If x `= log_(3) log_(2) log_(2) 256, "then" 2^(log_(4)2^(2^(x))`= _______

A

4

B

8

C

2

D

1

Verified by Experts

The correct Answer is:

C

Find x.

Similar Questions

Explore conceptually related problems

If log_(2)[log_(3)(log_(2)x)]=1 , then x is equal to

Simplify (1)/(log_(2)log_(2)log_(2)256) .

If log_(x)(log_(2)x)*log_(2)x=3, then x is a ( an )

Solve for x: log_(4) log_(3) log_(2) x = 0 .

Solve log_(x)2log_(2x)2=log_(4x)2

log_(2)(4^(x)+4)=log_(2)2^(x)+log_(2)(2^(x+1)-3)

If log_(4)(log_(2)x) + log_(2) (log_(4) x) = 2 , then find log_(x)4 .

If log_(8)(log_(4)(log_(2)x))=0 then x^(-(2)/(3)) equals

solve for x if log_(4)log_(3)log_(2)x=0 and log_(e)log_(5)(sqrt(2x+2)-3)=0