NYS

These are the resources that support this NYS Standard.

NY-AI-A.REI.1a

There are 191 resources.
Title Description Thumbnail Image Curriculum Topics

What Is an Equation?

Your students may know how to solve equations (or not), but do they know the underlying mathematical processes and properties involved in solving them? Do they have sufficient vocabulary to explain their steps in solving an equation?

More than memorizing an algorithm, the ability to define and use the properties of equality, as well as other key parts of the equation-solving process are essential for mathematical competence. The ability to analyze and use logical reasoning are skills that go beyond the math classroom.

In this module, students learn the basics of the equation-solving process. These principles apply to any equation a student is solving and provide a needed foundational reinforcement for students.

Anatomy of an Equation: -ax + -b = -cx - d

In this PowerPoint presentation, analyze the solution to a multi-step equation of the form: -ax + -b = -cx - d.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: -ax + b = -c

In this interactive, look at the solution to a two-step equation by clicking on various hot spots.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: -ax + b = -cx + d

In this PowerPoint presentation, analyze the solution to a multi-step equation of the form: -ax + b = -cx + d.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: -ax + b = -cx - d

In this PowerPoint presentation, analyze the solution to a multi-step equation of the form: -ax + b = -cx - d.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: -ax + b = c

In this interactive, look at the solution to a two-step equation by clicking on various hot spots.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: -ax + b = cx + d

In this PowerPoint presentation, analyze the solution to a multi-step equation of the form: -ax + b = cx + d.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: -ax + b = cx - d

In this PowerPoint presentation, analyze the solution to a multi-step equation of the form: -ax + b = cx - d.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: -AX + By = -C

In this PowerPoint Presentation, analyze the steps in converting a linear equation in Standard Form to a linear function in Slope-Intercept Form. In this Interactive we work with this version of the Standard Form: -AX + By = -C.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Standard Form

Anatomy of an Equation: -AX + By = C

In this PowerPoint Presentation, analyze the steps in converting a linear equation in Standard Form to a linear function in Slope-Intercept Form. In this Interactive we work with this version of the Standard Form: -AX + By = C.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Standard Form

Anatomy of an Equation: -ax - b = -c

In this interactive, look at the solution to a two-step equation by clicking on various hot spots.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: -ax - b = -cx + d

In this PowerPoint presentation, analyze the solution to a multi-step equation of the form: -ax - b = -cx + d.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: -ax - b = c

In this interactive, look at the solution to a two-step equation by clicking on various hot spots.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: -ax - b = cx + d

In this PowerPoint presentation, analyze the solution to a multi-step equation of the form: -ax - b = cx + d.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: -ax - b = cx - d

In this PowerPoint presentation, analyze the solution to a multi-step equation of the form: -ax - b = cx - d.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: -AX - By = -C

In this PowerPoint Presentation, analyze the steps in converting a linear equation in Standard Form to a linear function in Slope-Intercept Form. In this Interactive we work with this version of the Standard Form: -AX - By = -C.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Standard Form

Anatomy of an Equation: -AX - By = C

In this PowerPoint Presentation, analyze the steps in converting a linear equation in Standard Form to a linear function in Slope-Intercept Form. In this Interactive we work with this version of the Standard Form: -AX - By = C.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Standard Form

Anatomy of an Equation: -ax^2 + bx + c = 0

In this PowerPoint presentation, analyze the steps in solving a quadratic equation with two roots. In this Interactive we work with this version of the quadratic equation: -ax^2 + bx + c = 0.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Polynomial Functions and Equations

Anatomy of an Equation: -ax^2 + bx - c = 0

In this PowerPoint presentation, analyze the steps in solving a quadratic equation with two roots. In this Interactive we work with this version of the quadratic equation: -ax^2 + bx - c = 0.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Polynomial Functions and Equations

Anatomy of an Equation: -ax^2 - bx + c = 0

In this PowerPoint presentation, analyze the steps in solving a quadratic equation with two roots. In this Interactive we work with this version of the quadratic equation: -ax^2 - bx + c = 0.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Polynomial Functions and Equations

Anatomy of an Equation: -ax^2 - bx - c

In this PowerPoint presentation, analyze the steps in solving a quadratic equation with two roots. In this Interactive we work with this version of the quadratic equation: -ax^2 - bx - c = 0.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Polynomial Functions and Equations

Anatomy of an Equation: ax + b = -c

In this interactive, look at the solution to a two-step equation by clicking on various hot spots.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: ax + b = -cx + d

In this PowerPoint presentation, analyze the solution to a multi-step equation of the form: ax + b = -cx + d.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: ax + b = -cx - d

In this PowerPoint presentation, analyze the solution to a multi-step equation of the form: ax + b = -cx - d.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations

Anatomy of an Equation: ax + b = c

In this interactive, look at the solution to a two-step equation by clicking on various hot spots.

Note: The download is a PPT file.

Related Resources

To see the complete collection of Tutorials on this topic, click on this link: https://bit.ly/2Bev8rH

PowerPointPresentations.jpg Solving Two-Step Equations