逆元:
同余方程 ax≡1(mod n),gcd(a,n) = 1 时有解,这时称求出的 x 为 a 的对模n的乘法逆元。(注意:如果gcd(a,n)如果不等于1则无解),解法还是利用扩展欧几里得算法求解方程 ax + ny = 1 求出 x。
/**
* 求逆元
* ax = 1 (% mo),gcd(a,mo)=1
* ax+mo*y=1
* */
public static long inverseElement(long a, long mo) throws Exception { long d = linearEquation(a, mo, 1);//ax+mo*y=1
x = (x % mo + mo) % mo;//保证x>0
return d;
}
题目:HDU-1576
思路:设(A/B)%9973 = k, 则A/B = k + 9973x (x未知), 因此A = kB + 9973xB,又A%9973 = n, 所以kB%9973 = n, 故kB = n + 9973y (y未知),故(k/n)B +(-y/n)*9973 = gcd(B,9973) = 1扩展欧几里得 求出k/n, 再乘以个n,记得取模,就是answer了。
代码:
import java.util.Scanner; /**
* (A/B)%9973,求余,除法不满足交换性,可改为求B关于9973的逆元x,
* 这样结果等价于Ax%9973等价于x*A%9973等价于xn%9973,
*/ public class HDU1576 { public static void main(String[] args) {
Scanner scanner = new Scanner(System.in);
int T = scanner.nextInt();
for (int i = 0; i < T; i++) {
int n = scanner.nextInt();
int b = scanner.nextInt();
try {
MyGcd.inverseElement(b, 9973);
long x = MyGcd.x;
System.out.println(x*n%9973);
} catch (Exception e) {
// TODO: handle exception
}
}
} private static class MyGcd{
static long x;
static long y; public static long gcd(long m, long n) {
return n == 0 ? m : gcd(n, m % n);
} public static long ext_gcd(long a,long b){
if (b==0) {
x = 1;
y = 0;
return a;
}
long res = ext_gcd(b, a % b);
long x1 = x;
x = y;
y = x1 - a / b * y;
return res;
} public static long linearEquation(long a, long b, long m) throws Exception {
long d = ext_gcd(a, b);
if (m % d != 0) {
throw new Exception("无解");
}
long n = m / d;
x *= n;
y *= n;
return d;
} public static long inverseElement(long a, long mo) throws Exception { long d = linearEquation(a, mo, 1);// ax+mo*y=1
x = (x % mo + mo) % mo;// 保证x>0
return d;
}
}
}
结果:
