ソースコード

import sys
input = sys.stdin.readline
from bisect import bisect

mod=998244353


# 行列の計算（numpyを使えないとき,modを使用）
def prod(A,B,k,l,m):# A:k*l,B:l*m
    C=[[None for i in range(m)] for j in range(k)]

    for i in range(k):
        for j in range(m):
            ANS=0
            for pl in range(l):
                ANS=(ANS+A[i][pl]*B[pl][j])%mod

            C[i][j]=ANS

    return C

def plus(A,B,k,l):# a,B:k*l
    C=[[None for i in range(l)] for j in range(k)]

    for i in range(k):
        for j in range(l):
            C[i][j]=(A[i][j]+B[i][j])%mod

    return C


# x以下の素数の列挙,素因数分解,約数の列挙


x=10**7
import math 
L=math.floor(math.sqrt(x)) # 平方根を求める

Primelist=[i for i in range(x+1)]
Primelist[1]=0 # 1は素数でないので0にする.
 
for i in Primelist:
    if i>L:
        break
    if i==0:
        continue
    for j in range(2*i,x+1,i):
        Primelist[j]=0

Primes=[Primelist[j] for j in range(x+1) if Primelist[j]!=0]
D={Primes[i]:i for i in range(len(Primes))}

TO=[0]*len(Primes)

x=2
for j in range(len(Primes)):
    y=Primes[j]

    if x^y in D:
        TO[j]=1

S=[0]*len(Primes)

for i in range(1,len(Primes)):
    S[i]=S[i-1]+TO[i]

#print("!")




T=int(input())

for tests in range(T):
    N,M=list(map(int,input().split()))

    x=bisect(Primes,M)-1

    #print(x,Primes[x])

    if N==1:
        print(x+1)
        continue

    ss=S[x]

    k=Primes[x]

    if k^2 in D and k^2>k:
        ss-=1


    X=[[1,ss]]

    n=N-1

    B=[[0,ss],[1,1]]
    POWB=[B]


    for i in range(32):
        POWB.append(prod(POWB[-1],POWB[-1],2,2,2)) # ベキを求めて


    while n:
        X=prod(X,POWB[n.bit_length()-1],1,2,2) # n乗の場合
        n-=1<<(n.bit_length()-1)

    #print(X)

    print(sum(X[0])%mod)