Let x and y be positive numbers such that `log_(9)x=log_(12)y=log_(16)(x+y)` where `xlty` then `x/y` is: (a) Prime (b) Composite (c) Rational (d) Irrational

If x and y are positive real numbers such that 2log(2y - 3x) = log x + log y," then find the value of " x/y .

If x and y are positive real numbers such that 2log(2y - 3x) = log x + log y," then find the value of " x/y .

If x and y are positive real numbers such that 2log(2y - 3x) = log x + log y," then find the value of " x/y .

Prove that: log_(a)x xx log_(b)y=log_(b)x xx log_(a)y

If log_(2)x+log_(x)2=(10)/(3)=log_(2)y+log_(y)2 and x!=y, then x+y=

if log_(9)x+log_(4)y=(7)/(2) and log_(9)x-log_(8)y=-(3)/(2) then x+y is

If log_(2)x+log_(x)2=(10)/(3)=log_(2)y+log_(y)2 and x!=y find x+y

Let x,y and z be positive real numbers such that x^(log_(2)7)=8,y^(log_(3)5)=81 and z^(log_(5)216)=(5)^((1)/(3)) The value of (x(log_(2)7)^(2))+(y^(log_(3)5)^^2)+z^((log_(5)16)^(2)), is

If log_(y)x-log_(y^(3))x^(2)= 9 (log_(x)y)^(2) and x = 9y find y.