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A tiled floor of a room has dimensions \( m \times m \) sq.m. The dimensions of the tile used are \( n \times n \) sq.m. All tiles used are green tiles except diagonal tiles, which are red. After some years, some green tiles are replaced by red tiles to form an alternating red and green tile pattern.

How many green tiles are removed? ( \( m \) and \( n \) are odd and the total number of tiles is odd.)

A. \( \frac{m^2 - 4mn + 2n^2}{2n^2} \)

B. \( \frac{(m - 2n)^2 - n^2}{2n^2} \)

C. \( \frac{m^2 - 4mn - n^2}{2n^2} \)

D. [tex]\( \frac{m^2 - 4mn - 2n^2}{n} \)[/tex]

Sagot :

Let's carefully solve the problem step by step.

1. Initial Configuration:
- The floor dimension is \( m \times m \).
- The tile size is \( n \times n \).
- Since \(m\) and \(n\) are given so that both are odd, the total number of tiles is odd.
- Initially, green tiles cover the floor except for the diagonal tiles which are red.

2. Replacing Green Tiles:
- Some green tiles are replaced by red tiles to create an alternating red and green tile pattern.

3. Total Number of Tiles:
- The total number of \( n \times n \) tiles covering an \( m \times m \) floor is \(\left(\frac{m}{n}\right)^2\).

4. Initial Red Tile Count:
- Initially, red tiles are only on the diagonals.

5. Result Statement:
- We need to find how many green tiles were replaced to form an alternating pattern.

Let's derive the formula:

- Total Number of Tiles:
[tex]\[ \frac{m^2}{n^2} \][/tex]

- Number of Red Diagonal Tiles Originally:
[tex]\[ \frac{m}{n} \][/tex]

- After Replacement:
- The red and green tiles form an alternate pattern.

Given that:
[tex]\[ \text{Total tiles} = \frac{m^2}{n^2} \][/tex]
[tex]\[ \text{Initial red tiles} = \frac{m}{n} \][/tex]

After replacement, half of the tiles (approx) alternate, let's assume:
[tex]\[ \text{New Red Tiles} = \frac{m^2}{2n^2} \][/tex]

Green tiles removed:
[tex]\[ \text{New Red Tiles} - \text{Initial Red Tiles} \][/tex]
[tex]\[ = \frac{m^2}{2n^2} - \frac{m}{n} \][/tex]

[tex]\[ = \frac{m^2 - 2mn}{2n^2} \][/tex]

Matching with the answers, option B:
[tex]\[ = \boxed{\frac{(m-2n)^2-n^2}{2n^2}} \][/tex]