In Exercises 13–26, use vertices and asymptotes to graph each hyperbola. Locate the foci and find the equations of the asymptotes. 4y^2−x^2=1

A hyperbola is a type of conic section formed by the intersection of a plane and a double cone. It consists of two separate curves called branches, which are mirror images of each other. The standard form of a hyperbola can be expressed as (y^2/a^2) - (x^2/b^2) = 1 or (x^2/a^2) - (y^2/b^2) = 1, depending on its orientation. Understanding the structure of hyperbolas is essential for graphing and identifying their key features.

The vertices of a hyperbola are the points where the branches are closest to each other, while the foci are points located along the transverse axis, which help define the shape of the hyperbola. For the hyperbola given in the question, the vertices can be found by determining the values of 'a' and 'b' from its standard form. The distance from the center to each focus is given by 'c', where c = √(a^2 + b^2). Identifying these points is crucial for accurately graphing the hyperbola.

Asymptotes are lines that the branches of a hyperbola approach but never touch. For a hyperbola in the form (y^2/a^2) - (x^2/b^2) = 1, the equations of the asymptotes can be derived as y = ±(a/b)x. These lines provide a framework for sketching the hyperbola and indicate its direction and growth. Understanding how to find and use asymptotes is vital for graphing hyperbolas accurately.