To simplify \(\sqrt{1327}\), we first check if 1327 can be factored into a product of perfect squares.
After checking for divisibility by perfect squares, we find that:
1327 is not divisible by (2, 3, 4, 5, 6, 7, 8, 9, 10, 11, etc.) up until 36, which is more than enough to check considering \(36^2 = 1296\) and \(37^2 = 1369\).
It turns out that 1327 does not have any perfect square factors.
Therefore, the simplified form of \(\sqrt{1327}\) cannot be simplified further, and the expression remains \(\sqrt{1327}\).
So the response would be: This radical expression is already fully simplified.