题意:
n个物品全部乱序排列(都不在原来的位置)的方案数。
思路:
dp[i]表示i个物品都乱序排序的方案数,所以状态转移方程
另外:
还有二维的dp写法,虽然高精度开不了,但是还是有启发意义。设dp[i][j]表示i个物品j个乱序的方案数,状态转移方程
#include <bits/stdc++.h> const int MAXN = 2000 + 5;
struct bign {
int len, num[MAXN]; bign () {
len = 0;
memset(num, 0, sizeof(num));
}
bign (int number) {*this = number;}
bign (const char* number) {*this = number;} void DelZero ();
void Put (); void operator = (int number);
void operator = (char* number); bool operator < (const bign& b) const;
bool operator > (const bign& b) const { return b < *this; }
bool operator <= (const bign& b) const { return !(b < *this); }
bool operator >= (const bign& b) const { return !(*this < b); }
bool operator != (const bign& b) const { return b < *this || *this < b;}
bool operator == (const bign& b) const { return !(b != *this); } void operator ++ ();
void operator -- ();
bign operator + (const int& b);
bign operator + (const bign& b);
bign operator - (const int& b);
bign operator - (const bign& b);
bign operator * (const int& b);
bign operator * (const bign& b);
bign operator / (const int& b);
//bign operator / (const bign& b);
int operator % (const int& b);
}; bign dp[805]; int main() {
dp[0] = 0; dp[1] = 0; dp[2] = 1;
for (int i=3; i<=800; ++i) {
dp[i] = (dp[i-1] + dp[i-2]) * (i - 1);
}
int n;
while (scanf ("%d", &n) == 1 && n != -1) {
dp[n].Put ();
puts ("");
}
return 0;
} void bign::DelZero () {
while (len && num[len-1] == 0)
len--; if (len == 0) {
num[len++] = 0;
}
} void bign::Put () {
for (int i = len-1; i >= 0; i--)
printf("%d", num[i]);
} void bign::operator = (char* number) {
len = strlen (number);
for (int i = 0; i < len; i++)
num[i] = number[len-i-1] - '0'; DelZero ();
} void bign::operator = (int number) { len = 0;
while (number) {
num[len++] = number%10;
number /= 10;
} DelZero ();
} bool bign::operator < (const bign& b) const {
if (len != b.len)
return len < b.len;
for (int i = len-1; i >= 0; i--)
if (num[i] != b.num[i])
return num[i] < b.num[i];
return false;
} void bign::operator ++ () {
int s = 1; for (int i = 0; i < len; i++) {
s = s + num[i];
num[i] = s % 10;
s /= 10;
if (!s) break;
} while (s) {
num[len++] = s%10;
s /= 10;
}
} void bign::operator -- () {
if (num[0] == 0 && len == 1) return; int s = -1;
for (int i = 0; i < len; i++) {
s = s + num[i];
num[i] = (s + 10) % 10;
if (s >= 0) break;
}
DelZero ();
} bign bign::operator + (const int& b) {
bign a = b;
return *this + a;
} bign bign::operator + (const bign& b) {
int bignSum = 0;
bign ans; for (int i = 0; i < len || i < b.len; i++) {
if (i < len) bignSum += num[i];
if (i < b.len) bignSum += b.num[i]; ans.num[ans.len++] = bignSum % 10;
bignSum /= 10;
} while (bignSum) {
ans.num[ans.len++] = bignSum % 10;
bignSum /= 10;
} return ans;
} bign bign::operator - (const int& b) {
bign a = b;
return *this - a;
} bign bign::operator - (const bign& b) {
int bignSub = 0;
bign ans;
for (int i = 0; i < len || i < b.len; i++) {
bignSub += num[i];
bignSub -= b.num[i];
ans.num[ans.len++] = (bignSub + 10) % 10;
if (bignSub < 0) bignSub = -1;
}
ans.DelZero ();
return ans;
} bign bign::operator * (const int& b) {
int bignSum = 0;
bign ans; ans.len = len;
for (int i = 0; i < len; i++) {
bignSum += num[i] * b;
ans.num[i] = bignSum % 10;
bignSum /= 10;
} while (bignSum) {
ans.num[ans.len++] = bignSum % 10;
bignSum /= 10;
} return ans;
} bign bign::operator * (const bign& b) {
bign ans;
ans.len = 0; for (int i = 0; i < len; i++){
int bignSum = 0; for (int j = 0; j < b.len; j++){
bignSum += num[i] * b.num[j] + ans.num[i+j];
ans.num[i+j] = bignSum % 10;
bignSum /= 10;
}
ans.len = i + b.len; while (bignSum){
ans.num[ans.len++] = bignSum % 10;
bignSum /= 10;
}
}
return ans;
} bign bign::operator / (const int& b) { bign ans; int s = 0;
for (int i = len-1; i >= 0; i--) {
s = s * 10 + num[i];
ans.num[i] = s/b;
s %= b;
} ans.len = len;
ans.DelZero ();
return ans;
} int bign::operator % (const int& b) { bign ans; int s = 0;
for (int i = len-1; i >= 0; i--) {
s = s * 10 + num[i];
ans.num[i] = s/b;
s %= b;
} return s;
}