#!/usr/bin/env pypy3

# 制約再々変更後の想定解 (L <= 10 ^ 7)

import array

MIN_N = 3
MAX_N = 10 ** 6
MIN_L = 1
MAX_L = 10 ** 7


def sieve_of_eratosthenes(end, typecode="L"):
    assert end > 1
    is_prime = array.array("B", (True for i in range(end)))
    is_prime[0] = False
    is_prime[1] = False
    primes = array.array(typecode)
    for i in range(2, end):
        if is_prime[i]:
            primes.append(i)
            for j in range(2 * i, end, i):
                is_prime[j] = False
    return primes


def count_sequences(n, l):
    d_max = l // (n - 1)
    if d_max < 2:
        return 0
    ds = sieve_of_eratosthenes(d_max + 1)
    return sum(l - (n - 1) * d + 1 for d in ds)


def main():
    n, l = map(int, input().split())
    assert MIN_N <= n <= MAX_N
    assert MIN_L <= l <= MAX_L
    print(count_sequences(n, l))


if __name__ == '__main__':
    main()