270.2でも3でも割り切れない正の整数全体を小さいものから順に並べて a1,a2, A3, ..., an, とする. a 2n-1 X (1) nで表せ. ATS (2) 与えられた正の整数nに対して, am ≧6nとなる最大のm を求めよ. m (3)(2)のm に対して, Zak を求めよ. k=1 (筑波大)

270 14 3 4 5 a. az 6 7 7 7 6 11 a3 a4 (1) azn+= 1+ (n-116 = 6n-5 azn = 5+10-116 =62-1 (2) Am ≤ 62 11/84 m = 27-1, 2n 6η-56η-16ηより m = 2n (3) = A = A1, A2, A3, A4, A5 ... 2. Am m = 2n F" (2-1)+(21 k=1 n = (6-51+ (67-11 (36-60n+25+ 367-(2n+1) =72m²-72n+26 26 =72. (n+1)/(2n+1)-72. (n+1/+26n = 72(n+1)(n+1)-216n (n+1/+156 6 72 26 156 Zn ₤24(n+1)(2n+1)-72 (2+11+52} 131 162-172 =130²-12n+1) K=1 2 -7/8 (2n+1) (4+1) - 12 (2n+1)+2n = In (48n²-48n+52) = (2n (2n+1)(en) - 4n (2n+1/+an = 24n³ - 24 n² +26 n = 2n {6 (2n+1)(n+1)-2n (2n+1)+1} = 2n