Consider a sequence `{a_n}` with a_1=2 & `a_n =(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 be

Consider a sequence {a_n }with a_1=2 and a_n=(a_(n-1)^ 2)/(a_(n-2)) for all ngeq3, terms of the sequence being distinct. Given that a_1 and a_5 are positive integers and a_5lt=162 then the possible value(s) of a_5 can be (a) 162 (b) 64 (c) 32 (d) 2

Consider a sequence {a_n }with a_1=2 and a_n=(a_(n-1)^ 2)/(a_(n-2)) for all ngeq3, terms of the sequence being distinct. Given that a_1 and a_5 are positive integers and a_5lt=162 then the possible value(s) of a_5 can be (a) 162 (b) 64 (c) 32 (d) 2

Consider a sequence {a_(n)} with a_(1)=2 and a_(n)=(a_(n-1)^(2))/(a_(n-2)) for all n>=3, terms of the sequence being distinct. Given that a_(1)anda_(5) are positive integers and.a_(5)<=162 then the possible value (s) of a_(5) can be a.162 b.64 c.32 d.2

Consider a sequence {a_n}w i t ha_1=2a n da_n=(a n^2-1) /(a_(n-2)) for all ngeq3, terms of the sequence being distinct. Given that a_1a n da_5 are positive integers and a_5lt=162 then the possible value (s)ofa_5 can be a. 162 b. 64 c. 32 d. 2

If a_1=1 and a_n =na_(n-1) , for all positive integers n ge 2 , then a_5 is equal to :

If a_1=1 and a_n= na_(n-1) for all positive integer n ge 2 then a_5 is equal to

Find the first 6 terms of the sequence given by a_1=1, a_n=a_(n-1)+2 , n ge 2

Find the first five terms of the following sequence . a_1 = 1 , a_2 = 1 , a_n = (a_(n-1))/(a_(n-2) + 3) , n ge 3 , n in N

Let the sequence a_n be defined as a_1=1, a_n=a_(n-1)+2 for n ge 2 . Find first five terms and write corresponding series.

Find the first five terms of the following sequence a_1 = a_2 = 1 , a_n = a_(n-1) + a_(n - 2) , n ge 3