Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

Hi I have a equation like the following that I want to calculate.

The equation is given by :

enter image description here

In this equation x is an arrary from 0 to 500. The value of t = 500 i.e upper limit of the integration.

Now I want to compute c as c(500,x).

The code that I have written so far is as follows:

x <- seq(from=0,by=0.5,length=1000)

integrand <- function(t)t^(-0.5)*exp((-x^2/t)-t)
integrated <- integrate(integrand, lower=0, upper=t)
final <-  pi^(-0.5)*exp(2*x)*integrated

The error I get is as follows:

Error in integrate(integrand, lower = 0, upper = t) : 
  evaluation of function gave a result of wrong length
In addition: Warning messages:
1: In -x^2/t :
  longer object length is not a multiple of shorter object length
2: In -x^2/t - t :
  longer object length is not a multiple of shorter object length
3: In t^(-0.5) * exp(-x^2/t - t) :
  longer object length is not a multiple of shorter object length

But it doesn't work because there is a variable x inside the integrand which is an arrary. Can anyone suggest how can I compute the integration first and then calculate the total expression for each value of x ? If I change the value of x in the integrand to constant I can compute integration but I want to compute for all the values of x from 0 to 500.

Thank you so much.

share|improve this question
When using integrate the function needs to vary with the name of the variable that is being integrated, which in your case is \theta rather than "x". – 42- Apr 1 '13 at 0:24
I understand that. How can I change the expression with x outside of the integrand. It seems the exponential function is connected with both x and thita. How can I separate those variables ? – Jdbaba Apr 1 '13 at 0:25
generally one would use sapply( vector, FUN=...) and write up you FUN to take a single X variable. But do not call it "x" because you need that to be the variable that gets passed to integrate. What's the background of this problem? – 42- Apr 1 '13 at 0:33
This is a solution of the continuous release of a dye in a 1 D channel. – Jdbaba Apr 1 '13 at 0:38
The reason I ask is that my R solution breaks down for some values of X and that may depend on how you are presenting the problem. At one point you said x was an array of 500 and another point you said the limits of integration were to 500. It seemed as though you were conflating their roles. – 42- Apr 1 '13 at 0:47
up vote 1 down vote accepted

Well, here is some code, but it blows up after t=353:

Cfun <- function(XX, upper){
      integrand <- function(x)x^(-0.5)*exp((-XX^2/x)-x)
      integrated <- integrate(integrand, lower=0, upper=upper)$value
      (final <-  pi^(-0.5)*exp(2*XX)*integrated) }
sapply(1:400, Cfun, upper=500)
share|improve this answer
Thank you so much for sharing this code. I don't know why the equation behaved weird after t=353. But at least I can look the profile before t=353. Thanks. – Jdbaba Apr 1 '13 at 1:30
Be sure use a graphical view: plot( sapply(1:300, Cfun, upper=500) ); lines(sapply(1:300, Cfun, upper=500) ) – 42- Apr 1 '13 at 5:32

I'd put the loop over values for x outside the integration. Iterate over the x-values and perform the integration for each one inside. Then you'll have C(x) as a function of x suitable for plotting.

You realize, of course, that the indefinite integral can be evaluated:

Maybe that will help you see what the answer looks like before you get started.

share|improve this answer
In that integral expression x is a constant. – 42- Apr 1 '13 at 0:25
Yes, I know. You'll substitute a value for x and get the value of the integral. Keep arrays of x and c and you'll have a plot of c versus x. – duffymo Apr 1 '13 at 0:29
@duffmyo : Thank you so much for your solution. Can you suggest what should the syntax should be ? The link to the wolframalpha was very useful. I am new to R so I am having problem with syntax. – Jdbaba Apr 1 '13 at 0:40
Sorry, not enough of an expert in R to dash it off. I will think about it and try and post whatever might be helpful. I'm trying to learn R, too. – duffymo Apr 1 '13 at 0:41
I do not think the Wolfram expression was constructed properly. The variable of integration is not squared in the numerator of the exp argument. – 42- Apr 1 '13 at 0:43

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.