设数列{an}{bn}均为等差数列,公差都不为0,无穷数列liman/bn=3,则无穷数列limb1+b2+...+bn
设数列{an}{bn}均为等差数列,公差都不为0,无穷数列liman/bn=3,则无穷数列limb1+b2+...+bn
已知数列{An}与{Bn}都是公差不为零的等差数列,且limAn/Bn=3,求lim(B1+B2+……+B2n)/(n*
已知数列{an}、{bn}都是公差不为零的等差数列,且liman/bn=3,求lim(b1+b2+……b3n)/(n*a
设等差数列{an}的公差d≠0,数列{bn}为等比数列,若a1=b1,b2=a3 b3=a2,则bn的公比为
已知数列{An}与{Bn}都是公差不为零的等差数列,且limAn/Bn=2,求lim(A1+A2+……+An)/(n*B
在数列{an}和{bn}是两个无穷等差数列,公差分别为d1和d2,求证:数列{an+bn}是等差数列,并求它的公差.
设数列{an}是首项为3,公差为d的等差数列,又数列{bn}是由bn=an+an+1所决定的数列,那么数列{bn}前n项
设数列{an},{bn},满足an=[lg(b1)+lg(b2)+...+lg(bn)]/n,证明{an}为等差数列的冲
已知数列{An}及数列{Bn}都为等差数列,Cn=An+Bn,证数列{Cn}为等差数列
等差数列{an}等比数列{bn}其中a1=b1 a2=b2 a4=b4 两数列公差公比都为d 求{an}{bn}
设各项均为正数的数列{an}和{bn}满足:an,bn,an+1成等差数列,bn,an+1,bn+1等比数列且a1=1,
求证极限:设数列{An},{Bn}均收敛,An=n(Bn-Bn-1),求证limAn = 0.