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

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

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

The nth term of log_(e)2 is

The 3^(rd) term of log_(e) 2 is

If the n^(th) term of the A.P. 9, 7, 5, .... is same as the n^(th) term of the A.P. 15, 12, 9, .... find n.

Given that N=7^(log_(49),900),A=2^(log_(2)4)+3^(log_(2)4)-4^(log_(2)2),D=(log_(5)49)(log_(7)125) Then answer the following questions : (Using the values of N, A, D) If log_(A)D=a, then the value of log_(6)12 is (in terms of a)

Find the n^(th) term of the series 2+(5)/(9)+(7)/(27) + …… . Hence find sum to n terms.

Assertion (A) : The value of (2)/(1!) +6/(2!)+(12)/(3!) +(20)/(4!) + .......o = 3e Reason (R) : The n^(th) term of the series 2,6,12,20 , ....... Is n (n+1)

Find the n^(th) terms of the series 5 + 7 + 13 + 31 + …

Find the 6^("th") term of (1+(x)/(2))^(-5)