Answer
Check attached graph.
Work Step by Step
To undertand the graph of $\sqrt(x^{2} - 4x + 4)$, we divide it into three parts.
Part 1: $x^{2}$: this is relatively simple to understand. It is an upward-facing parabola with the bottom of the curve at (0,0).
Part 2: $x^{2} - 4x$: this shifts the bottom-most part of the curve (also called the minima) to (2, -4).
Part 3: $x^{2} - 4x + 4$: adding the constant $4$ shifts the curve up by four units, that is, the y coordinate goes from -4 to 0. Thus, the minima of the curve now becomes (2, 0).
Part 4: $\sqrt(x^{2} - 4x + 4)$: Taking the square root of this does not change the coordinates of the bottom-most part - minima. But, it changes the shape of the curve. It now looks like a |x| curve with some slight changes.
