Write the nth term of the A.P. `(1)/(m) , (1+m)/(m) , (1+2m)/(m) ,…`

Consider an AP with a as the first term and d is the common difference such that S_(n) denotes the sum to n terms and a_(n) denotes the nth term of the AP. Given that for some m, n inN,(S_(m))/(S_(n))=(m^(2))/(n^(2))(nen) . Statement 1 d=2a because Statement 2 (a_(m))/(a_(n))=(2m+1)/(2n+1) .

Solve : ( 4)/( m+ 2) - (1)/( m+3) = (4)/( 2m +1)

Let T_(r ) be the rth term of an A.P. for r = 1,2,3, "………." . If for some positive integers m,n we have : T_(m) = ( 1)/( n) and T_(n) = ( 1)/(m) , then T_(mn ) equals :

Let T_(r ) be the rth term of an A.P. for r = 1,2,3, "…………….." If for some positive integers m,n we have T_(m) = ( 1)/( n ) and T_(n) = ( 1)/( m ) , then T_(mn) equals :

Let a_(n) be the nth term of an A.P. If sum_(r=1)^(100) a_(2r) = alpha and sum_(r = 1)^(100) a_(2r-1) = beta , then the common difference of the A.P. is :

If sec theta = m and tan theta = n , then (1)/(m)[(m+n)+(1)/((m+n))]=

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)dot

If the lines y=m_(r )x, r=1, 2, 3 cut off equal intercepts on the transversal x+y=1 , then 1+m_(1), 1+m_(2), 1+m_(3) are in :

ABC is a right-angled triangle in which angleB=90^(@) and BC=a. If n points L_(1),L_(2),…,L_(n) on AB is divided in n+1 equal parts and L_(1)M_(1), L_(2)M_(2),…,L_(n)M_(n) are line segments paralllel to BC and M_(1), M_(2),….,M_(n) are on AC, then the sum of the lengths of L_(1)M_(1), L_(2)M_(2),...,L_(n)M_(n) is