Arithmetic & Geometric Sequences: Find the nth Term

Arithmetic sequences add the same number each step (linear pattern). Geometric sequences multiply by the same number each step (exponential pattern). Two formulas, one strategy: identify, then plug in.

7 分钟 TEKS 12C,12D 代数1

Patterns are sequences

2, 5, 8, 11, ... — same amount added each step. 2, 6, 18, 54, ... — same multiplier each step. Both are sequences: ordered lists of numbers following a rule. Algebra 1 asks you to identify which type, find the rule, and use it to predict the 7th, 10th, or 100th term.

Arithmetic sequences (add)

a_n = a₁ + (n − 1) · d a₁ = first term, d = common difference Subtract any term from the next to get d. Same throughout the sequence.

Example

Sequence: 5, 9, 13, 17, ... What's the next term?

d = 9 − 5 = 4 a₅ = 17 + 4 = 21

Next term

What is the next term in the arithmetic sequence: 5, 9, 13, 17, ...?

Formula example: find the 8th term

a₁ = 5, d = 3 a₈ = 5 + (8 − 1) · 3 = 5 + 21 = 26

nth term of an arithmetic sequence

Arithmetic sequence: a₁=5, d=3. Find a₈.

Geometric sequences (multiply)

a_n = a₁ · r^{(n − 1)} a₁ = first term, r = common ratio Divide any term by the previous to get r. Same throughout.

Example

Sequence: 5, 10, 20, 40, ... What is the common ratio?

r = 10 / 5 = 2 Each term is double the previous.

Find the common ratio

Geometric sequence: 5,10,20,40,... Common ratio?

Tell them apart

First check “subtract,” then “divide”

Compute a₂ − a₁ and a₃ − a₂. Same? → arithmetic. Different? Compute a₂/a₁ and a₃/a₂. Same? → geometric. Neither? → not a standard sequence.

Identify the sequence type

Is the sequence 2, 6, 18, 54 arithmetic or geometric?

Sequences are functions

The big connection

An arithmetic sequence is a discrete linear function (the common difference is the slope). A geometric sequence is a discrete exponential function (the common ratio is the base b). Same math, different notation.

3-second recap

Arithmetic → add d each step. a_n = a₁ + (n − 1) · d
Geometric → multiply by r each step. a_n = a₁ · rⁿ⁻¹
Subtract for d. Divide for r. (n − 1), not n, in the formula.

Check yourself

Quick check #1

Find the 10th term of the arithmetic sequence: 3, 7, 11, 15, …

Quick check #2

In the geometric sequence 2, 6, 18, 54, …, what is the common ratio?