If m is the geometric mean of
`((y)/(z))^(log(yz)),((z)/(x))^(log(zx))"and"((x)/(y))^(log(xy))`
then what is the value of m?

Prove that : (iii) (yz)^(log(y/z))(zx)^(log(z/x))(xy)^(log(x/y)) = 1

The value of (yz)^(log y-log z)xx(zx)^(log z-log x)xx(xy)^(log x-log y) is

(log a)/(y-z)=(log b)/(z-x)=(log c)/(x-y) then value of abc=

Find the value of (yz)^(log y - log z) xx (zx)^(log z - log x) xx (xy)^(log x - log y) .

The value of the determinant ,log_(a)((x)/(y)),log_(a)((y)/(z)),log_(a)((z)/(x))log_(b)((y)/(z)),log_(b)((z)/(x)),log_(b)((x)/(y))log_(c)((z)/(x)),log_(c)((x)/(y)),log_(c)((y)/(z))]|

Find the value of (x^(log y - log z))(y^(log z-log x))(z^(log x - log y))

If (log x)/(y-z)=(log y)/(z-x)=(log z)/(x-y), then prove that: x^(x)y^(y)z^(z)=1

If (log x)/(y-z) = (log y)/(z-x) = (log z)/(x-y) , then prove that xyz = 1 .