Explanation:

- Train X and train Y are moving in opposite directions. Relative speed needs to be calculated.

- Convert train Y's speed from kmph to m/sec: \(72 \, \text{kmph} = 72 \times \frac{1000}{3600} = 20 \, \text{m/sec}\).

- Relative speed of X and Y together = \(15 \, \text{m/sec} + 20 \, \text{m/sec} = 35 \, \text{m/sec}\).

- They cross each other in 15 seconds. Total distance covered in crossing = \(35 \, \text{m/sec} \times 15 \, \text{seconds} = 525 \, \text{meters}\).

- Let length of train Y = \(L\), then length of train X = \(2L\).

- \(2L + L = 525\), thus \(3L = 525\).

- Solve for \(L\): \(L = 175 \, \text{m}\).

- Length of train X = \(2 \times 175 \, \text{m} = 350 \, \text{m}\).

- Option 3: 350 m is correct.