Find the sum of first 24 terms of the A.P. `a_(1) , a_(2), a_(3)`...., if it is know that `a_(1) + a_(5) + a_(10) + a_(15) + a_(20) + a_(24) = 225`

Find the respective terms for the following Aps: (i) a_(1) =2, a_(3) = 26 find a_(2) (ii) a_(2) =13, a_(4) = 3 find a_(1), a_(3) (iii) a_(1) =5, a_(4) = -22 find a_(1),a_(3),a_(4),a_(5)

For arithmetic sequence a_(1),a_(2),a_3 ........ If a_(1)+a_(5)+a_(10)+a_(15)+a_(20)+a_(24)= 225 then s_(24) = ............

Find the sum of first 24 terms of the list of numbers whose nth term is given by a_(n) = 3 + 2n

What does a_(1) + a_(2) + a_(3) + …..+ a_(n) represent

Find the relation between acceleration of blocks a_(1), a_(2) and a_(3) .

The number of all possible 5-tuples (a_(1),a_(2),a_(3),a_(4),a_(5)) such that a_(1)+a_(2) sin x+a_(3) cos x + a_(4) sin 2x +a_(5) cos 2 x =0 hold for all x is

Write the first five terms of the sequences in obtain the corresponding series: a_(1)= a_(2)= 1, a_(n)= a_(n-1) + a_(n-2), n gt 2

If a_(1),a_(2),a_(3),".....",a_(n) are in HP, than prove that a_(1)a_(2)+a_(2)a_(3)+a_(3)a_(4)+"....."+a_(n-1)a_(n)=(n-1)a_(1)a_(n)

Let a_(1),a_(2),"...." be in AP and q_(1),q_(2),"...." be in GP. If a_(1)=q_(1)=2 " and "a_(10)=q_(10)=3 , then

Statement 1 The sum of the products of numbers pm a_(1),pma_(2),pma_(3),"....."pma_(n) taken two at a time is -sum_(i=1)^(n)a_(i)^(2) . Statement 2 The sum of products of numbers a_(1),a_(2),a_(3),"....."a_(n) taken two at a time is denoted by sum_(1le iltjlen)suma_(i)a_(j) .