数列AN满足A1=2,AN+1=AN^2+6AN+6,设CN=LOG5(AN+3),证{CN}为等比
人气:116 ℃ 时间:2020-05-14 13:49:45
解答
a(n+1)=an^2+6an+6=(an+3)^2-3,即a(n+1)+3=(an+3)^2,从而log5[a(n+1)+3]=2log5(an+3)
而cn=log5(an+3),则结合上式即得c(n+1)=2cn,并且c1=1故{cn}为等比数列
推荐
- 已知数列{an}是首项为a1=1/4,公比q=1/4的等比数列,设bn+2=3(log1/4)an(n∈N*),数列{Cn}满足Cn=an*bn
- 数列的前n项和为Sn,数列中,b1=a1,bn=an-an-1(n≥2),若an+Sn=n. (1)设cn=an-1,证:是等比数列
- 已知数列{an}是首项a1=1/4,公比q=1/4的等比数列,设(bn)+2=3log1/4an(n∈N*),数列{cn}满足cn=an*bn.
- 数列{an}中,a1=-5,an=(5a(n-1))/(6 - a(n-1))(n大于等于2) 若cn=an/ (an 减1 ) 证明cn为等比数列
- a1=1,Sn+1=4an+2,设bn=an+1-2an,设Cn=an/3n-1,证明Cn为等比数列
- -Hello,may I speak to Mrs Zhang,please?-Sorry,she is not in .She ___the school gym.
- 我最感动的时刻 - 作文 500字
- 一个数的2又5分之1倍是1又5分之4,这个数是多少?
猜你喜欢
