In Exercises 21–40, eliminate the parameter t. Then use the rectangular equation to sketch the plane curve represented by the given parametric equations. Use arrows to show the orientation of the curve corresponding to increasing values of t. (If an interval for t is not specified, assume that −∞ < t < ∞. _x = √t, y = t − 1

Parametric equations express the coordinates of points on a curve as functions of a variable, typically denoted as 't'. In this case, x and y are defined in terms of t, allowing for the representation of curves that may not be easily described by a single equation. Understanding how to manipulate these equations is crucial for eliminating the parameter and finding a rectangular equation.

Eliminating the parameter involves expressing one variable in terms of the other without the parameter. This is achieved by solving one of the parametric equations for 't' and substituting it into the other equation. This process transforms the parametric equations into a single rectangular equation, which can then be analyzed for its geometric properties.

Graphing rectangular equations involves plotting the relationship between x and y on a Cartesian plane. Once the parameter is eliminated, the resulting equation can be analyzed to determine its shape and orientation. Additionally, indicating the direction of the curve with arrows based on the increasing values of 't' helps visualize how the curve progresses over time.