The `8^(th)` term of `log_(e )2` is

n^(th) term of log_(e )(6//5) is

The nth term of log_(e)2 is

The 4^(th) term of "log"_(e )(3)/(2) is

Observe the following lists. {:("LIST - I","LIST - II"),((A) 8^(th)" term of log"_(e)^(2) " is",(1)log((n+1)/(n-1))),((B)7^(th)" term of log"_(e )(5//4)" is",(2)(-1)/(8)),((C )n^(th)" term of log"_(e )(3//2)" is",(3)(1)/(7.4^(7))),((D)(2)/(n^(2)+1)+(1)/(3)((2n)/(n^(2)+1))^(3)+.....,(4)( (-1)^(n-1))/(n.2^(n))):} The correct match for List-I from List-II is

The 7th term of log_(e)(5//4) is

The nth term of log_(e)(4//3) is

The nth term of log_(2)(3//2) is

The 8^(th) term of an A.P. is 17 and the 19^(th) term is 39. Find the 25^(th) term.

The 8^(th) term of a G.P. is 192 and its 11^(th) term is 1536, which term of G.P. is 6?

The sum of n terms of an AP is 2n^(2) +n . Then 8^(th) term of the AP is