Final answer:
The snippets provided indicate a problem involving an algebraic relationship possibly relating to physics concepts. Without clear context, it's challenging to provide a conclusive solution, but I've clarified the equation involving g(t), m(t), and k(t) assuming a function composition.
Step-by-step explanation:
The student's question seems to involve the manipulation of algebraic equations in relation to motion, forces, and possibly other physical concepts. However, the provided snippets are disjointed and lack context, which makes it difficult to discern a single coherent problem. Therefore, I will clarify the given equation g(t) = 9 / -5t3 and the relationship g = mok, by assuming it indicates the function composition where k(t) is composed with m(t) to form g(t).
Given that k(t) = -5t3, and assuming that the composition m(k(t)) results in g(t), we would have g(t) = m(-5t3). If g(t) is known to be \(\frac{9}{-5t3}\), then the relationship between m(t) and k(t) allows us to find m(t). Since k(t) is negative, this suggests m(t) must introduce the negative sign.
The actual solution would depend on additional information and clarification of the relationship between g, m, and k, which is not provided in the snippets.