" If "p^(6),q^((h)),r^(H)" terms of G.P.are "x,y,z" respectively then "x^(q-r).y

If p^(th), q^(th) and r^(th) terms of G.P. are x,y,z respectively then write the value of x^(q-r) y^(r-p) z^(p-q).

If p^(th),q^(th) and r^(th) terms of G.P.are x,y,x respectively then write the value of x^(q-r)y^(r-p)z^(p-q)

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 p ^(th), q ^(th) and r ^(th) terms of a G. P. are x,y,z respectively. Find the value of X ^( q-r). Y^( r - p). Z^(p-q)

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 .

If the pth , qth , rth , terms of a GP . Are x,y,z respectively prove 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 p^(th) , q^(th) , r^(th) term of an A.P is x,y and z respectively. Show that x(q-r)+y(r-p)+z(p-q)=0

If the pth, qth and rt terms of an A.P. be x,y,z respectively show that: x(q-r)+y(r-p)+z(p-q)=0