The value of `log_4[|log_2{log_2(log_3)81)}]` is equal to

The value of a^((log_b(log_bN))/(log_b a)), is

The value of (log_5 9*log_7 5*log_3 7)/(log_3 sqrt(6))+1/(log_4 sqrt(6)) is co-prime with

The value of int_0^([x]) 2^x/(2^([x])) dx is equal to (where, [.] denotes the greatest integer function) a. ([x])/(log2) " " b. ([x])/(2 log2) c. ([x])/(4 log 2) " " d. None of these

If x_n > x_(n-1) > ..........> x_3 > x_1 > 1. then the value of log_(x_1) [log_(x _2) {log_(x_3).........log_(x_n) (x_n)^(x_(r=i))}]

The value of int x log x (log x - 1) dx is equal to

Find the value of x satisfying log_a{1+log_b{1+log_c(1+log_px)}}=0 .

Find the value of the following 2^(log""_(4)5)

Find the value of (log)_(2sqrt(3))1728.

Find the value of 49^((1-log_7(2)))+5^(-log_5(4) is

Find the value of x of log_(4)x = 2