To find the area of the region enclosed by two curves, you must have the specific equations for those curves. Without these equations, it's impossible to provide an exact answer to the question. Additionally, we need to define the range of x-values over which we would be finding the enclosed area. Since the question marks in "y = ?" and "0 ? x" indicate missing information, we cannot proceed with a calculation.
Here's the general approach for finding the area between two curves if you had the equations and the range of x-values:
1. Identify the upper and lower curves within the range of x-values. You have to decide which function is on top (upper bound) and which is on the bottom (lower bound) by comparing the values of y given by both equations for a particular x within the interval.
2. Set up the integral for the area enclosed between the two curves by subtracting the lower function from the upper function. This will give you the height of the area at each point along the x-axis.
3. Integrate the result from step 2 over the given range of x-values. This could be from x=a to x=b where "a" and "b" are the x-values that define the interval.
Here's the mathematical formula for the area A, where f(x) is the upper curve and g(x) is the lower curve and [a, b] is the range for x:
\[ A = \int_{a}^{b} \left( f(x) - g(x) \right) dx \]
If you can provide the equations for the two curves and the range of x-values, I would be glad to guide you through finding the area enclosed by those curves.