0\/j4yCVyrXaGd4lk6v1tsfhW\/f6B4pn6fm0RzyhexF2KFakO17qraFQ2+QMwTfM0UDmrGYhIrdSy\nZUvnYiplbdq0iQYNGrBnz55S\/0gdPnyYLl26kJGRwYEDB+jatSs5OTkA5cq1QcuWLenfvz8bNmyo\nss\/45JNP6N+\/Py1atLhmuytXC\/jo4AVGrjrKlhOXGdWzOe\/\/qiOPdGys5E9EREQq1bXuLK61rFxg\nZXdEpCroV7Qb07t3b9q1a8dnn31Wqn7Lli3OxV9CQ0OJiIgAChdKad68Od9\/\/z2JiYns37+fXr16\nsW7dOoBy5dpi2rRprF69msuXLwOVGy8pKSmsWbOG6dOnu3zf4XDw7cUsZm0\/w1NrvuNSVj6v\/p92\nzHn4dnpFheGt7RxqNV1bxBOKF3GXYkWqw7USwFOGYfyuZIVhGF6GYTwDHK\/abolITTNNky1btvDy\nyy+zYMEClixZQlRUFF27dgVg+PDhpKSksHbtWjIzM2natCnx8fF069aN7t27c\/bsWefWB2XLtUVg\nYCBxcXG8\/vrrHh23fPly3n77bY4ePcrMmTM5efJkuTZxcXHExcURGFj697Jcq51Pj13m2fXHmLvz\nLB0aB7H81514vm+UVvUUERGRKudV0Up2hmE0Bt4GegFniqrbAbuBcaZpplZHB13Ztm2bo0ePHjX1\n8XIL0Vx68URVxst\/ruSy8VgKW0+k0jEymMGdmtCzVYhG+m5RuraIJxQv4i7FinjiwIEDPPDAAx7f\nSFS4CIxpminACMMwwoHooupE0zTL754sIiLl5Fnt7EpMY+P3KfyYkceADhG8NeQOmodqGwcRERGp\nGRWOANZmGgEUkdosMTWHjd9fZvupVDo0CeLhOxvTOyoMX2+N9omIiEjlqPQRQBERcV9mnpUdp66w\n+UQqKdkFPHRHBAuG3knTkBvbAF5ERESkKmh9canTEhISaroLcgvxNF5sdgdfJqXz6rZEnvj7t3xz\nIYsnejTjryM6M6pncyV\/dZiuLeIJxYu4S7Ei1UEjgCIiHnA4HCSm5rLtZCrbTqUSGezPgA4RTIht\nTUiALqkiIiJSu+kZQBERN\/yQnsv202nsOHWFXKuNX7RryC87RBAVbqnpromIiEg9pGcARURu0J7N\nm4lfvBjfvDysAQH0+\/3viRkwgOTsfHaeusL201dIyS6gX3Q4z\/dtTcfIYG3fICIiIrckJYBSp2k\/\nHbmePZs3s2vqVOYkJjrrxh8\/xfu\/Pkd6m7uJaRPGU\/e0oFvzEHy0iqcU0bVFPKF4EXcpVqQ6KAEU\nkXotfvHiUskfwFs\/\/Ien927gnalP4u+jtbJERESk7lACKHWafkWTivyQnsvuM+mc+THN5fsRXlYl\nf1IhXVvEE4oXcZdiRaqDEkARqRccDgcnUnLYfSaNPWfTycy3EhMVTsOIBi7b2yxa3EVERETqHv28\nLXWa9tOp3\/Ktdr4+l8GCPUn85u\/fMnvHGewOBxP7RbHy8S48F9uaQc89y5To6FLHvdC2LX3Hjq2h\nXsutQNcW8YTiRdylWJHqoBFAEalTfkjP5atzmXyVlMG3F7OIbhTIva1Dmf3QbUQ1LD+qFzNgAABT\n3n2XrIsXadC0Kf3GjnXWi4iIiNQl2gdQRG5pOQU2\/n0+i6\/PZfD1uQzyrA7ubhXCPa1D6d4iRJuz\ni4iISJ2kfQBFpF6w2R0kpuZw6MdMvjqXyffJ2XRoHMQ9rUJ58YF2RDey4KU9+kRERERcUgIodZr2\n07n12R0OzqTm8u\/zmRw6n8WRC1mEW3zp1iKEIZ0b81LzaIL8fSrlsxQv4i7FinhC8SLuUqxIdVAC\nKCI1Ys\/mzcQvXoxvXh7WgAD6\/f73xAwYgMPh4GxaLv\/+MYt\/n8\/km\/NZNAjwpVvzBvy8XTjP9WlN\nRJBfTXdfRERE5JakZwBFpNrt2byZXVOnMrvEBuzjWkSR9sRELrbsjsXPm27NG9CteQjdWjSgSbB\/\nDfZWREREpPbRM4Aicku4fLWAT\/6ygHdLJH8Ab\/\/4H8bsXMv8Vb+mWUhADfVOREREpG7TPoBSp2k\/\nnZqVa7Vz9GI2679NZtb2Mzzx928Zu\/Y7stKzXbaP9LbVaPKneBF3KVbEE4oXcZdiRaqDRgBFpFLk\nWu2cunyVEyk5nEi5yomUq5zPyKN1uIXbGwfRvUUIv+nejFZhAby2Pgy+K38Om6X8Pn0iIiIiUnmU\nAEqdppW0qkZWnpXEK7mcuuw62esYGcyQTk1o28iCv0\/5iQb9fv97ppw5U+oZwBfatqXf2LHV+TXK\nUbyIuxQr4gnFi7hLsSLVQQmgiFQo32YnKS2XxNRczlzJITE1l8QrOWTn22gTbqFdRCCdmgYzpHMT\n2jZ0ney5EjNgAABT3n0Xn9xcbBYL\/caOddaLiIiISNVQAih1mvbTcU++1c4PGXkkpeeSlJbHmSs5\nnEnN5XxmHs1CAohuaKFto0D+q2ME0Q0DaRrij\/dNbrYeM2BArUv4FC\/iLsWKeELxIu5SrEh1UAIo\nUk84HA5Sr1qLkrxczqUXJnzn0vO4fLWApg38aR1uoXVYAL1ahzGiW1Nah1nw99VaUSIiIiJ1hfYB\nFKlDrHYHl7LyOZ+Rx\/nMfC5kFv55PiOPHzPy8PPxpnVYAK3CLLQKD6B1mIXW4QE0CwnA1\/vmRvRE\nREREpPpoH0CResBqd3A5u4BL2fkkZ+VzKTuf8xk\/JXqXswtoFORHsxB\/mocE0DzUn9i24TQP8adF\naAChFv1fXkRERKQ+092g1Gm30lz6ApudKzlWUq8WkHK1gOSsfJKzC7iUlU9ydj7JWQWk5VoJD\/Ql\nMtifJg38aBLsz20RgfSNDqd5SACRDfzwc3MhFinvVooXqVmKFfGE4kXcpViR6qAEUKQKORwOrhbY\nuZJTQOrVAi5ftTpfp14tILUo4Uu9WkB2vo3wQD8aBfkSEeRHZAN\/IoP9ub1xYFHC509EkB8+mqop\nIiIiIjdIzwCKeMBmd5CRayU9z0pGrq3EayvpucV\/2sjIKyxfybECEBHkS6NAPxoF+dGwRJJX\/LpR\nkB+hAb5K7kRERETELXoGUMQNDoe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class=\"cell border-box-sizing text_cell rendered\">\n<div class=\"prompt input_prompt\">\n<\/div>\n<div class=\"inner_cell\">\n<div class=\"text_cell_render border-box-sizing rendered_html\">\n<h3>\nAdditional Resources<br \/>\n<\/h3>\n<p>You can grab a <a href=\"http:\/\/drsfenner.org\/public\/notebooks\/TwoIronCondorHeuristics.ipynb\">copy of this notebook<\/a>.<\/p>\n<p>Even better, you can <a href=\"http:\/\/nbviewer.ipython.org\/url\/drsfenner.org\/public\/notebooks\/TwoIronCondorHeuristics.ipynb\">view it using nbviewer<\/a>.<\/p>\n<h3>\nLicense<br \/>\n<\/h3>\n<p>Unless otherwise noted, the contents of this notebook are under the following license. The code in the notebook should be considered part of the text (i.e., licensed and treated as as follows).<\/p>\n<p><a rel=\"license\" href=\"http:\/\/creativecommons.org\/licenses\/by-nc-sa\/4.0\/\"><img decoding=\"async\" alt=\"Creative Commons License\" style=\"border-width:0\" src=\"https:\/\/i.creativecommons.org\/l\/by-nc-sa\/4.0\/88x31.png\" \/><\/a><br \/><span xmlns:dct=\"http:\/\/purl.org\/dc\/terms\/\" property=\"dct:title\">DrsFenner.org Blog And Notebooks<\/span> by <a xmlns:cc=\"http:\/\/creativecommons.org\/ns#\" href=\"drsfenner.org\" property=\"cc:attributionName\" rel=\"cc:attributionURL\">Mark and Barbara Fenner<\/a> is licensed under a <a rel=\"license\" href=\"http:\/\/creativecommons.org\/licenses\/by-nc-sa\/4.0\/\">Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International License<\/a>.<br \/>Permissions beyond the scope of this license may be available at <a xmlns:cc=\"http:\/\/creativecommons.org\/ns#\" href=\"drsfenner.org\/blog\/about-and-contacts\" rel=\"cc:morePermissions\">drsfenner.org\/blog\/about-and-contacts<\/a>.<\/p>\n<\/div>\n<\/div>\n<\/div>\n","protected":false},"excerpt":{"rendered":"<p>In the world of Iron Condors (an option position composed of short, higher strike (bear) call spread and a short, lower strike (bull) put spread), there are two heuristics that are bandied about without much comment. I&#8217;m generally unwilling to accept some Internet author&#8217;s word for something (unless it completely gels with everything I know), [&hellip;]<\/p>\n","protected":false},"author":3,"featured_media":0,"comment_status":"closed","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[14,6,7],"tags":[],"class_list":["post-341","post","type-post","status-publish","format-standard","hentry","category-finance","category-mrdr","category-sci-math-stat-python"],"_links":{"self":[{"href":"https:\/\/drsfenner.org\/blog\/wp-json\/wp\/v2\/posts\/341","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/drsfenner.org\/blog\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/drsfenner.org\/blog\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/drsfenner.org\/blog\/wp-json\/wp\/v2\/users\/3"}],"replies":[{"embeddable":true,"href":"https:\/\/drsfenner.org\/blog\/wp-json\/wp\/v2\/comments?post=341"}],"version-history":[{"count":3,"href":"https:\/\/drsfenner.org\/blog\/wp-json\/wp\/v2\/posts\/341\/revisions"}],"predecessor-version":[{"id":419,"href":"https:\/\/drsfenner.org\/blog\/wp-json\/wp\/v2\/posts\/341\/revisions\/419"}],"wp:attachment":[{"href":"https:\/\/drsfenner.org\/blog\/wp-json\/wp\/v2\/media?parent=341"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/drsfenner.org\/blog\/wp-json\/wp\/v2\/categories?post=341"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/drsfenner.org\/blog\/wp-json\/wp\/v2\/tags?post=341"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}