# Complex shipping price calculations

Our website works out shipping totals for orders, every item in our database has a cubic size and there is a size limit for using courier vs freight for an item. but we get orders with multiple items and I notice it's calling things freight when not needed.

The parcel limit is 0.15m3 per courier ticket, if bigger than that they have to go by freight instead. Incidentally freight cost more on small consignments only becuase there is a minimum charge, if there wasn't, this would not be a problem at all.

I'm asking here because our programmer has a limited time before he leaves the country and this was not one of the urgent tasks we gave him, if we are to get it done at all then i need to help him in the right direction - but alas, I am not a programmer.

The Problem:
An order came in with 2 items, both 0.106 each to a local address

• website calls it a total of 0.212 and makes it freight @ \$42
• we can ship 2 boxes on a courier, \$10 total

but needs to only use freight if any ONE item is bigger than the limit of 0.15
so, it would see that order as (0.106=\$5) and (0.106=\$5) = \$10

For example:

1. suppose there was something more complex:
10 items in cart, 0.02 each. website would work it out as 0.2 and call it freight, but we could put it in 2 boxes and pay \$10

2. 5 items in cart, 0.01 x 4 and 0.12 x 1. website would work it out as 0.16 and call it freight, but we could send 2 cartons - 0.04 and 0.12 costing \$10

can it do this: if any ONE item is bigger than 0.15 make it all freight, otherwise add up how many tickets needed supposing we packed into biggest boxes possible example 2:

(0.01+0.01+0.01+0.01)=0.04=\$5,
(0.12)=0.12=\$5
==\$10

tricky i know, but its just maths lol, and it matters most because a ridiculous shipping price might stop an order.

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You'll want to read up on the Bin packing Problem. Figuring out if any item has volume > 0.15 is trivial. Figuring out how to pack 4 items, with volumes [0.1, 0.1, 0.04, 0.04] into two containers containing (0.1 + 0.04) each instead of [0.1, 0.1, (0.04 + 0.04)] is not. –  AlistairIsrael Jun 21 '13 at 4:29

Like @AlistairIsrael said this is the bin packing problem which is not completely trivial to solve.

However below is one solution to this problem.

If we go through all combinations of ways to package the items and try and find the minimal cost, then we have a solution. Note that this solution is a brute-force solution, and as such will quickly slow down as the number of items grow.

To find all possible ways to partition the shipment into different boxes; we can use the algorithm from this answer for that:

Translating function for finding all partitions of a set from python to ruby

Next we loop through all the different combinations and search for the minimum cost. The solution then works like this:

> optimize_shipping([0.01, 0.01, 0.01, 0.01, 0.12])
Shipping type: courier
Total price  : \$10
Packaging    : [[0.12], [0.01, 0.01, 0.01, 0.01]]

> optimize_shipping([0.01, 0.01, 0.12, 0.15, 0.12])
Shipping type: courier
Total price  : \$15
Packaging    : [[0.01, 0.12], [0.15], [0.01, 0.12]]

> optimize_shipping([0.09, 0.09, 0.01, 0.12, 0.15, 0.12])
Shipping type: courier
Total price  : \$25
Packaging    : [[0.12], [0.15], [0.12], [0.09, 0.01], [0.09]]

> optimize_shipping([0.01, 0.01, 0.01, 0.30])
Shipping type: freight

The code:

COURIER_LIMIT = 0.15
COURIER_PRICE = 5

class Array
def sum
inject(:+)
end

def partitions
yield [] if self.empty?
(0 ... 2 ** self.size / 2).each do |i|
parts = [[], []]
self.each do |item|
parts[i & 1] << item
i >>= 1
end
parts[1].partitions do |b|
result = [parts[0]] + b
result = result.reject do |e|
e.empty?
end
yield result
end
end
end
end

def optimize_shipping(boxes)
if boxes.any? { |b| b > COURIER_LIMIT }
puts "Shipping type: freight"
return
end

# Try and find the cheapest most optimal combination of packaging
smallest_box   = 9999
cheapest_price = 9999
cheapest_combination = []

# Go through all paritions and find the optimal distribution
boxes.partitions { |partition|
# Add up sizes per box
sizes = partition.map(&:sum)

# Check if any box got too big for courier, and skip if so
next if sizes.any? { |s| s > COURIER_LIMIT }

# Calculate total price for this combination
total_price = partition.length * COURIER_PRICE

if total_price <= cheapest_price
# Naive algo to try and find best average distriution of items
next if total_price == cheapest_price && sizes.min < smallest_box

# Save this new optimized shipment
smallest_box         = sizes.min
cheapest_price       = total_price
cheapest_combination = partition
end
}

puts "Shipping type: courier"
puts "Total price  : \$#{cheapest_price}"
puts "Packaging    : #{cheapest_combination.inspect}"
end
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If you want the most optimal solution, and are dealing with small-ish sets of items, then iterating through all partitions to find the lowest cost/smallest # of boxes will work. However, this approach will quickly run into the problem of exponential growth. That is, the # of partitions of 10 items is a 'manageable' 115975 but with 13 items it's over 27 million combinations. –  AlistairIsrael Jun 21 '13 at 10:28
@AlistairIsrael Yep, that's true. It was obvious already in testing as even with 10 items you can see the slowdown. Will update the answer. –  Casper Jun 21 '13 at 12:14

There is no code shown, but basically, you would take your orders which may be a collection such as an array, and do this:

orders = [0.01,0.16,0.01,0.01]
freight = orders.any? {|item| item > 0.15 }

Of course, there will need to be more logic, but you can now use the freight as true or false as a boolean to continue on the needed work.

I believe count will be your friend here as well.

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thanks - did i explain the problem well enough or would you like more info? –  user2507464 Jun 21 '13 at 4:10
That totally depends. Did I answer it well enough that you can use what was provided, or do you feel you need to provide more information. The solution I show is simply Ruby, not Rails specific. But the question so far is just Plain Old Ruby. –  vgoff Jun 21 '13 at 4:44