1.7 KB | 1707 chars
"""
[34635: Art Installation](https://www.acmicpc.net/problem/34635)
Tier: Bronze 2
Category: math, greedy, arithmetic
"""
import sys
from math import sqrt, pi, sin, factorial, ceil, floor
from datetime import datetime, timedelta
from collections import deque, defaultdict, Counter
from itertools import permutations, combinations, product
from bisect import bisect_left, bisect_right
from heapq import heappush, heappop, heapify
from functools import reduce, lru_cache
from operator import itemgetter, attrgetter, mul, add, sub, truediv
from typing import List, Tuple, Dict, Set, Any, Union
from fractions import Fraction
SYS_INPUT = True
RECURSION_LIMIT = 10 ** 7
SET_RECURSION = False
BLANK = " "
if SET_RECURSION:
sys.setrecursionlimit(RECURSION_LIMIT)
inp = lambda : sys.stdin.readline().rstrip() if SYS_INPUT else input()
mii = lambda : [*map(int,inp().split())]
mfi = lambda : [*map(float,inp().split())]
ii = lambda : int(inp())
fi = lambda : float(inp())
isplit = lambda : inp().split()
p = print
def gcd(a, b): return gcd(b, a % b) if b > 0 else a
def lcm(a, b): return a * b // gcd(a, b)
def round_up_half(n): return floor(n + 0.5)
def rotate90(l): return [''.join(x) for x in zip(*l[::-1])]
def solve():
nr, ng, nb = mii()
r, g, b = mii()
rg, gb = mii()
nr = max(0, nr - r)
ng = max(0, ng - g)
nb = max(0, nb - b)
ans = 0
buy_r = min(nr, rg)
ans += buy_r
rg -= buy_r
nr -= buy_r
buy_b = min(nb, gb)
ans += buy_b
gb -= buy_b
nb -= buy_b
buy_g = min(ng, rg + gb)
ans += buy_g
ng -= buy_g
if nr + ng + nb == 0:
print(ans)
else:
print(-1)
if __name__ == "__main__":
tc = 1
for t in range(1, tc+1):
ret = solve()