已知数列an为等比数列且4a1,a5,-2a3
来源:学生作业帮助网 编辑:作业帮 时间:2024/08/05 19:07:33
证明:由于S(n+1)=4an+2则有:Sn=4a(n-1)+2两式相减,得:S(n+1)-Sn=4(an-a(n-1))a(n+1)-2an=2[an-2a(n-1)]由于bn=a(n+1)-2an
①设公差为d,公比为q∵数列{an+bn}的前三项依次为3,7,13∴a1+b1=3a2+b2=7a3+b3=13又a1=1∴b1=2d=2q=2∴an=2n-1,bn=2n②∵an=2n-1,bn=
a1=2,a2=1,等比1/2,an=2×(1/2)^(n-1).a1=2a2=1,a1=1,a2=1/2,等比1/2,an=1×(1/2)^(n-1).
a(n)=2n-1b1=12b2=b1公比为1/2b(n)=1/2^(n-1)Cn=(2n-1)*2^(n-1)Sn=1+3*2^1+5*2^2+.+(2n-1)*2^(n-1)2Sn=2+3*2^2
(1)已知{an}为递增的等比数列可知等比不可能是负数,有以下2种情况若q
a2=a1+da4=a1+3da6=a1+5da2,a4-2,a6成等【比】数列(a1+3d-2)^2=(a1+d)(a1+5d)(3d-1)^2=(1+d)(1+5d)9d^2-6d+1=5d^2+
设公差值为ca1+a2+a3=a1+(a1+c)+(a1+c+c)=3a1+3c=12c=2an=a1+c(n-1)=2nbn=3^(2n)b(n+1)/bn=3^(2n+2)/3^2n=9所以bn是
a(n+1)+1/2=3an+1+1/2=3(an+1/2)a1+1/2=1所以{an+1/2}是以1为首相,3为公比的等比数列an+1/2=3^(n-1)an=3^(n-1)-1/2
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
设数列的公比为q,首项为a1,则∵a52=a10,2(an+an+2)=5an+1,∴(a1q4)2=a1q9,2(1+q2)=5q,∵等比数列{an}为递增数列,∴q=2,a1=2∴an=2n故答案
(1)∵数列{an}是公差不为零的等差数列,a1=2,且a2,a4,a8成等比数列,∴(2+3d)2=(2+d)(2+7d),解得d=2,∴an=2n.(2)∵an=2n,∴3an=32n=9n,此数
1.a1=1,a2=3,所以an=2n-1b1=1,b2=0.5,所以an=(0.5)^(n-1)=2^(1-n)2.Cn=an/bn=(2n-1)*2^(n-1)Sn=1*2^0+3*2^1+5*2
电脑打字太麻烦思路应该是对的~
a1=a2-2,a5=a2+6∴a22=a1a5=(a2-2)(a2+6),解得a2=3故选D
a1a2a3成等比数列a2^2=a1a3=a3(a1+d)^2=a1+2da1^2+2a1d+d^2=a1+2d1+2d+d^2=1+2dd^2=0d=0公差不为零的等差数列错题
设首项为a1,公差为d.由题得:a1+a5=2*4a1*a7=a₃^2则:a1+(a1+4d)=8a1(a1+6d)=(a1+2d)^2综上解得a1=2d=1所以S5=20
由题意得S3=A1+A2+A3=A1+qA1+q*qA1=7A1整理得q*q+q-6=0解得q=-3或2