To determine the vertex of the quadratic function associated with the square root function \( h(x) \), you need to analyze the graph of \( h(x) \).
In general, if a square root function is depicted, it may have transformations that affect its vertex. The vertex of the quadratic form can often be derived from the characteristics of the square root function’s plot.
If the curve is opening upwards and the square root function has its vertex at a particular point, the corresponding vertex for the related quadratic function can typically be derived from the transformations of the square root function.
Without seeing the image, I cannot give a definitive answer about the vertex location; however, considering the typical placements of a vertex for common transformations, the vertex for a quadratic \( f(x) = a(x-h)^2 + k \) is located at the point \( (h,k) \).
If you know additional details about the graph or have more context, please share them so I can assist you better! Based on common options given, if the parabola opens upwards and is related to a square root function, the vertex is often positioned based on the graph's intercepts and transformations. Based on the options provided, common vertex points are:
- (0, 2)
- (0, -2)
- (-2, 0)
- (2, 0)
If you can describe the graph in more detail or provide its general shape and transformation, I can help more accurately identify the vertex.