Let `a = log 3, b = (log 3)/(log (log 3))`
(all logarithms on base 10) the number `a^(b)` is

log(log x)+log(log x^(3)-2)=0; where base of log is 10 everywhere.

Express log _(4)a+log_(8)a^((1)/(3))+(1)/(log_(a)8) as a logarithm to the base 2.

If log(2a-3b)=log a-log b, then a=

Let a=(log_(3)pi)(log_(2)3)(log_(pi)2),b=(log576)/(3log2+log3) the base of the logarithm being 10,c=2( sum of the solution of the equation (3)^(4x)-(3)^(2x+1083)+27=0) and d=7^(log_(7)2+log_(7)3) then (a+b+c+d) simplifies to

3^(log x)-2^(log x)=2^(log x+1)-3^(log x-1), where base is 10,

If (3x)^(log3)=(5y)^(log5) and 5^(log x)=3^(log y) (all the log used have same base) then x & y are respectively:

Let N=(log_(3)135)/(log_(15)3)-(log_(3)5)/(log_(405)3). Then N is a natural number (b) a prime number an even integer (d) an odd integer