2根号下Sn=an 1
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(1)证明:数列{根号下Sn}是一个等差数列:(2)求{an}通项公式证明:(1)当n=1时,S1=a1=1,√S1=1当n≥2时,an=(√Sn+√Sn-1)/2=Sn-Sn-1(√Sn+√Sn-1
首先先说,该题需要有一个条件就是An和Sn的关系,我姑且猜测是{Sn}为{An}的前n项和.An=(√Sn+√Sn-1)/2Sn-Sn-1=(√Sn+√Sn-1)/2(把Sn看做√Sn的平方)√Sn-
证明:an=(√Sn+√Sn-1)/2=Sn-Sn-1=(√Sn+√Sn-1)(√Sn-√Sn-1)∴√Sn-√Sn-1=1/2(√Sn是等差数列)S1=a1=1,√S1=1,∴√Sn=1+(n-1)
sn-s(n-1)=an=[√sn+√s(n-1)]/2√sn-√s(n-1)=1/2√sn-√s1=(n-1)/2√sn=(n+1)/2√sn为等差数列sn=(n+1)(n+1)/4an=sn-s(
1.n≥2时,an=Sn-S(n-1)=√Sn+√S(n-1)[√Sn+√S(n-1)][√Sn-√S(n-1)]=√Sn+√S(n-1)[√Sn+√S(n-1)][√Sn-√S(n-1)-1]=0算
∵Sn-Sn-1=√Sn+√Sn-1∴(√Sn)²-(√Sn-1)²=√Sn+√Sn-1(√Sn-√Sn-1)(√Sn+√Sn-1)=√Sn+√Sn-1∴√Sn-√Sn-1=1(n
由题意得,Sn=[(an+1)/2]^2①则S(n+1)=[(a(n+1)+1)/2]^2②②-①得(结合a(n+1)=S(n+1)-Sn)a(n+1)=[(a(n+1)+1)/2]^2-[(an+1
两边平方,得(an+2)^2/4=2Sn,两边同时除2,得Sn=(an+2)^2/8,S_(n+1)-Sn=a_(n+1)=[(a_(n+1)+2)^2-(an+2)^2]/8,完全平方式化成三项式后
(1)当n≥2时an=(√Sn+√Sn-1)/2Sn-Sn-1=(√Sn+√Sn-1)/2√Sn-√Sn-1=1/2∴数列(根号下Sn)是一个等差数列(2)由(1)得√Sn=1+(n-1)/2=(n+
由于a1=-2,an+1=1−an1+an∴a2=1+a11−a1=−13,a3=1+a21−a2=12,a4=1+a31−a3=3,a5=1+a41−a4=−2=a1∴数列{an}以4为周期的数列∴
由题意得,Sn=[(an+1)/2]^2①则S(n+1)=[(a(n+1)+1)/2]^2②②-①得(结合a(n+1)=S(n+1)-Sn)a(n+1)=[(a(n+1)+1)/2]^2-[(an+1
由于an=sn-sn-1=(根号sn)^2-(根号sn-1)^2=(根号sn-根号sn-1)*(根号sn+根号sn-1)=根号sn+根号sn-1)/2上面等号两边同时约去(根号sn+根号sn-1)可得
两边平方,得(an+2)^2/4=2Sn,两边同时除2,得Sn=(an+2)^2/8,S_(n+1)-Sn=a_(n+1)=[(a_(n+1)+2)^2-(an+2)^2]/8,完全平方式化成三项式后
1.2√Sn=an+14Sn=(an)^2+2an+14S1=(a1)^2+2a1+1=4a1,a1=14S(n-1)=[a(n-1)]^2+2a(n-1)+14an=4[sn-s(n-1)]=(an
两边同时平方,得10+根号下24+根号下40+根号下60=(根号下2)^2+(根号下3+根号下5)^2,左边再化简得:10+2*根号下6+2*根号下10+2*根号下15右边再化简得:2+3+5+2根号
√Sn-√S(n-1)=√2令bn=√Sn则bn是以√2位公差的等差数列bn=b1+(n-1)√2S1=a1=2所以b1=√S1=√2所以bn=√2+(n-1)√2=n*√2所以Sn=(bn)^2=2
(1)证明:若an+1=an,即2an1+an=an,解得an=0或1.从而an=an-1=…a2=a1=0或1,与题设a1>0,a1≠1相矛盾,故an+1≠an成立.(2)由a1=12,得到a2=2
因为2√S(n)=a(n)+12√S(n+1)=a(n+1)+1所以两式平方相减4(S(n+1)-S(n))=[a(n+1)+1]^2-[a(n)+1]^24·a(n+1)=[a(n+1)]^2+2·
∵1=2,an+1=1+an1−an(n∈N*),∴a2=1+a11−a1=1+21−2=-3,a3=1+a21−a2=1−31+3=−12a4=1+a31−a3=1−121+12=13a5=1+a4
根号下Sn-根号下S(n-1)-根号2=0根号下Sn-根号下S(n-1)=根号2设bn=(Sn)^(1/2)则:bn-b(n-1)=根号2b1=(S1)^(1/2)=(a1)^(1/2)=根号2bn=