If the sequence `{a_n},` satisfies the recurrence, `a_(n+1) = 3a_n - 2a_(n-1), n ge2, a_0 = 2, a_1 = 3,` then `a_2007` is

If the sequence {a_(n)} satisfies the recurrence a_(n+1)=3a_(n-1),n>=2,a_(0)=1,a_(1)=3 then a_(2007)=

A sequence of no. a_1,a_2,a_3 ..... satisfies the relation a_n=a_(n-1)+a_(n-2) for nge2 . Find a_4 if a_1=a_2=1 .

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 = a_2 = 1 , a_n = a_(n-1) + a_(n - 2) , n ge 3

A sequence of number a_1, a_2, a_3,…..,a_n is generated by the rule a_(n+1) = 2a_(n) . If a_(7) - a_(6) = 96 , then what is the value of a_(7) ?

A sequence of numbers a_0,a_1,a_2,a_3 , ........ satisfies the relation a_n^2-a_(n-1)a_(n+1)=(-1)^n . Find a_3 , given a_0=1 and a_1=3 .

Write the first five terms of the sequence in the corresponding series. a_1=-1, a_n=a_(n-1)/n, n ge 2

Let sequence by defined by a_1=3,a_n=3a_(n-1)+1 for all n >1

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