Illustrative Math Alignment: Grade 7 Unit 7

Topic

Linear Functions

Definition

Linear equations in standard form are written as Ax + By = C, where A, B, and C are constants, and A and B are not both zero.

Description

Linear equations in standard form are a fundamental representation of linear functions. They provide a way to express linear relationships in a general form.

Topic

Linear Functions

Definition

The equation of a line from two coordinates can be determined by finding the slope between the two points and using it in the point-slope form of a linear equation.

Description

Finding the equation of a line from two coordinates is a fundamental skill in algebra. It involves calculating the slope between the two points and then using one of the points to form the equation in point-slope or slope-intercept form.

Topic

Quadratics Concepts

Definition

A quadratic equation is a polynomial equation of degree two, typically in the form 

ax2 + bx + c = 0

where a, b, and c are constants and a ≠ 0.

Topic

Rationals and Radicals

Definition

Radical equations are equations in which the variable is inside a radical, such as a square root or cube root.

Description

Radical Equations are a fundamental aspect of Radical Numbers, Expressions, Equations, and Functions. These equations involve variables within radical signs, such as square roots or cube roots. Solving radical equations typically requires isolating the radical on one side of the equation and then squaring both sides to eliminate the radical. For example, to solve 

$$\sqrt{x+3} = 5$$

one would square both sides to obtain 

$$x + 3 = 25$$

Topic

Rationals and Radicals

Definition

Rational equations are equations that involve rational expressions, which are fractions containing polynomials in the numerator and denominator.

Description

Rational Equations are a fundamental aspect of Rational Numbers, Expressions, Equations, and Functions. These equations involve rational expressions, which are fractions containing polynomials in the numerator and denominator. Solving rational equations typically requires finding a common denominator, clearing the fractions, and then solving the resulting polynomial equation. For example, to solve 

$$\frac{1}{x} + \frac{1}{x+1} = \frac{1}{2}$$

This is part of a collection of definitions related to the topic of systems of equations. The focus of most of the terms is linear systems.

Related Resources

Desmos Collection

Derive the equation of a parabola with Focus at coordinates (a, c) and Directrix at y = c using a Desmos graphing calculator. There is a companion worksheet for this activity, which subscribers can download. The worksheet is a PDF file.

Related Resources

To see additional resources on this topic click on the Related Resources tab above.

Desmos Collection

To see the complete collection of Desmos Resources click on this link.

In this graphing calculator activity, have your students explore how to convert linear equations in point-slope to a linear function in slope-intercept form. This Desmos template allows students to explore the effect of changes in the values of coordinates of the point and the slope of the line. A companion downloadable worksheet uses the graphing calculator template to explore the properties of these linear equations and functions.

Related Resources

To see additional resources on this topic click on the Related Resources tab above.

Desmos Collection

To see the complete collection of Desmos Resources click on this link.

In this graphing calculator activity, have your students explore how to convert linear equations in standard form to a linear function in slope-intercept form. This Desmos template allows students to explore the effect of changes in the values of A, B, and C in the standard form and m and b in the slope-intercept form. A companion downloadable worksheet uses the graphing calculator template to explore the properties of these linear equations and functions. Note: The download is a PDF worksheet.

The following section includes background information on slope. This background also includes video resources and accompanying transcripts.

Topic

Multiplication and Division

Definition

A false equation is a mathematical statement that shows equality between two expressions that are not equal.

Topic

Multiplication and Division

Definition

A true equation is a mathematical statement that asserts equality between two expressions that are equal.

Description

True equations are essential in mathematics as they represent accurate relationships between numbers and expressions. For example, the equation 

2 + 3 = 5 

Topic

Addition and Subtraction

Definition

A false equation is a mathematical statement that shows two expressions that are not equal.

Description

A false equation is a mathematical statement where two expressions are not equal. For example, the equation 

3 + 4 = 8 

is false because the sum of 3 and 4 is 7, not 8. Understanding false equations helps students recognize and correct errors in their calculations.

Topic

Addition and Subtraction

Definition

A true equation is a mathematical statement that shows two expressions that are equal.

Description

A true equation is a mathematical statement where two expressions are equal. For example, the equation 

3 + 4 = 7

is true because the sum of 3 and 4 is indeed 7. Understanding true equations helps students recognize and verify the accuracy of their calculations.

Review key vocabulary on the topic of equations with this interactive and printable word search puzzle.

Related Resources

Learn different strategies for solving one-step addition equations. The Strategy Packs provide alternate ways of solving the same problem, giving your students different approaches to the same problem. The goal of the Strategy Packs is to encourage your students to think strategically when solving math problems.

Note: The download is a PPT file.

Learn different strategies for solving one-step multiplication equations. The Strategy Packs provide alternate ways of solving the same problem, giving your students different approaches to the same problem. The goal of the Strategy Packs is to encourage your students to think strategically when solving math problems.

Note: The download is a PPT file.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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.

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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.

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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.

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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.

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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.

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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.

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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.

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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.

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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.

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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.

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.

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

Library of Instructional Resources

To see the complete library of Instructional Resources , click on this link.