Let a=`log_(67) 9` and b=`log_(sqrt3) 71` .If `2/a+b/2=log_3 N` then find the characterstic of logarithm of N to the base 10

Let a=log_(67)9 and b=log_(sqrt(3))71. If (2)/(a)+(b)/(2)=log_(3)N then find the characterstic of logarithm of N to the base 10

If N= anti log _(3)(log_(6)(antilog_(sqrt(5))(log_(5)(1296))) then the characteristic of log N to the base 2 is equal to

Let N=10^(log2-2log(log10^(3))+log(log10^(6))^(2)) where base of the logarithm is 10. The characteristic of the logarithm of N the base 3, is equal to (a) 2 (b) 3 (c) 4 (d) 5

If log_(b) n = 2 and log_(n) 2b = 2 , then find the value of b.

If log_(b) n = 2 and log_(n) 2b = 2 , then find the value of b.

If log_(b) n = 2 and log_(n) 2b = 2 , then find the value of b.

If log_(b) n = 2 and log_(n) 2b = 2 , then find the value of b.

Let x=(0. 15)^(20)dot Find the characteristic and mantissa of the logarithm of x to the base 10. Assume (log)_(10)2=0. 301a n d(log)_(10)3=0. 477.

Let x=(0. 15)^(20)dot Find the characteristic and mantissa of the logarithm of x to the base 10. Assume (log)_(10)2=0. 301a n d(log)_(10)3=0. 477.

Let x=(0. 15)^(20)dot Find the characteristic and mantissa of the logarithm of x to the base 10. Assume log_(10)2=0. 301 and log_(10)3=0. 477.