The fifth , eighth and eleventh terms of a geometric progression are p,q and r respectively. Show that : `q^(2)="pr"`.

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

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

The fourth, seventh and tenth terms of a G.P. are p,q,r respectively, then

If the p^(t h) , q^(t h) and r^(t h) terms of a GP are a, b and c, respectively. Prove that a^(q-r)""b^(r-p)""c^(p-q)=1 .

The p^(t h),q^(t h) and r^(t h) terms of an A.P. are a, b, c, respectively. Show that (q-r)a+(r-p)b+(p-q)c=0 .

If 3rd, 8th and 13th terms of a G.P are p ,q and r respectively, then which one of the following is correct? (i) q^(2)=pr (ii) r^(2)=pq (iii) pqr=1 (iv) 2q=p+r

If the sum of odd terms and the sum of even terms in (x + a)^n are p and q respectively then p^2 - q^2 =

If the p^(t h) , q^(t h) and r^(t h) terms of a GP are a, b and c, respectively. Prove that a^(q-r)b^(r-p)c^(p-q)=1 .

If pth, qth, and rth terms of an A.P. are a ,b ,c , respectively, then show that (a-b)r+(b-c)p+(c-a)q=0

If pth, qth, and rth terms of an A.P. are a ,b ,c , respectively, then show that (a-b)r+(b-c)p+(c-a)q=0