log3[log2(log3t)]=1

If log_2 (log_2 (log_3 x)) = log_2 (log_3 (log_2 y))=0 , then the value of (x+y) is

Prove that log_3log_2log_(sqrt3) 81=1

(log)_2(log)_2(log)_3(log)_3 27^3 is 0 b. 1 c. 2 d. \ 3

if log_2(log_3(log_4x))=0 and log_3(log_4(log_2y))=0 and log_3(log_2(log_3z))=0 then find the sum of x, y and z is

Prove that: log_3log_2log_(sqrt(5))(625)=1

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

Prove that log(1+2+3)=log1+log2+log3

If log_(2)(log_(2)(log_(3)x))=log_(3)(log_(3)(log_(2)y))=0 , then x-y is equal to :

log_4log_5 25+log_3log_3 3

Find the value of the expressions (log2)^3+log8.log(5)+(log5)^3 .