# How to sum sequence of floors numbers?

How can I sum the following sequence:

``````⌊n∕2⌋ + ⌊n+1∕2⌋ + ⌊n+2∕2⌋ + ...... + (n-1)
``````

What I think is discard the floor and sum what inside each floor !! This is just a guess.

Give me any hint or general formula that helps me to sum them

Thanks

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is n guaranteed to be an integer? –  ggreiner Feb 1 '12 at 23:53
That doesn't look like a well defined sequence to me can you elaborate on the generating function? –  RussS Feb 1 '12 at 23:55

Since you're asking on a programming Q&A site, I must assume you want a computational answer. Here goes...

``````int sum = 0;
for (int j=0; j<n-1; ++j) {
sum += (n+j)/2;
}
``````

The `int` will automatically truncate to the floor.

The less smart ass answer is this. Let `n = 2k`. Then the sum becomes

``````k + k + k+1 + k+1 + ... + 2k-1 + 2k-1 = 2(k + k+1 + ... + 2k-1)
``````

and you can use the formula

``````1 + 2 + ... + a = a(a+1)/2
``````

with a bit of algebra to finish it off.

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This is quite smart. However, it works for even n (say n=2, then k=1 and it's 1 (2/2) + 1 (3/2) + 2 (4/2) + 2 (5/2)... works fine), but for odd n it needs correction (say n=3, then k=1 and its same as before while it should've been (3/2)=1 + (4/2)=2 + ...) by skiping the first k. –  Ranty Feb 2 '12 at 0:07
@Ranty For odd `n`, write `n=2k+1` and follow the same logic. Then the first and last terms are not doubled, but the middle terms are, so you get something like `k + 2(k+1 + ... + 2k-2) + 2k-1`. –  PengOne Feb 3 '12 at 20:32

Assuming `n` is even, then `floor(n/2) == floor((n+1)/2)`. And `floor((n+2)/2) == floor(n/2) + 1`.

The other piece in the puzzle is the expression for the sum of an arithmetic sequence, which can be found here.

-

for the arbitrary range 1..20 you could do:

``````sum = (1..20).inject{|sum, n| sum + (n/2.0).floor}
``````

and of course you could use any range. This example is in Ruby, but you could do something similar in many languages - the algorithm is the same.

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As long as you're not asking for a clever algorithm or optimizations, the simplest approach I can think of is good old trusty looping. In C#, one way to do that would look something like this:

``````namespace Practice
{
using System;

public class SequenceAggregator
{
public double FirstElement
{
get;
set;
}

public int Length
{
get;
set;
}

public double Calculate()
{
double sum = 0;

for (var i = FirstElement; i < FirstElement + Length; i++)
{
sum += Math.Floor(i / 2);
Console.WriteLine("i={0}, floor(i/2)={1}, sum={1}",
i, Math.Floor(i/2), sum);
}

return sum;
}
}
}
``````

And you can use this class in the following way:

``````namespace Practice
{
using System;

class Program
{
static void Main(string[] args)
{
SequenceAggregator a = new SequenceAggregator();
a.FirstElement = 1;
a.Length = 3;
Console.WriteLine("Sum:{0}", a.Calculate());
}
}
}
``````
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