是等差数列
an=lg(3^n)-lg[2^(n+1)]
=nlg3-(n+1)lg2
bn-bn-1
=a2n-a2(n-1)
=2nlg3-(2n+1)lg2-{2(n-1)lg3-[2(n-1)+1]lg2}
=2nlg3-2nlg2-lg2-2nlg3+2lg3+2nlg2-lg2
=2lg3-2lg2为常数
所以根据等差数列的定义,bn为等差数列
数列{an},{bn}中,an=lg(3^n)-lg[2^(n+1)],bn=a2n,求证{bn}是否为等差数列
1个回答
相关问题
-
设数列{an},{bn},满足an=[lg(b1)+lg(b2)+...+lg(bn)]/n,证明{an}为等差数列的冲
-
数列{An},{Bn},已知An=nlg3-(n+1)lg2,Bn=A3n,试问数列{Bn}是等差数列吗?如果不是请说明
-
数列{an}满足a1=1,an^2=(2an+1)a(n+1),令bn=lg(1+1/an),求证{bn}为等比数列
-
数列an中,a1=1,an+2an*a(n-1)-a(n-1)=0(n>=2) 若bn=1/an 求证bn为等差数列
-
数列{an}为等差数列,数列{bn}满足bn=2an+1+a2n-1,证明{bn}为等差数列
-
在数列}an}中,a1=2,an=2an-1+2^n+1(n》=2) 令bn=an/2^n,求证{bn}是等差数列.
-
已知数列{an}中a1=2,an/n=[a(n-1)/(n-1)]+1,求证:bn=an/n,求数列{bn}是等差数列并
-
数列{an}和{bn}满足an=1n(b1+b2+…+bn)(n=1,2,3…),求证{bn}为等差数列的充要条件是{a
-
已知{An}为等差数列,Bn=A3n+1,求证数列Bn为等差数列.
-
在数列{an}中,a1=1,an+1=(1+1/n)an+(n+1)∕2n 设bn=an/n,求证bn+1-bn=1/2