見解析
【解析】必要性:
設{an}是公差為d1的等差數(shù)列�,則
bn+1-bn=(an+1-an+3)-(an-an+2)
=(an+1-an)-(an+3-an+2)=d1-d1=0,
所以bn≤bn+1(n=1��,2,3�,…)成立.
又cn+1-cn=(an+1-an)+2(an+2-an+1)+3(an+3-an+2)=d1+2d1+3d1=6d1(常數(shù))(n=1,2�,3,…)����,
所以數(shù)列{cn}為等差數(shù)列.
充分性:
設數(shù)列{cn}是公差為d2的等差數(shù)列,且bn≤bn+1(n=1�����,2���,3�����,…).
∵cn=an+2an+1+3an+2����,①
∴cn+2=an+2+2an+3+3an+4����,②
①-②��,得cn-cn+2=(an-an+2)+2(an+1-an+3)+3(an+2-an+4)=bn+2bn+1+3bn+2.
∵cn-cn+2=(cn-cn+1)+(cn+1-cn+2)=-2d2�,
∴bn+2bn+1+3bn+2=-2d2��,③
從而有bn+1+2bn+2+3bn+3=-2d2�����,④
④-③�����,得(bn+1-bn)+2(bn+2-bn+1)+3(bn+3-bn+2)=0.⑤
∵bn+1-bn≥0�����,bn+2-bn+1≥0��,bn+3-bn+2≥0���,
∴由⑤得bn+1-bn=0(n=1,2�����,3,…).
由此不妨設bn=d3(n=1�����,2����,3,…)����,則an-an+2=d3(常數(shù)).
由此cn=an+2an+1+3an+2?cn=4an+2an+1-3d3,
從而cn+1=4an+1+2an+2-5d3�,
兩式相減得cn+1-cn=2(an+1-an)-2d3,
因此an+1-an=
(cn+1-cn)+d3=
d2+d3(常數(shù))(n=1�����,2��,3�����,…)�����,
∴數(shù)列{an}為等差數(shù)列.
