如何解方程a*x≡b(mod m)呢?因为a*x-b|m, 故令a*x-b=-y*m,即a*x+m*y=b。根据Bezout定理,该方程有解当且仅当gcd(a,m)|b。我们把等式两边同乘以gcd(a,m)/b,得到a*x0+m*y0=gcd(a, m)。这个方程可以用扩展欧几里得算法求得得到x0。等式是怎么乘的,就再把它除回来,也就是x=x0*b/gcd(a,m)。关于方程的通解,a*x+k*lcm(a,m)+m*y-k*lcm(a,m)=b,lcm(a,m)=a*m/gcd(a,m),也就是a*(x+k*m/gcd(a,m))+m*(y+k*a/gcd(a,m))=b,所以方程的通解为所有与x同余m/gcd(a,m)的数。若要求最小正整数解,令p=m/gcd(a,m),然后x=(x%p+p)%p即可。
ll Exgcd(ll a, ll b, ll &x, ll &y)
{
if (b == 0)
{
x = 1;
y = 0;
return a;
}
ll d = Exgcd(b, a%b, x, y);
ll tx = x;
x = y;
y = tx - (a / b) * y;
return d;
}
ll Gcd(ll a, ll b)
{
return b ? Gcd(b, a%b) : a;
}
ll Eq(ll a, ll b, ll m)
{
ll gcd = Gcd(a, m);
if (b%gcd)
return -1;
ll x, y;
Exgcd(a, m, x, y);
x = x * b / gcd;
ll p = m / gcd;
return (x%p+p) % p;
}
原文:https://www.cnblogs.com/headboy2002/p/8908090.html