If a, b, c, are positive real numbers and `log_(4) a=log_(6)b=log_(9) (a+b)`, then `b/a` equals

If a, b, c are positive real numbers, then (1)/("log"_(ab)abc) + (1)/("log"_(bc)abc) + (1)/("log"_(ca)abc) =

Suppose that a and b are positive real numbers such that log_(27)a+log_9(b)=7/2 and log_(27)b+log_9a=2/3 .Then the value of the ab equals

a, b, c are positive integers froming an increasing G.P . whose common ratio is rational number, b - a is cube of natural number and log_(6)a + log_(6)b + log_(6)c = 6 then a + b + c is divisible by

If a, b, c are positive numbers such that a^(log_(3)7) =27, b^(log_(7)11)=49, c^(log_(11)25)=sqrt(11) , then the sum of digits of S=a^((log_(3)7)^(2))+b^((log_(7)11)^(2))+c^((log_(11)25)^(2)) is :

If a, b, c are positive real numbers, then a^("log"b-"log"c) xx b^("log"c-"log"a) xx c^("log"a - "log"b)

If a,b,c are distinct real number different from 1 such that (log_(b)a. log_(c)a-log_(a)a) + (log_(a)b.log_(c)b-log_(b)b) +(log_(a)c.log_(b)c-log_(c)C)=0 , then abc is equal to

a , b , c are positive integers formaing an incresing G.P. and b-a is a perfect cube and log_(6)a+log_(6)b+log_(6)c=6 , then a+b+c=

a , b , c are positive integers formaing an incresing G.P. and b-a is a perfect cube and log_(6)a+log_(6)b+log_(6)c=6 , then a+b+c=

If log_a(ab)=x then log_b(ab) is equals to

If three positive real numbers a,b,c, (cgta) are in H.P., then log(a+c)+log(a-2b+c) is equal to