class: center, middle, title-slide # Clustering ### Claus O. Wilke ### last updated: 2022-03-21 --- .center[ ![](clustering_files/figure-html/three-clusters-viz-1.svg)<!-- --> ] These points correspond to three clusters. Can a computer find them automatically? --- .center[ ![](clustering_files/figure-html/three-clusters-viz2-1.svg)<!-- --> ] These points correspond to three clusters. Can a computer find them automatically? --- ## *k*-means clustering -- 1\. Start with *k* randomly chosen means -- 2\. Color data points by the shortest distance to any mean -- 3\. Move means to centroid position of each group of points -- 4\. Repeat from step 2 until convergence --- class: center middle ## Let's try it out --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans1-1.svg)<!-- --> ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans2-1.svg)<!-- --> ] .absolute-bottom-left[ Add means at arbitrary locations ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans3-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans4-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans5-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans6-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans7-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans8-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans9-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans10-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans11-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans12-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans13-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans14-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans15-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans16-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans17-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans18-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans19-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/three-clusters-kmeans20-1.svg)<!-- --> ] .absolute-bottom-left[ Final result ] --- class: middle center ## Now we'll cluster the same dataset with five centroids --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans1-1.svg)<!-- --> ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans2-1.svg)<!-- --> ] .absolute-bottom-left[ Add means at arbitrary locations ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans3-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans4-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans5-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans6-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans7-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans8-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans9-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans10-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans11-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans12-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans13-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans14-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans15-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans16-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans17-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: center middle ## ... do many more iterations ... --- class: middle .center[ ![](clustering_files/figure-html/five-clusters-kmeans18-1.svg)<!-- --> ] .absolute-bottom-left[ Final result ] --- class: middle center ## Let's try this on the spirals dataset --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans1-1.svg)<!-- --> ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans2-1.svg)<!-- --> ] .absolute-bottom-left[ Add means at arbitrary locations ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans3-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans4-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans5-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans6-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans7-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans8-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans9-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans10-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans11-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans12-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans13-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans14-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans15-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans16-1.svg)<!-- --> ] .absolute-bottom-left[ Color data points by the shortest distance to any mean ] --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans17-1.svg)<!-- --> ] .absolute-bottom-left[ Move means to centroid position of each group of points ] --- class: center middle ## ... do many more iterations ... --- class: middle .center[ ![](clustering_files/figure-html/spirals-kmeans18-1.svg)<!-- --> ] .absolute-bottom-left[ Final result ] --- class: center middle ## k-means clustering works best when<br>data forms distinct, compact clusters --- ## Other clustering algorithms .center[ <img src = "clustering_files/clustering_examples.png", width = 75%></img> ] .absolute-bottom-right.tiny-font[ From George Seif (2018) [The 5 Clustering Algorithms Data Scientists Need to Know](https://towardsdatascience.com/the-5-clustering-algorithms-data-scientists-need-to-know-a36d136ef68) ] [//]: # "segment ends here" --- class: center middle ## Doing k-means clustering in R --- ## Example dataset: `iris` Measurements on the sepals and petals of three iris species .small-font[ ```r iris ``` ``` Sepal.Length Sepal.Width Petal.Length Petal.Width Species 1 5.1 3.5 1.4 0.2 setosa 2 4.9 3.0 1.4 0.2 setosa 3 4.7 3.2 1.3 0.2 setosa 4 4.6 3.1 1.5 0.2 setosa 5 5.0 3.6 1.4 0.2 setosa 6 5.4 3.9 1.7 0.4 setosa 7 4.6 3.4 1.4 0.3 setosa 8 5.0 3.4 1.5 0.2 setosa 9 4.4 2.9 1.4 0.2 setosa 10 4.9 3.1 1.5 0.1 setosa 11 5.4 3.7 1.5 0.2 setosa 12 4.8 3.4 1.6 0.2 setosa 13 4.8 3.0 1.4 0.1 setosa 14 4.3 3.0 1.1 0.1 setosa 15 5.8 4.0 1.2 0.2 setosa 16 5.7 4.4 1.5 0.4 setosa 17 5.4 3.9 1.3 0.4 setosa 18 5.1 3.5 1.4 0.3 setosa 19 5.7 3.8 1.7 0.3 setosa 20 5.1 3.8 1.5 0.3 setosa 21 5.4 3.4 1.7 0.2 setosa 22 5.1 3.7 1.5 0.4 setosa 23 4.6 3.6 1.0 0.2 setosa 24 5.1 3.3 1.7 0.5 setosa 25 4.8 3.4 1.9 0.2 setosa 26 5.0 3.0 1.6 0.2 setosa 27 5.0 3.4 1.6 0.4 setosa 28 5.2 3.5 1.5 0.2 setosa 29 5.2 3.4 1.4 0.2 setosa 30 4.7 3.2 1.6 0.2 setosa 31 4.8 3.1 1.6 0.2 setosa 32 5.4 3.4 1.5 0.4 setosa 33 5.2 4.1 1.5 0.1 setosa 34 5.5 4.2 1.4 0.2 setosa 35 4.9 3.1 1.5 0.2 setosa 36 5.0 3.2 1.2 0.2 setosa 37 5.5 3.5 1.3 0.2 setosa 38 4.9 3.6 1.4 0.1 setosa 39 4.4 3.0 1.3 0.2 setosa 40 5.1 3.4 1.5 0.2 setosa 41 5.0 3.5 1.3 0.3 setosa 42 4.5 2.3 1.3 0.3 setosa 43 4.4 3.2 1.3 0.2 setosa 44 5.0 3.5 1.6 0.6 setosa 45 5.1 3.8 1.9 0.4 setosa 46 4.8 3.0 1.4 0.3 setosa 47 5.1 3.8 1.6 0.2 setosa 48 4.6 3.2 1.4 0.2 setosa 49 5.3 3.7 1.5 0.2 setosa 50 5.0 3.3 1.4 0.2 setosa 51 7.0 3.2 4.7 1.4 versicolor 52 6.4 3.2 4.5 1.5 versicolor 53 6.9 3.1 4.9 1.5 versicolor 54 5.5 2.3 4.0 1.3 versicolor 55 6.5 2.8 4.6 1.5 versicolor 56 5.7 2.8 4.5 1.3 versicolor 57 6.3 3.3 4.7 1.6 versicolor 58 4.9 2.4 3.3 1.0 versicolor 59 6.6 2.9 4.6 1.3 versicolor 60 5.2 2.7 3.9 1.4 versicolor 61 5.0 2.0 3.5 1.0 versicolor 62 5.9 3.0 4.2 1.5 versicolor 63 6.0 2.2 4.0 1.0 versicolor 64 6.1 2.9 4.7 1.4 versicolor 65 5.6 2.9 3.6 1.3 versicolor 66 6.7 3.1 4.4 1.4 versicolor 67 5.6 3.0 4.5 1.5 versicolor 68 5.8 2.7 4.1 1.0 versicolor 69 6.2 2.2 4.5 1.5 versicolor 70 5.6 2.5 3.9 1.1 versicolor 71 5.9 3.2 4.8 1.8 versicolor 72 6.1 2.8 4.0 1.3 versicolor 73 6.3 2.5 4.9 1.5 versicolor 74 6.1 2.8 4.7 1.2 versicolor 75 6.4 2.9 4.3 1.3 versicolor 76 6.6 3.0 4.4 1.4 versicolor 77 6.8 2.8 4.8 1.4 versicolor 78 6.7 3.0 5.0 1.7 versicolor 79 6.0 2.9 4.5 1.5 versicolor 80 5.7 2.6 3.5 1.0 versicolor 81 5.5 2.4 3.8 1.1 versicolor 82 5.5 2.4 3.7 1.0 versicolor 83 5.8 2.7 3.9 1.2 versicolor 84 6.0 2.7 5.1 1.6 versicolor 85 5.4 3.0 4.5 1.5 versicolor 86 6.0 3.4 4.5 1.6 versicolor 87 6.7 3.1 4.7 1.5 versicolor 88 6.3 2.3 4.4 1.3 versicolor 89 5.6 3.0 4.1 1.3 versicolor 90 5.5 2.5 4.0 1.3 versicolor 91 5.5 2.6 4.4 1.2 versicolor 92 6.1 3.0 4.6 1.4 versicolor 93 5.8 2.6 4.0 1.2 versicolor 94 5.0 2.3 3.3 1.0 versicolor 95 5.6 2.7 4.2 1.3 versicolor 96 5.7 3.0 4.2 1.2 versicolor 97 5.7 2.9 4.2 1.3 versicolor 98 6.2 2.9 4.3 1.3 versicolor 99 5.1 2.5 3.0 1.1 versicolor 100 5.7 2.8 4.1 1.3 versicolor 101 6.3 3.3 6.0 2.5 virginica 102 5.8 2.7 5.1 1.9 virginica 103 7.1 3.0 5.9 2.1 virginica 104 6.3 2.9 5.6 1.8 virginica 105 6.5 3.0 5.8 2.2 virginica 106 7.6 3.0 6.6 2.1 virginica 107 4.9 2.5 4.5 1.7 virginica 108 7.3 2.9 6.3 1.8 virginica 109 6.7 2.5 5.8 1.8 virginica 110 7.2 3.6 6.1 2.5 virginica 111 6.5 3.2 5.1 2.0 virginica 112 6.4 2.7 5.3 1.9 virginica 113 6.8 3.0 5.5 2.1 virginica 114 5.7 2.5 5.0 2.0 virginica 115 5.8 2.8 5.1 2.4 virginica 116 6.4 3.2 5.3 2.3 virginica 117 6.5 3.0 5.5 1.8 virginica 118 7.7 3.8 6.7 2.2 virginica 119 7.7 2.6 6.9 2.3 virginica 120 6.0 2.2 5.0 1.5 virginica 121 6.9 3.2 5.7 2.3 virginica 122 5.6 2.8 4.9 2.0 virginica 123 7.7 2.8 6.7 2.0 virginica 124 6.3 2.7 4.9 1.8 virginica 125 6.7 3.3 5.7 2.1 virginica 126 7.2 3.2 6.0 1.8 virginica 127 6.2 2.8 4.8 1.8 virginica 128 6.1 3.0 4.9 1.8 virginica 129 6.4 2.8 5.6 2.1 virginica 130 7.2 3.0 5.8 1.6 virginica 131 7.4 2.8 6.1 1.9 virginica 132 7.9 3.8 6.4 2.0 virginica 133 6.4 2.8 5.6 2.2 virginica 134 6.3 2.8 5.1 1.5 virginica 135 6.1 2.6 5.6 1.4 virginica 136 7.7 3.0 6.1 2.3 virginica 137 6.3 3.4 5.6 2.4 virginica 138 6.4 3.1 5.5 1.8 virginica 139 6.0 3.0 4.8 1.8 virginica 140 6.9 3.1 5.4 2.1 virginica 141 6.7 3.1 5.6 2.4 virginica 142 6.9 3.1 5.1 2.3 virginica 143 5.8 2.7 5.1 1.9 virginica 144 6.8 3.2 5.9 2.3 virginica 145 6.7 3.3 5.7 2.5 virginica 146 6.7 3.0 5.2 2.3 virginica 147 6.3 2.5 5.0 1.9 virginica 148 6.5 3.0 5.2 2.0 virginica 149 6.2 3.4 5.4 2.3 virginica 150 5.9 3.0 5.1 1.8 virginica ``` ] --- ## Example dataset: `iris` .small-font[ ```r ggplot(iris, aes(Petal.Length, Petal.Width, color = Species)) + geom_point() ``` ] .center[ ![](clustering_files/figure-html/iris-plot-out-1.svg)<!-- --> ] --- ## We perform k-means clustering with `kmeans()` .tiny-font[ ```r km_fit <- iris %>% select(where(is.numeric)) %>% kmeans( centers = 3, # number of cluster centers nstart = 10 # number of independent restarts of the algorithm ) km_fit ``` ``` K-means clustering with 3 clusters of sizes 50, 38, 62 Cluster means: Sepal.Length Sepal.Width Petal.Length Petal.Width 1 5.006000 3.428000 1.462000 0.246000 2 6.850000 3.073684 5.742105 2.071053 3 5.901613 2.748387 4.393548 1.433871 Clustering vector: [1] 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 [38] 1 1 1 1 1 1 1 1 1 1 1 1 1 3 3 2 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 [75] 3 3 3 2 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 2 3 2 2 2 2 3 2 2 2 2 [112] 2 2 3 3 2 2 2 2 3 2 3 2 3 2 2 3 3 2 2 2 2 2 3 2 2 2 2 3 2 2 2 3 2 2 2 3 2 [149] 2 3 Within cluster sum of squares by cluster: [1] 15.15100 23.87947 39.82097 (between_SS / total_SS = 88.4 %) Available components: [1] "cluster" "centers" "totss" "withinss" "tot.withinss" [6] "betweenss" "size" "iter" "ifault" ``` ] --- .tiny-font[ ```r km_fit ``` ``` K-means clustering with 3 clusters of sizes 50, 38, 62 Cluster means: Sepal.Length Sepal.Width Petal.Length Petal.Width 1 5.006000 3.428000 1.462000 0.246000 2 6.850000 3.073684 5.742105 2.071053 3 5.901613 2.748387 4.393548 1.433871 Clustering vector: [1] 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 [38] 1 1 1 1 1 1 1 1 1 1 1 1 1 3 3 2 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 [75] 3 3 3 2 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 3 2 3 2 2 2 2 3 2 2 2 2 [112] 2 2 3 3 2 2 2 2 3 2 3 2 3 2 2 3 3 2 2 2 2 2 3 2 2 2 2 3 2 2 2 3 2 2 2 3 2 [149] 2 3 Within cluster sum of squares by cluster: [1] 15.15100 23.87947 39.82097 (between_SS / total_SS = 88.4 %) Available components: [1] "cluster" "centers" "totss" "withinss" "tot.withinss" [6] "betweenss" "size" "iter" "ifault" ``` ] --- ## We perform k-means clustering with `kmeans()` .pull-left.xtiny-font[ ```r # run kmeans clustering km_fit <- iris %>% select(where(is.numeric)) %>% kmeans(centers = 3, nstart = 10) # plot km_fit %>% # combine with original data augment(iris) %>% ggplot() + aes(x = Petal.Length, Petal.Width) + geom_point( aes(color = .cluster, shape = Species) ) + geom_point( data = tidy(km_fit), aes(fill = cluster), shape = 21, color = "black", size = 4 ) + guides(color = "none") ``` ] .pull-right.width-50[ ![](clustering_files/figure-html/iris-kmeans-out-1.svg)<!-- --> ] --- ## We perform k-means clustering with `kmeans()` .pull-left.xtiny-font[ ```r # run kmeans clustering km_fit <- iris %>% select(where(is.numeric)) %>% kmeans(centers = 3, nstart = 10) # plot km_fit %>% # combine with original data augment(iris) %>% ggplot() + aes(x = Petal.Length, Petal.Width) + geom_point( aes(color = .cluster, shape = Species) ) + geom_point( data = tidy(km_fit), aes(fill = cluster), shape = 21, color = "black", size = 4 ) + guides(color = "none") ``` ] .pull-right.width-50[ ![](clustering_files/figure-html/iris-kmeans-out-1.svg) .small-font[ How do we choose the number of clusters? ]] --- ## We perform k-means clustering with `kmeans()` .pull-left.xtiny-font[ ```r # run kmeans clustering km_fit <- iris %>% select(where(is.numeric)) %>% kmeans(centers = 2, nstart = 10) # plot km_fit %>% # combine with original data augment(iris) %>% ggplot() + aes(x = Petal.Length, Petal.Width) + geom_point( aes(color = .cluster, shape = Species) ) + geom_point( data = tidy(km_fit), aes(fill = cluster), shape = 21, color = "black", size = 4 ) + guides(color = "none") ``` ] .pull-right.width-50[ ![](clustering_files/figure-html/iris-kmeans2-out-1.svg)<!-- --> .small-font[ How do we choose the number of clusters? ]] --- ## We perform k-means clustering with `kmeans()` .pull-left.xtiny-font[ ```r # run kmeans clustering km_fit <- iris %>% select(where(is.numeric)) %>% kmeans(centers = 5, nstart = 10) # plot km_fit %>% # combine with original data augment(iris) %>% ggplot() + aes(x = Petal.Length, Petal.Width) + geom_point( aes(color = .cluster, shape = Species) ) + geom_point( data = tidy(km_fit), aes(fill = cluster), shape = 21, color = "black", size = 4 ) + guides(color = "none") ``` ] .pull-right.width-50[ ![](clustering_files/figure-html/iris-kmeans3-out-1.svg)<!-- --> .small-font[ How do we choose the number of clusters? ]] --- ## Look for elbow in scree plot .pull-left.xtiny-font[ ```r # function to calculate within sum squares calc_withinss <- function(data, centers) { km_fit <- select(data, where(is.numeric)) %>% kmeans(centers = centers, nstart = 10) km_fit$tot.withinss } tibble(centers = 1:15) %>% mutate( within_sum_squares = map_dbl( centers, ~calc_withinss(iris, .x) ) ) %>% ggplot() + aes(centers, within_sum_squares) + geom_point() + geom_line() ``` ] .pull-right[ ![](clustering_files/figure-html/iris-scree-out-1.svg)<!-- --> .small-font[ Plot suggests number of clusters of about 3 ]] [//]: # "segment ends here" --- ## Further reading - Wikipedia: [k-means clustering](https://en.wikipedia.org/wiki/K-means_clustering) - Naftali Harris blog post: [Interactive k-means demonstration](https://www.naftaliharris.com/blog/visualizing-k-means-clustering/) - Stackoverflow post: [Determining the appropriate number of clusters in k-means](https://stackoverflow.com/questions/15376075/cluster-analysis-in-r-determine-the-optimal-number-of-clusters/15376462#15376462) - Medium article: [The 5 Clustering Algorithms Data Scientists Need to Know](https://towardsdatascience.com/the-5-clustering-algorithms-data-scientists-need-to-know-a36d136ef68)