L,M,N = map(int,input().split())
A = list(map(int,input().split()))
B = list(map(int,input().split()))
Q = int(input())
A.sort()
B.sort()
h = [A[0] - B[i] for i in reversed(range(M))]
delta = [A[i] - A[0] for i in range(L)]
import sys

sabun = -h[0]
n = h[-1] + sabun
x = [0] * (n + 1)
for i in h:
    x[i+sabun] += 1
m = delta[-1]
y = [0] * (m + 1)
for i in delta:
    y[i] += 1

import cmath

#FFT 配列のサイズは２べきのみ
#逆変換はinverse = True
#配列Aは壊れる
def fft(A,inverse = False):
    N = len(A)
    h = 0
    while 1 << h < N:
        h += 1
    for i in range(N):
        j = 0
        for k in range(h):
            j |= (i >> k & 1) << (h-1-k)
        if i < j:
            A[i],A[j] = A[j],A[i]
    #↑バタフライ演算用配列整備
    b = 1
    if inverse:c = -1
    else:c = 1
    while b < N:
        for j in range(b):
            w = cmath.rect(1.0,-cmath.pi * j / b * c)
            for k in range(0,N,2*b):
                s = A[j+k]
                t = A[j+k+b] * w
                A[j+k] = s + t
                A[j+k+b] = s - t
        b *= 2
    if inverse:
        for i in range(N):
            A[i] /= N
    return A
def convolve(a,b):
    s = len(a) + len(b) - 1
    t = 1
    while t < s:
        t <<= 1
    A = a + [0] * (t - len(a))
    B = b + [0] * (t - len(b))
    A = fft(A)
    B = fft(B)
    for i in range(t):
        A[i] *= B[i]
    A = fft(A,True)
    return A[:s]
#↓整数版、配列は壊れない
def Zconvolve(a,b):
    A = convolve(a,b)
    for i in range(len(A)):
        A[i] = round(A[i].real)
    return A

C = Zconvolve(x,y)
for i in range(Q):
    if sabun + i >= len(C):
        print(0)
    else:
        print(C[sabun+i])