If 5th, 8th, and 11th terms of a G.P. are `p ,\ q\ a n d\ s` respectively, prove that `q^2=p sdot`

The 5th, 8th and 11th terms of a G.P. are p, q and s, respectively. Show that q^(2)=ps.

The 3rd, 7th and 11th terms of a G.P. are x, y and z respectively, then prove that y^(2)= xz.

The 5^(t h) , 8^(t h) and 11^(t h) terms of a G.P. are p, q and s, respectively. Show that q^2=p s .

The 5th, 8th and 11th terms of a G.P. are P, Q and S respectively. Show that Q^(2)='PS .

If the 4^(th),7^(th) and 10^(th) terms of a G.P. are a, b and c respectively, prove that : b^(2)=ac

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

If the p t h ,\ q t h\ a n d\ r t h terms of a G.P. are a ,\ b ,\ c respectively, prove that: a^((q-r))dot^b^((r-p))dotc^((p-q))=1.

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

If the 5^(th) and 11^(th) terms of an A.P. are 16 and 34 respectively. Find the A.P.

The 4th and 7th terms of a G.P. are 18 and 486 respectively. Find the G.P.