import sys input=sys.stdin.readline def I(): return int(input()) def MI(): return map(int, input().split()) def LI(): return list(map(int, input().split())) def main(): mod=10**9+7 S=I() def gcd(a, b): while b: a, b = b, a % b return a def isPrimeMR(n): d = n - 1 d = d // (d & -d) L = [2] for a in L: t = d y = pow(a, t, n) if y == 1: continue while y != n - 1: y = (y * y) % n if y == 1 or t == n - 1: return 0 t <<= 1 return 1 def findFactorRho(n): m = 1 << n.bit_length() // 8 for c in range(1, 99): f = lambda x: (x * x + c) % n y, r, q, g = 2, 1, 1, 1 while g == 1: x = y for i in range(r): y = f(y) k = 0 while k < r and g == 1: ys = y for i in range(min(m, r - k)): y = f(y) q = q * abs(x - y) % n g = gcd(q, n) k += m r <<= 1 if g == n: g = 1 while g == 1: ys = f(ys) g = gcd(abs(x - ys), n) if g < n: if isPrimeMR(g): return g elif isPrimeMR(n // g): return n // g return findFactorRho(g) #[(p1,n1),(p2,n2),...]の形で返す def primeFactor(n): i = 2 ret = {} rhoFlg = 0 while i*i <= n: k = 0 while n % i == 0: n //= i k += 1 if k: ret[i] = k i += 1 + i % 2 if i == 101 and n >= 2 ** 20: while n > 1: if isPrimeMR(n): ret[n], n = 1, 1 else: rhoFlg = 1 j = findFactorRho(n) k = 0 while n % j == 0: n //= j k += 1 ret[j] = k if n > 1: ret[n] = 1 if rhoFlg: ret = {x: ret[x] for x in sorted(ret)} return ret #約数列挙 #10^6以下で約数の数が最大なのは720720の時(240個しかない!) def divisors(N): pf = primeFactor(N) ret = [1] for p in pf: ret_prev = ret ret = [] for i in range(pf[p]+1): for r in ret_prev: ret.append(r * (p ** i)) return sorted(ret) def calc(X,Y): diff=X-Y if diff==0: ans=0 #A=1の場合,B+C=X=Y ans+=X-1 #それ以外ならB*(A+1)=X=Y d=divisors(X) ans+=len(d)-1#(A+1)の部分がdの要素になれば良い,(A+1)は1になり得ない if X%2==0:# (A+1)=2 => A=1 をダブルカウントしている ans-=1 return ans d=divisors(diff) ans=0 for i in range(len(d)): A=d[i]+1 Z=d[-1-i] if Y-Z>0: if (Y-Z)%(A+1)==0: ans+=1 return ans # X-Y=(B-C)*(A-1) for _ in range(S): x,y=MI() if y>x: x,y=y,x print(calc(x,y)) main()