A sequence may be defined as a

Let the sequence be defined as follows : a_1=3 , a_n =3a_(n-1)+2 , for all n> 1. Find the first four terms of the sequence.

The sequence a(n) is defined by : a(n) =(n-1)(n- 2) (n -3). Show that the first three terms of the sequence are zero, but the rest of the terms are positive.

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

Show that the sequence t n defined by t n = 3 n + 1 is an AP.

Let S_n(n leq 1) be a sequence of sets defined by S_1{0},S_2={3/2,5/2},S_3={15/4,19/4,23/4,27/4},....... then

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

There is only one possible sequence of amino acids when deduced from a given nucleotides. But multiple nucleotides sequence can be deduced from a single amino acid sequence. Explain this phenomena.

Show that the the sequence defined by T_(n) = 3n^(2) +2 is not an AP.