The domain of the beta distribution as defined in R is 0 <= x <= 1 and as
shown by David Winsemius it is undefined outside [0,1]. But thats sort of
the question I have.
To elaborate, I have a variable with 0 as its natural lower limit but can
assume any positive number as an upper limit. So its do
On Jun 23, 2011, at 8:55 AM, Adan_Seb wrote:
Here is a self-contained example of my problem.
set.seed(100)
x = rbeta(100, 10.654, 10.439)
# So the shape parameters and the exteremes are
a = 10.654
b = 10.439
xmax = 1
xmin = 0
# Using the non-standardized form (as in my application and this
s
Here is a self-contained example of my problem.
set.seed(100)
x = rbeta(100, 10.654, 10.439)
# So the shape parameters and the exteremes are
a = 10.654
b = 10.439
xmax = 1
xmin = 0
# Using the non-standardized form (as in my application and this shouldn't
make any difference) of the
# Beta densi
Sent: Wednesday, June 22, 2011 6:46 PM
To: r-help@r-project.org
Subject: [R] numerical integration and 'non-finite function value' error
Dear R users,
I have a question about numerical integration in R.
I am facing the 'non-finite function value' error while
Dear R users,
I have a question about numerical integration in R.
I am facing the 'non-finite function value' error while integrating the
function
xf(x)
using 'integrate'. f(x) is a probability density function and assumed to
follow the three parameter (min = 0) beta
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