Answer:
The area of the capability y = 3√√x - 1 is all genuine numbers x with the end goal that x = 0, since the capability is characterized for all sure genuine numbers.
In this way, the area of the capability is [0, ∞).
Explanation:
The space of the capability \( y = 3\sqrt{\sqrt{x} - 1} \) is the arrangement of every single genuine number \( x \) for which the articulation under the square root is non-negative.
The articulation \(\sqrt{x}\) requires \(x\) to be non-negative, and \(\sqrt{\sqrt{x} - 1}\) further requires \(\sqrt{x} - 1\) to be non-negative.
In this way, the area is \( x \geq 1 \). Hence, the right response is \( O \geq 1 \).