1. Let's identify the problem: We need to find the values that give the right answers 0.75, 1.35, and 1.5. 2. Since the user provided these values as the right answers, it's likely a problem involving solving for variables or roots corresponding to these results. 3. Without an explicit equation or problem statement, we acknowledge these as solutions or results for an algebraic or numeric problem. 4. If these are roots or outputs of a function, we can write a generic function with these roots: $$f(x) = (x - 0.75)(x - 1.35)(x - 1.5)$$ to represent a cubic polynomial with these roots. 5. Expanding, we get $$f(x) = (x - 0.75)(x^2 - 2.85x + 2.025) = x^3 - 3.6x^2 + 4.2625x - 2. In learner-friendly terms, these values can be the solutions to the cubic equation $$x^3 - 3.6x^2 + 4.2625x - 2 = 0$$ that corresponds to the roots 0.75, 1.35, and 1.5. 6. Hence, the given answers appear to be roots of this cubic equation.