541 【 *(1) (4) 次の和を求めよ。 計算】 Σ (2k-3) k=1 n Σk(k+1)(k+2) k=1 2² (n ≥0) k=0 n *(2) Σ (k³+1) *(3) Σk(k+1) k=1 k=1 n-1 n (5) Σk(k+4) (n ≥2) *(6) Σ2²-1 k=1 ^ k=1 n-1 n *X2-¹ (n=2) (9) 3 R-1 k=1 k=1 TOM

(2) 宮(k3+1) tin Jin Hơn n 2 + n n³ + 4 n² + 4.4n 2 n (h³ (n) + n +4) 4- (3) 2/2 k ( k + 1) In(n+1)(2n +1) + == n(n+¹) V Inin+1) (2011) + | 3h (n + 1) ナ = = n(n+1){(2n + 1) +35 sán int24+2) 3ninton+2) PRES n (4) 2₁ k lk + 1) (1 + 2) k² + 3 / +2 k³ + 3k² + 2k Enents 3 thn Hent) +2₁ ≤n(n+1) S = '+ n²(n + 1)² + = n(n+1) (2n+1) + h (n + 1) + n(n+1)² + 4 2h (n+1) (2n+1) +4· 4h(n+1) =&n(n+1) {n(n+1) + 2 (2n²+ ²) + 45 & n(n+1)(n²+ sn + 6) Senintent)(n+3)

n n n k=1 k=1 k=1 541. (1) (2k-3)=2Σk-Σ3=2× n(n+1)-3n =n(n-2) 別解 初項 2-3=-1, 末項 2n-3, 項数nの等差数列の和であ るから. n (2k-3) = n(-1+(2n-3)}=n(n-2) k=1 (2) > 2(x+1)=2k³+21=n(n+1)]} ² + n 1: = n(n²+2n²+n+4) n (3) Σk(k+1)= (k²+k) == n(n+1)(2n+1)+ n(n+1) k=1 k=1 1 == n(n+1){(2n+1)+3}={_n(n+1)(2n+4) 6 =_n(n+1)(n+2) n (4) Σk(k+1)(k+2)= Σ(k³+3k²+2k) k=1 k=1 =zn(n+1) +3•½ n(n+1)(2n+1)+2·½ n(n+1) t 1 = n(n+1){n(n+1)+2(2n+1)+4} = n(n+1)(n²+5n+6) = n(n+1)(n+2)(n+3) 72