If x, y, z be the pth, qth, rth terms respectively both of an A.P. and of a G.P. prove that `x^(y-z).y^(z-x).z^(x-y) = 1`.

If x ,y ,a n dz are pth, qth, and rth terms, respectively, of an A.P. nd also of a G.P., then x^(y-z)y^(z-x)z^(x-y) is equal to a.x y z b. 0 c. 1 d. none of these

If x ,y ,a n dz are pth, qth, and rth terms, respectively, of an A.P. nd also of a G.P., then x^(y-z)y^(z-x)z^(x-y) is equal to a. x y z b. 0 c. 1 d. none of these

If x ,y ,a n dz are pth, qth, and rth terms, respectively, of an A.P. nd also of a G.P., then x^(y-z)y^(z-x)z^(x-y) is equal to x y z b. 0 c. 1 d. none of these

If x ,y ,a n dz are pth, qth, and rth terms, respectively, of an A.P. nd also of a G.P., then x^(y-z)y^(z-x)z^(x-y) is equal to x y z b. 0 c. 1 d. none of these

If x, y and z are pth, gth and rth terms respectively of an A.P and also of a G.P. then x^(y-z)*y^(z-x)*z^(x-y) is equal to

If x,y and z are pth,>h and rth terms respectively of an A.P and also of a G.P. then x^(y-z)*y^(z-x)*z^(x-y) is equal to

If x, y and z are the pth, qth, and rth, terms of a G.P respectively, then show that x^(q-r) . y^(r-p) . z^(p-q) = 1.

The pth, qth and rth term of a G.P. are x, y, z respectively, then prove that- x^(q-r).y^(r-p).z^(p-q)=1 .

If the pth, th, rth terms of a G.P. are x, y, z respectively, prove that x^(q-r).y^(r-p) .z^(p-q) = 1 .