`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 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

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 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 and log_(4) a=log_(6)b=log_(9) (a+b) , then b/a equals

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

If log_(4)A=log_(6)B=log_(9)(A+B), then [4((B)/(A))]

If three positive real number a,b and c are in G.P show that log a , log b and log c are in A.P

log_(a)b = log_(b)c = log_(c)a, then a, b and c are such that

If a, b and c are positive numbers in a G.P., then the roots of the quadratic equation (log_(e ) a) x^(2) -(2 log_(e ) b) x + (log_(e ) C)=0 are