We need to compare \(3 * a^5\) and \((3a)^5 = 243 * a^5\)

Since the exponent of \(a\) is negative, we can have the following scenarios:

Scenario 1: If \(a < 0 => a^5 < 0\):
\(243 * a^5\) is a larger negative than \(3 * a^5\)
Thus: \(3 * a^5 > (3a)^5 = 243 * a^5\)

Scenario 2: If \(a = 0\):
\(3 * a^5 = (3a)^5 = 0\)

Scenario 3: If \(a > 0 => a^5 > 0\):
\(243 * a^5\) is a larger positive than \(3 * a^5\)
Thus: \(3 * a^5 < (3a)^5 = 243 * a^5\)

Thus, there is no relation between the two quantities

Answer D