Part 2/6:
Knowing that we need to find (y = \frac{2Z + k}{Z}), the next step involves substituting values into our equation. Here, (k) is defined as ( \frac{p}{3} ), leading us to rewrite (y) as follows:
[ y = \frac{2Z + \frac{p}{3}}{Z} ]
Upon diving deeper into manipulating these equations, we choose to explore the positive side of our calculations first. This decision allows for a more straightforward interpretation of the results, setting the stage for identifying potential conjugate relationships for later use.