Explanation:

- We are given the volume of a cuboid: \(3300 \, \text{cm}^3\).

- The sum of the length (\(l\)) and the breadth (\(b\)) is 37 cm: \(l + b = 37\).

- The difference between the length and the breadth is 13 cm: \(l - b = 13\).

To solve for \(l\) and \(b\), we need to add and subtract these two equations:

- Adding: \( (l + b) + (l - b) = 37 + 13 \) which gives \(2l = 50\) and so \(l = 25\).

- Subtracting: \( (l + b) - (l - b) = 37 - 13 \) which gives \(2b = 24\) and so \(b = 12\).

Now, the volume formula \(l \times b \times h = 3300\) becomes:

- \(25 \times 12 \times h = 3300\)

- \(300h = 3300\)

- So, \(h = 11\) cm.

- Correct answer is: Option: 2, 11 cm