The process of identifying a variable through the constant of variation is predicated on the equation y=kx. Here, 'y' and 'x' represent variables while 'k' denotes the constant of variation. By having knowledge of any two of these values, the third one can be derived. This principle is regularly utilized in direct and inverse variation problems found within the realm of algebra.
Topic | Problem | Solution |
---|---|---|
None | Given the direct variation equation \(y = kx\), w… | Step 1: Find the value of \(k\) in the direct variation equation. Since \(y = kx\), we can substitu… |