{"id":938,"date":"2024-05-29T21:47:30","date_gmt":"2024-05-30T01:47:30","guid":{"rendered":"https:\/\/www.clayford.net\/statistics\/?p=938"},"modified":"2024-05-29T21:50:37","modified_gmt":"2024-05-30T01:50:37","slug":"hypothesis-testing-section-4-6-of-regression-and-other-stories","status":"publish","type":"post","link":"https:\/\/www.clayford.net\/statistics\/hypothesis-testing-section-4-6-of-regression-and-other-stories\/","title":{"rendered":"Hypothesis testing: section 4.6 of Regression and Other Stories"},"content":{"rendered":"<p>Gelman, et al.\u00a0tell a story from long ago where someone sent them a fax (that\u2019s right, a fax) asking for help with suspected voter fraud. The story is in <a href=\"https:\/\/users.aalto.fi\/~ave\/ROS.pdf\">section 4.6<\/a> (page 63) and is included to provide an example of constructing a hypothesis test. They provide data and code for this example in the <a href=\"https:\/\/github.com\/avehtari\/ROS-Examples\/tree\/master\/Coop\">Coop folder on Github<\/a>. The point of this post is to document some changes I made to the code to help me understand it.<\/p>\n<p>The story involves the election of a board of directors for a \u201cresidential organization\u201d. 5553 people were allowed to vote for up to 6 people. 27 candidates were running for the board. Votes were tallied after 600 people voted, then again at 1200, 2444, 3444, 4444, and the end after all 5553 people voted. What aroused suspicion was the fact that the proportion of votes for the candidates remained steady each time the votes were tallied. According to the author of the fax: \u201cthe election was rigged\u2026[it] is a fixed vote with fixed percentages being assigned to each and every candidate making it impossible to participate in an honest election.\u201d<\/p>\n<p>Let\u2019s read in the data and demonstrate what they\u2019re talking about. Notice this data is the rare CSV without column headers. The data consists of 27 rows, one for each candidate, showing cumulative vote totals.<\/p>\n<pre class=\"r\"><code>data &lt;- read.csv(&quot;https:\/\/raw.githubusercontent.com\/avehtari\/ROS-Examples\/master\/Coop\/data\/Riverbay.csv&quot;, \r\n                 header = FALSE)\r\n# drop 1st and 8th columns; contain candidate names which we don&#39;t need.\r\nvotes &lt;- data[,2:7]\r\nhead(votes)<\/code><\/pre>\n<pre><code>##    V2  V3  V4   V5   V6   V7\r\n## 1 208 416 867 1259 1610 2020\r\n## 2  55 106 215  313  401  505\r\n## 3 133 250 505  716  902 1129\r\n## 4 101 202 406  589  787  976\r\n## 5 108 249 512  745  970 1192\r\n## 6  54  94 196  279  360  451<\/code><\/pre>\n<p>Now let\u2019s calculate the proportion of votes received at each interval and create a basic line plot. Each line below represents proportion of votes received for a candidate at each of the six intervals. Notice how the lines are mostly flat. This is what prompted the emergency fax.<\/p>\n<pre class=\"r\"><code>vote_p &lt;- apply(votes, 2, proportions)\r\nmatplot(t(vote_p), type = &quot;l&quot;, col = 1, lty = 1)<\/code><\/pre>\n<p><img decoding=\"async\" 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\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ACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShA0P8HXww7sZARESAAAAAASUVORK5CYII=\" width=\"672\" \/><\/p>\n<p>Gelman, et al.\u00a0demonstrate this using separate plots for the top 8 vote-getters (Fig 4.5). They also divide by number of voters instead of total votes received. (Remember, each voter gets to vote for up to six people.) This simply changes the denominator, and hence, the y-axis. The steady vote patterns remain.<\/p>\n<pre class=\"r\"><code>voters &lt;- c(600,1200,2444,3444,4444,5553)\r\nvote_p &lt;- sweep(votes, 2, voters, FUN = &quot;\/&quot;)\r\nmatplot(t(vote_p), type = &quot;l&quot;, col = 1, lty = 1)<\/code><\/pre>\n<p><img decoding=\"async\" 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\" width=\"672\" \/><\/p>\n<p>They note that the data in this plot is not independent since proportions at times 2 and beyond include votes that came before. To address this, they create a matrix that contains number of votes received at <em>each interval<\/em> instead of cumulative totals.<\/p>\n<pre class=\"r\"><code>interval_votes &lt;- t(apply(votes, 1, diff))\r\ninterval_votes &lt;- cbind(votes[,1], interval_votes)\r\nhead(interval_votes)<\/code><\/pre>\n<pre><code>##           V3  V4  V5  V6  V7\r\n## [1,] 208 208 451 392 351 410\r\n## [2,]  55  51 109  98  88 104\r\n## [3,] 133 117 255 211 186 227\r\n## [4,] 101 101 204 183 198 189\r\n## [5,] 108 141 263 233 225 222\r\n## [6,]  54  40 102  83  81  91<\/code><\/pre>\n<p>After taking differences the lines still seem mostly stable.<\/p>\n<pre class=\"r\"><code>interval_p &lt;- apply(interval_votes, 2, proportions)\r\nmatplot(t(interval_p), type = &quot;l&quot;, col = 1, lty = 1)<\/code><\/pre>\n<p><img decoding=\"async\" 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\" width=\"672\" \/><\/p>\n<p>Again, the authors divide by number of voters instead of total votes to create these plots, but the result is the same with a different y-axis. Here\u2019s how I would do the calculations and create the plot.<\/p>\n<pre class=\"r\"><code>interval_voters &lt;- c(600, diff(voters))\r\ninterval_p &lt;- sweep(interval_votes, 2, interval_voters, FUN = &quot;\/&quot;)\r\nmatplot(t(interval_p), type = &quot;l&quot;, col = 1, lty = 1)<\/code><\/pre>\n<p><img decoding=\"async\" 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\" width=\"672\" \/><\/p>\n<p>And now comes the hypothesis test. What is the probability of seeing steady proportions like this if the votes really were coming in at random? I\u2019ll quote the book here: \u201cBecause the concern was that the votes were unexpectedly stable as the count proceeded, we define a test statistic to summarize variability.\u201d The test statistic in this case is the standard deviations of the sample proportions. We can quickly get these from the interval_p object we created above.<\/p>\n<pre class=\"r\"><code>test_stat &lt;- apply(interval_p, 1, sd)<\/code><\/pre>\n<p>Now we need to calculate the theoretical test statistic. For this we assume each candidate has a fixed but unknown proportion of voters who will vote for them, <span class=\"math inline\">\\(\\pi_i\\)<\/span>. Under the null, the six intervals where votes are tallied are random samples of the voters. So at each time point we can think of the proportion as a draw from a distribution with mean <span class=\"math inline\">\\(\\pi_i\\)<\/span> and standard deviation <span class=\"math inline\">\\(\\sqrt{\\pi_i(1 &#8211; \\pi_i)\/n_t}\\)<\/span>, where <span class=\"math inline\">\\(n_t\\)<\/span> is the number of voters at each interval. To calculate this, we first need to estimate <span class=\"math inline\">\\(\\pi_i\\)<\/span> with <span class=\"math inline\">\\(p_i\\)<\/span>, the observed proportion of votes each candidate received. This is the last column of the votes data frame divided by the total number of voters, 5553.<\/p>\n<pre class=\"r\"><code>p_hat &lt;- votes[,6]\/5553<\/code><\/pre>\n<p>Then we take the average of the variances calculated at each time point and take the square root to get the theoretical test statistic.<\/p>\n<pre class=\"r\"><code>theory_test_stat &lt;- sapply(p_hat, function(x)sqrt(mean(x*(1-x)\/interval_voters)))<\/code><\/pre>\n<p>Under the null, the observed test statistics should be very close to the theoretical test statistics. This is assessed in Fig 4.7 in the book. I replicate the plot as follows:<\/p>\n<pre class=\"r\"><code>plot(x = votes[,6], y = test_stat, xlab = &quot;total # of votes for the candidate&quot;,\r\n     ylab = &quot;sd of separate vote proportions&quot;)\r\npoints(x = votes[,6], y = theory_test_stat, pch = 19)<\/code><\/pre>\n<p><img decoding=\"async\" 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\" width=\"672\" \/><\/p>\n<p>The authors note that \u201cthe actual standard deviations appear consistent with the theoretical model.\u201d<\/p>\n<p>Personally I think the plot would be a little more effective if they zoomed out a little. Some of the dramatic looking departures are only off by 0.01. For example:<\/p>\n<pre class=\"r\"><code>plot(x = votes[,6], y = test_stat, xlab = &quot;total # of votes for the candidate&quot;,\r\n     ylab = &quot;sd of separate vote proportions&quot;, ylim = c(0,0.05))\r\npoints(x = votes[,6], y = theory_test_stat, pch = 19)<\/code><\/pre>\n<p><img decoding=\"async\" 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width=\"672\" \/><\/p>\n<p>Another null hypothesis approach is the chi-square test of association. Under the null, the number of votes is not associated with the interval when votes were tallied. We can run this test for each candidate and look at the p-values. If there is no association for each candidate we should see a fairly uniform scatter of p-values. On the other hand, if there was \u201csuspiciously little variation over time\u201d we would see a surplus of high p-values. Here\u2019s how I carried out these calculations. I first created the 2-way tables of yes\/no versus time for each candidate. I then applied the chi-square test to each table, and to that result, I extracted each p-value. A uniform QQ plot shows the p-values are mostly uniformly distributed.<\/p>\n<pre class=\"r\"><code>tables &lt;- apply(interval_votes, 1, function(x) rbind(x, interval_voters - x), \r\n      simplify = FALSE)\r\nchisq_out &lt;- lapply(tables, chisq.test, correct = FALSE)\r\np_values &lt;- sapply(chisq_out, function(x)x$p.value)\r\nqqplot(ppoints(27), p_values)\r\nqqline(p_values, distribution = qunif)<\/code><\/pre>\n<p><img decoding=\"async\" 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j9qcbW3\/+cO98AWV80NR3xR\/+\/OzulcXHfOihqhDOzfHns\/WAvpy\/g89D+gRF1SeX5D57OLnq9yvi5H09S6NN+6FDSGFSI7xdM0yrV1QObv3v86XJ3SGz+ScfyXIhrOfar64sS9vqG\/zKiGrP+Vz2uIFlX+arXzmB8z3jeasbvKqmNCzJ3VTbIlDbTsBVc+VVgK6OP19EdCjL6g8eX\/16uLi4snV68CKrIUOte27Tp1P0lyLF1ReBvSYqzEdzWKH2nYD2t1r6ZkWrwe6DKgr0kNaxniduooEFCi3vkCIfm6zCQ+Uy9YXqvMJ2tLWQaRH64Be+1ZOSMt63dMK6JZWAnqzHEOfB3T28xHDmI5l8UNdG0Ovu34xPdNKQPOxn2cv8oDOL0jf3Ra8gEJNmX6WaOdMpNUl6RfD38Onch7PGwCK7gijat6hrQsqP1v3M34xkQZ4L0BB+aqlfN6ptcvZfX6eX\/vjLH5B+kZ4N8CtdR73dFI9q0jogspN8IaAtUIgtz8Z8lmNgMJY7bvK0uJn9axIQGGs9gbU4fY6WjkT6e8Xm\/7mTCTo3p6Aqmc9LZ0Lv8m58NAD2wFVz9oEFMZq33U+u3s1SWplH+iXDyu\/Ps\/OfvpwxDdzHsn7A9Z8wdHRWj+I9Ok8q\/k9Rk3yFoG14jBQ+Qxp\/yj8dZfncnqTwK3sds+nT0ZI+wGdrYK6nB30gquEHKn9gLoiPZxepTDq57E6WQMVUDitKmmUzuN1sQ\/UV3rAaZVdJWR9h3oer+WATj7kV1S2DxROqeQqIav75bMRXQykdxQeoiru29z\/c\/EpGn9lo9RBQM+MA4Wgaod9SgKqno1qJaA\/Prj13ZPuzkMSUPqr6mHzrR8OPGz\/z\/LZNJezgz6otGp5177NfXcWf0U9myag0APVVi3L922WP04+T0FAoXsVVy3DAVXPExFQ6F7FMlYP6EaP5fNkThvQnSuBLjgTCTY0HNDt6yx535+KgEL3mg7odPMTd\/Tr44ATB7Q4gKkwlElAoajxgLpOSDvsA4XuVQ5otWFMqwfL56kJKHSv9tGhCiPu1bMFAgrdq7xqWXW8vXy2o5OAfnA5O9hQc9XSZT57oqWATn69WHnwraPwsK2hgz7q2a52AnpzbhgTlGqin\/LZtlYC+mmzn9lDm\/DQNPXsQCsBvc6j+esP2dl\/f\/U4y86eNj3J6ry\/GCj57EQbAZ08y7JH0+lllj3t+CuRBJT2tTCgXT270tIV6fNv8bieZzSvaXeroN5ktO30pwTJZ3daCmh+2Ohm8W1yN75UjhGpPD4p\/vzq2Z0WA\/rpfL7xPvubrzVmLGqdfBl6evnsUkv7QPOALsu5zGk3vNdoV43LfwSeWz271spR+Mv5PtDbjgooY3GygDpdsxfaGsaU7\/ZcHIa\/6fIwvDcc7TpRQNWzJ1oJaH5d5Vk0Z+n86vV\/\/uAgEuNxioCqZ3+0dCrn\/PTNfARTLt+e74i3He1qPqDy2SctXUzk3eP57s\/H837+1PQkq\/PGo10NB1Q9e6bly9m9u7h48kfTU6zBe492NTqMST57xwWV4ZQaG0ivnn3UyjjQ\/9Pdye9bvAFpWzOncspnP7V0JtK9F\/1oqLcgrTu+n+rZWy0FdOa7101PKcC7kOTIZ4+1sg\/03ePF8KWHb5qeWF3eh6RFPfutre9EevXtoqFPut2U91YkIU7X7L32jsJ\/ebX4Yo9Od4d6M5IM9UxAq8OYPj9fNNR3IkE59UxD2+NA3z\/PfCsnlJPPVLQc0Mm7HwUUyqhnQloN6LyenR5J8r6k5+QzKe0FdL7xnu8A7XI8qHcmfaaeqWkpoKvDR\/deND25erw56S\/5TE8r58IvBzB1PQh0KqD0lnomqbVTOXtwGtJUQOkp+UxUSwH97kXTk4nxHqV\/1DNdrWzC\/7Zn0\/3Lhy4urOxtSt\/IZ8q6uqByR19u7I1Kr6hn4gQUOuJaIekTUOiEeg6BgEL71HMgBBTaJp+DIaDQKvUcEgGFFsnnsAgotEU9B0dAoR3yOUACCi1Qz2ESUDg5+RwqAYXTUs8BE1A4IadrDlu6AZ38frXvKk\/lvJNpk3oOXboBDT2DNzOtUc8REFA4BfkchZQC+uVD0fvZM7ye\/Vnrusze0TQmO7x\/Uz3HIqGAzr9aaVetp\/Gmpim3b8H993TxmmhbVwENHAISUHpkncitVqrnqLQX0Mn7q6urD8c889vzLDu7WPnreXb2l9mff6vTYe9smlGIZPFNJZ8j01ZA3z1erjB+d8S3G39+lmX3Vr\/vIBId2qzm6k\/1HJt2Ajp5VtjmfnTEk\/97ttr5H4sfBZQO7QZUPseonYBezt5ZZ3\/5x9X\/\/uuxBf08W5P9Zr4SKqB0aCug6jlSrQT0Zvbe+n6xq3LycpbSX454+sk\/Z0\/w01RA6dTujk9vrTFqJaCzFdD7+\/8S8Wm2Evrwo4ByKiUDPAuP2Xz06V8VfdRGQGepK6x0fjrPvql9DvuG+VrsCwHlNA4P8Nx4UPGx7bww+qelgBZS18R1mPIBTX85F1BO4NAAzz2PqrKqyqC1EdDJs6YDOh\/QVHMM\/Zz3Onc4MMBz3+OyVUVbeFn0Uyv7QK+z7On6LzfH7gNd+Pe5gHIC+wZ47n1YpS19Bq6VgP75OPtqNf59c3X0CJ\/\/Xu8kpDlvdu5QJaCbJxO387ropZYG0j9fDD2aj+M8ahTTkbzbucPdAZVN1lo5iPTjgwf5W+7rxR9nDxa+85Ue9M8dAVVPilo6Cr+P70Sih0oDKp9sSjyg5Yf09031+GkyaIcD6g3Ejq6uB9oQAaVhh4Yxefuwx6ADussngLusM7mRUvVkn8QDOv3iO5Fo2Pbmim0XDko9oDX5GHC3jX6qJyUEFA5ST8oJKBwgn9wlwYBOPvx+dXX124fINfF8HKhIPakgtYC+f14YkvTwdd1f94mgEvmkkrQC+vlxtulezfPqfSa4m3pSVVIBvTnP39gPll8M\/23+l7Ond\/9agY8Fd5FPqkspoPkpoWcvCje8q31NUB8MSqkntaQU0OudXOZJrfUlyT4blJBPakoooJNnxQvbL9xk9b6hzqeDQ9ST+hIK6L7z3p0LTyOcrkmIgIJ6EpRQQGeb8DvfBmITnmOpJ3EJBXR6uVPLfLdora\/49EFhk3xyjJQC+ul8VtA3hRvyb4ev9xV1PioUqCdHSimg+TimWTEvfr7K\/boYSV9rFJOAcks+OVpSAZ2+Pd86lXP5ZcmV+bywoJ40Ia2ATievigk9e1L3ikw+MuTkk2YkFtCZyfurVxcXF0+uXgeuZ+dDg3rSnPQCehSfm9GTTxokoIyIetIsAWU05JOmCSjjoJ6cgIAyAq4VwmkIKIOnnpyKgDJs6skJCShDtpnPzKY8zRJQBmu7lrfnsHX3mhgWAWWgdlK5\/puC0hQBZYj2rGhubMq3\/oIYJgFlePZup29uzLf6ehgsAWVgDu3lFFCaJ6AMyuGDRAJK8wSU4Sg9xC6gNE9AGYi7RigJKM0TUAbh7vGdAkrzBJT0VRodbxgTzRNQUlf15CID6WmcgJK0OqdmOpWTpgkoCVvmsGoX9ZOGCSg9Vlq89V3WLOmKgNJfZWW8vd2+TTojoPTW4TIWq+roOt0RUPrqYBk3V0qN76Q7Akpf7S\/jnst87v8ZTk9A6as9Zdy3R1RA6Y6A0lc7Zdx\/PElA6Y6A0lf7vs7ozoed\/FVBgYDSV7sBrfCwE78m2CCg9NV6YZUPkjeMie4IKH11O06+fIS8gfR0RkDprayg2uPaemWwIKD0V9Uy6icdEVB6qur6J3RHQOkl4SQFAkr\/qCeJEFD6Rj5JhoDSK+pJSgSU\/nDIiMQIKH2hniRHQOkF9SRFAkoPyCdpElC6pp4kS0DplnySMAGlQ+pJ2gSUzsgnqRNQuqGeDICA0gX5ZBAElNapJ0MhoLTL6ZoMiIDSJvVkUASU1qgnQyOgtEQ+GR4BpQ3qySAJKKcnnwyUgHJi6slwCSgnJZ8MmYByOurJwAkopyKfDJ6AchLqyRgIKM1zuiYjIaA0TT0ZDQGlUerJmAgoDZJPxkVAaYp6MjoCSjPkkxESUBqgnoyTgHI0+WSsBJTjqCcjJqAcI5jPzFB7BkFACQtHMMsUlEEQUILiBVz\/moKSOAEl4pj1x8IvWh6kTUCp7cjN7+JvWiAkTUCpqbSeVfZtCiiDIaBUkhVVeFTpU+3\/GZIjoFRRKZ8Vjw4JKIMhoFSQB7FGP8v\/oQWUwRBQ7lZY+WygjALKYAgodyuueh5fRsOYGAwB5S6bW+4NrFoaSM9QCCildnZ8NrFt7lROBkJAKbGsXOM7N\/WTYUgsoJNXPz74yz8+rv\/+5w\/ZV\/+q8fs+sjXcNs7RIdgrrYD++3z+mT57skqogJ7Kxiqio0OwV1IBvV7vOvtmWVABPY2tDeyqZXR0iJFJKaCfZuuf9158+PAy\/3ORTQE9gT27J6uW0dEhxiWlgF6v1jw\/P14VVEAbt79\/Vcuon4xKQgGdPMuyp7c\/zlsqoM06XD9lhF0JBbQYy7yg96cCerxiGCUS6kk0oPlfskcCerRsS9evB5KSakDzI0pnvwjokYoHh+QT6koooIV9oLmbLPvqjYAexaY7HCWhgOZH4e9v\/vWr\/yegx5j\/c+w5XROoJKWA5uNAH\/5x+\/fL+SdfQOM2jyB1\/WogOSkFdH4mUrGXLwX0OIdO1wQqSSqg07fnm72c\/V1Ao3ZO1+zwtUCa0grodPLubx83\/v7yXEAjdoct+aeB2hIL6LFUYm4VTwGFowjo6BRWPateZQnYS0CH6sC5RZs3uv4cHENAB2rv2Zm7SXUSJxwh8YCWn4m0faL3iDqxb9WyZI10NP8u0CgBHaTdnZtjmntoy6ADumssCdk+vC6fcAqJB3T65cMfdz\/o1lgishlQ9YTTSD2gNY2lI5tfCCefcBoCOkgu8wltENBBKlynTkDhZBIM6OTD71dXV799+Hj3Q3cMICaVqji\/vufyUQOYZ+ip1AL6\/nlhSNLD13V\/Pf2YVBuQVXhE+rMMvZVWQPMvhN9w75d6T5B8TfYNkN\/3oEqPA46TVEBvzvMwPLhY+Db\/y9nTu3+tIPWa7A6Q3\/eQbL0Fbw8onFJKAc2\/yvjsReGGd3WvpzyAgO7\/uXDjqpn6CSeXUkCvd3K5\/Hb46lLvSXlAFRPalVBAt77WeO4my76pczQ+9byUBVQ+oW0JBXTfee9jOxf+YEDVEzogoEk5EFD5hE4kFNDZJvzZ9qglm\/DqCd1JKKDTy51a5rtF79d5itRDszOMyaF26FBKAf10Pivom8INn2f93FkpLdXn1FQ8R7M4QF49oVMpBTQfxzQr5sXPV7lfFyPpa41i6nNAK4583zoVq7\/zAyOQVECnb8+38nH2U70n6G9wKp97KZ\/QG2kFdDp5VUzo2ZO6V2TqbXIqnKO5+Wj1hO4lFtCZyfurVxcXF0+uXgeuZ9fb6tx5jubGY+UTeiG9gB6lt92pHFD1hP4Q0H6oGFD5hD4R0DYmenf3qgRUPaFnBLSFaVYo6N0BlU\/oHQE9\/SSrjE+6I6DqCX0koCefYqXxSaUPk0\/oJwFtcYqVCrqdSvWE3hLQFqdYYXzSViydcAR9JqAtTrHKVxFvPl49oc8EtMUp1pq6ekLvCWiLU6wxdfmEBAhoi1OsOnX1hDQI6MmnWOcyS8vfkE9IgoCefpIVL\/S5epB6QioEtIVpVr78sXxCUgS0jYlWCqN6QmoEtCfkE9IjoH2gnpAkAe2c0zUhVQLaMfWEdAlol9QTkiag3ZFPSJyAdkQ9IX0C2gn5hCEQ0PapJwyEgLb\/EuQTBkJAW56+esJwCGirU5dPGBIBbW\/S6gkDI6AtTVc+YXgEtJWpqicMkYCefpLqCQMloKeeoHzCYAnoSaemnjBkAnrCacknDJuAnmpC6gmDJ6CnmYx8wggI6AmmoZ4wDgLa+BTkE8ZCQJt9evWEERHQJp9cPmFUBLSxZ1ZPGBsBbeZp5RNGSECbeFL1hFES0KOfUT1hrAT0yOeTTxgvAT3myfQTRk1A40+VKSiMm4AGn+c2nAoKYyWgoWfZWPEUUBgpAa3\/FPN4Fp9JQWGcBLTuEyzXPQUUENBav13c89nUswKpEtDqv3pwx6eAwjgJaNVf3BqvJKCAgFb6rd3RngIKCGiF39k3WN4wJkBA7\/qFQ6caGUgPoyeg5Q8vOVPTqZwwdgJa8tg74qifMHICevCR2giUE9D9D1NP4E4Cuu9B8glUIKA7j3BwCKhGQLfuzxQUqEhAi3cuL1RngCdQhYCu71muczrFCKhIQJe3r7fYneQOVCSg20fdBRSoSEC3DxcJKFDRyAO652C7gAIVjTqge8cqCShQ0XgDemikp4ACFY01oBWu86mfQLlRBrT8NCMD6YFqRhjQytf51E+g1OgCWiWM+glUMcaAdv0igIEYXUC7fgXAcAgoQJCAAijTaqkAAAwnSURBVAQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQNDoAgrQnMYb1fQTNqnrf2xgWBpvVNNPeHKD3K43U4kY4jyZqWMm08pUmmRpp2KIMzXEeTJTx0ymlak0ydJOxRBnaojzZKaOmUwrU2mSpZ2KIc7UEOfJTB0zmVam0iRLOxVDnKkhzpOZOmYyrUylSZZ2KoY4U0OcJzN1zGRamUqTLO1UDHGmhjhPZuqYybQylSZZ2qkY4kwNcZ7M1DGTaWUqTbK0UzHEmRriPJmpYybTylSaZGmnYogzNcR5MlPHTKaVqTTJ0k7FEGdqiPNkpo6ZTCtTaZKlnYohztQQ58lMHTOZVqbSJEs7FUOcqSHOk5k6ZjKtTKVJlnYqhjhTQ5wnM3XMZFqZSpMs7VQMcaaGOE9m6pjJtDKVJlnaqRjiTA1xnszUMZNpZSpNsrRTMcSZGuI8maljJtPKVJpkaadiiDM1xHkyU8dMppWpNMnSTsUQZ2qI82SmjplMK1MBGCABBQgSUIAgAQUIElCAIAEFCBJQgCABBQgSUIAgAQUIElCAIAEFCBJQgCABBQgSUIAgAQUIElCAIAEFCBJQgCABBQgSUIAgAQUIElCAIAEFCBJQgCABBQgSUICg3gf08\/PzLDt7+KbeXT13+JVPXj3IsuzrYc3Uwqfz7Gmbr6cJJfM0eZsvqQc\/fWz9RR2rZKbeJ\/uRyv35w1f\/2nPzSTvR94C+nc177uw\/6tzVc4df+eqeLPu+ixd2jLsWx58\/ZMkFtGSePq2W1L19n9k+OzxTk5erd9+jLl7YsSbPsn0BPW0neh7Qm2xt+8NXclfPHX7lhXuy+928uKg7F8flkBbUbT+z7Ju01kFLZury9q4ECzqZvfw9AT1xJ\/od0Hyt5d5s1fv9451\/m5K7eu7wK5\/f83q6uOvsl45eX8idi+Mmvf\/p7nj3nf2U73E5Tyw2JTOV\/6eQb+h+fpbauy83W\/\/c99Y7dSf6HdDr1f\/v+b\/Oo6p39dzhV36zXu\/M70pqFfSuxZG\/j1MLaPm7b\/lpvElsFbR8ppbvucvEPlIz7+abBLuJPHUneh3Q2Tyv\/iec\/e+48T4tuavnSl755W1ihjNTq\/u\/+p+JBbTau6\/wYwrKFtTl+q6bxP77nn6erV9mDx\/vBvTkneh1QGerLatZ3n6fltzVc9VeeeFRKbhrpmbrAU+vEwtoyTzNPotpBWatbEElHNDrfI\/KvoNIJ+9ErwNaXI6Xmx+\/krt6rtorTyygd8zULDiPpqkFtPzdl9om7lLZgtrYhE9qUU2vz77\/uPco\/Mk70feArt+n14ffwml9Mqu98sTWAcpnavbOnv1vkNZiKp2n+V\/nwwu\/\/qmDV3aEsgWV76eeH0R6nth+3en0S\/5yDwT0tJ3odUCLc7z1n37JXT1X6ZXP3ssp7Za4Y6YW24apBbRknvIZuk5yHGjpgprvSUxwppb2BfTknRDQtlV55fmQtpRWQMtnannDsAL61\/XowqQG0ZW\/+\/IBTLmHaa1\/LgnotrEG9MCQ4B4rm6nV7tzhBHQ+5HC+tfvlZWKnPJS++67X\/ymcJbZnYk5At400oJP0BjKXzdTl8m09sIA+Wt+T0rIqW1B5P7\/\/Y\/m\/QlKLakFAt40zoJ+TOw2p2pIaTkDz47nroyxpHbEumanCxQreprYFNCeg20Z5FD6\/9kFy+\/APz9TtkMm0FlPpgiqeqZPWf9\/lH6lERwYuOQq\/bYzjQOfbUcntwz88U7f71VK7SkXJgrpOOaAlM\/W08HNCM7VkHOi2EZ6J9DKpxqwdnql0A1qyoIofy7RaUzJT6e4VW3Im0raxnQu\/OCUtof8M1g7PVLoBLVlQs7+vP6ppbf+UzFS6G3VL+wI67nPhx3Y1pvw9\/FWaVwOvsDhS2wdaNk\/5ON3FhzG14y2HZyq\/mt1yASU2tGBp7wWVR301pvUFMg9dD3T\/XT13+JWndv5RQYXFkVxAS+Ypj01+15fkdrmUzNRlcRhTSoNbl\/YG9NSd6HdAdy8nfduYAV2RfjVTm5u7abW0ZEktJRfQsnkqLKqU9h9Ny2Zqcc3WheTGgUw3A9paJ3oe0Om\/t77QpPCx3L4rHQdmavIs4YCWLamF9AJa5d2X3mmPh2fq9g2Y2H8KC\/sDeuJO9D2g21+pV\/xYDuZbOZczVVwDSC+gZUtqLsGAls3Tl1ffzu767nVXLy2uZKbe\/zi\/K8GZmh4M6Li\/lROgtwQUIEhAAYIEFCBIQAGCBBQgSEABggQUIEhAAYIEFCBIQAGCBBQgSEABggQUIEhAAYIEFCBIQAGCBBQgSEABggQUIEhAAYIEFCBIQAGCBBQgSEABggQUIEhAAYIEFCBIQAGCBBQgSEABggQUIEhAAYIEFCBIQAGCBBQgSEABggQUIEhAAYIEFCBIQAGCBBQgSEABggQUIEhAAYIEFCBIQAGCBBQgSEABggQUIEhAAYIEFCBIQAGCBBQgSEBJxORZ9tW\/Dtz3+cXh37vO7i9+\/9WDLMu+fvhmdfOGR\/MJPG30FTN8AkoiDgd08jLv3wGfzhe\/9fZ81crv57fvBnT9UKhKQEnE4YDeZIcDulqtvCnEcr5Guiegs9u++XiCV85wCSjJKwvosol\/\/pBl917Pfnj\/OMvOftl+zHIrf\/aow6uysEtASV5JQD+dr1dAF43MV0lXP97++mrF8\/rwblbYQ0BJXklAL5dtvMzWB4hmTd3YUJ+tdq5XSa2CUo+A0oVZxe5PP\/8425z+\/o\/9N8xM3s3+nn33YpG75T7Q+R+TV9\/OHrk4oL7au5kHcvJ2fqT9yR+3k9kJ4iySGwG9LObXKii1CChdyHv5aXFcfLH6t3PDdPr58TKN9+ahLAT0\/54XolkI6Kf1kfZlEq939nfuBLSwAT\/dX1w4SEDpwixU\/+XZMnbzxu3cMD\/uszRfK7wN6K38kbcBLfzGYoN9e2Vz7mZjH+js6YqN3fsbcIiA0oX5umK+ZpkPz7y\/74Z80\/rsycfp5NXyhmJAz376mI\/+XK5p3qxHIS2OtH9+tlyrPLAFXyzm9dYhpcs966xwiIDShbyXi1W92U95svbdsEzZ8qdCQJf7KVfxWwV0faRoNWT0Ots5t2hyuVHMrZzu\/RU4SEDpwm0elwdxdm4orBpers60XAX00fpJ5s0trIF+86Y4ld3VybyfxcNEN3vGNNkJSmUCShcKY4kWDdu5YXPg0f1iQFdV3A7ofG\/o2V\/+sdqJuXvuUl7fYlO39oCupwXVCChdKHRq8eP2DcW0LUJ5d0Dz6C6OLS3GMe0E9PP2aUjbY0IFlHoElC5s9nIWse0bivFbHBqvEND5AafbcUzbAc2PT93bKOr1zgb7blLhMAGlC6dZA5159\/y2oFsBzS8f8v1GHHe34K2BUouA0oVa+0AXN1QL6MyXX\/OI3iZ3aT3qae+rKNwkoFQmoHRh1qlV2y5XJxFt3lByFP5AQAu9nG305z8Wj8Jf716Fac8WvKPw1CKgdOHTarj8qpz7bjg0DvTQGujtWe3LgF5vrMV+tTHEafEL+5pqHCiVCShdmJ949PDNdLJxJlLxho0zkfJOlgZ09Wc2vxRJftHP5ZPeFnX3DKN9l2h2JhJ1CChdmKXt69UR83nEdm4oORd+O6CLa4g8vR3GtPqV2zPbN68\/v3yCPSe+OxeeWgSULuTHapZXAVkMLNq5oeRqTNsBXVxf5FHxQiP3Fg9ZXY1p4wokWWHfwHYt7QKlFgGlC\/OD3Z9mhfz6pwM3TG+vB7r828GATif5Yff5d8W9f36e3V5CdL0NX7xO00ZAt4+4X7oeKHUIKF3YadeJhg9d1tsid0V66hFQutBWQFffiVSRC9JTj4DShbYCWu+biq2AUpOA0oXWAjprYvVVUN8LT00CShdaC+jsiStvlX86NwaUegSULrQX0NlqZcUnnjxzEhI1CShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShAkIACBAkoQJCAAgQJKECQgAIECShA0P8HT9WfR8vxDKsAAAAASUVORK5CYII=\" width=\"672\" \/><\/p>\n<p>Finally the authors mention that a single test on the entire 27 x 6 table could be performed. This seems like the easiest approach of all.<\/p>\n<pre class=\"r\"><code>chisq.test(interval_votes, correct = F)<\/code><\/pre>\n<pre><code>## \r\n##  Pearson&#39;s Chi-squared test\r\n## \r\n## data:  interval_votes\r\n## X-squared = 114.72, df = 130, p-value = 0.8279<\/code><\/pre>\n<p>My R code differs quite a bit from <a href=\"https:\/\/github.com\/avehtari\/ROS-Examples\/blob\/master\/Coop\/riverbay.R\">the R code provided by the authors<\/a>. I\u2019m not saying mine is better, it just makes more sense to me. Maybe someone else will find this approach useful.<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Gelman, et al.\u00a0tell a story from long ago where someone sent them a fax (that\u2019s right, a fax) asking for&#8230; <a class=\"read-more\" href=\"https:\/\/www.clayford.net\/statistics\/hypothesis-testing-section-4-6-of-regression-and-other-stories\/\">Read more<\/a><\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[22],"tags":[84],"class_list":["post-938","post","type-post","status-publish","format-standard","hentry","category-hypothesis-testing","tag-regression-and-other-stories"],"_links":{"self":[{"href":"https:\/\/www.clayford.net\/statistics\/wp-json\/wp\/v2\/posts\/938","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/www.clayford.net\/statistics\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/www.clayford.net\/statistics\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/www.clayford.net\/statistics\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/www.clayford.net\/statistics\/wp-json\/wp\/v2\/comments?post=938"}],"version-history":[{"count":2,"href":"https:\/\/www.clayford.net\/statistics\/wp-json\/wp\/v2\/posts\/938\/revisions"}],"predecessor-version":[{"id":940,"href":"https:\/\/www.clayford.net\/statistics\/wp-json\/wp\/v2\/posts\/938\/revisions\/940"}],"wp:attachment":[{"href":"https:\/\/www.clayford.net\/statistics\/wp-json\/wp\/v2\/media?parent=938"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.clayford.net\/statistics\/wp-json\/wp\/v2\/categories?post=938"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.clayford.net\/statistics\/wp-json\/wp\/v2\/tags?post=938"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}