an为等差数列d不等于0

a3=a1+2da9=a1+8da1a9=a3^2a1*(a1+8d)=a1^2+8a1d(a1+2d)^2=a1^2+4a1d+4d^2a1^2+8a1d=a1^2+4a1d+4d^2(a1-d)d

额..a1=da2=2dq=a2/a1=2d/d=2.

a2=a1+d,a3=a1+2d.,a6=a1+5d,...,a10=a1+9d,若a1,a3,a6成等比数列,则a3^2=a1*a6,(a1+2d)^2=a1*(a1+5d),得到a1=4d.则(a

a1,a3,a9成等比数列a3^2=a1*a9(a1+2d)^2=a1*(a1+8d)解得a1=d(a1+a3+a9)/(a2+a4+a10)=(3a1+10d)/(3a1+13d)=13d/16d=

由题知：(a1+2d)(a1+14d)=(a1+8d)^2化简得到：(a1)^2+16a1*d+28d^2=(a1)^2+16a1*d+64d^236d^2=0解得：d=0因为d≠0故无解

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

a9²=a15²a9²-a15²=0(a9-a15)(a9+a15)=0公差d不等于0所以a9+a15=0a1+8d+a1+14d=0a1+11d=0-----

(1)由题意a2=1+d=b2=qa6=1+5d=b3=q^2,解得：d=3,q=4.(2)由(1)知等差数列的首项为1,公差为3,所以an=1+(n-1)*3=3n-2；等比数列的首相为1,公比为4

1.S5=5a1+10d=5(a1+2d)=70a1+2d=14a3=14a7^2=a2×a22(a3+4d)^2=(a3-d)(a3+19d)a3=14代入,整理,得d(d-4)=0d=0(已知d不

因为a5=a1+4d,a9=a1+8d,a15=a1+14d且a5a9a15成等比数列所以(a1+8d)^2=(a1+4d)(a1+14d)即(a1)^2+16a1*d+64d^2=(a1)^2+18

再问：求k1+2k2+3k3+.......+nkn=多少再答：令S=k1+2k2+...+nkn=2*[3^0+2*3^1+3*3^2+………+n*3^(n-1)]-(1+n)n/2令T=3^0+2

a1*a17=a5^2a1(a1+16d)=(a1+4d)^2a1^2+16a1d=a1^2+8a1d+16d^216d^2-8a1d=08d(2d-a1)=0a1=2d2d,3d,4d,5d,6d,

问题是什么?对于Sn,Sn为=等差数列与等比数列的对应各项积,所以Sn-qSn=a1b1+db2+db3+...+dbn-db(n+1)推出Sn=...对于Tn,Tn=Sn-2a1b1-2a4b4-2

【解】（1）方程A(k)(X^2)+2A(k+1)X+A(k+2)=0,则其Δ=4[A(k+1)^2-A(k)*A(k+2)]=4[[A(k)+d]^2-A(k)*[A(k)+2d]]=4d^2>0;

因为a1,a3,a9成等比数列,所以a3的平方等于a9*a1,化为a1+d模式,即为（a1+2d）^2=a1(a1+8d),化简为a1=d那末就分解原式吧化简为（a1+a1+2d+a1+8d)/(a1

Sn=a1+(n-1)dd作为自变量,是一次函数只要d>0Sn就单调递增所以Sn为递增数列的充分必要条件是d>0

A2*A2=A1*A4A2=A1+dA4=A1+d得A1=dA10=10dS10=10(A1+A10)/2=110A1=d=2An=2n

an=a1+(n-1)dSn=(a1+an)*n/2=(2a1+(n-1)d)n/2S10=(2a1+9d)*10/2=10a1+45dS5=(2a1+4d)*5/2=5a1+10d因为S10=4S5

证明：左边＝1/(a1a2)+1/(a2a3)+...+1/(an-1*an)＝1/d(1/a1-1/a2)+1/d(1/a2-1/a3)+...+1/d(1/an-1-1/an)=1/d[(1/a2