# How to use the sum function in a for loop in R?

We want to calculate the value of an integral in linear plot. For a better understanding look at the photo. Let's say the overall area is 1. We want to find what the value in a certain part is. For instance we want to know how much % of the overall 100% lay within the 10th and 11th month if everything refers to months and A as maximum stands for 24. We can calculate a integral and then should be able to get the searched area by F(x) - F(x-1) I thoght about the following code:

``````a <- 24
tab <-matrix(0,a,1)
tab <-cbind(seq(1,a),tab)
tab<-data.frame(tab)

#initialization for first point
tab[1,2] <- (2*tab[1,1] / a - tab[1,1]^2 / a^2)

#for loop for calculation of integral of each point - integral until to the area
for(i in 2:nrow(tab))
{tab[i,2] <- (2*tab[i,1] / a - tab[i,1]^2/ a^2) - sum(tab[1,2]:tab[i-1,2])}
#plotting
plot(tab[,2], type="l")
``````

If you see the plot - it's confusing. Any ideas how to handle this correct?

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The base R function `integrate()` can do this for you:

``````f <- function(x, A) 2/A - x / A^2

integrate(function(x)f(x, 24), lower=10, upper=11)

0.06510417 with absolute error < 7.2e-16
``````
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but why does it have an standard error? – Fabian Stolz Jun 21 '12 at 20:24
It's not a standard error, but an indication of the numeric error introduced by the numeric integration. – Andrie Jun 21 '12 at 20:27

Using the formulas directly:

``````a <- 24                          # number of divisions
x <- c(seq(1,a))                 #
y <- x*2/a - x^2/a^2             # F(x)
z <- (x*2/a - x^2/a^2) - ((x-1)*2/a - (x-1)^2/a^2) # F(x) - F(x-1)
``````

Then do the binding afterward.

``````> sum(z)
[1] 1
``````
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