I am practicing making decision trees using the package called 'tree'.

```
#install.packages("ISLR")
set.seed(666)
library(ISLR)
index=sample(1:nrow(OJ),800,replace=F)
OJtrain=OJ[index,]
OJtest=OJ[-index,]
#install.packages("tree")
library(tree)
OJtraintree=tree(Purchase~.,data=OJtrain)
OJtraintree
```

The output from this is:

```
node), split, n, deviance, yval, (yprob)
* denotes terminal node
1) root 800 1073.00 CH ( 0.60625 0.39375 )
2) LoyalCH < 0.508643 353 415.10 MM ( 0.27479 0.72521 )
4) LoyalCH < 0.277977 161 112.80 MM ( 0.11180 0.88820 )
8) LoyalCH < 0.035047 55 0.00 MM ( 0.00000 1.00000 ) *
9) LoyalCH > 0.035047 106 96.58 MM ( 0.16981 0.83019 ) *
5) LoyalCH > 0.277977 192 260.10 MM ( 0.41146 0.58854 )
10) PriceDiff < 0.195 84 84.62 MM ( 0.20238 0.79762 )
20) SpecialCH < 0.5 67 49.01 MM ( 0.11940 0.88060 ) *
21) SpecialCH > 0.5 17 23.51 CH ( 0.52941 0.47059 ) *
11) PriceDiff > 0.195 108 147.30 CH ( 0.57407 0.42593 ) *
3) LoyalCH > 0.508643 447 348.80 CH ( 0.86801 0.13199 )
6) LoyalCH < 0.764572 189 214.20 CH ( 0.74603 0.25397 )
12) PriceDiff < -0.165 33 43.26 MM ( 0.36364 0.63636 ) *
13) PriceDiff > -0.165 156 143.70 CH ( 0.82692 0.17308 )
26) PriceDiff < 0.265 86 99.88 CH ( 0.73256 0.26744 ) *
27) PriceDiff > 0.265 70 30.66 CH ( 0.94286 0.05714 ) *
7) LoyalCH > 0.764572 258 90.94 CH ( 0.95736 0.04264 ) *
```

I understand that the rows with asterisks on the tree are terminal nodes. I'm struggling to follow the other stuff. Using row 7 as an example, I know that 'LoyalCH > 0.764572' is where the decision tree splits and branches to the terminal node, and CH is the qualitative value of the terminal node where customers are greater than 76.4572% loyal to CH (the data is preloaded with the ISLR package, CH is a juice brand). I'm assuming 258 is supposed to be the number of data points that wind up in that terminal node. I know that 90.94 is supposed to describe goodness of fit to the model, but I'm a little confused about the concept of deviance. Is a higher value of deviance bad? Does 90.94 indicate that it is a weaker fit? As for the numbers in the brackets, am I to understand that 0.95736 is the probability of each data point in this branch choosing CH?