# Algorithm - Max number of grains that can be transported

I came across an interview question asked at Google which I can not solve:

There is a pile of `N` kg grains at an oasis located in a distance of `D` km to a town. The grains need to be transported by a camel cart whose initial location is at the oasis. The cart can carry `C` kg of grains at a time. The camel uses the grains as fuel while transporting them. It consumes `F` kg/km.

Write a function that computes the maximum amount of grains (`X` kg) that can be transported to the town.

I tried to use recursion but I couldn't get much further without confusing myself.

Here's what I have so far:

``````number of transports = N / C

fuel amount for distance D = D * F

X = N - ((number of transports) * 2 * (fuel amount for distance D))
``````
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Hint: the camel always starts each round-trip with `C` kilograms of grain. Hint 2: If the camel unloads all the grain at it destination, it will starve on the way back. Hint 3: the camel does not need to return to the oasis. – Jan Dvorak Nov 19 '12 at 2:43

Assuming that N, D, C and F are inputs, -

``````float computeMaxGrains(float N, float D, float C, float F)
{
//Case when the cart can carry all grains at once
if(N <= C)
{
float remainingGrains = N - D*F;
if(remainingGrains >= 0)
{
return remainingGrains;
}
else
{
//out of fuel
return 0;
}
}

// Grains consumed per Km = (Total Number of Trips) * F
// Total Number of Trips = 2*(N/C) + 1
float grainsConsumedPerKm = (float) (2*(Math.floor(N/C)) + 1);

// Remaining grains after Camels fuel = C*(N/C - 1)
float remainingGrains = (float) (C*(Math.floor(N/C)));

// Distance that the Camel is able to travel before the camel is
// 1 less round trip =
// (N - Remaining Grains) / grainsConsumedPerKm
// From equation N - (grainsConsumedPerKm * distanceTravelled) =
// Remaining Grains
float distanceTravelled = (N - remainingGrains) / grainsConsumedPerKm;

if(distanceTravelled >= D)
{
return N - (D * grainsConsumedPerKm);
}

//Use recursion for every 1 less round trip
return computeMaxGrains(remainingGrains, D-distanceTravelled, C, F);
}
``````
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Awesome. Thanks for the great explanation takyon and for showing how recursion could help here. – user1684308 Nov 19 '12 at 19:47
I think you missed multiplying by F while calculating grainsConsumedPerKm? – Rajeev Sep 5 '14 at 6:52

I think this problem is best worked iteratively, forwards. I'm going to split out the decision points. If I were writing one formula, I would use ?: All results are in Kg.

``````The first question is whether there is enough grain, and cart capacity, to
justify an initial trip from oasis to town. The camel would eat FD, so
if FD >= min(N,C) the answer is 0

If FD < min(N,C), the net amount transferred on the initial oasis to town
trip is min(N,C)-FD.

The camel is now in town, the remaining grain pile is N-min(N,C), and we
have to decide whether to send it back again. If C <= 2FD, no round trip
can be profitable.

Otherwise consider a round trip with at least C remaining at the oasis. That
gains net C-2FD (FD put in the cart in town to keep the camel fed getting
to the oasis, C-FD remaining in the cart when it gets back to town).

If N>C, we can do floor((N-C)/C) of those round trips, net gain
floor((N-C)/C)*(C-2FD).

After doing the initial run and any full cart round trips, the remaining
grain pile is N%C, the remainder on dividing N by C.

If N%C > 2FD it is worth doing a final trip to empty the grain pile, with
an additional net gain of N%C-2FD.
``````
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Really clear analysis, but it would help to explicitly mention the possibility that C-2FD could be negative (i.e. it's possible that it's a net loss to take a round trip from the town to the oasis and back, even if the very first trip is a net gain). – j_random_hacker Nov 19 '12 at 10:29
@j_random_hacker Thanks - I had that sentence in a draft, and somehow dropped it. I've edited my answer to put it back in. – Patricia Shanahan Nov 19 '12 at 14:11
You're welcome :) – j_random_hacker Nov 19 '12 at 14:43
Thanks Patricia for the detailed analysis. – user1684308 Nov 19 '12 at 18:39

As a idea, while there is more than D*F grain in the oasis the camel will travel, with C kg, or however much is left in the oasis. The camel consumes D*F kg on the trip there, drops off his load - 2*D*F kg of grain and returns if there is enough grain left to warrant the return journey.

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This is just a guess. I am not absolutely sure.

Let G(x) denote the maximum amount of grain transported to a distance x from the source. Then

``````G(x+1)= (G(x)/C)*(C-2F) + max(F,G(x)%C - F)
``````

Now, G(0)=N and we need to find G(D) using the above formulation.

The second term max(F,G(x)%C-F) denotes

1. F = when he does not come back to collect the remaining grains in last visit
2. G(x)%C - F =remaining grain in the last visit and then consumes F to go back to the destination
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