Question: 2. Two armies are advancing (say attacking) in 2 cities. The first army has 4 regiments (say, sub-army groups the second army has 3 regiments.

2. Two armies are advancing (say attacking) in 2 cities. The first army has 4 regiments (say, sub-army groups the second army has 3 regiments. At each czy the army that sends more regiments to the city captures the city and the opposing army's regiments. If both armies send the same number of regiments to city, the battle at that city is a draw. Each amy scores 1 point per city captured and 1 point per captured regiment. Assume that each army wants to mais the difference between its reward and its opponent reward. Formulate this situation as a two person zero-sum game in a matrix considering an action like IX yl where X is the number of regiments sent to city 1. and Ys the number of regiments sent to oty 2. 2. Two armies are advancing (say attacking) in 2 cities. The first army has 4 regiments (say, sub-army groups); the second army has 3 regiments. At each city, the army that sends more regiments to the city captures the city and the opposing army's regiments. If both armies send the same number of regiments to a city, the battle at that city is a draw. Each army scores 1 point per city captured and 1 point per captured regiment. Assume that each army wants to maximize the difference between its reward and its opponent reward. Formulate this situation as a two-person zero-sum game in a matrix considering an action like (x, y), where, X is the number of regiments sent to city 1, and Y is the number of regiments sent to city 2. 2. Two armies are advancing (say attacking) in 2 cities. The first army has 4 regiments (say, sub-army groups); the second army has 3 regiments. At each city, the army that sends more regiments to the city captures the city and the opposing army's regiments. If both armies send the same number of regiments to a city, the battle at that city is a draw. Each army scores 1 point per city captured and 1 point per captured regiment. Assume that each army wants to maximize the difference between its reward and its opponent reward. Formulate this situation as a two-person zero-sum game in a matrix considering an action like (x, y), where X is the number of regiments sent to city 1, and is the number of regiments sent to city 2

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