Bir veri k\u00fcmesindeki de\u011fi\u015fkenler aras\u0131nda var olan do\u011frusal ili\u015fkilerin g\u00fcc\u00fcn\u00fc anlaman\u0131n h\u0131zl\u0131 bir yolunu sa\u011flar.<\/span><\/p>\n R’de korelasyon matrisi olu\u015fturman\u0131n d\u00f6rt yayg\u0131n yolu vard\u0131r:<\/span><\/p>\n Y\u00f6ntem 1: kor fonksiyonu (basit bir korelasyon katsay\u0131lar\u0131 matrisi elde etmek i\u00e7in)<\/strong><\/span><\/p>\n Y\u00f6ntem 2: rcorr i\u015flevi (korelasyon katsay\u0131lar\u0131n\u0131n p de\u011ferlerini elde etmek i\u00e7in)<\/strong><\/span><\/p>\n Y\u00f6ntem 3: corrplot i\u015flevi (korelasyon matrisini g\u00f6rselle\u015ftirmek i\u00e7in)<\/strong><\/span><\/p>\n Y\u00f6ntem 4: ggcorrplot i\u015flevi (korelasyon matrisini g\u00f6rselle\u015ftirmek i\u00e7in)<\/strong><\/span><\/p>\n A\u015fa\u011f\u0131daki \u00f6rnekler, R’de her y\u00f6ntemin a\u015fa\u011f\u0131daki veri \u00e7er\u00e7evesiyle nas\u0131l kullan\u0131laca\u011f\u0131n\u0131 g\u00f6sterir:<\/span><\/p>\n Veri \u00e7er\u00e7evemizdeki her de\u011fi\u015fken aras\u0131ndaki korelasyon katsay\u0131lar\u0131n\u0131 g\u00f6steren bir korelasyon matrisi olu\u015fturmak i\u00e7in R base cor()<\/strong> fonksiyonunu kullanabiliriz:<\/span><\/p>\n Tablonun k\u00f6\u015fegeni boyunca korelasyon katsay\u0131lar\u0131n\u0131n t\u00fcm\u00fc 1’e e\u015fittir \u00e7\u00fcnk\u00fc her de\u011fi\u015fken kendisiyle m\u00fckemmel bir korelasyona sahiptir.<\/span><\/p>\n Di\u011fer t\u00fcm korelasyon katsay\u0131lar\u0131, de\u011fi\u015fkenlerin farkl\u0131 ikili kombinasyonlar\u0131 aras\u0131ndaki korelasyonu g\u00f6sterir. \u00d6rne\u011fin:<\/span><\/p>\n Veri \u00e7er\u00e7evemizdeki her de\u011fi\u015fken aras\u0131ndaki korelasyon katsay\u0131lar\u0131n\u0131 g\u00f6steren bir korelasyon matrisi olu\u015fturmak i\u00e7in R’deki Hmisc<\/strong> paketindeki rcorr()<\/strong> fonksiyonunu kullanabiliriz:<\/span><\/p>\n \u0130lk matris de\u011fi\u015fkenler aras\u0131ndaki korelasyon katsay\u0131lar\u0131n\u0131 g\u00f6sterir ve ikinci matris kar\u015f\u0131l\u0131k gelen p de\u011ferlerini g\u00f6sterir.<\/span><\/p>\n \u00d6rne\u011fin asist ve ribaundlar aras\u0131ndaki korelasyon katsay\u0131s\u0131 -0,24<\/strong> ve bu korelasyon katsay\u0131s\u0131n\u0131n p de\u011feri 0,5589’dur<\/strong> .<\/span><\/p>\n Bu bize iki de\u011fi\u015fken aras\u0131ndaki korelasyonun negatif oldu\u011funu ancak p de\u011feri 0,05’ten az olmad\u0131\u011f\u0131 i\u00e7in istatistiksel olarak anlaml\u0131 bir korelasyon olmad\u0131\u011f\u0131n\u0131 s\u00f6yler.<\/span><\/p>\n Korelasyon matrisini g\u00f6rselle\u015ftirmek i\u00e7in R’deki corrplot<\/strong> paketindeki corrplot()<\/strong> fonksiyonunu kullanabiliriz:<\/span> <\/p>\n Korelasyon matrisindeki dairelerin rengi ve boyutu, her de\u011fi\u015fken aras\u0131ndaki korelasyonu g\u00f6rselle\u015ftirmemize yard\u0131mc\u0131 olur.<\/span><\/p>\n \u00d6rne\u011fin asist ve ribaund de\u011fi\u015fkenlerinin kesi\u015fti\u011fi dairenin k\u00fc\u00e7\u00fck ve a\u00e7\u0131k k\u0131rm\u0131z\u0131 olmas\u0131 bize korelasyonun zay\u0131f ve negatif oldu\u011funu anlat\u0131yor.<\/span><\/p>\n Korelasyon matrisini g\u00f6rselle\u015ftirmek i\u00e7in R’deki ggcorrplot<\/strong> paketindeki ggcorrplot()<\/strong> fonksiyonunu kullanabiliriz:<\/span> <\/p>\n Korelasyon matrisindeki karelerin rengi, her de\u011fi\u015fken aras\u0131ndaki korelasyonlar\u0131 g\u00f6rselle\u015ftirmemize yard\u0131mc\u0131 olur.<\/span><\/p>\n A\u015fa\u011f\u0131daki e\u011fitimlerde R’de di\u011fer ortak g\u00f6revlerin nas\u0131l ger\u00e7ekle\u015ftirilece\u011fi a\u00e7\u0131klanmaktad\u0131r:<\/span><\/p>\n R’de Spearman s\u0131ralama korelasyonu nas\u0131l hesaplan\u0131r<\/a> Korelasyon matrisi, bir veri setindeki de\u011fi\u015fkenler aras\u0131ndaki korelasyon katsay\u0131lar\u0131n\u0131 g\u00f6steren kare bir tablodur. Bir veri k\u00fcmesindeki de\u011fi\u015fkenler aras\u0131nda var olan do\u011frusal ili\u015fkilerin g\u00fcc\u00fcn\u00fc anlaman\u0131n h\u0131zl\u0131 bir yolunu sa\u011flar. R’de korelasyon matrisi olu\u015fturman\u0131n d\u00f6rt yayg\u0131n yolu vard\u0131r: Y\u00f6ntem 1: kor fonksiyonu (basit bir korelasyon katsay\u0131lar\u0131 matrisi elde etmek i\u00e7in) cor(df) Y\u00f6ntem 2: rcorr i\u015flevi (korelasyon katsay\u0131lar\u0131n\u0131n […]<\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[11],"tags":[],"class_list":["post-2950","post","type-post","status-publish","format-standard","hentry","category-rehber"],"yoast_head":"\n cor(df)<\/strong><\/span><\/pre>\n library<\/span> (Hmisc)\n\nrcorr( as.matrix<\/span> (df))<\/strong><\/span><\/pre>\n library<\/span> (corplot)\n\ncorrplot(cor(df))\n<\/strong><\/span><\/pre>\n library<\/span> (ggcorrplot)\n\nggcorrplot(cor(df))<\/strong><\/span><\/pre>\n #create data frame\n<\/span>df <- data. frame<\/span> (assists=c(4, 5, 5, 6, 7, 8, 8, 10),\n rebounds=c(12, 14, 13, 7, 8, 8, 9, 13),\n points=c(22, 24, 26, 26, 29, 32, 20, 14))\n\n#view data frame\n<\/span>df\n\n assists rebound points\n1 4 12 22\n2 5 14 24\n3 5 13 26\n4 6 7 26\n5 7 8 29\n6 8 8 32\n7 8 9 20\n8 10 13 14\n<\/strong><\/span><\/pre>\n \u00d6rnek 1: Cor i\u015flevi<\/strong><\/span><\/h3>\n
#create correlation matrix<\/span>\ncor(df)\n\n assists rebound points\nassists 1.0000000 -0.2448608 -0.3295730\nrebounds -0.2448608 1.0000000 -0.5220917\npoints -0.3295730 -0.5220917 1.0000000\n<\/strong><\/span><\/pre>\n\n
\u00d6rnek 2: rcorr i\u015flevi<\/strong><\/span><\/h3>\n
library<\/span> (Hmisc)\n\n#create matrix of correlation coefficients and p-values<\/span>\nrcorr( as.matrix<\/span> (df))\n\n assists rebound points\nassists 1.00 -0.24 -0.33\nrebounds -0.24 1.00 -0.52\npoints -0.33 -0.52 1.00\n\nn=8 \n\nP\n assists rebound points\nassists 0.5589 0.4253\nrebounds 0.5589 0.1844\npoints 0.4253 0.1844<\/strong><\/span><\/pre>\n \u00d6rnek 3: Do\u011frulama i\u015flevi<\/strong><\/span><\/h3>\n
library<\/span> (corplot)\n\n#visualize correlation matrix<\/span>\ncorrplot(cor(df))\n<\/strong><\/span><\/pre>\n![\"\"](\"https:\/\/statorials.org\/wp-content\/uploads\/2023\/08\/corrplot1.jpg\")
<\/p>\n \u00d6rnek 4: Do\u011frulama i\u015flevi<\/strong><\/span><\/h3>\n
library<\/span> (ggcorrplot)\n\n#visualize correlation matrix<\/span>\nggcorrplot(cor(df))\n<\/strong><\/span><\/pre>\n![\"\"](\"https:\/\/statorials.org\/wp-content\/uploads\/2023\/08\/corrplot2.jpg\")
<\/p>\n Ek kaynaklar<\/strong><\/span><\/h3>\n
R’de k\u0131smi korelasyon nas\u0131l hesaplan\u0131r<\/a>
R’de kayan korelasyon nas\u0131l hesaplan\u0131r<\/a><\/p>\n","protected":false},"excerpt":{"rendered":"