Final answer:
The equation is already solved for ax, showing that x is the subject related to a, b, and c. To isolate x, divide by a to get x=(bc+1)/a. This shows x's dependency on a and b but not directly on their difference.
Step-by-step explanation:
The question involves transforming the given equation to isolate ax on one side. The transformation process instructs to perform the same operation on both sides of an equation to maintain its equality. The equation provided, ax=bc+1, is already solved for ax, indicating that x is the subject of the formula related to the constants a, b, and c.
To understand the relationship between the value of x and the difference of a and b, you may want to further solve the equation for x by dividing both sides by a. This would result in x = (bc + 1) / a. Now, x directly depends on the values of a and b, but not explicitly on their difference. The question may require additional context to relate x to the difference between a and b.
As for the provided examples involving quadratic equations such as x² +0.0211x -0.0211 = 0, they can be solved for x using the quadratic formula. An equation in the form ax² + bx + c = 0 provides solutions for x based on the coefficients a, b, and c.