Consider a sequence {an}w i t ha1=2a n d...

Consider a sequence `{a_n}w i t ha_1=2a n da_n=(a n-1 2)/(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

Similar Questions

Explore conceptually related problems

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

The largest term of the sequence lt a_n gt given by a_n=(n^2)/(n^3 + 200),n in N . Is

Find the sum of n terms of the sequence given by a_(n)=(3^(n)+5n), n in N .

Consider the sequence defined by a_(n)=an^(2)+bn+* If a_(1)=1,a_(2)=5,anda_(3)=11, then find the value of a_(10).

If the nth term a_(n) of a sequence is given by a_(n)=n^(2)-n+1 write down its first five terms.

find first 5 terms of the sequences, defined by a_(1) =-1 , a_(n) = ( a_(n-1))/n " for n ge 2

Define a sequence (a_(n)) by a_(1)=5,a_(n)=a_(1)a_(2)…a_(n-1)+4 for ngt1 . Then lim_(nrarroo) (sqrt(a_(n)))/(a_(n-1))

Consider the sequence 1,-2,3,-4,5,-6,......,n.(-1)^(n+1) What is the average of the first 300 terms of the sequence?

The nth term of a sequence is given by a_(n)=2n^(2)+n+1. Show that it is not an A.P.

Consider a sequence `{a_n}w i t ha_1=2a n da_n=(a n-1 2)/(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

Similar Questions

Recommended Questions