The Fibonacci sequence is defined by `1=a_1=a_2` and `a_n=a_(n-1)+a_(n-2,)n > 2.` Find `(a_(n+1))/(a_n),for n=5.`

The Fibonacci sequence is defined by 1=a_(1)=a_(2) and a_(n)=a_(n-1)+a_(n-2),n>2 Find (a_(n+1))/(a_(n)) for n=1,2,3,4,5

The Fibonacci sequence is defined by 1=a_(1)=a_(2)and a_(n)=a_(n-1)+a_(n-2),ngt2. "Find "(a_(n+1))/(a_(n)),"for n = 1, 2, 3, 4, 5."

The fibonacct sequence is defined by 1=a_(1) = a_(2) and a_(n-1) + a_( n-1) , n gt 1 Find (a_(n+1))/(a_(n)) " for " n =1 ,2,34,5,

The Fibonacci sequence is defined by a_(1)=1=a_(2),a_(n)=a_(n-2)f or n>2. Find (a_(n+1))/(a_(n))f or n=1,2,3,4,5

Let a sequence be defined by a_(1)=1,a_(2)=1 and a_(n)=a_(n-1)+a_(n-2) for all n>2, Find (a_(n+1))/(a_(n)) for n=1,2,3,4

A sequence is defined as follows : a_(a)=4, a_(n)=2a_(n-1)+1, ngt2 , find (a_(n+1))/(a_(n)) for n=1, 2, 3.

Fibonacci sequence is defined as follows : a_(1)=a_(2)=1 and a_(n)=a_(n-2)+a_(n-1) , where n gt 2 . Find third, fourth and fifth terms.

If quad 1,a_(1)=3 and a_(n)^(2)-a_(n-1)*a_(n+1)=(-1)^(n) Find a_(3).

The Sequence {a_(n)}_(n=1)^(+oo) is defined by a_(1)=0 and a_(n+1)=a_(n)+4n+3,n>=1 . Find the value of lim_(n rarr+oo)(sqrt(a_(n))+sqrt(a_(4n))+sqrt(a_(4^(2)n))+sqrt(a_(4^(3)n))+......+sqrt(a_(4^(10)n)))/(sqrt(a_(n))+sqrt(a_(2n))+sqrt(a_(2^(2)n))+sqrt(a_(2^(3)n))+.....+sqrt(a_(2^(10)n)))