已知数列an bn其中a1=1 2 数列an的前n项和Sn=
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a1+a2+a3=12a1+a1+d+a1+2d=126+3d=12d=2an=a1+d(n-1)=2+2n-2=2nsn=b1+b2+b3+b4+b5+.+bn=3^2+3^4+3^6+.3^2n=
因an=2^n,bn=2n-1所以anbn=(2n-1)2^n所以tn=a1b1+a2b2.+anbn=1*2+3*2^2+5*2^3+.+(2n-3)2^(n-1)+(2n-1)2^n两边乘以2得2
假设公比为q,则a2=a1*q,a3=a1*q^2,a4=a3+(a3-a2)=a1(2q^2-q)所以a1+a1(2q^2-q)=16,a1*q+a1*q^2=12解得a1=1,q=3,或者a1=1
a1=2a1+a2+a3=12a2=4d=2an=2nbn=3^an=3^2n=9^n数列bn是以9为首项,公比=9的等比数列Sn=9(1-9^n)/(1-9)=(9^[n+1]-9)/8
1,a1+a2+a3=3a1+3d=12∴d=2,an=2n2,Sn=2x^1+4x^2+……+2nx^n①x*Sn=2x^2+4x^3+……+2nx^(n+1)②②-①得(x-1)*Sn=2nx^(
a1=2,a1+a2+a3=12a2=4d=2an=2n2.Sn=2*3+4*3^2+6*3^3+……+2n*3^n3Sn=2*3^2+4*3^3+……+(2n-2)*3^n+2n*3^[n+1]相减
{an}是等差数列,且a1=2,a1+a2+a3=12而2a2=a1+a3所以a2=4所以公差d=a2-a1=2所以an=a1+(n-1)d=2nbn=(1/2)^n*2n和Tn=b1+b2+……+b
(1)设数列{an}的公差为d,数列{bn}的公比为q,则由题意知a1b1=1(a1+d)(b1q) =4(a1+2d)(b1q2) =12 ,因为数列{an}各项为正数
an=3/(2^n)-2/(3^n)Sn=2-3/(2^n)+1/(3^n)由bn是等差数列得[an-a(n-1)/3]/[a(n+1)-an/3]=2由cn是等比数列得[a(n+1)-an/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
an=2nbn=3^an=9^n数列{bn}的前n项和Sn=9(9^n-1)/8
an=a1+(n-1)dbn=b1+(n-1)Da1=36.b1=64,a100+b100=100所以d+D=0an的等差为d.则bn的等差为-d数列an+bn是等差为0的等差数列100*200=20
解题思路:构造数列解题过程:varSWOC={};SWOC.tip=false;try{SWOCX2.OpenFile("http://dayi.prcedu.com/include/readq.ph
n是(1/2)n还是1/(2n)
∵数列{log2(an+1-an3)}是公差为-1的等差数列,∴log2(an+1-an3)=log2(a2-13a1)+(n-1)(-1)=log2(1936-13×56)-n+1=-(n+1),于
(1)由等差数列的前n项和的公式,Sn=n*a1+(1/2)*n*(n-1)*d,根据题意可得1*10+(1/2)*10*(10-1)*d=100,解得公差d=2所以an=a1+(n-1)*d=1+(
cn=anbn=(3n-1)*2^nSn=2*2^1+5*2^2+……+(3n-1)*2^n2Sn=2*2^2+……+(3n-4)*2^n+(3n-1)*2^(n+1)相减:Sn=(3n-1)*2^(
∵函数f(x)=x/(1+2x),正项数列{a[n]}满足a[n+1]≤f(a[n])(n≥1且n∈N)∴a[n+1]≤a[n]/(1+2a[n])即:1/a[n+1]-1/a[n]≥2∴1/a[n]
因为Sn=2^n-1所以S(n-1)=2^(n-1)-1所以an=Sn-S(n-1)=2^(n-1)(n>=2)因为S1=a1=2^1-1=1=2^0所以an=2^(n-1)(n>=2)因为bn=n所