# cor(x,y) when x is POSIXct

I am calculating a linear regression between an age (numeric) vector and a date (POSIXct) vector. What is the most convenient way to transform the date so that cor is happy with it?

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what about `as.numeric()`? I've not through what possible impacts this has on the interpretation...but that should satisfy `cor()`. –  Chase Oct 2 '12 at 0:42
Sure you can, but should you? –  Joshua Ulrich Oct 2 '12 at 0:50
perhaps you'd be better off looking into a time series model, starting with `arima()`? –  Chase Oct 2 '12 at 0:56
@dmvianna what are you trying to test with this analysis? –  Paul Hiemstra Oct 2 '12 at 5:24
@PaulHiemstra, H1 is: People who joined this organisation more recently tend to resign sooner. So for axis x I have join date, and for y I have length of membership (from join date to resign date). –  dmvianna Oct 3 '12 at 0:04

As mentionned in @Chase's comment, you can use directly your dates in `cor` if you transform them into numeric objects with `as.numeric`.

``````#First some dummy data:
age<-ceiling(runif(20,min=25,max=45))
joindate<-sample(seq(as.Date("01/01/1990","%d/%m/%Y"),
as.Date("31/12/2010","%d/%m/%Y"), by="day"), 20)
age
[1] 35 33 33 30 39 30 32 26 45 37 28 44 35 31 39 44 44 40 29 39
joindate
[1] "1999-07-03" "2006-08-09" "2001-11-22" "2003-02-11" "1991-06-23" "2007-04-20" "1993-04-28" "1997-04-08" "1999-08-16"
[10] "2005-02-17" "2002-11-01" "1991-09-17" "2006-05-03" "1995-12-02" "2007-06-20" "2000-02-26" "2005-10-01" "1997-06-13"
[19] "2007-06-09" "1994-11-27"

as.numeric(joindate)
# Dates are transformed into a number that corresponds to the number of days since the origin date (as a convention the 1970/01/01)
[1] 10775 13369 11648 12094  7843 13623  8518  9959 10819 12831 11992  7929 13271  9466 13684 11013 13057 10025 13673  9096

cor.test(age, as.numeric(joindate))

Pearson's product-moment correlation

data:  age and as.numeric(joindate)
t = -0.9641, df = 18, p-value = 0.3478
alternative hypothesis: true correlation is not equal to 0
95 percent confidence interval:
-0.6048037  0.2449517
sample estimates:
cor
-0.2215884
``````
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