So, I've written this code that should effectively estimate the area under the curve of the function defined as h(x). My problem is that i need to be able to estimate the area to within 6 decimal places, but the algorithm i've defined in estimateN seems to be using too heavy for my machine. Essentially the question is how can i make the following code more efficient? Is there a way i can get rid of that loop?

```
h = function(x) {
return(1+(x^9)+(x^3))
}
estimateN = function(n) {
count = 0
k = 1
xpoints = runif(n, 0, 1)
ypoints = runif(n, 0, 3)
while(k <= n){
if(ypoints[k]<=h(xpoints[k]))
count = count+1
k = k+1
}
#because of the range that im using for y
return(3*(count/n))
}
#uses the fact that err<=1/sqrt(n) to determine size of dataset
estimate_to = function(i) {
n = (10^i)^2
print(paste(n, " repetitions: ", estimateN(n)))
}
estimate_to(6)
```

`estimate_to(6)`

might be a little too greedy: your current algorithm will likely make R run out of memory trying to allocate numeric vectors of length 1e12. – flodel Nov 19 '12 at 2:19`x`

closer to`1.0`

contribute more to the value of the integral than those closer to`0.0`

. – Hristo Iliev Nov 19 '12 at 9:44