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my problem is that I have calculated Spearman rank correlations between two variables. One reviewer asked me if I could add also test statistics for all coefficients where p < 0.001.

Here is one result:

> cor.test(pl$data, pl$rang, method= "spearman")

#       Spearman's rank correlation rho

data:  pl$data and pl$rang
S = 911164.6, p-value = 1.513e-05
alternative hypothesis: true rho is not equal to 0 
sample estimates:

Is the test statistics equal to S = 911164.6? Is it OK that it is so big number? Sorry in advance if the question is not very professional but I spend quite some time searching for the answers in the books and on internet. :( Thank you for the help in advance.

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presumably it is the sum of squared rank differences (see the Wikipedia entry on Spearman rank correlation); its magnitude signifies just that you have a big data set, I think ... – Ben Bolker Mar 14 '13 at 12:50
so if someone ask from me to write also test statistics I could write S = 911164.6 and rho= -0,335? – Eco06 Mar 14 '13 at 16:11
yes ............ – Ben Bolker Mar 14 '13 at 16:40
Thank you Ben ... – Eco06 Mar 14 '13 at 16:56
@MtS I flagged your question to be migrated to but it was declined. You might want to go to that site yourself and ask them about your large S value, though BenBolker and RichieCotton have basically answered the question. – Ben Mar 22 '13 at 23:08

1 Answer 1

up vote 3 down vote accepted

Yes. The ?cor.test help page (in the Value section) describes the return value from cor.test as:

 A list with class ‘"htest"’ containing the following components:  

statistic: the value of the test statistic.

Adapting the example on that page, we see

x <- c(44.4, 45.9, 41.9, 53.3, 44.7, 44.1, 50.7, 45.2, 60.1)
y <- c( 2.6,  3.1,  2.5,  5.0,  3.6,  4.0,  5.2,  2.8,  3.8)
(result <- cor.test(x, y, method = "spearman"))
#         Spearman's rank correlation rho

# data:  x and y 
# S = 48, p-value = 0.0968
# alternative hypothesis: true rho is not equal to 0 
# sample estimates:
# rho 
# 0.6 
#  S 
# 48 

The statistic is given by (n ^ 3 - n) * (1 - r) / 6 where n is the length of x and r <- cor(rank(x), rank(y)).

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Thanks you for this quick answer. So it is OK that my S is 911164? What could be the reason for so high number? – Eco06 Mar 14 '13 at 11:30
@MtS That specific statistics question might be better suited to rather than here, which is focused on coding. – Ben Mar 14 '13 at 14:35
Ben is it possible to copy the question to this other side? – Eco06 Mar 14 '13 at 16:12
@MtS: Read my updated answer. S is large because you have a lot of data, and S is proportional to the length of the input vectors cubed. – Richie Cotton Mar 14 '13 at 16:25
in wikipedia I found that it is possible to test the significance with: rho*sqrt((n-2)/1-rho^2) or 0.6*sqrt((9-2)/1-0.6^2) = 1.546. This is not the test statistic? :( – Eco06 Mar 14 '13 at 16:42

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