Math tutor writing number sequence 2, 4, 6, 8 to explain nth term patterns on a transparent board with geometric designs.
Lower Secondary Algebra

Patterns and Sequences: Mastering the Nth Term

Learn how to spot patterns and calculate the nth term rule.

πŸ‘‹ Welcome to the world of patterns! In this lesson, you will learn how to spot mathematical sequences, describe how they grow, and unlock the powerful "$n$th term" formula to predict the future (mathematically speaking!).

1. Identifying Patterns πŸ”

A sequence is an ordered list of numbers that follow a specific rule. Each number in the sequence is called a term.

To understand a sequence, we look at how to get from one term to the next. There are two main types of sequences you will encounter:

πŸ”’ Arithmetic Sequences

In an arithmetic sequence, the difference between consecutive terms is always the same. We call this the common difference.

Example: $3, 7, 11, 15, [[dots]]$

Rule: Add $4$ each time.

πŸš€ Geometric Sequences

In a geometric sequence, you multiply or divide by the same number each time to get the next term. We call this the common ratio.

Example: $2, 6, 18, 54, [[dots]]$

Rule: Multiply by $3$ each time.

2. Term-to-Term Rules πŸ“

The simplest way to describe a sequence is the term-to-term rule. This tells you how to find the next number if you know the current one.

Let’s look at the sequence: $5, 12, 19, 26, [[dots]]$

To find the rule, ask yourself: "How do I get from $5$ to $12$?"

$$12 – 5 = 7$$

Does it work for the next pair? Yes, $19 – 12 = 7$.

So, the term-to-term rule is: Add $7$.

3. The Nth Term Rule ⚑

The term-to-term rule is useful, but what if you need to find the $100$th term? Adding $7$ one hundred times would take forever! This is where the position-to-term rule, or the $n$th term, becomes essential.

In algebra, we use the letter $n$ to represent the position of a number in the sequence.

  • $n = 1$ is the 1st term.
  • $n = 2$ is the 2nd term.
  • $n = 100$ is the 100th term.

How to find the $n$th term for linear sequences

For arithmetic sequences (where you add or subtract the same amount), use this method:

The Formula Strategy

$$T_n = dn + c$$

Where:

  • $d$ is the difference between terms.
  • $c$ is the zero term (the term that would come before the first term).

Let’s find the $n$th term for: $4, 7, 10, 13, [[dots]]$

Step 1: Find the difference ($d$).
The sequence goes up by $3$ each time ($7 – 4 = 3$). So, the first part of our rule is $3n$.

Step 2: Find the zero term ($c$).
Go backwards from the first term. If we subtract $3$ from the first term ($4$), we get $1$. So, $c = +1$.

Step 3: Combine them.
The $n$th term rule is $3n + 1$.

πŸ’‘ Check your answer!

If the rule is $3n + 1$, let’s test it for the 3rd term ($n=3$).

$$3 [[times]] 3 + 1 = 10$$

Looking at our sequence ($4, 7, 10, 13$), the 3rd term is indeed $10$. It works!

Practice Problems

Practice finding the rules for these sequences.

1. Find the next two terms in this arithmetic sequence:

$$8, 13, 18, 23, [[dots]]$$

Show Answer

Step 1: Find the difference between the terms.

$$13 - 8 = 5$$

The rule is "add $5$".

Step 2: Apply the rule to the last known term ($23$).

$$23 + 5 = 28$$

$$28 + 5 = 33$$

The next two terms are $28$ and $33$.

2. Find the $n$th term rule for the sequence:

$$5, 9, 13, 17, [[dots]]$$

Show Answer

Step 1: Find the common difference ($d$).

The sequence increases by $4$ each time. So, start with $4n$.

Step 2: Find the zero term ($c$).

Work backwards from the first term ($5$) by subtracting the difference ($4$).

$$5 - 4 = 1$$

So, the adjustment is $+1$.

Answer: The $n$th term is $4n + 1$.

3. Use the $n$th term rule $6n - 2$ to find the 50th term.

Show Answer

Step 1: Substitute $n = 50$ into the formula.

$$6(50) - 2$$

Step 2: Calculate.

$$300 - 2 = 298$$

The 50th term is $298$.

Interactive Quiz

Test your knowledge of patterns and sequences!

1. What is the next term in the sequence: $2, 7, 12, 17, [[dots]]$?

$20$
$22$
$27$

2. Find the $n$th term rule for: $2, 5, 8, 11, [[dots]]$

$3n + 1$
$3n - 1$
$2n + 3$

3. Is the sequence $3, 6, 12, 24, [[dots]]$ arithmetic or geometric?

Arithmetic
Geometric