The nth terms of an A.P.`(1)/(m),(m+1)/(m),(2m+1)/(m),...` is:

The nth term of an A.P. is (1)/(n) and nth term is (1)/(m). Its (mn)th term is :

Find the nth and 6th term of the AP (2m + 1)/m , (2m-1)/m , (2m-3)/m..

If the m^(th) term of an A.P.is (1)/(n) and the n^(th) term is (1)/(m), show that the sum of mn terms is (1)/(2)(mn+1)

If the m^(th) term of an A.P.is (1)/(n) and the n^(th) terms is (1)/(m), show that the sum of mn terms is (1)/(2)(mm+1)

If the m^(th) term of an A.P.is (1)/(n) and the n^(th)term is (1)/(m), show that the sumof mn terms is (1)/(2(mn+1)where)m!=n

If the sum of m terms of an A.P is equal to these that n terms and also to the sum of the next p terms,prove (m+n)((1)/(m)-(1)/(p))=(m+p)((1)/(m)-(1)/(n))

If mth term of am A.Pis (1)/(n) and nth term is (1)/(m) find the sum of first mn terms.

If S_n denotes the sum of first n terms of an A.P. such that (S_m)/(S_n)=(m^2)/(n^2), t h e n(a_m)/(a_n)= a.(2m+1)/(2n+1) b. (2m-1)/(2n-1) c. (m-1)/(n-1) d. (m+1)/(n+1)

If the sum of m terms of an A.P.is equal to the sum of either the next n terms or the next p terms,then prove that (m+n)((1)/(m)-(1)/(p))=(m+p)((1)/(m)-(1)/(n))