To calculate the surface area based on the description of the two rectangular dimensions provided, we need to clarify if the provided dimensions are referring to a two-dimensional surface. Assuming we are dealing with a rectangle with a length of 18 yards and a width of 15 yards, the area can be calculated using the formula for the area of a rectangle:
\[ \text{Area} = \text{length} \times \text{width} \]
Substituting the values:
\[ \text{Area} = 18 , \text{yards} \times 15 , \text{yards} = 270 , \text{yards}^2 \]
However, since none of the options match this rectangle's area, we might need to clarify if any additional circular measurements (considering pi) are in place that could multiply the area drastically, such as involving circles or semi-circles.
If so, we might use π in the case of circular dimensions, but with the details explicitly provided, we will calculate the area we initially established based on the rectangular information.
The closest area based on simple rectangle calculations is neither of the provided options unless other dimensions or features factor into making more space; hence, further clarification should be accrued.
The options provided might suggest advanced calculation or misinterpretation of surface area requirements. Assuming standard practices and these provided choices, none align with direct rectangular calculations.
Could you please clarify or extend the details regarding what you wished to calculate with surface areas or if circles/others were intended alongside this?