Sequence S is such that S_n=S_n−1+and S₁=2

Sequence A is such that A_n=A_n−1−1.5 and A₁=18.5

A sequence has terms a₁,a₂,a₃,…….,a_n, where a₁=2 and general term is given as a_n=a_(n−1)× .

1, 2, -3, -4, 1, 2, -3, -4... The sequence above begins with 1 and repeats in the pattern 1, 2, -3, -4 indefinitely

a₁,a₂,8,16,.......,128 is a geometric sequence

Series F is defined as F n = F(n – 1) + 3 and F 1 = 10.

The sequence a1,a2,a3,…an,... is such that a₁=−2,a₂=−5,a₃=4,a₄=3,and a_n=a_n−4 for n>4.

0 <G<H<I<J<K<L<M<N<100

S_n represent the sum of n terms of a certain sequence, where each term after the first term of the sequence is obtained by adding a constant c, where c > 0, in the preceding term

The first six terms of an infinite sequence are $2,4,4,3,7,5$ and these six terms repeat in the same order. (e.g., $2,4,4,3$, $7,5,2,4,4,3,7,5,…)$

x, y, and z are three consecutive multiples of 3 such that 0<x<y<z.