Let `a_(n)=(10^(n))/(n!)` for n=1,2,3, Then the greatest value of n for which `a_(n)` is the greatest is:
(A) 11 (B) 20 (C) 10 (D) 8

Let a_(n)=(1000^(n))/(n!) for n in N, then a_(n) is greatest,when

Let a_(n)=(827^(n))/(n!) for n in N , then a_(n) is greatest when

Let n in N and n<(5sqrt(3)+8)^(4) .Then the greatest value of n is

Let a_(n) = (1+1/n)^(n) . Then for each n in N

If n (AnnB)=10, n (BnnC) =20 and n(AnnC)=30, then the greatest possible value of n(AnnBnnC) is

Let (:a_(n):) be a sequence given by a_(n+1)=3a_(n)-2*a_(n-1) and a_(0)=2,a_(1)=3 then the value of sum_(n=1)^(oo)(1)/(a_(n)-1) equals (A) 1 (B) (1)/(2) (C) 2 D) 4

If the largest interval to which x belongs so that the greatest therm in (1+x)^(2n) has the greatest coefficient is (10/11, 11/10) then n= (A) 9 (B) 10 (C) 11 (D) none of these

Let a_(0)=0 and a_(n)=3a_(n-1)+1 for n ge 1 . Then the remainder obtained dividing a_(2010) by 11 is