What is the first step to solving a linear variation equation?

In the context of solving a linear variation equation, the first step often involves forming an equation using two variables. This is essential because linear variation deals with the direct relationship between two variables, typically expressed in the form (y = kx), where (k) represents the constant of variation. By establishing a basic equation that relates these two variables, you set the foundation for further analysis.

Once this equation is established, you can proceed to identify the constant of variation, substitute values if necessary, or rewrite the equation in different forms. However, the initial step of forming the equation is crucial as it directly defines the relationship you are working with, allowing you to solve for values or interpret the meaning of the constant of variation appropriately.