{"id":268,"date":"2017-04-15T03:20:21","date_gmt":"2017-04-15T03:20:21","guid":{"rendered":"https:\/\/courses.lumenlearning.com\/conceptstest1\/chapter\/probability-rules-1-of-2\/"},"modified":"2017-05-30T23:44:57","modified_gmt":"2017-05-30T23:44:57","slug":"probability-rules-2-of-3","status":"publish","type":"chapter","link":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/chapter\/probability-rules-2-of-3\/","title":{"raw":"Probability Rules (2 of 3)","rendered":"Probability Rules (2 of 3)"},"content":{"raw":"&nbsp;\r\n<div class=\"textbox learning-objectives\">\r\n<h3>Learning Objectives<\/h3>\r\n<ul>\r\n \t<li>Reason from probability distributions, using probability rules, to answer probability questions.<\/li>\r\n<\/ul>\r\n<\/div>\r\nHere we continue to use probability distributions to answer probability questions. We look for some patterns that suggest general rules for determining probabilities.\r\n<div class=\"textbox examples\">\r\n<h3>Example<\/h3>\r\n<h2>When Can We Add Probabilities?<\/h2>\r\nCompare these two questions. What do the solutions have in common?\r\n<ul style=\"list-style-type: none\">\r\n \t<li><strong>Question 1:<\/strong> A person with blood type A can receive blood from individuals with type A or O blood. <em>What is the probability that a randomly selected person from the United States can donate blood to someone with type A blood?<\/em><\/li>\r\n<\/ul>\r\n<table>\r\n<tbody>\r\n<tr class=\"oli_table\">\r\n<td align=\"center\">Blood Type<\/td>\r\n<td align=\"center\">O<\/td>\r\n<td align=\"center\">A<\/td>\r\n<td align=\"center\">B<\/td>\r\n<td align=\"center\">AB<\/td>\r\n<\/tr>\r\n<tr class=\"oli_table\">\r\n<td align=\"center\">Probability<\/td>\r\n<td align=\"center\">0.45<\/td>\r\n<td align=\"center\">0.41<\/td>\r\n<td align=\"center\">0.10<\/td>\r\n<td align=\"center\">0.04<\/td>\r\n<\/tr>\r\n<\/tbody>\r\n<\/table>\r\n<ul style=\"list-style-type: none\">\r\n \t<li><strong>Answer:<\/strong> <em>P<\/em>(donate to A) = <em>P<\/em>(blood type A or blood type O) = 0.45 + 0.41 = 0.86. There is an 86% chance that a randomly selected person in the United States can donate blood to someone with type A blood.<\/li>\r\n<\/ul>\r\n<ul style=\"list-style-type: none\">\r\n \t<li><strong>Question 2:<\/strong> <em>What is the probability that a randomly chosen boreal owl nest will either be empty or contain only 1 egg?<\/em><\/li>\r\n<\/ul>\r\n<table>\r\n<tbody>\r\n<tr class=\"oli_table\">\r\n<td align=\"center\">Number of Eggs<\/td>\r\n<td align=\"center\">0<\/td>\r\n<td align=\"center\">1<\/td>\r\n<td align=\"center\">2<\/td>\r\n<td align=\"center\">3<\/td>\r\n<td align=\"center\">4<\/td>\r\n<td align=\"center\">5<\/td>\r\n<td align=\"center\">6<\/td>\r\n<\/tr>\r\n<tr class=\"oli_table\">\r\n<td align=\"center\">Probability<\/td>\r\n<td align=\"center\">0.2<\/td>\r\n<td align=\"center\">0.1<\/td>\r\n<td align=\"center\">0.1<\/td>\r\n<td align=\"center\">0.25<\/td>\r\n<td align=\"center\">0.25<\/td>\r\n<td align=\"center\">0.05<\/td>\r\n<td align=\"center\">0.05<\/td>\r\n<\/tr>\r\n<\/tbody>\r\n<\/table>\r\n<ul style=\"list-style-type: none\">\r\n \t<li><strong>Answer:<\/strong> <em>P<\/em>(no eggs or 1 egg) = <em>P<\/em>(no egg) + <em>P<\/em>(1 egg) = 0.2 + 0.1 = 0.3. There is a 30% chance that a randomly selected boreal owl nest will be empty or contain only one egg.<\/li>\r\n<\/ul>\r\nWhat do these solutions have in common?\r\n\r\nIn each case, we have two events and we want to find the probability that either event A <em>or<\/em> event B occurs. In each case, we added the probabilities. This works because the events have no outcomes in common. When two events have no outcomes in common, they are <strong>disjoint<\/strong>.\r\n\r\nThe events \u201ctype A blood\u201d and \u201ctype O blood\u201d are disjoint. These events cannot both happen at the same time for a single person. A person cannot have both type A blood and type O blood.\r\n\r\nThe events \u201cno eggs\u201d and \u201c1 egg\u201d are disjoint. These outcomes cannot both happen at the same time for a single nest. A nest cannot contain no eggs and at the same time contain 1 egg.\r\n\r\nIf two events are disjoint, then we can add their individual probabilities. We write this fact as a rule:\r\n\r\n\r\n<em>P<\/em>(<em>A<\/em> or <em>B<\/em>) = <em>P<\/em>(<em>A<\/em>) + <em>P<\/em>(<em>B<\/em>)<\/div>\r\n<h3>Comment<\/h3>\r\nWe stated the addition rule as a formal rule. A rule is a concise way to summarize a general principle from specific examples. This is one advantage of a rule. One disadvantage of a rule is that sometimes it discourages us from just thinking through a problem. Students often have the experience that they misremember a rule or forget the conditions required for the rule to work. This leads to mistakes that we can avoid if we just think through the problem without worrying about rules. We encourage you to think through probability problems whenever possible without resorting to rules. If you use a rule, be careful to check that the situation meets the conditions required for using the rule.\r\n\r\nThis addition rule for probabilities only works when the events are disjoint. If the events are not disjoint, the rule does not work. Here is an example of when the rule does not work because the events are not disjoint.\r\n<div class=\"textbox examples\">\r\n<h3>Example<\/h3>\r\n<h2>When Can We NOT Add Probabilities?<\/h2>\r\n<table>\r\n<tbody>\r\n<tr class=\"oli_table\" style=\"height: 30px\">\r\n<td style=\"height: 30px\"><\/td>\r\n<td style=\"height: 30px\"><strong>Arts-Sci<\/strong><\/td>\r\n<td style=\"height: 30px\"><strong>Bus-Econ<\/strong><\/td>\r\n<td style=\"height: 30px\"><strong>Info Tech<\/strong><\/td>\r\n<td style=\"height: 30px\"><strong>Health Science<\/strong><\/td>\r\n<td style=\"height: 30px\"><strong>Graphics Design<\/strong><\/td>\r\n<td style=\"height: 30px\"><strong>Culinary Arts<\/strong><\/td>\r\n<td style=\"height: 30px\" align=\"center\"><strong>Row Totals<\/strong><\/td>\r\n<\/tr>\r\n<tr class=\"oli_table\" style=\"height: 15.1562px\">\r\n<td style=\"height: 15.1562px\" align=\"center\"><strong>Female<\/strong><\/td>\r\n<td style=\"height: 15.1562px\" align=\"center\">4,660<\/td>\r\n<td style=\"height: 15.1562px\" align=\"center\">435<\/td>\r\n<td style=\"height: 15.1562px\" align=\"center\">494<\/td>\r\n<td style=\"height: 15.1562px\" align=\"center\">421<\/td>\r\n<td style=\"height: 15.1562px\" align=\"center\">105<\/td>\r\n<td style=\"height: 15.1562px\" align=\"center\">83<\/td>\r\n<td style=\"height: 15.1562px\" align=\"center\">6,198<\/td>\r\n<\/tr>\r\n<tr class=\"oli_table\" style=\"height: 15px\">\r\n<td style=\"height: 15px\" align=\"center\"><strong>Male<\/strong><\/td>\r\n<td style=\"height: 15px\" align=\"center\">4,334<\/td>\r\n<td style=\"height: 15px\" align=\"center\">490<\/td>\r\n<td style=\"height: 15px\" align=\"center\">564<\/td>\r\n<td style=\"height: 15px\" align=\"center\">223<\/td>\r\n<td style=\"height: 15px\" align=\"center\">97<\/td>\r\n<td style=\"height: 15px\" align=\"center\">94<\/td>\r\n<td style=\"height: 15px\" align=\"center\">5,802<\/td>\r\n<\/tr>\r\n<tr class=\"oli_table\" style=\"height: 30px\">\r\n<td style=\"height: 30px\" align=\"center\"><strong>Column Totals<\/strong><\/td>\r\n<td style=\"height: 30px\" align=\"center\">8,994<\/td>\r\n<td style=\"height: 30px\" align=\"center\">925<\/td>\r\n<td style=\"height: 30px\" align=\"center\">1,058<\/td>\r\n<td style=\"height: 30px\" align=\"center\">644<\/td>\r\n<td style=\"height: 30px\" align=\"center\">202<\/td>\r\n<td style=\"height: 30px\" align=\"center\">177<\/td>\r\n<td style=\"height: 30px\" align=\"center\">12,000<\/td>\r\n<\/tr>\r\n<\/tbody>\r\n<\/table>\r\n<ul style=\"list-style-type: none\">\r\n \t<li><strong>Question:<\/strong> <em>What is the probability that a randomly selected student is either a Health Science major or a female?<\/em><\/li>\r\n<\/ul>\r\n<ul style=\"list-style-type: none\">\r\n \t<li><strong>Answer:<\/strong> There are 644 Health Science majors and 6,198 females, but 421 students are counted twice because they are both Health Science majors and female. We must subtract these students before calculating the relative frequency:<\/li>\r\n \t<li style=\"text-align: center\">[latex]P(\\mathrm{Health\\; Science\\; or\\; female})=\\frac{644+6,198-421}{12,000}=\\frac{6,421}{12,000}\\approx 0.54[\/latex]<\/li>\r\n \t<li>Now let\u2019s calculate the individual probabilities and see if the rule works:<\/li>\r\n \t<li style=\"text-align: center\">[latex]\\text{P}(\\mathrm{Health\\; Science})+\\text{P}(\\mathrm{female})=\\frac{\\text{644}}{\\text{12,000}}+\\frac{\\text{6,198}}{\\text{12,000}}\\approx \\text{0.57}[\/latex]<\/li>\r\n \t<li><strong>Main point:<\/strong> <em>P<\/em>(Health Science or female) \u2260 <em>P<\/em>(Health Science) + <em>P<\/em>(female). In other words, the addition rule does not work here. Why not? The two events \u201cHealth Science\u201d and \u201cfemale\u201d are not disjoint. The data set contains people who are both in the Health Science program and female.<\/li>\r\n<\/ul>\r\n<\/div>\r\n<div class=\"textbox exercises\">\r\n<h3>Learn By Doing<\/h3>\r\nhttps:\/\/assessments.lumenlearning.com\/assessments\/3878\r\n\r\nhttps:\/\/assessments.lumenlearning.com\/assessments\/3879\r\n\r\n<\/div>\r\n<div class=\"textbox exercises\">\r\n<h3>Learn By Doing<\/h3>\r\nhttps:\/\/assessments.lumenlearning.com\/assessments\/3880\r\n\r\n<\/div>\r\n<div class=\"textbox examples\">\r\n<h3>Example<\/h3>\r\n<h2>Do We Ever Subtract Probabilities?<\/h2>\r\nCompare these two questions. What do the solutions have in common?\r\n<ul style=\"list-style-type: none\">\r\n \t<li><strong>Question 1:<\/strong> People with blood type O can donate blood to people with any other blood type. For this reason, people with blood type O are called universal donors. <em>What is the probability that a randomly selected person from the United States is <strong>not<\/strong> a universal donor?<\/em><\/li>\r\n<\/ul>\r\n<table>\r\n<tbody>\r\n<tr class=\"oli_table\">\r\n<td align=\"center\">Blood Type<\/td>\r\n<td align=\"center\">O<\/td>\r\n<td align=\"center\">A<\/td>\r\n<td align=\"center\">B<\/td>\r\n<td align=\"center\">AB<\/td>\r\n<\/tr>\r\n<tr class=\"oli_table\">\r\n<td align=\"center\">Probability<\/td>\r\n<td align=\"center\">0.45<\/td>\r\n<td align=\"center\">0.41<\/td>\r\n<td align=\"center\">0.10<\/td>\r\n<td align=\"center\">0.04<\/td>\r\n<\/tr>\r\n<\/tbody>\r\n<\/table>\r\n<ul style=\"list-style-type: none\">\r\n \t<li><strong>Answer:<\/strong> <em>P<\/em>(NOT a universal donor) = <em>P<\/em>(blood type is not type O) = <em>P<\/em>(blood type A, B, or AB) = 0.41 + 0.10 + 0.04 = 0.55. There is a 55% chance that a randomly selected person in the United States is not a universal donor.<\/li>\r\n<\/ul>\r\nHere is another way we can solve this problem. We can use the idea that all of the probabilities together make up 100% of the possibilities. If we add up all the probabilities in the table, we get 1. We can subtract the probability that someone is type O from 1 to find the probability that the person is not type O:\r\n<ul style=\"list-style-type: none\">\r\n \t<li><em>P<\/em>(NOT a universal donor) = <em>P<\/em>(blood type is not type O) = 1 \u2013 <em>P<\/em>(type O) = 1 \u2013 0.45 = 0.55<\/li>\r\n<\/ul>\r\n<ul style=\"list-style-type: none\">\r\n \t<li><strong>Question 2:<\/strong> <em>What is the probability that a randomly selected boreal owl nest is <strong>not<\/strong> empty?<\/em><\/li>\r\n<\/ul>\r\n<table>\r\n<tbody>\r\n<tr class=\"oli_table\">\r\n<td align=\"center\">Number of Eggs<\/td>\r\n<td align=\"center\">0<\/td>\r\n<td align=\"center\">1<\/td>\r\n<td align=\"center\">2<\/td>\r\n<td align=\"center\">3<\/td>\r\n<td align=\"center\">4<\/td>\r\n<td align=\"center\">5<\/td>\r\n<td align=\"center\">6<\/td>\r\n<\/tr>\r\n<tr class=\"oli_table\">\r\n<td align=\"center\">Probability<\/td>\r\n<td align=\"center\">0.2<\/td>\r\n<td align=\"center\">0.1<\/td>\r\n<td align=\"center\">0.1<\/td>\r\n<td align=\"center\">0.25<\/td>\r\n<td align=\"center\">0.25<\/td>\r\n<td align=\"center\">0.05<\/td>\r\n<td align=\"center\">0.05<\/td>\r\n<\/tr>\r\n<\/tbody>\r\n<\/table>\r\n<ul style=\"list-style-type: none\">\r\n \t<li><strong>Answer:<\/strong> <em>P<\/em>(nest is not empty) = <em>P<\/em>(at least one egg) = <em>P<\/em>(1, 2, 3, 4, 5, or 6 eggs) = 0.1 + 0.1 + 0.25 + 0.25 + 0.05 + 0.05 = 0.80. There is an 80% chance that the nest you observe has at least one egg.<\/li>\r\n<\/ul>\r\nHere is another approach:\r\n<ul style=\"list-style-type: none\">\r\n \t<li><em>P<\/em>(nest is not empty) = <em>P<\/em>(at least one egg) = 1 \u2013 <em>P<\/em>(0 eggs) = 1 \u2013 0.2 = 0.8.<\/li>\r\n<\/ul>\r\nWhat do these solutions have in common?\r\n\r\nIn each case, we have an event that can be interpreted as a \u201cnot\u201d statement. The probability that a person is not a universal donor means the person is <em>not type O<\/em>. The probability that a boreal owl nest is empty means the nest <em>does not contain 0 eggs<\/em>. In each case, the easy way to compute the probability is to use the <strong>complement <\/strong>event. The complement of event A is the event composed of outcomes that are \u201cnot <em>A<\/em>.\u201d In our examples, the complement of \u201ctype O blood\u201d is the event composed of \u201cblood types A, B, or AB.\u201d The complement of \u201c0 eggs\u201d is the event composed of \u201c1, 2, 3, 4, 5, or 6 eggs.\u201d When two sets of events are complements, their probabilities add to 1.\r\n\r\nWhen one event is the complement of another, then we can use the complement rule:\r\n<p style=\"text-align: center\"><em>P<\/em>(not <em>A<\/em>) = 1 \u2013 <em>P<\/em>(<em>A<\/em>)<\/p>\r\nWe can use this rule to find probabilities only when the two events are complements. Two events are complements when their probabilities add to 1.\r\n\r\n<\/div>\r\n<div class=\"textbox exercises\">\r\n<h3>Learn By Doing<\/h3>\r\nhttps:\/\/assessments.lumenlearning.com\/assessments\/3881\r\n\r\n<\/div>\r\n<div class=\"textbox exercises\">\r\n<h3>Learn By Doing<\/h3>\r\nhttps:\/\/assessments.lumenlearning.com\/assessments\/3882\r\n\r\n<\/div>\r\n&nbsp;","rendered":"<p>&nbsp;<\/p>\n<div class=\"textbox learning-objectives\">\n<h3>Learning Objectives<\/h3>\n<ul>\n<li>Reason from probability distributions, using probability rules, to answer probability questions.<\/li>\n<\/ul>\n<\/div>\n<p>Here we continue to use probability distributions to answer probability questions. We look for some patterns that suggest general rules for determining probabilities.<\/p>\n<div class=\"textbox examples\">\n<h3>Example<\/h3>\n<h2>When Can We Add Probabilities?<\/h2>\n<p>Compare these two questions. What do the solutions have in common?<\/p>\n<ul style=\"list-style-type: none\">\n<li><strong>Question 1:<\/strong> A person with blood type A can receive blood from individuals with type A or O blood. <em>What is the probability that a randomly selected person from the United States can donate blood to someone with type A blood?<\/em><\/li>\n<\/ul>\n<table>\n<tbody>\n<tr class=\"oli_table\">\n<td align=\"center\">Blood Type<\/td>\n<td align=\"center\">O<\/td>\n<td align=\"center\">A<\/td>\n<td align=\"center\">B<\/td>\n<td align=\"center\">AB<\/td>\n<\/tr>\n<tr class=\"oli_table\">\n<td align=\"center\">Probability<\/td>\n<td align=\"center\">0.45<\/td>\n<td align=\"center\">0.41<\/td>\n<td align=\"center\">0.10<\/td>\n<td align=\"center\">0.04<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<ul style=\"list-style-type: none\">\n<li><strong>Answer:<\/strong> <em>P<\/em>(donate to A) = <em>P<\/em>(blood type A or blood type O) = 0.45 + 0.41 = 0.86. There is an 86% chance that a randomly selected person in the United States can donate blood to someone with type A blood.<\/li>\n<\/ul>\n<ul style=\"list-style-type: none\">\n<li><strong>Question 2:<\/strong> <em>What is the probability that a randomly chosen boreal owl nest will either be empty or contain only 1 egg?<\/em><\/li>\n<\/ul>\n<table>\n<tbody>\n<tr class=\"oli_table\">\n<td align=\"center\">Number of Eggs<\/td>\n<td align=\"center\">0<\/td>\n<td align=\"center\">1<\/td>\n<td align=\"center\">2<\/td>\n<td align=\"center\">3<\/td>\n<td align=\"center\">4<\/td>\n<td align=\"center\">5<\/td>\n<td align=\"center\">6<\/td>\n<\/tr>\n<tr class=\"oli_table\">\n<td align=\"center\">Probability<\/td>\n<td align=\"center\">0.2<\/td>\n<td align=\"center\">0.1<\/td>\n<td align=\"center\">0.1<\/td>\n<td align=\"center\">0.25<\/td>\n<td align=\"center\">0.25<\/td>\n<td align=\"center\">0.05<\/td>\n<td align=\"center\">0.05<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<ul style=\"list-style-type: none\">\n<li><strong>Answer:<\/strong> <em>P<\/em>(no eggs or 1 egg) = <em>P<\/em>(no egg) + <em>P<\/em>(1 egg) = 0.2 + 0.1 = 0.3. There is a 30% chance that a randomly selected boreal owl nest will be empty or contain only one egg.<\/li>\n<\/ul>\n<p>What do these solutions have in common?<\/p>\n<p>In each case, we have two events and we want to find the probability that either event A <em>or<\/em> event B occurs. In each case, we added the probabilities. This works because the events have no outcomes in common. When two events have no outcomes in common, they are <strong>disjoint<\/strong>.<\/p>\n<p>The events \u201ctype A blood\u201d and \u201ctype O blood\u201d are disjoint. These events cannot both happen at the same time for a single person. A person cannot have both type A blood and type O blood.<\/p>\n<p>The events \u201cno eggs\u201d and \u201c1 egg\u201d are disjoint. These outcomes cannot both happen at the same time for a single nest. A nest cannot contain no eggs and at the same time contain 1 egg.<\/p>\n<p>If two events are disjoint, then we can add their individual probabilities. We write this fact as a rule:<\/p>\n<p><em>P<\/em>(<em>A<\/em> or <em>B<\/em>) = <em>P<\/em>(<em>A<\/em>) + <em>P<\/em>(<em>B<\/em>)<\/div>\n<h3>Comment<\/h3>\n<p>We stated the addition rule as a formal rule. A rule is a concise way to summarize a general principle from specific examples. This is one advantage of a rule. One disadvantage of a rule is that sometimes it discourages us from just thinking through a problem. Students often have the experience that they misremember a rule or forget the conditions required for the rule to work. This leads to mistakes that we can avoid if we just think through the problem without worrying about rules. We encourage you to think through probability problems whenever possible without resorting to rules. If you use a rule, be careful to check that the situation meets the conditions required for using the rule.<\/p>\n<p>This addition rule for probabilities only works when the events are disjoint. If the events are not disjoint, the rule does not work. Here is an example of when the rule does not work because the events are not disjoint.<\/p>\n<div class=\"textbox examples\">\n<h3>Example<\/h3>\n<h2>When Can We NOT Add Probabilities?<\/h2>\n<table>\n<tbody>\n<tr class=\"oli_table\" style=\"height: 30px\">\n<td style=\"height: 30px\"><\/td>\n<td style=\"height: 30px\"><strong>Arts-Sci<\/strong><\/td>\n<td style=\"height: 30px\"><strong>Bus-Econ<\/strong><\/td>\n<td style=\"height: 30px\"><strong>Info Tech<\/strong><\/td>\n<td style=\"height: 30px\"><strong>Health Science<\/strong><\/td>\n<td style=\"height: 30px\"><strong>Graphics Design<\/strong><\/td>\n<td style=\"height: 30px\"><strong>Culinary Arts<\/strong><\/td>\n<td style=\"height: 30px\" align=\"center\"><strong>Row Totals<\/strong><\/td>\n<\/tr>\n<tr class=\"oli_table\" style=\"height: 15.1562px\">\n<td style=\"height: 15.1562px\" align=\"center\"><strong>Female<\/strong><\/td>\n<td style=\"height: 15.1562px\" align=\"center\">4,660<\/td>\n<td style=\"height: 15.1562px\" align=\"center\">435<\/td>\n<td style=\"height: 15.1562px\" align=\"center\">494<\/td>\n<td style=\"height: 15.1562px\" align=\"center\">421<\/td>\n<td style=\"height: 15.1562px\" align=\"center\">105<\/td>\n<td style=\"height: 15.1562px\" align=\"center\">83<\/td>\n<td style=\"height: 15.1562px\" align=\"center\">6,198<\/td>\n<\/tr>\n<tr class=\"oli_table\" style=\"height: 15px\">\n<td style=\"height: 15px\" align=\"center\"><strong>Male<\/strong><\/td>\n<td style=\"height: 15px\" align=\"center\">4,334<\/td>\n<td style=\"height: 15px\" align=\"center\">490<\/td>\n<td style=\"height: 15px\" align=\"center\">564<\/td>\n<td style=\"height: 15px\" align=\"center\">223<\/td>\n<td style=\"height: 15px\" align=\"center\">97<\/td>\n<td style=\"height: 15px\" align=\"center\">94<\/td>\n<td style=\"height: 15px\" align=\"center\">5,802<\/td>\n<\/tr>\n<tr class=\"oli_table\" style=\"height: 30px\">\n<td style=\"height: 30px\" align=\"center\"><strong>Column Totals<\/strong><\/td>\n<td style=\"height: 30px\" align=\"center\">8,994<\/td>\n<td style=\"height: 30px\" align=\"center\">925<\/td>\n<td style=\"height: 30px\" align=\"center\">1,058<\/td>\n<td style=\"height: 30px\" align=\"center\">644<\/td>\n<td style=\"height: 30px\" align=\"center\">202<\/td>\n<td style=\"height: 30px\" align=\"center\">177<\/td>\n<td style=\"height: 30px\" align=\"center\">12,000<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<ul style=\"list-style-type: none\">\n<li><strong>Question:<\/strong> <em>What is the probability that a randomly selected student is either a Health Science major or a female?<\/em><\/li>\n<\/ul>\n<ul style=\"list-style-type: none\">\n<li><strong>Answer:<\/strong> There are 644 Health Science majors and 6,198 females, but 421 students are counted twice because they are both Health Science majors and female. We must subtract these students before calculating the relative frequency:<\/li>\n<li style=\"text-align: center\">[latex]P(\\mathrm{Health\\; Science\\; or\\; female})=\\frac{644+6,198-421}{12,000}=\\frac{6,421}{12,000}\\approx 0.54[\/latex]<\/li>\n<li>Now let\u2019s calculate the individual probabilities and see if the rule works:<\/li>\n<li style=\"text-align: center\">[latex]\\text{P}(\\mathrm{Health\\; Science})+\\text{P}(\\mathrm{female})=\\frac{\\text{644}}{\\text{12,000}}+\\frac{\\text{6,198}}{\\text{12,000}}\\approx \\text{0.57}[\/latex]<\/li>\n<li><strong>Main point:<\/strong> <em>P<\/em>(Health Science or female) \u2260 <em>P<\/em>(Health Science) + <em>P<\/em>(female). In other words, the addition rule does not work here. Why not? The two events \u201cHealth Science\u201d and \u201cfemale\u201d are not disjoint. The data set contains people who are both in the Health Science program and female.<\/li>\n<\/ul>\n<\/div>\n<div class=\"textbox exercises\">\n<h3>Learn By Doing<\/h3>\n<p>\t<iframe id=\"lumen_assessment_3878\" class=\"resizable\" src=\"https:\/\/assessments.lumenlearning.com\/assessments\/load?assessment_id=3878&#38;embed=1&#38;external_user_id=&#38;external_context_id=&#38;iframe_resize_id=lumen_assessment_3878\" frameborder=\"0\" style=\"border:none;width:100%;height:100%;min-height:400px;\"><br \/>\n\t<\/iframe><\/p>\n<p>\t<iframe id=\"lumen_assessment_3879\" class=\"resizable\" src=\"https:\/\/assessments.lumenlearning.com\/assessments\/load?assessment_id=3879&#38;embed=1&#38;external_user_id=&#38;external_context_id=&#38;iframe_resize_id=lumen_assessment_3879\" frameborder=\"0\" style=\"border:none;width:100%;height:100%;min-height:400px;\"><br \/>\n\t<\/iframe><\/p>\n<\/div>\n<div class=\"textbox exercises\">\n<h3>Learn By Doing<\/h3>\n<p>\t<iframe id=\"lumen_assessment_3880\" class=\"resizable\" src=\"https:\/\/assessments.lumenlearning.com\/assessments\/load?assessment_id=3880&#38;embed=1&#38;external_user_id=&#38;external_context_id=&#38;iframe_resize_id=lumen_assessment_3880\" frameborder=\"0\" style=\"border:none;width:100%;height:100%;min-height:400px;\"><br \/>\n\t<\/iframe><\/p>\n<\/div>\n<div class=\"textbox examples\">\n<h3>Example<\/h3>\n<h2>Do We Ever Subtract Probabilities?<\/h2>\n<p>Compare these two questions. What do the solutions have in common?<\/p>\n<ul style=\"list-style-type: none\">\n<li><strong>Question 1:<\/strong> People with blood type O can donate blood to people with any other blood type. For this reason, people with blood type O are called universal donors. <em>What is the probability that a randomly selected person from the United States is <strong>not<\/strong> a universal donor?<\/em><\/li>\n<\/ul>\n<table>\n<tbody>\n<tr class=\"oli_table\">\n<td align=\"center\">Blood Type<\/td>\n<td align=\"center\">O<\/td>\n<td align=\"center\">A<\/td>\n<td align=\"center\">B<\/td>\n<td align=\"center\">AB<\/td>\n<\/tr>\n<tr class=\"oli_table\">\n<td align=\"center\">Probability<\/td>\n<td align=\"center\">0.45<\/td>\n<td align=\"center\">0.41<\/td>\n<td align=\"center\">0.10<\/td>\n<td align=\"center\">0.04<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<ul style=\"list-style-type: none\">\n<li><strong>Answer:<\/strong> <em>P<\/em>(NOT a universal donor) = <em>P<\/em>(blood type is not type O) = <em>P<\/em>(blood type A, B, or AB) = 0.41 + 0.10 + 0.04 = 0.55. There is a 55% chance that a randomly selected person in the United States is not a universal donor.<\/li>\n<\/ul>\n<p>Here is another way we can solve this problem. We can use the idea that all of the probabilities together make up 100% of the possibilities. If we add up all the probabilities in the table, we get 1. We can subtract the probability that someone is type O from 1 to find the probability that the person is not type O:<\/p>\n<ul style=\"list-style-type: none\">\n<li><em>P<\/em>(NOT a universal donor) = <em>P<\/em>(blood type is not type O) = 1 \u2013 <em>P<\/em>(type O) = 1 \u2013 0.45 = 0.55<\/li>\n<\/ul>\n<ul style=\"list-style-type: none\">\n<li><strong>Question 2:<\/strong> <em>What is the probability that a randomly selected boreal owl nest is <strong>not<\/strong> empty?<\/em><\/li>\n<\/ul>\n<table>\n<tbody>\n<tr class=\"oli_table\">\n<td align=\"center\">Number of Eggs<\/td>\n<td align=\"center\">0<\/td>\n<td align=\"center\">1<\/td>\n<td align=\"center\">2<\/td>\n<td align=\"center\">3<\/td>\n<td align=\"center\">4<\/td>\n<td align=\"center\">5<\/td>\n<td align=\"center\">6<\/td>\n<\/tr>\n<tr class=\"oli_table\">\n<td align=\"center\">Probability<\/td>\n<td align=\"center\">0.2<\/td>\n<td align=\"center\">0.1<\/td>\n<td align=\"center\">0.1<\/td>\n<td align=\"center\">0.25<\/td>\n<td align=\"center\">0.25<\/td>\n<td align=\"center\">0.05<\/td>\n<td align=\"center\">0.05<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<ul style=\"list-style-type: none\">\n<li><strong>Answer:<\/strong> <em>P<\/em>(nest is not empty) = <em>P<\/em>(at least one egg) = <em>P<\/em>(1, 2, 3, 4, 5, or 6 eggs) = 0.1 + 0.1 + 0.25 + 0.25 + 0.05 + 0.05 = 0.80. There is an 80% chance that the nest you observe has at least one egg.<\/li>\n<\/ul>\n<p>Here is another approach:<\/p>\n<ul style=\"list-style-type: none\">\n<li><em>P<\/em>(nest is not empty) = <em>P<\/em>(at least one egg) = 1 \u2013 <em>P<\/em>(0 eggs) = 1 \u2013 0.2 = 0.8.<\/li>\n<\/ul>\n<p>What do these solutions have in common?<\/p>\n<p>In each case, we have an event that can be interpreted as a \u201cnot\u201d statement. The probability that a person is not a universal donor means the person is <em>not type O<\/em>. The probability that a boreal owl nest is empty means the nest <em>does not contain 0 eggs<\/em>. In each case, the easy way to compute the probability is to use the <strong>complement <\/strong>event. The complement of event A is the event composed of outcomes that are \u201cnot <em>A<\/em>.\u201d In our examples, the complement of \u201ctype O blood\u201d is the event composed of \u201cblood types A, B, or AB.\u201d The complement of \u201c0 eggs\u201d is the event composed of \u201c1, 2, 3, 4, 5, or 6 eggs.\u201d When two sets of events are complements, their probabilities add to 1.<\/p>\n<p>When one event is the complement of another, then we can use the complement rule:<\/p>\n<p style=\"text-align: center\"><em>P<\/em>(not <em>A<\/em>) = 1 \u2013 <em>P<\/em>(<em>A<\/em>)<\/p>\n<p>We can use this rule to find probabilities only when the two events are complements. Two events are complements when their probabilities add to 1.<\/p>\n<\/div>\n<div class=\"textbox exercises\">\n<h3>Learn By Doing<\/h3>\n<p>\t<iframe id=\"lumen_assessment_3881\" class=\"resizable\" src=\"https:\/\/assessments.lumenlearning.com\/assessments\/load?assessment_id=3881&#38;embed=1&#38;external_user_id=&#38;external_context_id=&#38;iframe_resize_id=lumen_assessment_3881\" frameborder=\"0\" style=\"border:none;width:100%;height:100%;min-height:400px;\"><br \/>\n\t<\/iframe><\/p>\n<\/div>\n<div class=\"textbox exercises\">\n<h3>Learn By Doing<\/h3>\n<p>\t<iframe id=\"lumen_assessment_3882\" class=\"resizable\" src=\"https:\/\/assessments.lumenlearning.com\/assessments\/load?assessment_id=3882&#38;embed=1&#38;external_user_id=&#38;external_context_id=&#38;iframe_resize_id=lumen_assessment_3882\" frameborder=\"0\" style=\"border:none;width:100%;height:100%;min-height:400px;\"><br \/>\n\t<\/iframe><\/p>\n<\/div>\n<p>&nbsp;<\/p>\n\n\t\t\t <section class=\"citations-section\" role=\"contentinfo\">\n\t\t\t <h3>Candela Citations<\/h3>\n\t\t\t\t\t <div>\n\t\t\t\t\t\t <div id=\"citation-list-268\">\n\t\t\t\t\t\t\t <div class=\"licensing\"><div class=\"license-attribution-dropdown-subheading\">CC licensed content, Shared previously<\/div><ul class=\"citation-list\"><li>Concepts in Statistics. <strong>Provided by<\/strong>: Open Learning Initiative. <strong>Located at<\/strong>: <a target=\"_blank\" href=\"http:\/\/oli.cmu.edu\">http:\/\/oli.cmu.edu<\/a>. <strong>License<\/strong>: <em><a target=\"_blank\" rel=\"license\" href=\"https:\/\/creativecommons.org\/licenses\/by\/4.0\/\">CC BY: Attribution<\/a><\/em><\/li><\/ul><\/div>\n\t\t\t\t\t\t <\/div>\n\t\t\t\t\t <\/div>\n\t\t\t <\/section>","protected":false},"author":163,"menu_order":5,"template":"","meta":{"_candela_citation":"[{\"type\":\"cc\",\"description\":\"Concepts in Statistics\",\"author\":\"\",\"organization\":\"Open Learning Initiative\",\"url\":\"http:\/\/oli.cmu.edu\",\"project\":\"\",\"license\":\"cc-by\",\"license_terms\":\"\"}]","CANDELA_OUTCOMES_GUID":"9cb80586-e8fa-4b83-9da0-a20ea0cb2270","pb_show_title":"on","pb_short_title":"","pb_subtitle":"","pb_authors":[],"pb_section_license":""},"chapter-type":[],"contributor":[],"license":[],"class_list":["post-268","chapter","type-chapter","status-publish","hentry"],"part":258,"_links":{"self":[{"href":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/wp-json\/pressbooks\/v2\/chapters\/268","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/wp-json\/pressbooks\/v2\/chapters"}],"about":[{"href":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/wp-json\/wp\/v2\/types\/chapter"}],"author":[{"embeddable":true,"href":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/wp-json\/wp\/v2\/users\/163"}],"version-history":[{"count":5,"href":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/wp-json\/pressbooks\/v2\/chapters\/268\/revisions"}],"predecessor-version":[{"id":1398,"href":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/wp-json\/pressbooks\/v2\/chapters\/268\/revisions\/1398"}],"part":[{"href":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/wp-json\/pressbooks\/v2\/parts\/258"}],"metadata":[{"href":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/wp-json\/pressbooks\/v2\/chapters\/268\/metadata\/"}],"wp:attachment":[{"href":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/wp-json\/wp\/v2\/media?parent=268"}],"wp:term":[{"taxonomy":"chapter-type","embeddable":true,"href":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/wp-json\/pressbooks\/v2\/chapter-type?post=268"},{"taxonomy":"contributor","embeddable":true,"href":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/wp-json\/wp\/v2\/contributor?post=268"},{"taxonomy":"license","embeddable":true,"href":"https:\/\/courses.lumenlearning.com\/suny-wmopen-concepts-statistics\/wp-json\/wp\/v2\/license?post=268"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}