If the `p^(t h)a n dq^(t h)` terms of a G.P. are `qa n dp` respectively, show that `(p+q)^(t h)` term is `((q^p)/(p^q))^(1/(p-q))` .

If the p^(th) and q^(th) terms of a G.P.are q and p respectively,show that (p+q)^(th) term is ((q^(p))/(p^(q)))^((p-q)/(p-q))

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 .

If (p+q)^(th) and (p-q)^(th) terms of a G.P.re m and n respectively,then write it pth term.

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

If pth term of a G.P. is P and its qt term is Q, prove that the nth term is ((P^(n-q))/(Q^(n-p)))^(1/(p-q))

The (m+n) th and (m-n) th terms fa G.P. ae p and q respectively.Show that the mth and nth terms are sqrt(pq) and p((q)/(p))^(m/2n) respectively.

If the p^(th) term of an A.P is q and q^(th) term is p, prove that its n^(th) term is (p+q-n)