【答案】(1)
���;(2)見解析
【解析】
先假設(shè)存在符合題意的常數(shù)a��,b����,c,再令n=1�,n=2,n=3構(gòu)造三個(gè)方程求出a�,b,c����,再用用數(shù)學(xué)歸納法證明成立,證明時(shí)先證:(1)當(dāng)n=1時(shí)成立.(2)再假設(shè)n=k(k≥1)時(shí)�����,成立��,即122+232+…+k(k+1)2=
(3k2+11k+10)�����,再遞推到n=k+1時(shí)����,成立即可.
(1):假設(shè)存在符合題意的常數(shù)a��,b��,c�,
在等式122+232+…+n(n+1)2
=
(an2+bn+c)中��,
令n=1���,得4=
(a+b+c)①
令n=2���,得22=
(4a+2b+c)②
令n=3,得70=9a+3b+c③
由①②③解得a=3���,b=11���,c=10��,
于是���,對(duì)于n=1��,2����,3都有
122+232+…+n(n+1)2=(3n2+11n+10)(*)成立.
(2)下面用數(shù)學(xué)歸納法證明:對(duì)于一切正整數(shù)n,(*)式都成立.
(1)當(dāng)n=1時(shí)����,由上述知,(*)成立.
(2)假設(shè)n=k(k≥1)時(shí)����,(*)成立,
即122+232+…+k(k+1)2
=
(3k2+11k+10)����,
那么當(dāng)n=k+1時(shí),
122+232+…+k(k+1)2+(k+1)(k+2)2
=(3k2+11k+10)+(k+1)(k+2)2
=
(3k2+5k+12k+24)
=[3(k+1)2+11(k+1)+10]��,
由此可知�����,當(dāng)n=k+1時(shí)����,(*)式也成立.
綜上所述,當(dāng)a=3���,b=11�,c=10時(shí)題設(shè)的等式對(duì)于一切正整數(shù)n都成立.
