Let S(n) denote the sum of the digits of a positive integer n. e.g. `S(178)=1+7+8=16`. Then, the value of `S(1)+S(2)+S(3)+...+S(99)` is
a)476 b)998 c)782 d)900

Let S_(n) denote the sum of first n terms of an AP and S_(2n) = 3S_(n) . If S_(3n) = k S_(n) , then the value of k is equal to

Let S_(n) denote the sum of first n terms of an A.P . If S_(2n) = 3S_(n) then find the ratio S_(3n)//S_(n) .

If S_(n) denotes the sum of first n terms of an A.P whose first term is a and (S_(nx))/(S_(x)) is independent of x then S_(p)=

Let S be the sum P the product and R the sum of reciprocals of n terms in a G.P. Then prove that P^2R^n=S^n

Let S be the sum, P , the product and R the sum of reciprocals of n terms in a G . P . Prove that P^2 R^n=S^n

Let S_(1) be a square of side is 5 cm. Another square S_(2) is drawn by joining the mid-points of the sides of S_(1) . Square S_(3) is drawn by joining the mid-points of the sides S_(2) and so on. Then, (area of S_(1) + area of S_(2)+…+ area of S_(10) ) is a) 25(1-1/(2^(10)))cm^(2) b) 50(1-1/(2^(10)))cm^(2) c) 2(1-1/(2^(10)))cm^(2) d) 1-1/(2^(10))cm^(2)

If S_(n) , denotes the sum of first n terms of a A.P. then (S_(3n)-S_(n-1))/(S_(2n)-S_(2n-1)) is always equal to

If S denotes the sum to infinity and S_(n) , denotes the sum of n terms of the series 1+(1)/(2)+(1)/(4) + (1)/(8)+ cdots , such that S-S_(n) lt (1)/(100) , then the least value of n is

If the sum of the first n terms of an Arithmetic progression is S_n=nX+1/2n(n-1)Y where X and Y are constants, find S_1 and S_2 .

Let S={(1,2),(2,3),(3,4)}. Find S^-1