Let `a_n=10^n/(n!)` for `nge1` Then `a_n` takes the greatest value when :

Let a_(n)=(1000^(n))/(n!) for n in N . Then a_(n) is greatest when:

The lengths of the sides of a traingle are log_(10)12,log_(10)75andlog_(10)n , where n in N . If a and b are the least ad greatest values of n respectively. The value of b-a is divisible by

lim_(x rarr oo) (logx^(n)-[x])/([x]) , where n in N and [.] denotes the greatest integer function, is

sum_(n = 1)^(1000) int_(n - 1)^(n) e^(x-[x]) dx , whose [x] is the greatest integer function, is :

If a_n=sin((npi)/6) then the value of sum a_n^2

Let the sequence a_n be defined as follows: a_1 = 1, a_n = a_(n - 1) + 2 for n ge 2 . Find first five terms and write corresponding series

When n in N , the value of int_0^n [x] dx , where [x] is the greatest integer function, is :

Fill in the blanks in the following , given that a is the first term, d the common difference and a_n the nth term of the A.P.

If (a^(n)+b^n)/ (a^(n-1) +b^(n-1)) is the A.M. between a and b, then find the value of n.