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

What is the 20^(th) term of the sequence defined by a_(n)= (n-1) (2-n) (3+n) ?

Let a_(0)=2,a_1=5 and for n ge 2, a_n=5a_(n-1)-6a_(n-2) , then prove by induction that a_(n)=2^(n)+3^(n), forall n ge 0 , n in N .

What does a_(1) + a_(2) + a_(3) + …..+ a_(n) represent

Write the first five terms of the sequences in obtain the corresponding series: a_(1)= a_(2)= 1, a_(n)= a_(n-1) + a_(n-2), n gt 2

Let a sequence {a_(n)} be defined by a_(n)=(1)/(n+1)+(1)/(n+2)+(1)/(n+3)+"....."(1)/(3n) , then

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

Find the respective terms for the following Aps: (i) a_(1) =2, a_(3) = 26 find a_(2) (ii) a_(2) =13, a_(4) = 3 find a_(1), a_(3) (iii) a_(1) =5, a_(4) = -22 find a_(1),a_(3),a_(4),a_(5)