Final answer:
The question seems to revolve around finding a number whose square is equal to its square root. The solution indicates such a number is 1, since squaring 1 or taking the square root of 1 both result in 1.
Step-by-step explanation:
The student's question appears to be incomplete and lacks the necessary information to provide a direct answer. However, it does concern the concept of square roots and exponents. In general, if we have x2 = √x, this implies that we are looking for a number x that, when squared, equals its own square root. For a number to satisfy this condition, x would have to be 1, because 12 equals 1, and the square root of 1 is also 1.
Understanding these principles is essential in solving equations involving exponents and square roots. It is also crucial to apply operations equally on both sides of an equation to maintain equality. This forms the basis of solving equations algebraically, whether they involve simple numbers or more complex algebraic expressions.