第1章 数列と極限 10 23 次を満たす数列{an} の一般項を求めよ. (1) 初項 a1= 1, 漸化式 an+1 = an + n + 2 1 01= 1, 漸化式 an+1 = an+ 2n (2)初項 a1 24 次を満たす数列{an}の一般項を求めよ. 教問 1.14 (1)初項 a1 = 1,第2項a2= 2,漸化式an+2=3an+1-2an (2)初項 a1 = 1,第2項a2=2,漸化式2an+2=an+1+an 教問 1.15 次に bn すなわち bn

第1章の解答 1.3節 21 (1) 例:2m² -5 +4 22 (1) an = 5.2-12 23(1) an=n'+3n-2 2 24 (1) an = =2n-1 - (2) 例: (n+1)(2n2-5n+6) (2)an=3-1 6 (3) an= = 6- 3 2n-1 (2) an = 2 - 2m²-1 1 (2) an = 3 + 1/(-1/2) n-2 143 25 (1) (2) いずれも一般項はan = 2n-1 2n-1. 証明略(ヒント:最初の数項を書き下してみよ.) 26 (1)~(3) 証明略(ヒント: いずれもn=1で成り立つ.n=Nでも成り立つと仮 定せよ.) 27 (1) an=2n- (n2+4n + 5 ) (2) an=3n-1/2(n2+n+1) 28 (1) an = 3- 1 n-1 2n-2 2n-1 29 (1) an 1 = 2n+1-3 (2) an = (2) an = =2- (n+1)(5n-4) n2

2anta = antitan (2) Anta 〃 = antit an x²-2x-1=0 (x-1) (x+2) = 0x = 1, - — — X=10=-1/2のときant2+//an+1 bn = An+ 2 - Ban+1 = x (anti-Ban) = antit & an anti + {anxx but₁ = ant₂+ & anti bnti = bn b₁ = a2+ a₁ = 9 + 1x1 = 5)=>{bn}={x/h リ n- anti + an an+ 1 = = = (anti-an) α= -3 B = 117zz anta - anti = - Gn = anti-an Cuti amız-anti ½ Ch+l = = Ch === C₁ = 02-a₁ = 2-1 = 1) (43 = 1. (±) m² = (+) m { anti-an = - (+)^-1 n- = ant (+)m + ± an ₤41-1 3 h-1 an = -+ | - an = 5 x 1 (n-1) - 3/1/1/(m-D |- $-33 (1) ②