These are the resources that support this NYS Standard.
NY-AI-A.SSE.1b: Interpret expressions by viewing one or more of their parts as a single entity.
There are 155 resources.| Title | Description | Thumbnail Image | Curriculum Topics |
|---|---|---|---|
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: ax^2 - bx - c = 0 |
INSTRUCTIONAL RESOURCE: 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. |
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Polynomial Functions and Equations |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: ax^3 + bx^2 + cx + d = 0 |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: ax^3 + bx^2 + cx + d = 0
In this interactive, look at the solution to a polynomial equation of degree 3 using synthetic division. The equation is of the form ax^3 + bx^2 + cx + d = 0 and has three integer solutions. |
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Polynomial Functions and Equations |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: ax^3 + bx^2 + cx + d = 0 |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: ax^3 + bx^2 + cx + d = 0
In this interactive, look at the solution to a polynomial equation of degree 3 using synthetic division. The equation is of the form ax^3 - bx^2 + cx - d = 0 and has three integer solutions. |
|
Polynomial Functions and Equations |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: ax^3 + bx^2 + cx + d = 0 |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: ax^3 + bx^2 + cx + d = 0
In this interactive, look at the solution to a polynomial equation of degree 3 using synthetic division. The equation is of the form ax^3 + bx^2 - cx - d = 0 and has three integer solutions. |
|
Polynomial Functions and Equations |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: ax^3 + bx^2 + cx - d = 0 |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: ax^3 + bx^2 + cx - d = 0
In this interactive, look at the solution to a polynomial equation of degree 3 using synthetic division. The equation is of the form ax^3 + bx^2 + cx - d = 0 and has three integer solutions. |
|
Polynomial Functions and Equations |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: x + a = -b. |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: x + a = -b.
In this Slide Show, look at the solution to a one-step equation. |
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Solving One-Step Equations |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: x + a = b. |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: x + a = b.
In this Slide Show, look at the solution to a one-step equation. |
|
Solving One-Step Equations |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: x - a = -b. |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: x - a = -b.
In this Slide Show, look at the solution to a one-step equation. |
|
Solving One-Step Equations |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: x - a = b. |
INSTRUCTIONAL RESOURCE: Anatomy of an Equation: x - a = b.
In this Slide Show, look at the solution to a one-step equation. |
|
Solving One-Step Equations |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 1 |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 1
This is part of a collection of math examples that focus on polynomial concepts. This includes adding, subtracting, multiplying, and dividing polynomials, along with polynomial properties. |
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Factoring Quadratics |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 10 |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 10
This is part of a collection of math examples that focus on polynomial concepts. This includes adding, subtracting, multiplying, and dividing polynomials, along with polynomial properties. |
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Factoring Quadratics |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 11 |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 11
This is part of a collection of math examples that focus on polynomial concepts. This includes adding, subtracting, multiplying, and dividing polynomials, along with polynomial properties. |
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Factoring Quadratics |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 2 |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 2
This is part of a collection of math examples that focus on polynomial concepts. This includes adding, subtracting, multiplying, and dividing polynomials, along with polynomial properties. |
|
Factoring Quadratics |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 3 |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 3
This is part of a collection of math examples that focus on polynomial concepts. This includes adding, subtracting, multiplying, and dividing polynomials, along with polynomial properties. |
|
Factoring Quadratics |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 4 |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 4
This is part of a collection of math examples that focus on polynomial concepts. This includes adding, subtracting, multiplying, and dividing polynomials, along with polynomial properties. |
|
Factoring Quadratics |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 5 |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 5
This is part of a collection of math examples that focus on polynomial concepts. This includes adding, subtracting, multiplying, and dividing polynomials, along with polynomial properties. |
|
Factoring Quadratics |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 6 |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 6
This is part of a collection of math examples that focus on polynomial concepts. This includes adding, subtracting, multiplying, and dividing polynomials, along with polynomial properties. |
|
Factoring Quadratics |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 7 |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 7
This is part of a collection of math examples that focus on polynomial concepts. This includes adding, subtracting, multiplying, and dividing polynomials, along with polynomial properties. |
|
Factoring Quadratics |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 8 |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 8
This is part of a collection of math examples that focus on polynomial concepts. This includes adding, subtracting, multiplying, and dividing polynomials, along with polynomial properties. |
|
Factoring Quadratics |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 9 |
Math Example--Polynomial Concepts--Difference of Squares and Cubes--Example 9
This is part of a collection of math examples that focus on polynomial concepts. This includes adding, subtracting, multiplying, and dividing polynomials, along with polynomial properties. |
|
Factoring Quadratics |
Video Transcript: Anatomy of an Equation: Linear Equations in Standard Form to Slope-Intercept Form 1: Ax + By = C |
This is the transcript for the video entitled, Anatomy of an Equation: Linear Equations in Standard Form to Slope-Intercept Form 1: AX + By = C. In this video tutorial, analyze the steps in converting a linear equation in Standard Form to a linear function in Slope-Intercept Form. In this video we work with this version of the Standard Form: AX + By = C. |
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Standard Form |
Video Transcript: Anatomy of an Equation: Linear Equations in Standard Form to Slope-Intercept Form 2: Ax + By = -C |
This is the transcript for the video entitled, Anatomy of an Equation: Linear Equations in Standard Form to Slope-Intercept Form 2: AX + By = -C. In this video tutorial, analyze the steps in converting a linear equation in Standard Form to a linear function in Slope-Intercept Form. In this video we work with this version of the Standard Form: AX + By = -C. |
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Standard Form |
Video Transcript: Anatomy of an Equation: Linear Equations in Standard Form to Slope-Intercept Form 3: Ax - By = C |
This is the transcript for the video entitled, Anatomy of an Equation: Linear Equations in Standard Form to Slope-Intercept Form 3: Ax - By = C. In this video tutorial, analyze the steps in converting a linear equation in Standard Form to a linear function in Slope-Intercept Form. In this video we work with this version of the Standard Form: AX - By = C. |
|
Standard Form |
Video Transcript: Anatomy of an Equation: Linear Equations in Standard Form to Slope-Intercept Form 4: -Ax + By = C |
Video Transcript: Anatomy of an Equation: Linear Equations in Standard Form to Slope-Intercept Form 4: -Ax + By = C
This is the transcript for the video entitled, Anatomy of an Equation: Linear Equations in Standard Form to Slope-Intercept Form 4: -Ax + By = C. |
|
Standard Form |
Video Transcript: Anatomy of an Equation: Linear Equations in Standard Form to Slope-Intercept Form 5: Ax - By = -C |
This is the transcript for the video entitled, Anatomy of an Equation: Linear Equations in Standard Form to Slope-Intercept Form 5: Ax - By = -C. In this video tutorial, analyze the steps in converting a linear equation in Standard Form to a linear function in Slope-Intercept Form. In this video we work with this version of the Standard Form: Ax - By = -C. |
|
Standard Form |
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Media4Math's mission is to educate 21st-century students in real-world applications of math with digital technology. We bring math to life in your classroom with a rich blend of resources to inspire your students to learn. Our philosophy is that the procedural side of math is a prerequisite to using it, but we also find that real-world math applications can provide motivation and even inspiration for math students. Math is its own language and it has important stories to tell. While many of our resources are for procedural skills, there are many resources that are real-world applications of math. Some of these resources rely on partnerships with other educational publishers.
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Google Earth. Media4Math has partnered with GoogleEarth to create a comprehensive library of GoogleEarth Voyager Stories. These map-based explorations of geometry, geography, and culture will literally bring the math to life. See our collection of Voyager Stories by clicking on this link to the Google Earth resources.
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