the least postitive interger n from which `root(3) (n+1) -root(3)(n)lt (1)/(12)` is -

The least positive integer n for which sqrt(n+1) - sqrt(n-1) lt 0.2 is

Find the least value of the positve interger n for which (sqrt(3) + i)^(n) real

Prove : underset(nrarroo)"lim"[root(3)(n+1)-root(3)(n)]=0

Find the least value of the positve interger n for which (sqrt(3) + i)^(n) purely imaginary.

root(3n)(a^3) times root(n)(a^(n-1))

Write the least positive intergal value of n when ((1+i)/(1-i))^(2n) =1 .

The value of lim_(x rarr oo)[root(3)((n+1)^(2))-root(3)((n-1)^(2))] is

What will be the least positive intergal value of n such that ((2i)/(1+i))^(n) be a positive intergal value