The `3^(rd)` term in `log((1)/(1-x))` is

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

The 3^(rd), 4^(th), 5^(th) terms in the expansion of log_(e )2 are respectively a, b, c then their ascending order is

If log xy^(3) = m and log x ^(3) y ^(2) = p, " find " log (x^(2) -: y) in terms of m and p.

If y = (x-1)log(x-1)-(x+1)log(x+1) , prove that : dy/dx = log((x-1)/(1+x))

If y=(x-1)log(x-1)-(x+1)log(x+1) , prove that : dy/dx = log((x-1)/(1+x))

int(1)/(x(3+log x))dx

Evaluate int_-1^1 log((3-x)/(3+x))dx

If y=(x-1)log(x-1)-(x+1)log(x+1), prove : (dy)/(dx)=log((x-1)/(1+x))

If y=(x-1)log(x-1)-(x+1)log(x+1) , prove that (dy)/(dx)=log((x-1)/(1+x))

In sequence S, the 3rd term is 4, the 2nd term is three times the 1st, and the 3rd term is four times the 2nd.What is the 1 st term is sequence S?