#include <iostream>

#include <cstdio>

#include <cstdlib>

#include <cmath>

#include <cstring>

#include <algorithm>

#include <set>

#include <map>

#include <queue>

#include <string>

#define LL long long

using namespace std;

//多项式乘法运算

//快速傅里叶变换

//FFT

//用于求两个多项式的卷积,但有精度损失

//时间复杂度nlogn

const int maxN = ;

const double PI = acos(-1.0);

struct Complex

{

    double r, i;

    Complex(double rr = 0.0, double ii = 0.0)

    {

        r = rr;

        i = ii;

    }

    Complex operator+(const Complex &x)

    {

        return Complex(r+x.r, i+x.i);

    }

    Complex operator-(const Complex &x)

    {

        return Complex(r-x.r, i-x.i);

    }

    Complex operator*(const Complex &x)

    {

        return Complex(r*x.r-i*x.i, i*x.r+r*x.i);

    }

};

//雷德算法--倒位序

//Rader算法

//进行FFT和IFFT前的反转变换。

//位置i和 （i二进制反转后位置）互换

void Rader(Complex y[], int len)

{

    int j = len>>;

    for(int i = ; i < len-; i++)

    {

        if (i < j) swap(y[i], y[j]);

        int k = len >> ;

        while (j >= k)

        {

            j -= k;

            k >>= ;

        }

        if (j < k) j += k;

    }

}

//FFT实现

//len必须为2^k形式，

//on==1时是DFT，on==-1时是IDFT

void FFT(Complex y[], int len, int on)

{

    Rader(y, len);

    for (int h = ; h <= len; h<<=)//分治后计算长度为h的DFT

    {

        Complex wn(cos(-on**PI/h), sin(-on**PI/h)); //单位复根e^(2*PI/m)用欧拉公式展开

        for (int j = ; j < len; j += h)

        {

            Complex w(, );//旋转因子

            for (int k = j; k < j+h/; k++)

            {

                Complex u = y[k];

                Complex t = w*y[k+h/];

                y[k] = u+t;//蝴蝶合并操作

                y[k+h/] = u-t;

                w = w*wn;//更新旋转因子

            }

        }

    }

    if (on == -)

        for (int i = ; i < len; i++)

            y[i].r /= len;

}

//求卷积

void Conv(Complex a[], Complex b[], int ans[], int len)

{

    FFT(a, len, );

    FFT(b, len, );

    for (int i = ; i < len; i++)

        a[i] = a[i]*b[i];

    FFT(a, len, -);

    //精度复原

    for(int i = ; i < len; i++)

        ans[i] = a[i].r+0.5;

}

//进制恢复

//用于大数乘法

void turn(int ans[], int len, int unit)

{

    for(int i = ; i < len; i++)

    {

        ans[i+] += ans[i]/unit;

        ans[i] %= unit;

    }

}

char str1[maxN], str2[maxN];

Complex za[maxN],zb[maxN];

int ans[maxN];

int len;

void init(char str1[], char str2[])

{

    int len1 = strlen(str1);

    int len2 = strlen(str2);

    len = ;

    while (len < *len1 || len < *len2) len <<= ;

    int i;

    for (i = ; i < len1; i++)

    {

        za[i].r = str1[len1-i-]-'';

        za[i].i = 0.0;

    }

    while (i < len)

    {

        za[i].r = za[i].i = 0.0;

        i++;

    }

    for (i = ; i < len2; i++)

    {

        zb[i].r = str2[len2-i-]-'';

        zb[i].i = 0.0;

    }

    while (i < len)

    {

        zb[i].r = zb[i].i = 0.0;

        i++;

    }

}

void work()

{

    Conv(za, zb, ans, len);

    turn(ans, len, );

    while (ans[len-] == ) len--;

    for (int i = len-; i >= ; i--)

        printf("%d", ans[i]);

    printf("\n");

}

int main()

{

    //freopen("test.in", "r", stdin);

    while (scanf("%s%s", str1, str2) != EOF)

    {

        init(str1, str2);

        work();

    }

    return ;

}