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Consider a sequence `{a_n}` with `a_1 =(a_(n-1)^2)/(a_(n-2))` for all ` n ge 3` terms of the sequence being distinct .Given that `a_2 " and " a_5` are positive integers and `a_5 le 162`, then the possible values (s) of `a_5` can beA. 162B. 64C. 32D. 2 |
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Answer» Correct Answer - A::C::D `(a_(n))/(a_(n-1))=(a_(n-1))/(a_(n-2))` Here `a_(1),a_(2),a_(3)`…..are in G.P. Let `a_(2)=x` then for `n=3` `(a_(3))/(a_(2))=(a_(2))/(a_(1))impliesa_(2)^(2)=a_(1)a_(3)impliesa_(3)=(x^(2))/2` `:.` G.P. is `2, x, (x^(2))/2, (x^(3))/4`,……….. Comon ratio `r=x/2` Given `(x^(4))/8le162impliesx^(4)1296impliesxle6` Also, `x` & `(x^(4))/8` are integers so, if `x` is also even then only `(x^(4))/8` will be an integer Hence, the possible values of `x` are 4 & 6, because `x!=2` as terms are distinct hence possible values of `a_(5)=(x^(4))/8` are `(4^(4))/8` & `(6^(4))/8` |
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