The square root function is defined as f(x) = √(x), which returns the non-negative value whose square is x. The domain is x ≥ 0.

The cube root function is defined as f(x) = ∛(x), which returns the value whose cube is x. The domain is all real numbers.

The domain of a square root function f(x) = √(x - a) is x ≥ a, meaning the expression inside the square root must be non-negative.

The domain of a cube root function f(x) = ∛(x - a) is all real numbers, as cube roots are defined for all x.

This transformation shifts the graph of g(x) to the right by 4 units and up by 2 units.

A negative sign in front of a square root function, such as f(x) = -√(x), reflects the graph across the x-axis.

Adding a constant to a square root function, such as f(x) = √(x) + k, shifts the graph vertically by k units.