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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. 10A. 7B. 8C. 5D. 6 |
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Answer» Correct Answer - B We have, Length of a side of `S_(n)` = Length of a diagonal of `S_(n+1)` `rArr" "` Length of a side of `S_(n)=sqrt(2)` Length of a side of `S_(n+1)` `rArr" "("Length of a side of "S_(n+1))/("Length of a side of "S_(n))(1)/(sqrt(2))"for all "ngtl`. `rArr" "` Sides of `S_(1),S_(2) , . . . .S_(n)` form a G.P. with common ratio `(1)/(sqrt(2))` and first term 10. `:.` Length of the side of `S_(n)=10((1)/(sqrt(2)))^(n-1)=(10)/((n-1)/(2^(2)))` `rArr" Area of "S_(n)=("side")^(2)=((10)/((n-1)/(2^(2))))^(2)=(100)/(2^(n-1))` Now, Area of `S_(n)lt1` `rArr" "(100)/(2^(n-1))lt1rArrn-1ge7rArrnge8` |
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