sn=3n p,an为等比数列,求q
来源:学生作业帮助网 编辑:作业帮 时间:2024/05/05 19:35:42
an+sn=-2n-1,当n=1时,a1+s1=-3,则a1=-3/2.由已知得:sn=-2n-1-an当n大于或等于2时,则an=sn-s(n-1)=-2n-1-an-[-2(n-1)-1-a(n-
n=1时,a1=1+3a1.即a1=-1/2.n>1时,an=Sn-Sn-1=1+3an-(1+3a(n-1))=3an-3a(n-1),即an=3/2a(n-1),即an=-1/2*(3/2)^(n
Sn=n-5an-85S1=1-5a1-85即a1=1-5a1-85解得a1=-14an=Sn-S(n-1)=n-5an-85-[(n-1)-5a(n-1)-85]=-5an+5a(n-1)+16an
Sn,S2n-Sn,S3n-S2n成等比数列48,12,3S3n-S2n=3S3n=3+S2n=63
设首项为a1,公比为r,当r=1时,Sn=n(a1),此时Sn/S(n+1)的极限为1r≠1时,Sn=a1(1-r^n)/(1-r),Sn/S(n+1)=(1-r^n)/(1-r^(n+1)),极限为
Sn-S(n-1)=an=2an+3-2a(n-1)-3=2an-2a(n-1)an=2a(n-1){an}为等比数列,公比为2
证明:A(n+1)=Sn+3n+1,则An=S(n-1)+3n-2两式想减得A(n+1)-An=Sn+3n+1-(S(n-1)+3n-2)=An+3即A(n+1)+3=2(An+3)即(A(n+1)+
因数列{an}为等比,则an=3qn-1,因数列{an+1}也是等比数列,则(an+1+1)2=(an+1)(an+2+1)∴an+12+2an+1=anan+2+an+an+2∴an+an+2=2a
Sn=4An-3S(n-1)=4A(n-1)-3Sn-S(n-1)=An=4An-3-[4A(n-1)-3]=4an-3-4A(n-1)+3=4An-4A(n-1)3An=4A(n-1)An/A(n-
第一个:S2=a1+a2=a1+a1q=a1(1+q)第二个:S1,S3,S2成等差数列,S3-S1=S2-S3=d再问:通常这些题是用等比的条件穿插在等差里么?再答:有时候等比中某些项的和构成等差,
1.证:Sn=(3an-n)/2Sn-1=[3a(n-1)-(n-1)]/2an=Sn-Sn-1=[3an-3a(n-1)-1]/2an=3a(n-1)+1an+1/2=3a(n-1)+3/2=3[a
Sn+an=n^2+3n+5/2①当n=1时,S1+a1=1^2+3*1+5/2=13/2而S1=a1,所以2a1=13/2,即a1=13/4,所以a1-1=9/4;又S(n-1)+a(n-1)=(n
an=Sn-S(n-1)=2(an-3)-2[a(n-1)]-3=2an-2a(n-1)]an=2a(n-1)所以an是等比数列q=1S1=a1所以a1=2(a1-3)a1=6所以an=6*2^(n-
数列{an}前N项和Sn3Sn=(an-1),(1)当n>=2,有:3Sn-1=[a(n-1)-1],(2)(1)-(2),3an=an-an-1an/an-1=-1/2,(n>=2)当n=1,3S1
n=b1.q^(n-1)bn=an-3nan=bn+3n=b1.q^(n-1)+3nSn=a1+a2+...+an=b1(q^n-1)/(q-1)+3n(n+1)/2
Sn=3a(n+1)+m与S(n-1)=3an+m两式相减:Sn-S(n-1)=an=3a(n+1)-3an.a(n+1)/an=4/3,所以q=4/3.
显然a2,a4是方程x^2-20/3*x+4=0的两个实根解得x1=2/3x2=6若a2=2/3a4=6则q=3a1=2/9an=2/9*3^(n-1)若a2=6a4=2/3则q=1/3a1=18an
已知Sn=2An-1取n=1得:S1=2A1-1又因为S1=A1,解上述方程可得:A1=1Sn=2An-1S(n-1)=2A(n-1)-1注:"n-1"为下标上下两式相减得:Sn-S(n-1)=2An
由题意有:S3=a1(1+q+q^2)=3*a1*q^2即:1+q+q^2=3q^2所以:2q^2-q-1=0即(2q+1)(q-1)=0解得:q=-1/2或q=1