For positive numbers x, y and z, the numerical value of the determinant` |[1,log_xy,log_xz],[log_yx,1,log_yz],[log_zx,log_zy,1]|`is

For positive numbers x,y and z, the numerical value of the determinant det[[log_(x)y,log_(x)zlog_(y)x,1,log_(y)zlog_(z)x,log_(z)y,1]]

Prove that |[1,log_xy,log_xz],[log_yx,1,log_yz],[log_zx,log_zy,1]|=0

For positive numbers x,y,s the numberical value of the determinant |{:(1,log_(x)y,log_(x)z),(log_(y)x,3,log_(y)z),(log_(z)x,log_(z)y,5):}| is

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

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

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

Prove that , |[1,log_x^y,log_x^z],[log_y^x,1,log_y^z],[log_z^x,log_z^y,1]|=0

For positive numbers x, y and z, the numerical value of the determinant |{:(1,"log"_(x)y, "log"_(x)z),("log"_(y)x, 1, "log"_(y)z),("log"_(z)x, "log"_(z)y, 1):}| is……

For positive numbers x, y and z, the numerical value of the determinant |{:(1,"log"_(x)y, "log"_(x)z),("log"_(y)x, 1, "log"_(y)z),("log"_(z)x, "log"_(z)y, 1):}| is……