The coordinates of the vertices of a hyperbola are the points where the hyperbola intersects its transverse axis. For example, for the hyperbola with vertices at (-15, 2) and (9, 2), these points are the closest points to the center along the transverse axis.

In hyperbolas, 'b' represents the distance from the center to the co-vertices along the conjugate axis. It is a key parameter in the standard form of the hyperbola's equation.

The center of a hyperbola is the midpoint between its vertices. It can be found by averaging the x-coordinates and y-coordinates of the vertices.

The 'c' value in a hyperbola represents the distance from the center to the foci. It is calculated using the formula c = √(a² + b²), where 'a' is the distance to the vertices and 'b' is the distance to the co-vertices.

To find the vertices of a hyperbola from its equation, identify 'a' in the standard form. The vertices are located at (h ± a, k) for horizontal hyperbolas and (h, k ± a) for vertical hyperbolas.

In hyperbolas, the relationship is given by the equation c² = a² + b², where 'c' is the distance to the foci, 'a' is the distance to the vertices, and 'b' is the distance to the co-vertices.