数列{bn}满足bn=(2n-1)/3^n,求前n项和,Tn

数列{bn}满足bn=(2n-1)/3^n,求前n项和,Tn 已知数列{ bn } 满足2b(n+1)= bn + 1/bn ,且bn>1,求{bn}通项公式 若数列bn满足bn=n^2/2^(n+1),证明bn 设数列{bn}满足bn=n^2/2^(n+1),证明:bn 已知数列{bn}满足bn=n^2/3^n,证明:bn≤4/9 已知数列满足{bn}满足:b1=1,当n≥2时,bn=(2bn-1)/(bn-1+3),求bn其中,n-1都是b的下标已知数列{bn}满足:b1=1,当n≥2时,bn=(2bn-1)/(bn-1+3),求bn其中，n-1都是b的下标 18、一道数列题已求出数列An=2n.若数列Bn满足B（n+1）=Bn^2-（n-2）Bn+3,Bn大于等于1,证明：Bn大于等于An/2 an=2*3^n-1 若数列bn满足bn=an+（-1）^n*ln（an）,求数列bn前n项和Sn 已知数列满足an+1-an=2(n属于N*),且a9=17数列{bn}中,bn=3^an,求证数列{bn}是等比数列并...已知数列满足an+1-an=2(n属于N*),且a9=17数列{bn}中,bn=3^an,求证数列{bn}是等比数列并求其前n项和sn 已知数列{bn}满足b1=-1,b(n+1)=bn+(2n-1),求bn 已知数列bn满足bn=b^2n,其前n项和为Tn,求(1-bn)/Tn 若数列bn满足b1=2,且bn+1=bn+2^n+n,求数列bn的通项公式. 若数列{bn}满足：bn+1=bn^2-(n-2)bn + 3,且b1≥1,n∈N*,用数学归纳法证明：bn≥n如题, 数列{an}{bn}满足bn=a1+2a2+3a3+…+nan/(1+2+3+…+n),若数列{an}为等差数列,求证；{bn}为等差数列. 数列an=(1/2)^n,数列{bn}满足 bn=3+log4an ,设Tn=|b1|+|b2|+...+|bn|,求Tn ． 数列｛bn｝满足b（n+1）=2bn+1,n∈N*且b1=3 求｛bn｝的通项公式 数列b1=3,bn+1=3bn+2n,求bn通项. 有关数列的数学题.已知数列{bn}满足b1=1,b2=3,b(n+2)=3b(n+1)-2bn.求证数列{b(n+1)-bn}是等比数列,求{bn}的通项公式.