Let `L` denote antilog_32 0.6 and M denote the number of positive integers which have the characteristic 4, when the base of log is 5, and N denote the value of `49^((1-(log)_7 2))+5^(-(log)_5 4.)` Find the value of `(L M)/Ndot`

Let L denote antilog 320.6 and M denote the number of positive integers which have the characteristic 4, when the base of log is 5, and N denote the value of 49^((1-log_(7)2))+5^(-log_(5)4) Find the value of (LM)/(N) .

Find the value of 49^(1-log_(7)2)+5^(-log_(5)4)

Find the value of 49^((1-log_(7)(2)))+5^(-log_(5)(4)) is

Let M denote antilog ""_(32) 0.6 and N denote the value of 49^((1-log_(7)2))+5^(-log_(5)4) . Then M.N is :

Find the value of (1/49)^(1+log_(7)2) + 5^(-log_((1//5))(7) .

Let 'L' denotes the antilog of 0.4 to the base 1024. and 'M' denotes the number of digits in 6^(10) (Given log,02-03 and 'N' denotes the number of positive integers which have the characteristic 2, when base of the logarithm is 6. Find the value of LMN

Let S denotes the antilog of 0.5 to the base 256 and K denotes the number of digits in 6^(10) (given log_(10)2=0.301 , log_(10)3=0.477 ) and G denotes the number of positive integers, which have the characteristic 2, when the base of logarithm is 3. The value of SKG is

Find the value of ((1)/(49))^(1+log_(7)2)+5^(-1log_(((1)/(5)))(7))

If log_(4)m=1.5 , then find the value of m.

Find the value of the following 2^(log""_(4)5)