In Exercises 1–14, write the first six terms of each arithmetic sequence. an = an-1 +6, a₁ = −9

An arithmetic sequence is a sequence of numbers in which the difference between consecutive terms is constant. This difference is known as the common difference. In the given sequence, the common difference is 6, meaning each term is obtained by adding 6 to the previous term.

A recursive formula defines each term of a sequence based on the preceding term(s). In this case, the formula an = an-1 + 6 indicates that each term (an) is derived from the previous term (an-1) by adding 6. This approach is essential for generating terms in sequences where a direct formula is not provided.

The initial term of a sequence is the first term from which all subsequent terms are generated. In this problem, the initial term is given as a₁ = -9. This starting point is crucial for calculating the first six terms of the arithmetic sequence, as it sets the foundation for all following terms.