In mathematics, a pattern is a sequence of numbers, shapes, or objects that follow a certain rule or repetition. Patterns can be found in many different areas of math, including arithmetic, geometry, and algebra.

Number patterns are sequences of numbers that follow a specific rule or operation. For example, in the sequence 2, 4, 6, 8, 10, the pattern is adding 2 to the previous number. Recognizing number patterns can help in understanding basic arithmetic operations and in solving more complex mathematical problems.

In geometry, patterns can also be found in shapes and figures. For example, a pattern of triangles, squares, and circles can repeat in a sequence. Recognizing and extending shape patterns can help in developing spatial reasoning and understanding geometric properties.

Identifying and extending patterns is an important skill in mathematics. Students are often asked to identify the core of a pattern and extend it by predicting the next numbers or shapes in the sequence. This helps in developing critical thinking and problem-solving skills.

Patterns can also be used to solve problems in mathematics. By recognizing and understanding patterns, students can make predictions and test their hypotheses, leading to a deeper understanding of mathematical concepts and relationships.

Overall, patterns play a significant role in mathematics, helping students develop logical thinking, problem-solving skills, and a deeper understanding of mathematical concepts.

.Study GuidePatterns Worksheet/Answer key

Patterns Worksheet/Answer key

Patterns Worksheet/Answer key

Patterns Worksheet/Answer keyPattern and Algebra Worksheet/Answer keyPatterns and Algebra Worksheet/Answer keyPatterns and Algebra

Algebra (NCTM)

Understand patterns, relations, and functions.

Describe, extend, and make generalizations about geometric and numeric patterns.

Represent and analyze patterns and functions, using words, tables, and graphs.

Use mathematical models to represent and understand quantitative relationships.

Model problem situations with objects and use representations such as graphs, tables, and equations to draw conclusions.

Analyze change in various contexts.

Identify and describe situations with constant or varying rates of change and compare them.