Deck 8: Math: Strategies and Techniques

The NCTM's Principles and Standards for School Mathematics calls for an increased emphasis on conceptual understanding and ____________________ skills in mathematics curricula.

Many students who are successful in mastering number sense and calculation first exhibit signs of mathematical difficulties when beginning to learn about ____________________.

Understanding the big idea of ____________________ means appreciating that the information on the left and right sides of the equal sign are the same.

____________________ includes the skills of addition, subtraction, multiplication and division.

To ____________________ is to approximate an outcome to a problem.

When a teacher identifies the prerequisite and co-requisite knowledge and skills required to accomplish a lesson goal, that teacher is engaging in ____________________.

By applying ____________________ operations, students can check their work on basic calculation problems.

Many students with disabilities are not ____________________ to practice and learn math because of the confusion they experience during lessons and their high failure rates.

Just as phonemic awareness is an essential "pre" skill to reading, ____________________ is an essential "pre" skill to mathematics.

Understanding of ____________________ is critical to comprehending decimals.

Show, draw, and/or explain an example of the following math problem in concrete form, semi-concrete form, and abstract form: 14 + 6 = 20.

What procedure would you follow to determine if a student with a mild disability should be provided a calculator as an accommodation for his/her difficulty recalling basic calculation facts?

Name and briefly explain the four factors that can cause students with mild disabilities to have difficulty with story problems. Create a sample story problem that contains one of these four factors. Why would this factor make the problem more challenging?

Thoughtful sequencing of math concepts/skills is essential to effective instruction. What is a smart sequence when teaching the following single digit multiplication facts: 0 facts, 1 facts, 2 facts, 3 facts, 4 facts, and 5 facts?

What factors make story problems uniquely difficult for many students with mild disabilities to solve? Name three of these and explain each.

Researchers indicate that effective instruction in math concepts and skills progresses from concrete, to semi-concrete, to abstract representations. However, what exactly is meant by these three representations? Moreover, what is an example for each one?

Some students with mild disabilities have difficulty memorizing calculation facts. Describe tactics or simple strategies that a teacher might employ to help these students to remember these facts and give examples of each one.