You are looking to buy a new camper, but you are a bit concerned that your truck might not be able to safely pull the camper you are currently interested in purchasing. So you do some calculations.
First, you look up your truck’s Gross Combined Vehicle Weight Rating (GCVWR); the maximum total weight it can haul including the weight of the truck itself. You also have a list of items you would want to bring on a camping trip.
But wait! You want a bit of wiggle room too in case you want to bring any extra items with you. So you want to reserve a bit of towing capacity, after factoring in the weight of the vehicle. That is, the total weight of the trailer and goods you want to bring should not exceed $90\% $ of the towing capacity remaining after factoring in the truck.
The first line of input contains three integers $G$ ($5\, 000 \leq G \leq 25\, 000)$, $T$ ($3\, 000 \leq T \leq 12\, 000$), and $N$ ($1 \leq N \leq 100$). Here, $G$ is the GCVWR in lbs, $T$ is the weight of your truck in lbs, and $N$ is the number of items you want to bring camping. You are guaranteed both $G$ and $T$ are multiples of $10$.
The second line contains $N$ space-separated integers $w_1, \ldots , w_ N$. For each $1 \leq i \leq N$, $w_ i$ ($1 \leq w_ i \leq 500$) is the weight (in lbs) of the $i$’th item you want to bring on the trip.
You are further guaranteed $T \leq G - 2\, 000$ and that the total weight of all items is at most $90\% $ of the towing capacity that remains after subtracting the weight of the truck from the GCVWR.
Output a single line containing a single integer that is the maximum possible weight of a trailer you can pull subject to the restrictions described above.
Explanation of First Sample
The remaining towing capacity after subtracting out the weight of the truck is $G-T = 9\, 000$ lbs, so the weight of the items plus the weight of the trailer you want to purchase should not exceed $90\% $ of this, namely $8\, 100$ lbs.
The total weight of items you want to bring is $1\, 205$, so the weight of the trailer you want to purchase should not exceed $6\, 895$ lbs.
|Sample Input 1||Sample Output 1|
12000 3000 5 400 25 200 80 500
|Sample Input 2||Sample Output 2|
10000 4000 7 110 10 20 10 5 3 5