If `(x(y+z-x))/(logx)=(y(z+x-y))/(logy)(z(x+y-z))/(logz),p rov et h a tx^y y^x=z^x y^z=x^z z^x`

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

If cos^(-1)x+cos^(-1)y+cos^(-1)=pi,p rov et h a tx^2+y^2+z^2+2x y z=1.

If (logx)/(b-c)=(logy)/(c-a)=(logz)/(a-b) , then which of the following is/are true? z y z=1 (b) x^a y^b z^c=1 x^(b+c)y^(c+b)=1 (d) x y z=x^a y^b z^c

If log(x+z)+log(x-2y+z)=2log(x-z)," then "x,y,z are in

If x+y+z=0 show that x^3+y^3+z^3=3x y z .

x^(log_(10)((y)/(z))).y^(log_(10)((z)/(x))).z^(log_(10)((x)/(y))) is equal to :

prove that x^(logy-logz).y^(logz-logx).z^(logx-logy)=1

For positive numbers x ,\ y\ a n d\ z the numerical value of the determinant |1(log)_x y(log)_x z(log)_y x1(log)_y z(log)_z x(log)_z y1| is- a. 0 b. logx y z c. "log"(x+y+z) d. logx\ logy\ logz

. If 1, log_y x, log_z y, -15 log_x z are in AP, then

If x,y,z are in G.P and a^x=b^y=c^z ,then