The reciprocal of `2/(log_(4)(2000)^(6))+3/(log_(5)(2000)^(6))` is _______.

Find the value of [2/log_4(2000)^6+3/log_5(2000)^6]

Value of [(2)/(log_(4)(2000)^(6))+(3)/(log_(3)(2000)^(6))] is 4^((1)/(3)).5^((1)/(2))(b)(1)/(6)(c)root(3)(4)(d) none of these

(log_(5)6) /(log_(5)2 + 1) =

Value of [2/((log)_4(2000)^6)+3/((log)_5(2000)^6)] is a. 4^(1/3). 5^(1/2) b. 1/6 c. 3 3 d. none of these

Value of [2/((log)_4(2000)^6)+3/((log)_5(2000)^6)] is 4^(1/3). 5^(1//2) b. 1/6 c. 3 3 d. none of these

log_(3)^(2), log_(6)^(2), log_(120^(2) are in

(2^(log_(6)18))*(3^(log_(6)3))

If the reciprocals of 2, log_((3^(x)-4))4 and log_(3^(x)+(7)/(2))4 are in arithmetic progression, then x is equal to

If the reciprocals of 2, log_((3^(x)-4))4 and log_(3^(x)+(7)/(2))4 are in arithmetic progression, then x is equal to

(2log_(6)3)/(log_(2)6)+(log_(6)2)^(2)+(1)/(log_(3)^(2)6) is a