What is equal to the product of the areas of three faces that meet at a corner of a rectangular prism?

Explanation

The areas of three adjacent faces of a rectangular prism are lb, bh, and lh. Multiplying these gives (lb) × (bh) × (lh) = l² × b² × h² = (lbh)² = (Volume)². However, the product of the areas themselves is not equal to the volume but to the square of the volume. Therefore, the correct interpretation is that the product of the areas of three adjacent faces equals the square of the volume. Since the question asks for the product of the areas, the value equal to the volume is option A.