Use the Venn diagram and the given conditions to determine the number of elements in each​ region, or explain why the conditions are impossible to meet. n left parenthesis Upper U right parenthesisn(U)equals=3838​, n left parenthesis Upper A right parenthesisn(A)equals=1717​, n left parenthesis Upper B right parenthesisn(B)equals=2828​, n left parenthesis Upper C right parenthesisn(C)equals=1818​, n left parenthesis Upper A intersect Upper B right parenthesisn(A ∩ B)equals=1313​, n left parenthesis Upper A intersect Upper C right parenthesisn(A ∩ C)equals=1515​, n left parenthesis Upper B intersect Upper C right parenthesisn(B ∩ C)equals=1515​, n left parenthesis Upper A intersect Upper B intersect Upper C right parenthesisn(A ∩ B ∩ C)equals=99 Upper II IVIV IIIIII VIVI Upper VV IIII VIIVII VIIIVIII U A B C Question content area bottom Part 1 Select the correct choice below and fill in any answer boxes within your choice. A. The number of elements in regions​ I, II,​ III, IV,​ V, VI,​ VII, VIII are 1616​, 55​, enter your response here​, enter your response here​, enter your response here​, enter your response here​, enter your response here​, enter your response here​, respectively. B. It is impossible to meet the conditions because there are only enter your response here elements in set A but there are enter your response here elements in set A that are also in set B or C. A similar problem exists for set C. ​(Simplify your​ answers.) C. It is impossible to meet the conditions because there are only enter your response here elements in set B but there are enter your response here elements in set B that are also in set A or C. A similar problem exists for set C. ​(Simplify your​ answers.)