The number `N = 6 log_(10) 2+ log_(10) 31 ` lies between two successive integers whose sum is equal to

The number of N=6-(6(log)_(10)2+(log)_(10)31) lies between two successive integers whose sum is equal to (a)5(b) 7(c)9(c)10

The number of N=6-(6(log)_(10)2+(log)_(10)31) lies between two successive integers whose sum is equal to (a)5 (b) 7 (c) 9 (c) 10

The number of N=6-(6(log)_(10)2+(log)_(10)31) lies between two successive integers whose sum is equal to (a)5 (b) 7 (c) 9 (c) 10

The number of N=6-(6(log)_(10)2+(log)_(10)31) lies between two successive integers whose sum is equal to (a)5 (b) 7 (c) 9 (c) 10

If N = antilog_7 (log_3 (antilog_sqrt3 (log_3 81))), then log_3 N lies between two successive integers a and b. Find (a + b).

(log_(10) 500000- log_(10)5) is equal to:

If log_(10) 2 = a, log_(10)3 = b" then "log_(0.72)(9.6) in terms of a and b is equal to