an是等比数列,首项a公比q bn=1 a1 a2 an
来源:学生作业帮助网 编辑:作业帮 时间:2024/07/01 00:17:37
![an是等比数列,首项a公比q bn=1 a1 a2 an](/uploads/image/f/461205-45-5.jpg?t=an%E6%98%AF%E7%AD%89%E6%AF%94%E6%95%B0%E5%88%97%2C%E9%A6%96%E9%A1%B9a%E5%85%AC%E6%AF%94q+bn%3D1+a1+a2+an)
我猜你的题目给出的条件是a(n+2)=a(n+1)+2an,就像楼上所列正解如下a3=a2+2a1=2a1+1a4=a3+2a2=2a1+1+2=2a1+3又an为等比数列,a2=a1*q,a3=a1
S4=a1(1-q^4)/(1-q)=5a1(1-q^2)/(1-q)1+q^2=5q^2=4因为q
设A1A2=a则:由于在数列{An}中An小于0故a>0,且An+1An+2/AnAn+1>0即q>0;由题中:2AnAn+1+An+1An+2>An+2An+3得2aq^(n-1)+aq^n>aq^
因为a2+a5=9/4,a3.a4=1/2所以a2(1+q^3)=9/4,a2^2.q^3=1/2(计算过程把q^3看作整体来解)即a2=2,q=1/2所以an=4.(1/2)^(n-1)
(1)a3*a4=a2*a5=1/2a2+a5=9/4-1
首先得求的a1a4=5s2...a1q^3=5(a1+a1q)又.a3=a1q^2=2...所以.2q=5(a1+a1q)得.a1=(2q)/(5(1+q))又因为.a3=a1q^2=2得.q=1.2
等比数列an=a1*q^(n-1),Sn=a1(1-q^n)/(1-q)∴a3=2=a1*q^(3-1)=a1*q^2S4=5S2=>a1(1-q^4)/(1-q)=5*a1(1-q^2)/(1-q)
a1*p=a2a1*p^3=a4,a1*p-a1=a1*p^3-a1*Pp-1=p^(p^2-1);(p-1)(p*(p+1)-1)=0,p=1,或p^2+p-1=0,p=(-1+√5)/2,p=(-
a1,a2,a4成等差数列2a2=a1+a4即2a1*q=a1+a1q^3a1不为0所以:2q=1+q^3q^3-2q+1=0q^3-q^2+q^2-2q+1=0q^2*(q-1)+(q-1)^2=0
a1,a2,a4成等差数列所以2a2=a1+a4{an}是等比数列a2=a1qa4=a1q^3所以2×a1q=a1+a1q^3即:q^3-2q+1=0(q-1)(q^2+q-1)=0q=1或q=(-1
a1,a2,a4成等差数列所以2a2=a1+a4{an}是等比数列a2=a1qa4=a1q^3所以2×a1q=a1+a1q^3即:q^3-2q+1=0(q-1)(q^2+q-1)=0q=1或q=(-1
a1,a2,a4成等差数列2a2=a1+a4即2a1*q=a1+a1q^3a1不为0所以:2q=1+q^3q^3-2q+1=0q^3-q^2+q^2-2q+1=0q^2*(q-1)+(q-1)^2=0
由题意知a1=1,q=a-32,且|q|<1,∴Sn=a11−q=a,即11−a+32= a,解得a=2.故选B.
S4=a1(1-q4)/(1-q),S2=a1(1-q2)/(1-q),已知S4=5S2,则a1(1-q4)/(1-q)=5a1(1-q2)/(1-q),即q=±2,又公比q
等比数列an的公比大于1,设公比为q,且q>1a1a3=6a2,a1*a2*q=6a2a1*q=6a2=6a1.a2.a3-8成等差,2a2=a1+a3-82*6=6/q+6*q-820q=6+6q^
a1(1+q)=1,a1q^2(1+q)=4q^2=4,q=-2a4+a5=a1q^3(1+q)=(a3+a4)*q=-8
4a1,a5,-2a3成等差数列2a5=4a1-2a32a1q^4=4a1-2a1q^2q^4+q^2-2=0(q^2+2)(q+1)(q-1)=0因为q不等于1所以,q=-1
S4=a1(1-q4)/(1-q),S2=a1(1-q2)/(1-q),已知S4=5S2,则a1(1-q4)/(1-q)=5a1(1-q2)/(1-q),即q=±2,又公比q
∵等比数列{an}中,公比q=12,且log2a1+log2a2+…+log2a10=55=log2(a1a2…a10)=log2 (a1a10) 5,∴(a1a10)5=255,
由a/an=bn,得a/a=b,{an}是公差为d的等差数列,{bn}是公比是q的等比数列,∴a/a*an/a=q,即[a1+(n-1)d][a1+(n+1)d]/[a1+nd]^2=q(常数)对n∈