Suppose `'a'` is a fixed real number such that `(a-x)/(p x)=(a-y)/(q y)=(a-z)/(r z)` if `p,q, r` are in `AP` then `x,y,z` all are in

Suppose a is a fixed real number such that (a - x)/(px) = (a - y)/(qy) = (a - z)/(rz) If p,q,r, are in A.P., then prove that x,y,z are in H.P.

Suppose a is a fixed real number such that (a - x)/(px) = (a - y)/(qy) = (a - z)/(rz) If p,q,r, are in A.P., then prove that x,y,z are in H.P.

If (a-x)/(px) = (a-y)/(qy)= (a-z)/(rz) and p, q, r, be in A.P then x,y, z are in

If (a-x)/(p x)=(a-y)/(q y)=(a-z)/(rz) and p ,q ,and r are in A.P., then prove that x ,y ,z are in H.P.

If (a-x)/(px)=(a-y)/(qy)=(a-z)/(r) andp,q, andr are in A.P.,then prove that x,y,z are in H.P.

Let a(a != 0) is a fixed real number and (a-x)/(px)=(a-y)/(qy)=(a-z)/(rz) . If p, q, r are in A.P., show that 1/x,1/y,1/z are in A.P.

Let a(a!=0) is a fixed real number and (a-x)/(px)=(a-y)/(qy)=(a-z)/(rz). If p,q,r are in A.P.show that (1)/(x),(1)/(y),(1)/(z) are in A.P.

Let a(a != 0) is a fixed real number and (a-x)/(p x) = (a-y)/(qy) = (a-z)/(r z) . If p, q, r are in A.P., show that (1)/(x), (1)/(y), (1)/(z) are in A.P.

If p, q, r, are in G.P. and p^(1/x) = q^(1/y) = r^(1/z) Verify x, y, z are in A.P or G.P or neither.