`16^(log_(16)25)`= ______

2 ^(16-log_(2)1024) = ______

(log_(3)729+log_(6)216)/(4+log_(2)16-2log_(4)64) = ______

log_(2)[log_(4)(log_(10)16^(4)+log_(10)25^(8))] simplifies to :

The value of log_(16)root(5)(64) = ______.

if log_(16)25 = k log_(2)5 then k = _____

log_(16)3.log_(17)4,log_(9)17 =_______

The value of 16^("log"_(4)3) , is

The number of real values of the parameter k for which the equation ("log"_(16)x)^(2) -"log"_(16)x +"log"_(16) k = 0 with real coefficients will have exactly one solution, is