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 a, b, c be in A.P. and x, y, z be in G.P., prove that, x^(b-c).y^(c-a).z^(a-b) = 1 .

If x+z = 2y " and " b^2 = ac , then prove that a^(y-z)*b^(z-x)*c^(x-y) =1 .

If x, y, z are the three consecutive term of an AP, then the value of x + y + z is

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

If 5, x, y, z, 405, are the first five terms of a G.P., find the values of x, y, z.

If pth, qth, and rth term of an AP are equal to corresponding terms of a GP and these terms are respectively x,y,z, then x^(y-z)y^(z-x)z^(x-y) equals

If the 4th, 10th and 16th terms of a G.P. are x, y and z, respectively. Prove that x, y, z are in GP.

If a,b,c are in A.P and x,y,z are in G.P prove that (b-c) logx+(c-a) log y+(a-b) log z=0

If a, b a n d c are in A.P., a x ,b y ,a n dc z in G.P. and x,y,z in H.P. then prove that x/z+z/x=a/c+c/a .

The value of |[yz, z x,x y],[ p,2p,3r],[1, 1, 1]|,w h e r ex ,y ,z are respectively, pth, (2q) th, and (3r) th terms of an H.P. is a. -1 b. 0 c. 1 d. none of these