已知等比数列为递增数列,且a5的平方=a10
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依题意有:(a1+2d)^2=a1(a1+8d)5a1+10d=(a1+4d)^2即:d^2-a1d=0a1^2+16d^2+8a1d-5a1-10d=0由于(an)是递增数列所以,d>0.所以:a1
a5^2=a10.得出(a1*q^4)^2=a1*q^9得出a1=qAn为递增数列,说明q>12[An+A(n+2)]=5A(n+1)A(n+2)=an·q^2;A(n+1)=an·q代入上式得:2A
(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
(1)由等差数列通项公式和求和公式:an=a1+(n-1)*dSn=n*a1+1/2[n*(n-1)]*d及a3^2=a1*a9S5=(a5)^2有(a1+2d)^2=a1(a1+8d)5a1+10d
已知公差为d(d不等于0),a1=1,那么:a2=a1+d=1+d,a5=a1+4d=1+4d,a14=a1+13d=1+13d又a2a5a14依次成等比数列,所以:(a5)²=a2*a14
(1)设An=q^(n-1),Bn=1+(n-1)d.由所给等式得q^4+2d=20,q^2+4d=12,设m=q^2,n=2d,则m,q>0,简化式子,易解得q=b=2.得An,Bn.(2)Bn/2
1.只有常数数列才能满足既成等比也成等差a10为12、等比a2+a4+.+a20=a1q+a3q+.+a19q=q(a1+a3+.+a19)=6故a1+a3+.+a19=6/3=2s20=a2+a4+
由于a5*a3=(a4)^2=64数列递增所以a4=8又a1=1所以q=2所以an=2^(n-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
设公比为q,数列是递增数列,q>1数列是等比数列,a1a5=a2a4=729,又a1+a5=246,a1、a5是方程x²-246x+729=0的两根.(x-3)(x-243)=0x=3或x=
设等比数列的公比为q由a5²=a10>0得(a1q^4)^2=a1q^9a1=q由2[an+a(n+2)]=5a(n+1)得2[an+q^2an]=5qan所以2q^2-5q+2=0解得q=
(1)将a4+a4q^2=2*(a4q+1)与a4q^3=1联立,得q=1/2,a4=8,所以an=64q^(n-1)(n>=1,n∈R+)(2)Sn=64[1-(1/2)^n]/(1-1/2)=12
a1=a2-2,a5=a2+6∴a22=a1a5=(a2-2)(a2+6),解得a2=3故选D
(1)因为a4,a5,a8成等比数列,所以a52=a4a8.设数列{an}的公差为d,则(3+3d)2=(3+2d)(3+6d)化简整理得d2+2d=0.∵d≠0,∴d=-2.于是an=a2+(n-2
设公比为q,那么a3=2/3q,a5=2q/3,于是2/3q+2q/3=20/9整理,得:(q-3)(3q-1)=0,而an递增,所以q>1,所以q=3那么an=2/3*3^(n-4)=2×3^(n-
a7=aq^6=1aq^4=1/q^2aq^3=1/q^3aq^5=1/qa4,a5+1,a6成等差数列2(a*q^4+1)=a*q^3+a*q^52a*q^4+2=a*q^3+a*q^52/q^2+
∵等差数列{an}中,a1,a2,a5成等比数列,∴a22=a1•a5,即(a1+d)2=a1•(a1+4d),又d=2,∴(a1+2)2=a1•(a1+8),整理得:a12+4a1+4=a12+8a