The corresponding first and the (2n-1)th terms of an A.P a G.P and a H.P are equal ,If their nth terms are a, b and c , respectively , then

If the first and (2n-1)^(th) terms of an A.P, a G.P and an H.P of positive terms are equal and their (n+1)^(th) terms are a, b & c respectively then

If first and (2n-1)^th terms of an AP, GP. and HP. are equal and their nth terms are a, b, c respectively, then (a) a=b=c (b)a+c=b (c) a>b>c (d) none of these

Can 2n^2+ 7 be the nth term of an A.P. ? Explain.

Show (m+n)th and (m-n)t h terms of an A.P. is equal to twice the mth terms.

Question on nth terms in A.P.

If the n^(t h) term of an A.P. is (2n+1), find the sum of first n terms of the A.P.

The (p+q)th term and (p-q)th terms of a G.P. are a and b respectively. Find the pth term.

The m^(th) term of an A.P. is n and n^(th) term is m its p^(th) term is

(a) The 3rd and 19th terms of an A.P. are 13 and 77 respectively. Find the A.P. (b) The 5th and 8th terms of an A.P. are 56 and 95 respectively. Find the 25th term of this A.P. (c) The pth and qth terms of an A.P. are q and p respectively. Prove that its (p + q)th term will be zero.

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