# Calculate depth of array

I want to calculate the depth of array as per the formula in the image. I have implemented the following code but I am not able to get correct results. Input contains the size of the array n and elements

``````depth=0;
for(int i=0;i<n-1;i++)
{

depth=depth+arr[i]+(1/arr[i+1]);
}
``````
• Please provide sample input and output. Jul 7 '19 at 14:07
• this formula is not clear enough, please provide clear formula. Jul 7 '19 at 14:09
• @NiVeR input contains an array of size n Jul 7 '19 at 14:10
• it can be a recursion problem, as a recursion problem, always think about the base case, which is the last step. so if you wish to implement it iteratively, you need to go from n-1 to 0, not 0 to n-1 Jul 7 '19 at 14:11
• the same question was asked yesterday stackoverflow.com/questions/56912049/… Jul 7 '19 at 14:28

try this, its simplest to do with recursion -

``````static double calc_depth(int arr[], int i) {
return arr[i] + (i<arr.length-1 ? + (1.0 / calc_depth(arr, i+1)) : 0.0);
}

public static void main(String args[]) {
int[] a = {2, 1};
System.out.println(calc_depth(a, 0));
}
``````
• @SumeetNegi, I debugged it, try it now. Jul 7 '19 at 14:22
• @harold that edge case is not resolvable unless you know the actual value of 1/0 Jul 7 '19 at 14:24
• it has passed 2 test cases. But 11 hidden cases are failing. Should all the values have to be taken as BigInteger? Jul 7 '19 at 14:27
• @SumeetNegi what are constraints for this problem. escpecially the number limit Jul 7 '19 at 14:28
• 1<=n<=50 and 1<= arr[¡] <= 1018 where arr[¡] is the ith element of the array @Thomas Jul 7 '19 at 14:34

I don't have a c++ editor now, but the idea is the same: you can do this in your way, this is my python code:

``````
#!/usr/bin/python
# -*- coding: utf-8 -*-

def cal(arr):
depth, n = 0.0, len(arr)
# go from n - 1 to 0
for i in range(n - 1, -1, -1):
if depth == 0.0:
depth = arr[i]
else:
depth = (arr[i] + 1.0 / depth)
return depth

arr = [10, 20, 30]
print cal(arr)

``````

As I mentioned in comment, if you wish to implement it iteratively, you need to go from n-1 to 0, not 0 to n-1, and you need to solve the base case. Also, this one can be implemented in a recursive way as first answer.

It looks like the C++ has been removed in the meantime, so if you still want c++, here's almost an one-liner:

``````#include <vector>
#include <numeric>
double depth(const std::vector<double>& array){
return std::accumulate(array.rbegin(),array.rend(),std::numeric_limits<double>::infinity(),[](double s, double a){
return a + 1.0/s;
});
}

#include <iostream>
int main(){
std::vector<double> v{ 1.0,2.0,3.0, 4.0, 5.0, 6.0, 7.0, 8.0};

std::cout<<depth(v);
}
``````

But you won't get very precise results for continued fractions due to the floating-point precision.

You can do it like :

``````double ans=0;
for(int i=n-1;i>1;i--){
arr[i-1] = arr[i-1] + (double)(1/arr[i]);
ans = arr[i-1];
}
``````