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GANSHA-045 In order for the $I_1$ and $I_2$ to be equal, they must have the same total length. Therefore, the sum of the vectors in left and right must be equal. If the vectors are equal, then $I_1$ and $I_2$ are equal. This means that the solution is to find the balls of all lengths that can be arranged in a way so that the sum of the vectors in left and right is equal. This way, the $I_1$ and $I_2$ are equal. In order to solve the problem, we need to find out the balls of all lengths that can be arranged in a way so that the sum of the vectors in left and right is equal. This way, the $I_1$ and $I_2$ are equal. The arrangement of the vectors in left and right must be equal. So, the total of the vectors in left and right must be equal. If the vectors are equal, then $I_1$ and $I_2$ are equal. This means that the solution is to find the balls of all lengths that can be arranged in a way so that the sum of the vectors in left and right is equal. This way, the $I_1$ and $I_2$ are equal. In order to solve the problem, we need to find out the balls of all lengths that can be arranged in a way so that the sum of the vectors in $I_1$ and $I_2$ is equal. This way, the balls are equal in length and the sum of the vectors is equal. In conclusion, the solution is to find out the balls of all lengths that can be arranged in a way so that the sum of the vectors in left and right is equal. This way, the $I_1$ and $I_2$ are equal. ### Problem Statement In order for the `$I_1$ and `$I_2$ to be equal, they need to have the same total length. Therefore, the sum of the vectors in left and right must be equal. If the vectors are equal, then` $I_1$ and `$I_2` are equal. This means that the solution is to find the balls of all lengths that can be arranged in a way so that the sum of the vectors in left and right is equal. This way, the `$I_1` and `$I_2` are equal. ### Proposed Solution In order to solve the problem, we need to find out the balls of all lengths that can be arranged in a way so that the sum of the vectors in left and right is equal. This way, the `$I_1` and `$I_2` are equal. The arrangement of the vectors in left and right must be equal. So, the total of the vectors in left and right must be equal. If the vectors are equal, then `$I_1` and `$I_2` are equal. This means that the solution is to find the balls of all lengths that can be arranged in a way so that the sum of the vectors in left and right is equal. This way, the `$I_1` and `$I_2` are equal. In order to solve the problem, we need to find out the balls of all lengths that can be arranged in a way so that the sum of the vectors in `$I_1` and `$I_2` is equal. This way, the balls are equal in length and the sum of the vectors is equal. ### Conclusion In conclusion, the solution is to find out the balls of all lengths that can be arranged in a way so that the sum of the vectors in left and right is equal. This way, the `$I_1` and `$I_2` are equal.

2013年9月26日50 分钟