For example, consider forming "tcraete" from "cat" and "tree":
String A: cat
String B: tree
String C: tcraete
As you can see, we can form the third string by alternating characters from the two strings. As a second example, consider forming "catrtee" from "cat" and "tree":
String A: cat
String B: tree
String C: catrtee
Finally, notice that it is impossible to form "cttaree" from "cat" and "tree".
For each data set, the line of input consists of three strings, separated by a single space. All strings are composed of upper and lower case letters only. The length of the third string is always the sum of the lengths of the first two strings. The first two strings will have lengths between 1 and 200 characters, inclusive.
Data set n: yes
if the third string can be formed from the first two, or
Data set n: no
if it cannot. Of course n should be replaced by the data set number. See the sample output below for an example.
3 cat tree tcraete cat tree catrtee cat tree cttaree
Data set 1: yes Data set 2: yes Data set 3: no
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思路 |
题意是说:判断强两个字符串是否能由第三个拆成。Dp[i][j]的值只有2个,0,(表示串3不能拆成1的i之前2的j之前的串)即判断dp[len(1)][len(2)]是0还是1即可。 dp[i][j]的值可由两个方向而来,即串3的那个字母与串1相等且dp[i-1][j]==1则dp[i][j]==1;串三的字母与串2相等且dp[i][j-1]==1则dp[i][j]==1 (解题报告写的不是很好,忏悔一下) |
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源码 |
#include <iostream> #define MAX 210 using namespace std; char a[MAX], b[MAX], c[2*MAX]; int dp[MAX][MAX]; int main() { int i, j, t, cas; scanf("%d", &cas); for(t = 1; t <= cas; t++) { scanf("%s%s%s", a, b, c); memset(dp, 0, sizeof(dp)); dp[0][0] = 1; int la, lb; la = strlen(a); lb = strlen(b); for(i = 0; i <= la; i++) { for(j = 0; j <= lb; j++) { if(i > 0 && a[i-1] == c[i+j-1] && dp[i-1][j]) dp[i][j] = 1; if(j > 0 && b[j-1] == c[i+j-1] && dp[i][j-1]) dp[i][j] = 1; } } printf("Data set %d: ", t); if(dp[la][lb]) printf("yes\n"); else printf("no\n"); } return 0; } |