100882: [AtCoder]ABC088 C - Takahashi's Information

Memory Limit:256 MB Time Limit:2 S
Judge Style:Text Compare Creator:
Submit:0 Solved:0

Description

Score: $300$ points

Problem Statement

We have a $3 \times 3$ grid. A number $c_{i, j}$ is written in the square $(i, j)$, where $(i, j)$ denotes the square at the $i$-th row from the top and the $j$-th column from the left.
According to Takahashi, there are six integers $a_1, a_2, a_3, b_1, b_2, b_3$ whose values are fixed, and the number written in the square $(i, j)$ is equal to $a_i + b_j$.
Determine if he is correct.

Constraints

  • $c_{i, j} \ (1 \leq i \leq 3, 1 \leq j \leq 3)$ is an integer between $0$ and $100$ (inclusive).

Input

Input is given from Standard Input in the following format:

$c_{1,1}$ $c_{1,2}$ $c_{1,3}$
$c_{2,1}$ $c_{2,2}$ $c_{2,3}$
$c_{3,1}$ $c_{3,2}$ $c_{3,3}$

Output

If Takahashi's statement is correct, print Yes; otherwise, print No.


Sample Input 1

1 0 1
2 1 2
1 0 1

Sample Output 1

Yes

Takahashi is correct, since there are possible sets of integers such as: $a_1=0,a_2=1,a_3=0,b_1=1,b_2=0,b_3=1$.


Sample Input 2

2 2 2
2 1 2
2 2 2

Sample Output 2

No

Takahashi is incorrect in this case.


Sample Input 3

0 8 8
0 8 8
0 8 8

Sample Output 3

Yes

Sample Input 4

1 8 6
2 9 7
0 7 7

Sample Output 4

No

Input

题意翻译

一个 3*3 的网格,标号分别为c(i,j),同时有六个整数A1,A2,A3,B1,B2,B3(均未知),其值是固定的,并且在c(i,j)中写的数字等于Ai + Bj。判断时候有满足条件的六个数,有输出“Yes”,没有输出“No”。

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