Final answer:
The graph of f(x) = |x - h| + k with h and k both positive would have its vertex in the first quadrant where both x and y values are positive. Of the given options, the graph with a vertex at (2, 1) is the correct one, as it's the only vertex with both coordinates being positive.
Step-by-step explanation:
The question is asking which graph could represent the function f(x) = |x - h| + k given that h and k are both positive numbers. The graph of an absolute value function is typically a V-shaped curve, with the vertex representing the point (h, k). Since h and k are positive, the vertex of the graph should be in the first quadrant of the coordinate plane, where both x and y values are positive.
Now, let's evaluate the provided vertex options:
- A vertex at (2, 1) would be correct since both coordinates are positive.
- A vertex at (1, -4), (-3, 2), and (-4, -5) would not be correct because either one or both coordinates are negative, which is not possible if h and k are positive.
Therefore, the graph of f(x) = |x - h| + k with h and k being positive could have a vertex at (2, 1).