`log_8 128=`

If sqrt(8-2sqrt(12))=sqrt(x)-sqrt(y) then find log_x 216 + log_y 128

The value of log_(4) 128 is

Which of the following when simplified reduces to an integer? a. (2log6)/(log12+log3) b. (log32)/(log4) c. ((log)_5 15-(log)_5 4)/((log)_5 128) d. (log)_(1//4)(1/(16))^2

Which of the following when simplified reduces to an integer? a. (2log6)/(log12+log3) b. (log32)/(log4) c. ((log)_5 15-(log)_5 4)/((log)_5 128) d. (log)_(1//4)(1/(16))^2

Compute log2 (3) . log 27(128)

Find the value of 2log2/5 +3 log25/8 -log 625/128

Find the value of 2log2/5 +3 log25/8 -log 625/128

Solve for x : (i) (log 81)/(log 27) = x (ii) (log 128)/(log 32) = x (iii) (log 64)/(log 8) = log x (iv) (log 225)/(log 15) = log x