Final answer:
The question involves rewriting a function in the specific form Q + (1/D) by dividing the polynomial numerator by the linear denominator.
Step-by-step explanation:
The student's question seems to involve finding the expression of a given algebraic function in the form Q + (1/D), where Q and D represent some quantities derived from the function. The function in question is (x²+x-5)/(x-2). To rewrite this expression in the desired form, one would typically perform polynomial long division or synthetic division to divide x²+x-5 by x-2. This process separates the function into a quotient (Q) plus the remainder divided by the divisor (D), which aligns with the desired form.
For more complicated expressions involving the equilibrium constant K, which are presented in the surrounding context, we would need additional chemical context to employ techniques such as the quadratic formula or simplifications based on assumptions about the extent of ionization in reactions. However, such context is not provided in the question, and therefore, we cannot apply these concepts directly to this math problem.