设数列an是公差大于0的等差数列,sn为数列an的前n项和,已知s3等于9
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数列an满足条件:A1=1,A2=r(r>0)数列{an+an+1}是公差为d的等差数,令bn=an+an+1即首项b1=a1+a2=1+rb3=a3+a4=b1+2d=1+r+2db5=a5+a6=
设{A(n)}的通项公式为:A(n)=2+d(n-1){B(n)}的通项公式为:B(n)=2×q^(n-1)则{A(n)}的前n项和为:S(n)=[A(1)+A(n)]n/2=[4+d(n-1)]n/
a1=a2-d,a5=a2+3d所以a2a2=(a2-d)(a2+3d)得2da2=3dd即a2=3d/2所以a1=a2-d=1d/2=1得出d=2公差=2,首项=1,后面你会的即a10=19故S10
(1)当n=4时有a1,a2,a3,a4.将此数列删去某一项得到的数列(按照原来的顺序)是等比数列.如果删去a1,或a4,则等于有3个项既是等差又是等比.可以证明在公差不等于零的情况下不成立(a-d)
本题考查的是数列重组后新数列的性质问题当n=2k时,(相邻两项提公因式后,变成n/2个特殊数列公差为4/3)Sn=b1+b2+...+b2k=A1A2-A2A3+A3A4-A4A5+...+A(2k-
(1)(an+2)/2=根号下2Sn所以8Sn=(an+2)^2n=1,S1=a1.8a1=(a1+2)^2,得a1=2n=2,8S2=(a2+2)^2,8(a1+a2)=(a2+2)^2,得a2=6
a2+a7=a3+a5=16a3a5=55a3=5a5=11d=3a1=-1an=3n-4
设等比数列{an}的公比为q,则:a2=a1q,a3=a1q2,由a3是a1,a2的等差中项,得:2a3=a1+a2,即2a1q2=a1+a1q,因为a1≠0,所以2q2-q-1=0,解得:q=−12
设该等差数列是首项为a1,公差为dS3=3a1+3(3-1)*d/2=3a1+3dS2=2a1+2(2-1)*d/2=2a1+dS4=4a1+4(4-1)*d/2=4a1+6d又:S3²=9
(1)an=a1+(n-1)da3a6=55(a1+2d)(a1+5d)=55(1)a2+a7=162a1+7d=16a1=(16-7d)/2(2)sub(2)into(1)((16-7d)/2+2d
设该等差数列是首项为a1,公差为dS3=3a1+3(3-1)*d/2=3a1+3dS2=2a1+2(2-1)*d/2=2a1+dS4=4a1+4(4-1)*d/2=4a1+6d又:S3²=9
设AN=A1Q^(n-1)S3=7,2*3A2=A3+4A1+3a1(1+q+q^2)=7a1q+6a1q=7+a1(1+q+q^2)=142q^2-5q+2=0求得q=2q=1/2(舍去q>1)An
再问:我看懂了,谢谢。不过请你把第四行写的证明一遍,好多人可能还不会证明,服务大众,我多给点分,谢谢再答:
S(n+1)=4an+2Sn=4a(n-1)+2S(n+1)-Sn=4an-4a(n-1)=a(n+1)有a(n+1)-2an=2(an-2a(n-1))可得{a(n+1)-2an}为q=2的等比有公
由题意得(an+1)/2=√(Sn×1)Sn=[(an+1)/2]²n=1时,S1=a1=[(a1+1)/2]²,整理,得(a1-1)²=0a1=1n≥2时,Sn=[(a
a1+a2+...+an=(1/2)(an²+an)a1+a2+...+a(n-1)=(1/2)(a(n-1)²+a(n-1))两式相减得an=(1/2)(an²+an)
/>1、a3=a2^2-10a1+2d=(a1+d)^2-10a1=22+2d=(2+d)^2-10d=2或-4(舍去)an=2+(n-1)*2=2n2、bn=1*2^(n-1)=2^(n-1)设cn
等差数列a3+a6=a2+a7=16a3a6=55所以a3和a6是方程x²-16x+55=0的根(x-5)(x-11)=0d>0a6>a3所以a3=5,a6=113d=a6-a3=6d=2a