The value of log 6 is equal to:

A circle has radius log_(10)(a^(2)) and a circumference of log_(10)(b^(4)) . Then the value of log_(a)b is equal to :

Let x=(((81^(1/( (log_(5)9))+3^(3/( log_(sqrt6)3)))/(409)).( (sqrt7)^((2)/(log_(25)7))-125^( log_(25)6))) then value of log_(2)x is equal to :

If log_(9)12=a, then the value of log_(24)48 is equal to

If log(xy^(3))=1 and log(x^(2)y)=1, then the value of xy is equal to (where base of the logarithm is 32)

If (lim)_(x->0)(log(3+x)-"log"(3-x))/(x^2-9)="k", then the value of k is equal to.......