Evenly distribute values over a time period

I have got a variable amount of items, and a variable date range that I need to distribute them over. Lets say I have 3 items and I need to distribute them over 6 days. What I would want is to have every second day have an item, and it does not matter if the first day has an item or not. If I had 7 items over 6 days, one of the days would get 2 items, it does not matter which day that is either.

Sadly, it turns out I really suck at maths, so I have no real idea on how to do this in a relatively nice and pretty way, or if it is even possible. I could probably figure it out in a hacky way, but I'm hoping to learn something from it as well :P

The language used is PHP.

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Is this an homework? –  Eineki Nov 17 '09 at 12:24
No, it's for an application I'm building, and my math fails :P –  Marco Nov 17 '09 at 12:43

``````//If you get the period between items:
\$period = \$days / \$items;
//Then you can iterate through the items:
for (\$i = 0; \$i < \$items; \$i++)
{
//and have a function that will add an item to the day number given as a parameter.
}
``````
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note that \$days and \$items are both just counts of how many days and items there are. I accidentally typed "days" instead of "items" in the for loop, but fixed that in an edit. the floor() function just removes any decimal places. –  Oliver Nov 17 '09 at 12:38

Essentially you're doing division and then distributing the remainder sequentially. So the steps go something like this:

• count the number of days
• count the number of items

• if items > days

• divide the number of items by the number of days (items per day) \$x
• take the modulus of items/day \$m (this is the remainder)
• cycle through the days placing \$x items on each day, and 1 extra item on the first \$m days
• if days > items

• divide the number of days by the number of items (days per item) \$x
• cycle through the days stepping by \$x and placing 1 item on each day (keep track of how many items are left)
• when you arrive past the last day, if there are any items left, loop over the days again starting at day0+1 and stepping by \$x
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I'm not sure which of the approach would have worked the best, but I went with this one, thank you :) –  Marco Nov 17 '09 at 16:32
Oliver's approach is more efficient as it doesn't require 2 different methods. This solution is less elegant, but perhaps more immediately understandable. –  dnagirl Nov 17 '09 at 17:19

(items in day i) = floor( (i+1) * items / days) - floor( i * items / days), where i is 0-based.

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