In a sequence, if `T_(n+1)=4n+5`, then `T_n` is:

If the nth term of the sequence is a_ n =4n -3 then find 17th term

IF T_n=5n-2 , then find S_4 .

Let T_n denote the number of triangles which can be formed using the vertices of a regular polygon of n sides . If T_(n+1)-T_n=21 , then n 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 :

Show that the the sequence defined by T_(n) = 3n^(2) +2 is not an AP.

Let T_n be the number of all possible triangles formed by joining vertices of an n - sided regular polygon . If T_(n+1)-T_n=10 , then the value of n is :

The following geometric arrays suggest a sequence of numbers. (a) Find the next three terms . (b) Find the 100^(th) term . (c) Find the n^(th) term . The dots here arranged in such a way that they form a rectangle. Here T_1 =2 , T_2 = 6 , T_3 = 12 , T_4 = 20 and so on. Cay you guess what T_5 is ? What about T_6 ? What about T_n ? Make a conjecture about T_n .

If n^(th) term of the sequences is a_(n)= (-1)^(n-1)5^(n+1) , Find a_(3) ?

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 :

Write the first five terms of the sequence defined by a_n = ( n)/( n+1) where n in N