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I got this question today in an interview: write a function to calculate the total number of gifts received for any day in the 12 days of christmas song. I wrote a simple function using a for() loop in c#'ish code that worked. Then the interviewer asked me to extend it to any number of days. The conversation then turned to how to optimize the loop. Apparently there's a cool math trick that will do this within the limits of whatever your integer is. Anyone know what it is and what it's called? Any language is ok and a reference to the algorithm would be fabuloso.

Answers that use recursion are NOT what I'm looking for.

EDIT: Answer for day 2 is 4 gifts total, not 3 since I will have 2 Trees (1 from today, 1 from yesterday) and 2 partridges. On day 12 I'll have received a total of 364. I want the formula that lets me input 12 and get 364.

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math "trick"? It's not a trick, it's algebra. On day n, you get g(n) = 1 + 2 + ... + n gifts. So in N days, you get a total of T(N) = g(1) + g(2) + ... + g(N) objects. –  Alok Singhal Feb 26 '10 at 3:06
    
You have to know N to code this function. –  No Refunds No Returns Feb 26 '10 at 3:20
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Of course. Isn't this the point? To know the number of gifts in N days, you need to know N. –  Alok Singhal Feb 26 '10 at 3:35
    
You have to know the song to code this function. –  cschol Feb 26 '10 at 3:58
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3 Answers

up vote 14 down vote accepted
  • On the first day, you get 1.
  • On the second day, you get 1 + 2.
  • On the third day, you get 1 + 2 + 3.
  • ...
  • On nth day, you get 1 + 2 + 3 + ... + n.

The sum 1 + 2 + ... + n is n(n+1)/2. So the total number, T(N) is the sum of n(n+1)/2 for n in 1..N, where N is the number of days.

Now, n(n+1)/2 = n^2 / 2 + n / 2, and sum of n^2 for n in 1..N is N(N+1)(2N+1)/6, so you get:

T(N) = N(N+1)(2N+1)/12 + N(N+1)/4
     = N(N^2 + 3N + 2) / 6

No loops. No recursion.

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+1 for correctly modeling the question. –  Jeff Meatball Yang Feb 26 '10 at 3:48
    
Easy once you see it. Thanks. And I REALLY love SO. It's my new favorite site. –  No Refunds No Returns Feb 26 '10 at 4:13
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On the n th day, we get 1 + 2 + 3 + ... + n gifts.

Or ... (1 + n) + (2 + n-1) + ...

In other words, (n + 1) * n/2.

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The question asks for total gifts after N days, not the gifts on the nth day. –  Jeff Meatball Yang Feb 26 '10 at 3:49
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That's the number of gifts received on day N itself, not the number of gifts received cumulatively up to day N. –  Jonathan Leffler Feb 26 '10 at 3:51
    
@Jeff Meatball Yang - +1 for 1st person to understand the question. Everyone upvoting doesn't get it. –  No Refunds No Returns Feb 26 '10 at 4:10
    
@No Refunds No Returns: Maybe it's not that noone understands the question. Maybe you don't understand the answer or the question is wrong :) Seriously though, people are not giving the full answer, although you should be able to extrapolate from the partial answer. What you actually have is a geometric series where each term happens to be an arithmetic series. –  Duncan Feb 26 '10 at 4:24
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The $P$-th type of present (where the $1$st is partridges, the $2$nd is turtle doves, etc.) comes in quantities of $P = \sum_{X = 1}^{P} 1$.

On day $D$, you receive presents of type $1$ through $D$, for a total of $\sum_{P = 1}^{D} \sum_{X = 1}^{P} 1$ many presents on that day.

And so, if the days run from $1$ through $N$ (canonically, $N$ is 12, but our interest now is in allowing it to vary), you receive overall $\sum_{D = 1}^{N} \sum_{P = 1}^{D} \sum_{X = 1}^{P} 1$.

This counts the number of non-decreasing triples $1 \leq X \leq P \leq D \leq N$.

This is the same as the number of increasing triples $1 \leq X < P + 1 < D + 2 \leq N + 2$.

So the answer is $\binom{N + 2}{3} = \frac{(N + 2)(N + 1)N}{6}$.

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Oh, I thought this site supported LaTeX in the same way as MathOverflow/math.stackexchange/etc., but I see I was mistaken... –  Sridhar Ramesh Nov 30 '12 at 20:20
    
You can use the ` marks to surround something in order to set something apart, but yes, unfortunately LaTeX is not currently part of the SO. –  YYY Nov 30 '12 at 20:39
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