A convex 1994-gon M is given in the plane. A closed polygonal line consists of 997 of its diagonals. Every vertex is adjacent to exactly one diagonal. Each diagonal divides M into two sides, and the smaller of the numbers of edges on the two sides of M is defined to be the length of the diagonal. Is it posible to have
(a) 991 diagonals of length 3 and 6 of length 2?
(b) 985 diagonals of length 6,4 of length 8, and 8 of length 3? combinatorial geometrycombinatoricsdiagonals