Let `S_(1),S_(2),S_(3)`, …. Are squares such that for each `nge1,` The length of the side of `S_(n)` is equal to length of diagonal of `S_(n+1)`. If the length of the side `S_(1)` is 10 cm then for what value of n, the area of `S_(n)` is less than 1 sq.cm.

Let S_1, S_2, be squares such that for each ngeq1, the length of a side of S_n equals the length of a diagonal of S_(n+1)dot If the length of a side of S_1i s10c m , then for which of the following value of n is the area of S_n less than 1 sq. cm? a. 5 b. 7 c. 9 d. 10

Let S_1, S_2, be squares such that for each ngeq1, the length of a side of S_n equals the length of a diagonal of S_(n+1)dot If the length of a side of S_1i s10c m , then for which of the following value of n is the area of S_n less than 1 sq. cm? a. 5 b. 7 c. 9 d. 10

Let A_(1), A_(2), A_(3),….., A_(n) be squares such that for each n ge 1 the length of a side of A _(n) equals the length of a diagonal of A _(n+1). If the side of A_(1) be 20 units then the smallest value of 'n' for which area of A_(n) is less than 1.

S_(N)1 is observed in

Let S_n denotes the sum of the first of n terms of A.P. and S_(2n)=3S_n . then the ratio S_(3n):S_n is equal to

If S_n , be the sum of n terms of an A.P ; the value of S_n-2S_(n-1)+ S_(n-2) , is

If S dentes the sum to infinity and S_n the sum of n terms of the series 1+1/2+1/4+1/8+….., such that S-S_n lt 1/1000 then the least value of n is

l_1 and l_2 are the side lengths of two variable squares S_1, and S_2 , respectively. If l_1=l_2+l_2^3+6 then rate of change of the area of S_2 , with respect to rate of change of the area of S_1 when l_2 = 1 is equal to

Let S_(n) denote the sum of the first n terms of an A.P.. If S_(4)=16 and S_(6)=-48 , then S_(10) is equal to :