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

x, x + 3, x + 9 are first three terms of a G.P. Find the value of x.

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

If y z+z x+x y=12 , and x , y , z are positive values, find the greatest value of x y zdot

If 5.x, 405 are in G.P, then which of the following is the value of x?

If the number of surface of a cuboid is x, the number of edges is y, the number of vertices is z and the number of diagonals is P, then find the value of x - y + z + P.

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 .

x varies directly with y and inversely with z if y y =4 ,z=5, then x=3 . Again ,if y=16 , z=30 , then find the value of x .

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 ,d ,e , and f are in G.P. then the value of |((a^2),(d^2),x),((b^2),(e^2),y),((c^2),(f^2),z)| depends on (A) x and y (B) x and z (C) y and z (D) independent of x ,y ,and z