# Plotting the curve of a function with parametric integral using R

With

``````n<-3; rho<-0.5;
``````

I want to draw the picture of the function

``````g<-function(r)
{
integrate(
function(beta)
{
1/(cosh(beta)-rho*r)^(n-1)
}
,lower=0,upper=Inf)
}
``````

I tried

``````curve(g(x),from=0,to=1)
``````

but R complained that

In cosh(beta) - rho * r : longer object length is not a multiple of shorter object length

I think all variables are scalar. So how to draw it correctly? Thank you.

-

## migrated from stats.stackexchange.comJan 11 '12 at 19:31

This question came from our site for people interested in statistics, machine learning, data analysis, data mining, and data visualization.

``````g<-function(r)
{
integrate(
function(beta)
{
1/(cosh(beta)-rho*r)^(n-1)
}
,lower=0,upper=Inf)\$value   # integrate would return a list otherwise
}
gv <- Vectorize(g)
# Since `g` is not naturally going to handle the vector that `curve` will send
curve(gv(x),from=0,to=1)
``````
-
+1 Wow. Are you spying on me? That's literally the answer I was just about to post, complete with the choice of `gv <- Vectorize()`, and the addition of `\$value`, almost letter for letter. –  joran Jan 11 '12 at 20:03
Yes, my mind reading powers now extend to potential answerers as well as those from posters. –  BondedDust Jan 11 '12 at 20:05
Oops, I thought the message "1.568874 with absolute error < 1e-06" is friendly representation of 1.568874 –  ziyuang Jan 11 '12 at 20:24
I would like to add: This shows why we (especially me :-) ) should always double-check the "Value" part of function documentation, to avoid just this sort of confusion as to what the function returns. The naive user (aka me most of the time) types `integrate(funcfoo,0,1)` and gets a nice number printed to the console, and completely forgets that `integrate(funcfoo,0,1) ->intfoo` produces something rather different. –  Carl Witthoft Jan 11 '12 at 20:24
Yeah, it would be good if I could claim to have always checked the "Value" section but in this case I just used str() on g(0) and was immediately reminded of the more complex nature of the returned object. –  BondedDust Jan 11 '12 at 20:39