Score : $600$ points
Takahashi will participate in a programming contest, which lasts for $T$ minutes and presents $N$ problems.
With his extrasensory perception, he already knows that it will take $A_i$ minutes to solve the $i$-th problem.
He will choose zero or more problems to solve from the $N$ problems so that it takes him no longer than $T$ minutes in total to solve them.
Find the longest possible time it takes him to solve his choice of problems.
Input is given from Standard Input in the following format:
$N$ $T$ $A_1$ $\dots$ $A_N$
Print the answer as an integer.
5 17 2 3 5 7 11
17
If he chooses the $1$-st, $2$-nd, $3$-rd, and $4$-th problems, it takes him $2+3+5+7=17$ minutes in total to solve them, which is the longest possible time not exceeding $T=17$ minutes.
6 100 1 2 7 5 8 10
33
It is optimal to solve all the problems.
6 100 101 102 103 104 105 106
0
He cannot solve any of the problems.
7 273599681 6706927 91566569 89131517 71069699 75200339 98298649 92857057
273555143
If he chooses the $2$-nd, $3$-rd, and $7$-th problems, it takes him $273555143$ minutes in total to solve them.