If `("log"_(e)x)/(b - c) = ("log"_(e) y)/(c - a) = ("log"_(e) z)/(a - b)`, show that
xyz = 1

If ("log"_(e)x)/(b - c) = ("log"_(e) y)/(c - a) = ("log"_(e) z)/(a - b) , show that x^(a)y^(b)z^(c ) = 1

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

If x=(log)_(2a)a , y=(log)_(3a)2a ,z=(log)_(4a)3a ,prove that 1+x y z=2y z

The value of "log"_(a) b "log"_(b)c "log"_(c ) a is

If log_(e)5 , log_(e)(5^(x) - 1) and log_(e)(5^(x) - 11/5) are in A.P., then the values of x are

If log_(e)4 = 1.3868 , then log_(e) 4.01 =

If (dy)/(dx)-y log_(e) 2 = 2^(sin x)(cos x -1) log_(e) 2 , then y =

I=int \ log_e (log_ex)/(x(log_e x))dx

If f(x)=log_(e)(log_(e)x)/log_(e)x then f'(x) at x = e is

"If "log_(e)(log_(e) x-log_(e)y)=e^(x^(2_(y)))(1-log_(e)x)," then find the value of "y'(e).