[" 13.The number of real values of the parameter "k" for which "],[(log_(16)x)^(2)-log_(16)x+log_(16)k=0" with real coefficients will "],[" have exactly one solution is "]

The number of real values of the parameter k for which (log_(16)x)^(2)-(log)_(16)x+(log_(16)k=0 with real coefficients will have exactly one solution is (1)2(b)1(c)4(d) none of these

The number of real values of the parameter k for which (log_(16)x)^2-(log)_(16)x+(log)_(16)k=0 with real coefficients will have exactly one solution is 2 (b) 1 (c) 4 (d) none of these

The number of real values of the parameter k for which (log_(16)x)^2-(log)_(16)x+(log)_(16)k=0 with real coefficients will have exactly one solution is (1) 2 (b) 1 (c) 4 (d) none of these

The number of real values of the parameter k for which (log_(16)x)^2-(log)_(16)x+(log)_(16)k=0 with real coefficients will have exactly one solution is 2 (b) 1 (c) 4 (d) none of these

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

log_(16)64-log_(64)16

log_(x)4+log_(x)16+log_(x)64=12

If log_(4)x+log_(16)x=6 then x=

x^(log_(x)(x+3)^(2))=16