证明:a(n+2)=[an+a(n+1)]/2
a(n+2)-a(n+1)=-[a(n+1)-an]/2,即
b(n+1)=-bn/2,
b(n+1)/bn=-1/2,b1=a2-a1=1-0=1
所以bn是以q=-1/2等比数列
bn=b1q^(n-1)=(-1/2)^(n-1)
数列{an} {bn}满足:a1=0 a2=1 a(n+2)=[an+a(n+1)]/2 bn=a(n+1)-an 求证
1个回答
相关问题
-
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}中,a1=-1,a2=0,a(n+1)+4a(n-1)=4an(n>=2),数列bn满足 bn=a(n+1)
-
数列{an}与{bn}满足关系:a1=2,a(n+1)=(an^2+1)/2an,bn=(an+1)/(an-1).(n
-
数列{an }满足an=4n-1,bn=(a1+a2+a3...+an)/n(n属于N+)求证数列{ an}是等差数列
-
数列{an}满足a1=1,a2=2,an=1/2(an-1+an-2)(n=3,4...),数列{bn}满足bn=an+
-
已知数列{an}中a1=[3/5],an=2-[1an−1(n≥2,n∈N*),数列 {bn},满足bn=1a
-
(1)在数列{an},a1=2,an=2an-1+2n+1(n≥2,n∈N*),令{bn}= an/2n,求证:{bn}
-
1.已知数列{an},{bn}满足a1=2,a2=4,bn=a(n+1)-an,b(n+1)=2bn+2.
-
已知数列(an)满足:a1-1,a2-a(a>0),数列(bn)满足bn=ana(n+1)(n∈N)
-
已知数列{an}中,a1=35,an=2−1an−1(n≥2,n∈N+),数列{bn}满足:bn=1an−1(n∈N+)