Suppose x , y ,z=0 and are not equal to ...

Suppose `x , y ,z=0` and are not equal to 1 and `logx+logy+logz=0.` Find the value of `1/(x^(logy))+1/(^(logz))1/(y^(logz))+1/(^(logx))1/(z^(logx))+1/(^(logy))`

Similar Questions

Explore conceptually related problems

Suppose x , y ,z are not equal to 1 and logx+logy+logz=0. Find the value of (x^(1/logy+1/logz))(y^(1/logz+1/logx))(z^(1/logx+1/logy))

Suppose x;y;zgt0 and are not equal to 1 and log x+log y+log z=0 . Find the value of x^(1/log y+1/log z)xx y^(1/log z+1/log x)xx z^(1/logx+1/logy) (base 10)

The value of x^((logy-logz))xx y^((logz - logx)) xx z^((log x- logy)) is equal to

The value of (yz)^(logy-logz)xx(zx)^(logz-logx)xx(xy)^(logx-logy) is

If x, y and z are in G.P, then show that logx, logy, logz are in A.P.

If log_y x +log_x y=7, then the value of (log_y x)^2+(log_x y)^2, is

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

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

What is the value of abs((1,log_x y, log_x z),(log_y x,1,log_y z),(log_z x,log_z y, 1)) ?

Prove that x^(log y - logz) xx y^(log z - logx) xx z^(log x - log y) = 1 .

Suppose `x , y ,z=0` and are not equal to 1 and `logx+logy+logz=0.` Find the value of `1/(x^(logy))+1/(^(logz))1/(y^(logz))+1/(^(logx))1/(z^(logx))+1/(^(logy))`

Similar Questions

Recommended Questions