Use shifts and scalings to transform the graph of $\text{ƒ}\left(x\right)=\sqrt{x}$  into the graph of g. Use a graphing utility to check your work.
$g\left(x\right)=2\text{ƒ}(2x-1)$

Function transformation involves altering the graph of a function through shifts, stretches, and reflections. In this context, the function ƒ(x) = √x is transformed into g(x) = 2ƒ(2x - 1) by applying specific operations. Understanding how these transformations affect the graph's position and shape is crucial for accurately sketching the new function.

Horizontal and vertical shifts are specific types of transformations that move the graph of a function without changing its shape. A horizontal shift occurs when the input variable x is adjusted, while a vertical shift involves scaling the output. In the given function g(x), the term (2x - 1) indicates a horizontal shift to the right by 0.5 units, while the multiplication by 2 scales the output vertically.

Graphing utilities are tools that allow users to visualize mathematical functions and their transformations. These tools can plot graphs based on equations, helping to verify the accuracy of transformations performed manually. In this question, using a graphing utility to check the transformation from ƒ(x) to g(x) provides a visual confirmation of the changes made to the original function.