Use this page to find all resources aligned with a particular North Carolina state standard. Simply input the standard, using dot notation, highlight it when it shows up on the drop-down list, and press Apply. You'll see a complete list of all Media4Math resources aligned with that standard.Download your standards report as a CSV file for your reference.To help you with the dot notation, each standard follows this structure.NC.GRADE.STANDARD.BENCHMARKThe table on the right shows the abbreviations for the different standards for K-8. For example, if you are a grade 3 teacher looking for Operations and Algebraic Thinking resources, simply input in the field below "NC.3.OA" and you'll see a drop-down list of possible standards for that grade and topic. Then select the appropriate one and press the Apply button. |
|
NC Standards | Thumbnail | Title | Description | Curriculum Topic |
---|---|---|---|---|
NC.M4.AF.1.1 | Definition--Calculus Topics--Vertical Asymptote |
Definition--Calculus Topics--Vertical Asymptote
A vertical line that the graph of a function approaches but does not intersect. The equation of a vertical asymptote is x = c, for some constant c. |
Calculus Vocabulary | |
NC.M4.AF.1.1 | Definition--Calculus Topics--Zeros of a Function |
Definition--Calculus Topics--Zeros of a Function
Where the graph of a function intersects the x-axis. The solutions to the equation f(x) = 0 for some function f(x). |
Calculus Vocabulary | |
NC.M4.AF.1 | Math Definitions Collection--Calculus Concepts |
This collection aggregates all the definitions for key terms in a standards Calculus course. There are a total of 88 images. This collection of resources is made up of downloadable PNG files that you can easily incorporate into a presentation. | Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Tangent to a Curve |
Definition--Calculus Topics--Tangent to a Curve
A line that intersects a curve at a single point and is perpendicular to the curve at that point. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Trapezoidal Rule |
Definition--Calculus Topics--Trapezoidal Rule
A technique for approximating a definite integral by adding the areas of trapezoids underneath a curve. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Trig Identities |
Definition--Calculus Topics--Trig Identities
Equations that involve trigonmetric functions and are often used to simplify certain trigonometric expressions. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Trigonometric Function |
Definition--Calculus Topics--Trigonometric Function
One of six main functions, including sine, cosine, tangent, secant, cosecant, and cotangent. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Vector |
Definition--Calculus Topics--Vector
A quantity that has magnitude and direction. Vectors are often used to model real-world phenomena such as force, speed, or acceleration. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Velocity |
Definition--Calculus Topics--Velocity
The first derivative, with respect to time, for the displacement function. Velocity is a vector quantity. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Vertical Asymptote |
Definition--Calculus Topics--Vertical Asymptote
A vertical line that the graph of a function approaches but does not intersect. The equation of a vertical asymptote is x = c, for some constant c. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Zeros of a Function |
Definition--Calculus Topics--Zeros of a Function
Where the graph of a function intersects the x-axis. The solutions to the equation f(x) = 0 for some function f(x). |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Absolute Maximum |
Definition--Calculus Topics--Absolute Maximum
When a function takes an input value, a, for some value in the domain, such that f(a) ≥ f(x), for all x in the domain. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Absolute Minimum |
Definition--Calculus Topics--Absolute Minimum
When a function takes an input value, a, for some value in the domain, such that f(a) ≤ f(x), for all x in the domain. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Absolute Value Function |
Definition--Calculus Topics--Absolute Value Function
A piecewise function whose simplest form is shown below. These functions are not differentiable at their vertex. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Acceleration |
Definition--Calculus Topics--Acceleration
The second derivative, with respect to time, for the displacement function. Acceleration is a vector quantity. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Antiderivative |
Definition--Calculus Topics--Antiderivative
For two differentiable functions f(x) and F(x), if F'(x) = f(x), then F(x) is the antiderivative of f(x). |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Area Beneath a Curve |
Definition--Calculus Topics--Area Beneath a Curve
For a definite integral, it is the numerical result of the integration. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Asymptote |
Definition--Calculus Topics--Asymptote
A line that the graph of a function approaches but does not intersect. Asymptotes can be vertical, horizontal, or oblique. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Average Rates of Change |
Definition--Calculus Topics--Average Rates of Change
The ratio along an interval of a domain for a given function, comparable to calculating the slope of a line. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Ceiling Function |
Definition--Calculus Topics--Ceiling Function
A discrete function that takes real number values and whose output is the least integer value greater than the input value. The graph looks like a staircase. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Chain Rule |
Definition--Calculus Topics--Chain Rule
The process for finding the derivative of a composite function. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Change of Variables |
Definition--Calculus Topics--Change of Variables
A substitution technique where a variable replaces a more complicated expression. In calculus it can simplify differentiation or integration. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Composite Function |
Definition--Calculus Topics--Composite Function
A function whose input values are made up of another function. For two functions f(x) and g(x), a composite function can be written as f(g(x)). |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Concave Function |
Definition--Calculus Topics--Concave Function
A function whose graph curves down along an interval of the domain. The inflection point is where the first derivative is zero. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Continuous Functions |
Definition--Calculus Topics--Continuous Functions
A function is continuous if it has no gaps along the domain of the function. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Convex Function |
Definition--Calculus Topics--Convex Function
A function whose graph curves up along an interval of the domain. The inflection point is where the first derivative is zero. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Definite Integral |
Definition--Calculus Topics--Definite Integral
The integral of a function with specific limits on the endpoints. A definite integral results in a numerical value. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Delta x |
Definition--Calculus Topics--Delta x
The change in x-coordinates for a given function. Often used in the formula for finding the derivative of a function. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Delta y |
Definition--Calculus Topics--Delta y
The change in y-coordinates for a given function. Often used in the formula for finding the derivative of a function. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Derivative |
Definition--Calculus Topics--Derivative
A function used to find the slope of a tangent to a curve at a given point. The derivative is based on the following limit. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Derivative of a Composite Function |
Definition--Calculus Topics--Derivative of a Composite Function
For two functions f(x) and g(x), the derivative of the composite function f(g(x)) is f'(x)*g'(x). This is an example of the Chain Rule. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Derivative of a Linear Function |
Definition--Calculus Topics--Derivative of a Linear Function
The derivative of a linear function of the form y = mx + b is the slope of the line, m. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Derivative of a Logarithmic Function |
Definition--Calculus Topics--Derivative of a Logarithmic Function
The derivative of a logarithmic function uses the laws of logarithms and the definition of e to find the derivative. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Derivative of an Exponential Function |
Definition--Calculus Topics--Derivative of an Exponential Function
The derivative of an exponential function is the product of the function and the natural log of the base. The derivative of ex is ex. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Derivative of a Polynomial Function |
Definition--Calculus Topics--Derivative of a Polynomial Function
The derivative of a polynomial of degree n is another polynomial of degree n - 1. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Derivative of a Quadratic Function |
Definition--Calculus Topics--Derivative of a Quadratic Function
Since a quadratic function is a polynomial function of degree 2, the derivative is a linear function. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Derivative of a Rational Function |
Definition--Calculus Topics--Derivative of a Rational Function
Since a rational function is the ratio of two polynomials, the derivative of a rational function is also the ratio of two polynomials. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Derivative of a Trig Function |
Definition--Calculus Topics--Derivative of a Trig Function
The derivative of a trig function is another trig function, as shown in the table. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Derivative of the Inverse of a Trig Function |
Definition--Calculus Topics--Derivative of the Inverse of a Trig Function
Use implicit differentiation and the quotient rule to find the derivative of an inverse trig function. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Differentiable Function |
Definition--Calculus Topics--Differentiable Function
A function is differentiable if a derivative can be found at each point in its domain. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Differential Equation |
Definition--Calculus Topics--Differential Equation
An equation that includes the derivative of a function f(x) and the variable x. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Differentiation |
Definition--Calculus Topics--Differentiation
The process of finding the derivative of a function. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Discontinuous Function |
Definition--Calculus Topics--Discontinuous Function
A function is discontinuous if it has one or more gaps along the domain of the function. The left- or right-hand limits exist but are not equal. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Discrete Function |
Definition--Calculus Topics--Discrete Function
A function whose graphs has gaps. This is because the function consists of separate ordered pairs or is a discontinuous function with gaps. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Displacement Function |
Definition--Calculus Topics--Displacement Function
A distance-vs.-time function used to find the distance an object has moved from a starting point. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--End Behavior |
Definition--Calculus Topics--End Behavior
The way a function f(x) changes as x approaches infinity, whether positive or negative. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Even Function |
Definition--Calculus Topics--Even Function
A function whose graph is symmetric about the y-axis. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Explicit Function |
Definition--Calculus Topics--Explicit Function
A function in which y can be written as a function of x, where y is on the left side of the equation and all terms with x are on the right side of the equation. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Extreme Value Theorem |
Definition--Calculus Topics--Extreme Value Theorem
For function f(x) along an interval, there are maximum and minimum values. If the derivative is zero along this interval, this is an inflection point. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--First Derivative |
Definition--Calculus Topics--First Derivative
For differentiable function f(x), the first derivative is denoted as f'(x). |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Floor Function |
Definition--Calculus Topics--Floor Function
A discrete function that takes real number values and whose output is the greatest integer value greater than the input value. The graph looks like a staircase. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Fundamental Theorem of Calculus |
Definition--Calculus Topics--Fundamental Theorem of Calculus
The theorem that relates differentiation and integration. The two operations are basically inverses of each other. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Hooke's Law |
Definition--Calculus Topics--Hooke's Law
A second-order differential equation that is used to model simple harmonic motion using a trigonometric function. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Horizontal Asymptote |
Definition--Calculus Topics--Horizontal Asymptote
A horizontal line that the graph of a function approaches but does not intersect. The equation of a horizontal asymptote is y = c, for some constant c. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Implicit Differentiation |
Definition--Calculus Topics--Implicit Differentiation
When a function cannot be written in the form of y as a function of x, then implicit differentation can be used to find the derivative with respect to x. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Implicit Function |
Definition--Calculus Topics--Implicit Function
A function in which y cannot be written as a function of x, where y is on the left side of the equation and all terms with x are on the right side of the equatio |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Indefinite Integral |
Definition--Calculus Topics--Indefinite Integral
The integral of a function without a specific limit on the endpoints. The result of an indefinite integral is a differentiable function. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Inflection Point |
Definition--Calculus Topics--Inflection Point
The point on a curve where the curvature changes. This is often indicated by a change in the slopes of tangents to the curve. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Instantaneous Rate of Change |
Definition--Calculus Topics--Instantaneous Rate of Change
Another way of describing the slope of the line tangent to a given curve at a given point. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Integral |
Definition--Calculus Topics--Integral
A method for finding the area of a curve along an interval. In calculus, integrating a function f(x) involves finding the antiderivative of f(x). |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Integral Symbol |
Definition--Calculus Topics--Integral Symbol
The mathematical symbol used to denote the process of integration. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Integrand |
Definition--Calculus Topics--Integrand
In the process of integration, it is the function that is being integrated. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Integration by Substitution |
Definition--Calculus Topics--Integration by Substitution
Replacing the integrand with a simpler expression to make the process of integration easier. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Intermediate Value Theorem |
Definition--Calculus Topics--Intermediate Value Theorem
For continuous function f(x) along interval [a, b] there are values between f(a) and f(b). |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Inverse Function |
Definition--Calculus Topics--Inverse Function
For function f(x), the inverse function f-1(x), if it exists, undoes the mapping of the original function. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--L'Hopital's Rule |
Definition--Calculus Topics--L'Hopital's Rule
For function f(x)/g(x), where f(x) and g(x) are two functions, along an interval [a, b], if there is a point c in the interval such that g(x) = 0, then L'Hopital' |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Left-Hand Limit |
Definition--Calculus Topics--Left-Hand Limit
As a function f(x) approaches a specific input value a, for x-values less than or equal to a, the function may approach a specific limiting value. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Limit |
Definition--Calculus Topics--Limit
As a function f(x) approaches a specific input value a, the function may approach a specific limiting value. This limit may or may not exist. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Limits at Infinity |
Definition--Calculus Topics--Limits at Infinity
Finding the limiting value for function f(x) as the input value x approaches infinity. This limit may or may not exist. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Linear Approximation |
Definition--Calculus Topics--Linear Approximation
For differentiable function f(x), the linear approximation at x = a, for some real number a, is the equation of the line tangent to f(x) at a. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Local Maximum |
Definition--Calculus Topics--Local Maximum
When a function takes an input value, a, for some region in the domain, such that f(a) ≥ f(x), for all x in that region. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Local Minimum |
Definition--Calculus Topics--Local Minimum
When a function takes an input value, a, for some region in the domain, such that f(a) ≤ f(x), for all x in that region. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Matrix Representations of Vectors |
Definition--Calculus Topics--Matrix Representations of Vectors
A vector quantity can be represented by a matrix. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Mean Value Theorem |
Definition--Calculus Topics--Mean Value Theorem
For differentiable function f(x) along the closed interval [a, b] there is a value c within that interval such that f'(c) is parallel to the secant formed by th |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Oblique Asymptote |
Definition--Calculus Topics--Oblique Asymptote
A slanted line that the graph of a function approaches but does not intersect. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Odd Function |
Definition--Calculus Topics--Odd Function
A function whose graph has point symmetry about the origin. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--One-Sided Limits |
Definition--Calculus Topics--One-Sided Limits
Restricting the limit of a function for values approaching the limiting value from one side. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Parametric Equations |
Definition--Calculus Topics--Parametric Equations
A set of equations where each variable, x and y, is a function of a third variable, t. Graphs of parametric equations are sometimes not functions. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Piecewise Function |
Definition--Calculus Topics--Piecewise Function
A function made up of separate functions, each with its own interval. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Power Function |
Definition--Calculus Topics--Power Function
A function with a single term that consists of a variable base raised to a real number power. The variable can also have a real number coefficient. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Power Rule |
Definition--Calculus Topics--Power Rule
The process of finding the derivative of a power function. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Quotient Rule |
Definition--Calculus Topics--Quotient Rule
The rule for finding the derivative of a function made up of the ratios of two functions f(x) and g(x). |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Rational Function |
Definition--Calculus Topics--Rational Function
A function made up of the ratio of two functions f(x) and g(x). |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Riemann Sum |
Definition--Calculus Topics--Riemann Sum
An approximation method for estimating the area under a curve and used to approximate the solution to a definite integral. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Right-Hand Limit |
Definition--Calculus Topics--Right-Hand Limit
As a function f(x) approaches a specific input value a, for x-values greater than or equal to a, the function may approach a specific limiting value. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Rolle's Theorem |
Definition--Calculus Topics--Rolle's Theorem
For function f(x) along an interval [a, b], if f(a) = f(b), then there is a point along the interval where the derivative is zero. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Second Derivative |
Definition--Calculus Topics--Second Derivative
For differentiable function f(x), the second derivative is the derivative of f'(x) and denoted as f''(x). |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Separable Differential Equation |
Definition--Calculus Topics--Separable Differential Equation
A special type of differential equation in which functions f(x) and g(y) can be separated to find the solution to the equation. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Sigma Notation |
Definition--Calculus Topics--Sigma Notation
The Greek letter used for summarizing terms of a finite or infinite sequence. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Step Function |
Definition--Calculus Topics--Step Function
A discontinuous function whose graph looks like a staircase. A step function can be generated by ceiling or floor functions. |
Calculus Vocabulary | |
NC.M4.AF.1 | Definition--Calculus Topics--Sum Rule |
Definition--Calculus Topics--Sum Rule
For differentiable functions f(x) and g(x) along a given interval, the derivative of the sum f(x) + g(x) is the sum of the individual derivatives f'(x) and g'(x). |
Calculus Vocabulary | |
NC.M4.N.2.2 | Math Examples Collection: Vectors |
This collection aggregates all the math examples around the topic of Vectors. There are a total of 13 Math Examples. | Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 1 |
Math Example--Vectors--Example 1
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 2 |
Math Example--Vectors--Example 2
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 3 |
Math Example--Vectors--Example 3
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 4 |
Math Example--Vectors--Example 4
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 5 |
Math Example--Vectors--Example 5
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 6 |
Math Example--Vectors--Example 6
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 7 |
Math Example--Vectors--Example 7
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 8 |
Math Example--Vectors--Example 8
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 9 |
Math Example--Vectors--Example 9
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 10 |
Math Example--Vectors--Example 10
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 11 |
Math Example--Vectors--Example 11
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 12 |
Math Example--Vectors--Example 12
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.2 | Math Example--Vectors--Example 13 |
Math Example--Vectors--Example 13
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.1 | Math Examples Collection: Matrices |
This collection aggregates all the math examples around the topic of Matrices. There are a total of 8 Math Examples. | Numerical and Algebraic Expressions | |
NC.M4.N.2.1 | Math Examples Collection: Systems of Equations |
This collection aggregates all the math examples around the topic of Systems of Equations. There are a total of 38 Math Examples. This collection of resources is made up of downloadable PNG images that you can easily incorporate into your lesson plans. | Numerical and Algebraic Expressions and Solving Systems of Equations | |
NC.M4.N.2.1 | Math Definitions Collection--Calculus Concepts |
This collection aggregates all the definitions for key terms in a standards Calculus course. There are a total of 88 images. This collection of resources is made up of downloadable PNG files that you can easily incorporate into a presentation. | Calculus Vocabulary | |
NC.M4.N.2.1 | Math Example--Systems of Equations--Matrices--Example 1 |
Math Example--Systems of Equations--Matrices--Example 1
This is part of a collection of math examples that focus on systems of equations. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.1 | Math Example--Systems of Equations--Matrices--Example 2 |
Math Example--Systems of Equations--Matrices--Example 2
This is part of a collection of math examples that focus on systems of equations. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.1 | Math Example--Systems of Equations--Matrices--Example 3 |
Math Example--Systems of Equations--Matrices--Example 3
This is part of a collection of math examples that focus on systems of equations. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.1 | Math Example--Systems of Equations--Matrices--Example 4 |
Math Example--Systems of Equations--Matrices--Example 4
This is part of a collection of math examples that focus on systems of equations. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.1 | Math Example--Systems of Equations--Matrices--Example 5 |
Math Example--Systems of Equations--Matrices--Example 5
This is part of a collection of math examples that focus on systems of equations. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.1 | Math Example--Systems of Equations--Matrices--Example 6 |
Math Example--Systems of Equations--Matrices--Example 6
This is part of a collection of math examples that focus on systems of equations. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.1 | Math Example--Systems of Equations--Matrices--Example 7 |
Math Example--Systems of Equations--Matrices--Example 7
This is part of a collection of math examples that focus on systems of equations. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.1 | Math Example--Systems of Equations--Matrices--Example 8 |
Math Example--Systems of Equations--Matrices--Example 8
This is part of a collection of math examples that focus on systems of equations. |
Numerical and Algebraic Expressions | |
NC.M4.N.2.1 | Definition--Calculus Topics--Absolute Maximum |
Definition--Calculus Topics--Absolute Maximum
When a function takes an input value, a, for some value in the domain, such that f(a) ≥ f(x), for all x in the domain. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Absolute Minimum |
Definition--Calculus Topics--Absolute Minimum
When a function takes an input value, a, for some value in the domain, such that f(a) ≤ f(x), for all x in the domain. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Absolute Value Function |
Definition--Calculus Topics--Absolute Value Function
A piecewise function whose simplest form is shown below. These functions are not differentiable at their vertex. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Acceleration |
Definition--Calculus Topics--Acceleration
The second derivative, with respect to time, for the displacement function. Acceleration is a vector quantity. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Antiderivative |
Definition--Calculus Topics--Antiderivative
For two differentiable functions f(x) and F(x), if F'(x) = f(x), then F(x) is the antiderivative of f(x). |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Area Beneath a Curve |
Definition--Calculus Topics--Area Beneath a Curve
For a definite integral, it is the numerical result of the integration. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Asymptote |
Definition--Calculus Topics--Asymptote
A line that the graph of a function approaches but does not intersect. Asymptotes can be vertical, horizontal, or oblique. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Average Rates of Change |
Definition--Calculus Topics--Average Rates of Change
The ratio along an interval of a domain for a given function, comparable to calculating the slope of a line. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Ceiling Function |
Definition--Calculus Topics--Ceiling Function
A discrete function that takes real number values and whose output is the least integer value greater than the input value. The graph looks like a staircase. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Chain Rule |
Definition--Calculus Topics--Chain Rule
The process for finding the derivative of a composite function. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Change of Variables |
Definition--Calculus Topics--Change of Variables
A substitution technique where a variable replaces a more complicated expression. In calculus it can simplify differentiation or integration. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Composite Function |
Definition--Calculus Topics--Composite Function
A function whose input values are made up of another function. For two functions f(x) and g(x), a composite function can be written as f(g(x)). |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Concave Function |
Definition--Calculus Topics--Concave Function
A function whose graph curves down along an interval of the domain. The inflection point is where the first derivative is zero. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Continuous Functions |
Definition--Calculus Topics--Continuous Functions
A function is continuous if it has no gaps along the domain of the function. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Convex Function |
Definition--Calculus Topics--Convex Function
A function whose graph curves up along an interval of the domain. The inflection point is where the first derivative is zero. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Definite Integral |
Definition--Calculus Topics--Definite Integral
The integral of a function with specific limits on the endpoints. A definite integral results in a numerical value. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Delta x |
Definition--Calculus Topics--Delta x
The change in x-coordinates for a given function. Often used in the formula for finding the derivative of a function. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Delta y |
Definition--Calculus Topics--Delta y
The change in y-coordinates for a given function. Often used in the formula for finding the derivative of a function. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Derivative |
Definition--Calculus Topics--Derivative
A function used to find the slope of a tangent to a curve at a given point. The derivative is based on the following limit. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Derivative of a Composite Function |
Definition--Calculus Topics--Derivative of a Composite Function
For two functions f(x) and g(x), the derivative of the composite function f(g(x)) is f'(x)*g'(x). This is an example of the Chain Rule. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Derivative of a Linear Function |
Definition--Calculus Topics--Derivative of a Linear Function
The derivative of a linear function of the form y = mx + b is the slope of the line, m. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Derivative of a Logarithmic Function |
Definition--Calculus Topics--Derivative of a Logarithmic Function
The derivative of a logarithmic function uses the laws of logarithms and the definition of e to find the derivative. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Derivative of an Exponential Function |
Definition--Calculus Topics--Derivative of an Exponential Function
The derivative of an exponential function is the product of the function and the natural log of the base. The derivative of ex is ex. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Derivative of a Polynomial Function |
Definition--Calculus Topics--Derivative of a Polynomial Function
The derivative of a polynomial of degree n is another polynomial of degree n - 1. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Derivative of a Quadratic Function |
Definition--Calculus Topics--Derivative of a Quadratic Function
Since a quadratic function is a polynomial function of degree 2, the derivative is a linear function. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Derivative of a Rational Function |
Definition--Calculus Topics--Derivative of a Rational Function
Since a rational function is the ratio of two polynomials, the derivative of a rational function is also the ratio of two polynomials. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Derivative of a Trig Function |
Definition--Calculus Topics--Derivative of a Trig Function
The derivative of a trig function is another trig function, as shown in the table. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Derivative of the Inverse of a Trig Function |
Definition--Calculus Topics--Derivative of the Inverse of a Trig Function
Use implicit differentiation and the quotient rule to find the derivative of an inverse trig function. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Differentiable Function |
Definition--Calculus Topics--Differentiable Function
A function is differentiable if a derivative can be found at each point in its domain. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Differential Equation |
Definition--Calculus Topics--Differential Equation
An equation that includes the derivative of a function f(x) and the variable x. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Differentiation |
Definition--Calculus Topics--Differentiation
The process of finding the derivative of a function. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Discontinuous Function |
Definition--Calculus Topics--Discontinuous Function
A function is discontinuous if it has one or more gaps along the domain of the function. The left- or right-hand limits exist but are not equal. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Discrete Function |
Definition--Calculus Topics--Discrete Function
A function whose graphs has gaps. This is because the function consists of separate ordered pairs or is a discontinuous function with gaps. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Displacement Function |
Definition--Calculus Topics--Displacement Function
A distance-vs.-time function used to find the distance an object has moved from a starting point. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--End Behavior |
Definition--Calculus Topics--End Behavior
The way a function f(x) changes as x approaches infinity, whether positive or negative. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Even Function |
Definition--Calculus Topics--Even Function
A function whose graph is symmetric about the y-axis. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Explicit Function |
Definition--Calculus Topics--Explicit Function
A function in which y can be written as a function of x, where y is on the left side of the equation and all terms with x are on the right side of the equation. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Extreme Value Theorem |
Definition--Calculus Topics--Extreme Value Theorem
For function f(x) along an interval, there are maximum and minimum values. If the derivative is zero along this interval, this is an inflection point. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--First Derivative |
Definition--Calculus Topics--First Derivative
For differentiable function f(x), the first derivative is denoted as f'(x). |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Floor Function |
Definition--Calculus Topics--Floor Function
A discrete function that takes real number values and whose output is the greatest integer value greater than the input value. The graph looks like a staircase. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Fundamental Theorem of Calculus |
Definition--Calculus Topics--Fundamental Theorem of Calculus
The theorem that relates differentiation and integration. The two operations are basically inverses of each other. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Hooke's Law |
Definition--Calculus Topics--Hooke's Law
A second-order differential equation that is used to model simple harmonic motion using a trigonometric function. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Horizontal Asymptote |
Definition--Calculus Topics--Horizontal Asymptote
A horizontal line that the graph of a function approaches but does not intersect. The equation of a horizontal asymptote is y = c, for some constant c. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Implicit Differentiation |
Definition--Calculus Topics--Implicit Differentiation
When a function cannot be written in the form of y as a function of x, then implicit differentation can be used to find the derivative with respect to x. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Implicit Function |
Definition--Calculus Topics--Implicit Function
A function in which y cannot be written as a function of x, where y is on the left side of the equation and all terms with x are on the right side of the equatio |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Indefinite Integral |
Definition--Calculus Topics--Indefinite Integral
The integral of a function without a specific limit on the endpoints. The result of an indefinite integral is a differentiable function. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Inflection Point |
Definition--Calculus Topics--Inflection Point
The point on a curve where the curvature changes. This is often indicated by a change in the slopes of tangents to the curve. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Instantaneous Rate of Change |
Definition--Calculus Topics--Instantaneous Rate of Change
Another way of describing the slope of the line tangent to a given curve at a given point. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Integral |
Definition--Calculus Topics--Integral
A method for finding the area of a curve along an interval. In calculus, integrating a function f(x) involves finding the antiderivative of f(x). |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Integral Symbol |
Definition--Calculus Topics--Integral Symbol
The mathematical symbol used to denote the process of integration. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Integrand |
Definition--Calculus Topics--Integrand
In the process of integration, it is the function that is being integrated. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Integration by Substitution |
Definition--Calculus Topics--Integration by Substitution
Replacing the integrand with a simpler expression to make the process of integration easier. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Intermediate Value Theorem |
Definition--Calculus Topics--Intermediate Value Theorem
For continuous function f(x) along interval [a, b] there are values between f(a) and f(b). |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Inverse Function |
Definition--Calculus Topics--Inverse Function
For function f(x), the inverse function f-1(x), if it exists, undoes the mapping of the original function. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--L'Hopital's Rule |
Definition--Calculus Topics--L'Hopital's Rule
For function f(x)/g(x), where f(x) and g(x) are two functions, along an interval [a, b], if there is a point c in the interval such that g(x) = 0, then L'Hopital' |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Left-Hand Limit |
Definition--Calculus Topics--Left-Hand Limit
As a function f(x) approaches a specific input value a, for x-values less than or equal to a, the function may approach a specific limiting value. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Limit |
Definition--Calculus Topics--Limit
As a function f(x) approaches a specific input value a, the function may approach a specific limiting value. This limit may or may not exist. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Limits at Infinity |
Definition--Calculus Topics--Limits at Infinity
Finding the limiting value for function f(x) as the input value x approaches infinity. This limit may or may not exist. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Linear Approximation |
Definition--Calculus Topics--Linear Approximation
For differentiable function f(x), the linear approximation at x = a, for some real number a, is the equation of the line tangent to f(x) at a. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Local Maximum |
Definition--Calculus Topics--Local Maximum
When a function takes an input value, a, for some region in the domain, such that f(a) ≥ f(x), for all x in that region. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Local Minimum |
Definition--Calculus Topics--Local Minimum
When a function takes an input value, a, for some region in the domain, such that f(a) ≤ f(x), for all x in that region. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Matrix Representations of Vectors |
Definition--Calculus Topics--Matrix Representations of Vectors
A vector quantity can be represented by a matrix. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Mean Value Theorem |
Definition--Calculus Topics--Mean Value Theorem
For differentiable function f(x) along the closed interval [a, b] there is a value c within that interval such that f'(c) is parallel to the secant formed by th |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Oblique Asymptote |
Definition--Calculus Topics--Oblique Asymptote
A slanted line that the graph of a function approaches but does not intersect. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Odd Function |
Definition--Calculus Topics--Odd Function
A function whose graph has point symmetry about the origin. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--One-Sided Limits |
Definition--Calculus Topics--One-Sided Limits
Restricting the limit of a function for values approaching the limiting value from one side. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Parametric Equations |
Definition--Calculus Topics--Parametric Equations
A set of equations where each variable, x and y, is a function of a third variable, t. Graphs of parametric equations are sometimes not functions. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Piecewise Function |
Definition--Calculus Topics--Piecewise Function
A function made up of separate functions, each with its own interval. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Power Function |
Definition--Calculus Topics--Power Function
A function with a single term that consists of a variable base raised to a real number power. The variable can also have a real number coefficient. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Power Rule |
Definition--Calculus Topics--Power Rule
The process of finding the derivative of a power function. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Quotient Rule |
Definition--Calculus Topics--Quotient Rule
The rule for finding the derivative of a function made up of the ratios of two functions f(x) and g(x). |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Rational Function |
Definition--Calculus Topics--Rational Function
A function made up of the ratio of two functions f(x) and g(x). |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Riemann Sum |
Definition--Calculus Topics--Riemann Sum
An approximation method for estimating the area under a curve and used to approximate the solution to a definite integral. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Right-Hand Limit |
Definition--Calculus Topics--Right-Hand Limit
As a function f(x) approaches a specific input value a, for x-values greater than or equal to a, the function may approach a specific limiting value. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Rolle's Theorem |
Definition--Calculus Topics--Rolle's Theorem
For function f(x) along an interval [a, b], if f(a) = f(b), then there is a point along the interval where the derivative is zero. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Second Derivative |
Definition--Calculus Topics--Second Derivative
For differentiable function f(x), the second derivative is the derivative of f'(x) and denoted as f''(x). |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Separable Differential Equation |
Definition--Calculus Topics--Separable Differential Equation
A special type of differential equation in which functions f(x) and g(y) can be separated to find the solution to the equation. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Sigma Notation |
Definition--Calculus Topics--Sigma Notation
The Greek letter used for summarizing terms of a finite or infinite sequence. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Step Function |
Definition--Calculus Topics--Step Function
A discontinuous function whose graph looks like a staircase. A step function can be generated by ceiling or floor functions. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Sum Rule |
Definition--Calculus Topics--Sum Rule
For differentiable functions f(x) and g(x) along a given interval, the derivative of the sum f(x) + g(x) is the sum of the individual derivatives f'(x) and g'(x). |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Tangent to a Curve |
Definition--Calculus Topics--Tangent to a Curve
A line that intersects a curve at a single point and is perpendicular to the curve at that point. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Trapezoidal Rule |
Definition--Calculus Topics--Trapezoidal Rule
A technique for approximating a definite integral by adding the areas of trapezoids underneath a curve. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Trig Identities |
Definition--Calculus Topics--Trig Identities
Equations that involve trigonmetric functions and are often used to simplify certain trigonometric expressions. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Trigonometric Function |
Definition--Calculus Topics--Trigonometric Function
One of six main functions, including sine, cosine, tangent, secant, cosecant, and cotangent. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Vector |
Definition--Calculus Topics--Vector
A quantity that has magnitude and direction. Vectors are often used to model real-world phenomena such as force, speed, or acceleration. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Velocity |
Definition--Calculus Topics--Velocity
The first derivative, with respect to time, for the displacement function. Velocity is a vector quantity. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Vertical Asymptote |
Definition--Calculus Topics--Vertical Asymptote
A vertical line that the graph of a function approaches but does not intersect. The equation of a vertical asymptote is x = c, for some constant c. |
Calculus Vocabulary | |
NC.M4.N.2.1 | Definition--Calculus Topics--Zeros of a Function |
Definition--Calculus Topics--Zeros of a Function
Where the graph of a function intersects the x-axis. The solutions to the equation f(x) = 0 for some function f(x). |
Calculus Vocabulary | |
NC.M4.N.2 | Math Examples Collection: Vectors |
This collection aggregates all the math examples around the topic of Vectors. There are a total of 13 Math Examples. | Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Video Collection: Texas Instruments Tutorial Videos |
This collection aggregates all the math videos and resources in this series: Texas Instruments Tutorial Videos. There are a total of 266 resources. | Rational Expressions, Sequences, Series, Polynomial Functions and Equations, Graphs of Quadratic Functions, Quadratic Equations and Functions, Solving Systems of Equations, Trig Expressions and Identities, Probability, Geometric Constructions with Triangles, Composite Functions, Geometric Constructions with Angles and Planes, Distance Formula, Data Analysis, Slope, Special Functions, Trigonometric Functions, Graphs of Exponential and Logarithmic Functions, Radical Functions and Equations, Rational Functions and Equations, Slope-Intercept Form, Coordinate Systems, Graphs of Linear Functions, Inequalities, Matrix Operations and Midpoint Formula | |
NC.M4.N.2 | VIDEO: Ti-Nspire Mini-Tutorial, Video 88 |
VIDEO: TI-Nspire Mini-Tutorial: Matrix Addition and Multiplication (2 x 2 Matrices)
In this TI Nspire tutorialthe Calculator window is used to create 2x2 matrices to add and subtract. |
Matrix Operations | |
NC.M4.N.2 | VIDEO: Ti-Nspire Mini-Tutorial, Video 89 |
VIDEO: TI-Nspire Mini-Tutorial: Matrix Addition and Multiplication (3 x 3 Matrices)
In this TI Nspire tutorialthe Calculator window is used to create 3x3 matrices to add and subtract. |
Matrix Operations | |
NC.M4.N.2 | Definition--Matrix |
Definition--Matrix
This is part of a collection of images that cover key vocabulary on a variety of math topics. |
Applications of Linear Systems and Matrix Operations | |
NC.M4.N.2 | Math Example--Vectors--Example 1 |
Math Example--Vectors--Example 1
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Example--Vectors--Example 2 |
Math Example--Vectors--Example 2
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Example--Vectors--Example 3 |
Math Example--Vectors--Example 3
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Example--Vectors--Example 4 |
Math Example--Vectors--Example 4
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Example--Vectors--Example 5 |
Math Example--Vectors--Example 5
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Example--Vectors--Example 6 |
Math Example--Vectors--Example 6
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Example--Vectors--Example 7 |
Math Example--Vectors--Example 7
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Example--Vectors--Example 8 |
Math Example--Vectors--Example 8
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Example--Vectors--Example 9 |
Math Example--Vectors--Example 9
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Example--Vectors--Example 10 |
Math Example--Vectors--Example 10
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Example--Vectors--Example 11 |
Math Example--Vectors--Example 11
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Example--Vectors--Example 12 |
Math Example--Vectors--Example 12
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Math Example--Vectors--Example 13 |
Math Example--Vectors--Example 13
This is part of a collection of math examples that focus on vectors. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Worksheet: TI-Nspire Mini-Tutorial: Matrix addition and multiplication (2 x 2 matrices) |
Worksheet: TI-Nspire Mini-Tutorial: Matrix addition and multiplication (2 x 2 matrices)
This is part of a collection of math worksheets on the use of the TI-Nspire graphing calculator. |
Matrix Operations | |
NC.M4.N.2 | Worksheet: TI-Nspire Mini-Tutorial: Matrix addition and multiplication (3 x 3 matrices) |
Worksheet: TI-Nspire Mini-Tutorial: Matrix addition and multiplication (3 x 3 matrices)
This is part of a collection of math worksheets on the use of the TI-Nspire graphing calculator. |
Matrix Operations | |
NC.M4.N.2 | Quizlet Flash Cards: Calculating the Modulus |
Description
In this set of Quizlet flash cards test understanding of calculating the modulus of complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.2 | Video Transcript: TI-Nspire Mini-Tutorial: Matrix Addition and Multiplication (2 x 2 Matrices) |
Video Transcript: TI-Nspire Mini-Tutorial: Matrix Addition and Multiplication (2 x 2 Matrices)
This is the transcript for the TI-Nspire Mini-Tutorial entitled, Matrix Addition and Multiplication (2 x 2 Matric |
Matrix Operations | |
NC.M4.N.2 | Video Transcript: TI-Nspire Mini-Tutorial: Matrix Addition and Multiplication (3 x 3 Matrices) |
Video Transcript: TI-Nspire Mini-Tutorial: Matrix Addition and Multiplication (3 x 3 Matrices)
This is the transcript for the TI-Nspire Mini-Tutorial entitled, Matrix Addition and Multiplication (3 x 3 Matric |
Matrix Operations | |
NC.M4.N.2 | Closed Captioned Video: Matrix Addition - Multiplication 1 |
Closed Captioned Video: Matrix Addition - Multiplication 1
In this TI Nspire tutorialthe Calculator window is used to create 2x2 matrices to add and subtract. |
Matrix Operations | |
NC.M4.N.2 | Closed Captioned Video: Matrix Addition - Multiplication 2 |
Closed Captioned Video: Matrix Addition - Multiplication 2
In this TI Nspire tutorialthe Calculator window is used to create 3x3 matrices to add and subtract. |
Matrix Operations | |
NC.M4.N.1.2 | INSTRUCTIONAL RESOURCE: Tutorial: Multiplying and Dividing Complex Numbers |
INSTRUCTIONAL RESOURCE: Tutorial: Multiplying and Dividing Complex Numbers
This slide show shows several worked-out examples that show how to multiply and divide complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Examples Collection: Adding and Subtracting Complex Numbers |
This collection aggregates all the math examples around the topic of Adding and Subtracting Complex Numbers. | Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Examples Collection: Complex Coordinates |
This collection aggregates all the math examples around the topic of Complex Coordinates. There are a total of 13 Math Examples. | Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Examples Collection: Multiplying and Dividing Complex Numbers |
This collection aggregates all the math examples around the topic of Multiplying and Dividing Complex Numbers. There are a total of 12 Math Examples. | Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Examples Collection: Complex Numbers |
This collection aggregates all the math examples around the topic of Complex Numbers. There are a total of 38 images. This collection of resources is made up of downloadable PNG files that you can easily incorporate into a presentation. | Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 12 |
Math Example--Complex Numbers--Complex Coordinates--Example 12
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 13 |
Math Example--Complex Numbers--Complex Coordinates--Example 13
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 11 |
Math Example--Complex Numbers--Complex Coordinates--Example 11
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 9 |
Math Example--Complex Numbers--Complex Coordinates--Example 9
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 10 |
Math Example--Complex Numbers--Complex Coordinates--Example 10
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 8 |
Math Example--Complex Numbers--Complex Coordinates--Example 8
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 6 |
Math Example--Complex Numbers--Complex Coordinates--Example 6
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 7 |
Math Example--Complex Numbers--Complex Coordinates--Example 7
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 5 |
Math Example--Complex Numbers--Complex Coordinates--Example 5
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 3 |
Math Example--Complex Numbers--Complex Coordinates--Example 3
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 4 |
Math Example--Complex Numbers--Complex Coordinates--Example 4
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 2 |
Math Example--Complex Numbers--Complex Coordinates--Example 2
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Complex Coordinates--Example 1 |
Math Example--Complex Numbers--Complex Coordinates--Example 1
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 12 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 12
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 10 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 10
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 11 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 11
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 9 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 9
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 8 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 8
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 7 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 7
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 6 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 6
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 4 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 4
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 5 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 5
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 3 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 3
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 2 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 2
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 1 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 1
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 14 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 14
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 13 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 13
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 11 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 11
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 12 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 12
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 10 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 10
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 9 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 9
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 8 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 8
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 7 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 7
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 5 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 5
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 6 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 6
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 4 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 4
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 3 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 3
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 2 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 2
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 1 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 1
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Examples Collection: Adding and Subtracting Complex Numbers |
This collection aggregates all the math examples around the topic of Adding and Subtracting Complex Numbers. | Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Examples Collection: Complex Coordinates |
This collection aggregates all the math examples around the topic of Complex Coordinates. There are a total of 13 Math Examples. | Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Examples Collection: Multiplying and Dividing Complex Numbers |
This collection aggregates all the math examples around the topic of Multiplying and Dividing Complex Numbers. There are a total of 12 Math Examples. | Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Examples Collection: Complex Numbers |
This collection aggregates all the math examples around the topic of Complex Numbers. There are a total of 38 images. This collection of resources is made up of downloadable PNG files that you can easily incorporate into a presentation. | Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 12 |
Math Example--Complex Numbers--Complex Coordinates--Example 12
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 13 |
Math Example--Complex Numbers--Complex Coordinates--Example 13
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 11 |
Math Example--Complex Numbers--Complex Coordinates--Example 11
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 9 |
Math Example--Complex Numbers--Complex Coordinates--Example 9
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 10 |
Math Example--Complex Numbers--Complex Coordinates--Example 10
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 8 |
Math Example--Complex Numbers--Complex Coordinates--Example 8
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 6 |
Math Example--Complex Numbers--Complex Coordinates--Example 6
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 7 |
Math Example--Complex Numbers--Complex Coordinates--Example 7
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 5 |
Math Example--Complex Numbers--Complex Coordinates--Example 5
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 3 |
Math Example--Complex Numbers--Complex Coordinates--Example 3
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 4 |
Math Example--Complex Numbers--Complex Coordinates--Example 4
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 2 |
Math Example--Complex Numbers--Complex Coordinates--Example 2
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Complex Coordinates--Example 1 |
Math Example--Complex Numbers--Complex Coordinates--Example 1
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 12 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 12
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 10 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 10
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 11 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 11
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 9 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 9
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 8 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 8
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 7 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 7
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 6 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 6
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 4 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 4
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 5 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 5
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 3 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 3
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 2 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 2
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 1 |
Math Example--Complex Numbers--Multiplying and Dividing Complex Numbers--Example 1
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 14 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 14
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 13 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 13
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 11 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 11
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 12 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 12
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 10 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 10
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 9 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 9
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 8 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 8
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 7 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 7
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 5 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 5
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 6 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 6
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 4 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 4
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 3 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 3
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 2 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 2
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 1 |
Math Example--Complex Numbers--Adding and Subtracting Complex Numbers--Example 1
This is part of a collection of math examples that focus on complex numbers. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | Quizlet Flash Cards: Adding and Subtracting Complex Numbers |
Description
In this set of Quizlet flash cards test understanding of sums and differences of complex numbers. Note: The download is the teacher's guide for using Media4Math's Quizlet Flash Cards. |
Numerical and Algebraic Expressions | |
NC.M4.N.1 | INSTRUCTIONAL RESOURCE: Tutorial: Comparing Complex Numbers |
INSTRUCTIONAL RESOURCE: Tutorial: Comparing Complex Numbers
This slide show covers comparing complex numbers. |
Numerical and Algebraic Expressions | |
NC.M3.S-IC.6 | Math Video Collection: Algebra Applications Video Series: Data Analysis |
This collection aggregates all the math videos and resources in this series: Algebra Applications Video Series: Data Analysis. There are a total of 26 resources. | Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | Math Games Collection: Simulations |
This is a collection of all our math simulations. There are a total of 9 games. | Probability | |
NC.M3.S-IC.6 | Math in the News Collection: Applications of Ratios |
This is a collection of Math in the News stories that focus on the topic of Ratios, Proportions, and Percents. | Applications of Ratios, Proportions, and Percents and Proportions | |
NC.M3.S-IC.6 | Math in the News Collection: Applications of Exponential Functions |
This is a collection of Math in the News stories that focus on the topic of Exponential Functions. | Applications of Exponential and Logarithmic Functions, Applications of Linear Functions, Data Analysis and Sequences | |
NC.M3.S-IC.6 | Math in the News Collection: Applications of Data Analysis |
This is a collection of Math in the News stories that focus on the topic of Data Analysis. | Data Analysis, Data Gathering, Probability, Percents and Ratios and Rates | |
NC.M3.S-IC.6 | Math in the News Collection: Business Math |
This is a collection of issues of Math in the News that deal with business applications. | Applications of Exponential and Logarithmic Functions, Data Analysis and Volume | |
NC.M3.S-IC.6 | Halloween Math Collection |
This is a collection of Halloween-themed math clip art and other resources. There are more than 40 resources. | 3-Dimensional Figures, Applications of 3D Geometry, Numerical Expressions, Even and Odd Numbers, Ratios and Rates, Counting, Data Analysis and Divide by 1-Digit Numbers | |
NC.M3.S-IC.6 | VIDEO: Algebra Applications: Data Analysis |
VIDEO: Algebra Applications: Data Analysis
In this episode of Algebra Applications, students explore the dramatic events of 2008 related to the mortgage crisis. |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | VIDEO: Algebra Applications: Data Analysis, 1 |
VIDEO: Algebra Applications: Data Analysis, Segment 1: Introduction
In this introductory segment students learn about the mortage crisis of 2008. |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | VIDEO: Algebra Applications: Data Analysis, 2 |
VIDEO: Algebra Applications: Data Analysis, Segment 2: What Is a Mortgage?
The time value of money is at the basis of all loans. |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | VIDEO: Algebra Applications: Data Analysis, 3 |
VIDEO: Algebra Applications: Data Analysis, Segment 3: What Is a What is a Subprime Mortgage?
Having learned the general features of a mortgage, students learn the specifics of a subprime mortgage. |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | VIDEO: Algebra Applications: Data Analysis, 4 |
VIDEO: Algebra Applications: Data Analysis, Segment 4: What is an Adjustable Rate Mortgage?
Another factor in the mortgage crisis was the use of adjustable rate mortgages. |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | VIDEO: Algebra Nspirations: Data Analysis and Probability |
VIDEO: Algebra Nspirations: Data Analysis and Probability
What are the two meanings of statistics? What does it really mean that an event has a 50% probability of occurring? |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | VIDEO: Algebra Nspirations: Data Analysis and Probability, 1 |
VIDEO: Algebra Nspirations: Data Analysis and Probability, Segment 1
What are the two meanings of statistics? What does it really mean that an event has a 50% probability of occurring? |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | VIDEO: Algebra Nspirations: Data Analysis and Probability, 2 |
VIDEO: Algebra Nspirations: Data Analysis and Probability, Segment 2
What are the two meanings of statistics? What does it really mean that an event has a 50% probability of occurring? |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | VIDEO: Algebra Nspirations: Data Analysis and Probability, 3 |
VIDEO: Algebra Nspirations: Data Analysis and Probability, Segment 3
What are the two meanings of statistics? What does it really mean that an event has a 50% probability of occurring? |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | VIDEO: Algebra Nspirations: Data Analysis and Probability, 4 |
VIDEO: Algebra Nspirations: Data Analysis and Probability, Segment 4
What are the two meanings of statistics? What does it really mean that an event has a 50% probability of occurring? |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | Math in the News: Issue 3--The 2008 Mortgage Crisis |
Math in the News: Issue 3--The 2008 Mortgage Crisis
March 2011. In this issue we look at the continuing housing crisis that began in 2008. We use a spreadsheet to calculate mortgage payments. |
Applications of Exponential and Logarithmic Functions | |
NC.M3.S-IC.6 | Math in the News: Issue 4--The Cost of Gasoline |
Math in the News: Issue 4--The Cost of Gasoline
4/11/11. In this issue we look at the high price of gasoline and investigate whether a hybrid car makes more economic sense. |
Data Analysis and Ratios and Rates | |
NC.M3.S-IC.6 | Math in the News: Issue 5--Tax Day |
Math in the News: Issue 5--Tax Day
4/18/11. In this issue we look at income taxes. We analyze who pays what proportion of income taxes based on income level. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 6--The BP Oil Spill, a Year Later |
Math in the News: Issue 6--The BP Oil Spill, a Year Later
4/25/11. In this issue we discuss the BP oil spill one year after the spill. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 7--Texas Wildfires |
Math in the News: Issue 7--Texas Wildfires
5/2/11. In this issue we explore the wildfires in Texas. In particular, we conduct random walk simulations as a tool for predicting the path of a wildfire. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 8--Tornado Damage |
Math in the News: Issue 8--Tornado Damage
5/9/11. In this issue we look at tornado season. In particular we study why the swirling winds of a tornado are so damaging. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 11--Taxing Tobacco |
Math in the News: Issue 11--Taxing Tobacco
5/30/11. In this issue we look at the subject of taxation of tobacco products. Many states are using such taxes to meet budget shortfalls. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 14--Will There Be an NFL Strike? |
Math in the News: Issue 14--Will There Be an NFL Strike?
6/20/11. In this issue we look at the possibility of an NFL strike and what the issues are that keep players and owners from coming to agreement. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 16--Blockbuster Math |
Math in the News: Issue 16--Blockbuster Math
7/4/11. In this issue we look at box office receipts for blockbuster movies as well as flops. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 17--Lone Star Employer |
Math in the News: Issue 17--Lone Star Employer
7/11/11. In this issue we look at the underlying factors that make Texas such a powerhouse for employment. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 19--Mr. 3000 |
Math in the News: Issue 19--Mr. 3000
7/25/11. In this issue we look at the elite group of baseball players that have hit 3000 or more hits in their careers. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 20--Heat Wave! |
Math in the News: Issue 20--Heat Wave!
8/1/11. In this issue we look at the physics of air pressure and the forces that give rise to heat waves. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 21--Why Does Washington Spend So Much? |
Math in the News: Issue 21--Why Does Washington Spend So Much?
8/8/11. In this issue we look at federal spending and the growth of such spending. |
Data Analysis and Percents | |
NC.M3.S-IC.6 | Math in the News: Issue 22--Football Is On! |
Math in the News: Issue 22--Football Is On!
8/15/11. In this issue we look at the specifics of the new NFL collective bargaining agreement. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 23--How the Government Borrows Money |
Math in the News: Issue 23--How the Government Borrows Money
8/22/11. In this issue we look at the way in which the U.S. government borrows money. This involves an exploration of Treasury bonds and notes. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 24--A Wild, Random Ride on a Hurricane |
Math in the News: Issue 24--A Wild, Random Ride on a Hurricane
8/29/11. In this issue we look at random path of a hurricane by developing a simulation for tracking the path of a hurricane. |
Data Analysis, Data Gathering and Probability | |
NC.M3.S-IC.6 | Math in the News: Issue 25--E-Mail |
Math in the News: Issue 25--Did E-Mail Doom the Postal Service?
9/5/11. In this issue we look at the financial state of the U.S. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 28--Will the Euro Survive? |
Math in the News: Issue 28--Will the Euro Survive?
9/26/11. In this issue we look at the state of the euro and the economies in the Eurozone. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 30--An Improbable Collapse! |
Math in the News: Issue 30--An Improbable Collapse!
10/10/11. In this issue we look at the Boston Red Sox and their improbable collapse in September. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 32--A Man for All Seasons |
Math in the News: Issue 32--A Man for All Seasons
10/24/11. In this issue we pay tribute to the life and times of Steve Jobs. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 33--TV Winners and Losers |
Math in the News: Issue 33--TV Winners and Losers
10/31/11. In this issue we look at TV ratings for the Fall 2011 lineup. Why do some series succeed and others fail after a few episodes? |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 36--Will There Be an NBA Season? |
Math in the News: Issue 36--Will There Be an NBA Season?
11/21/11. In this issue we look at the NBA labor dispute. Why is this labor dispute so different from the one for the NFL? |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 40--Will Netflix Bounce Back? |
Math in the News: Issue 40--Will Netflix Bounce Back?
12/19/11. In this issue we look at the steep drop in the price of NetFlix’s stock. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 41--2012: The Facebook Year |
Math in the News: Issue 41--2012: The Facebook Year
January 2012. In this issue of Math in the News we look at the Facebook IPO. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 43--A Hollywood Decline? |
Math in the News: Issue 43--A Hollywood Decline?
January 2012. In this issue of Math in the News, we look at box office data from 2011. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 45--Super Bowl Stats |
Math in the News: Issue 45--Super Bowl Stats
February 2012. In this issue of Math in the News we look at stats from Super Bowls past. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 46--The Unemployment Rate |
Math in the News: Issue 46--The Unemployment Rate
February 2012. In this issue we look at unemployment statistics from the Bureau of Labor Statistics. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 47--The Rising Price of Gasoline |
Math in the News: Issue 47--The Rising Price of Gasoline
February 2012. In this issue of Math in the News, we analyze data on the price of gasoline. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 48--How Good Is Jeremy Lin? |
Math in the News: Issue 48--How Good Is Jeremy Lin?
February 2012. In this issue of Math in the News, we look at basketball statistics, in particular the stats for Jeremy Lin. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 50--March Madness Made Rational |
Math in the News: Issue 50--March Madness Made Rational
March 2012. In this issue we look at March Madness mathematically. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 51--Peyton Manning |
Math in the News: Issue 51--Is Peyton Manning a Good Investment?
March 2012. In this issue of Math in the News we look at Peyton Manning's new contract with the Denver Broncos. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 52--The iPhone |
Math in the News: Issue 52--Did the iPhone Doom the Blackberry?
April 2012. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 58--Unemployment |
Math in the News: Issue 58--Unemployment
May 2012. In this issue of Math in the News we look at unemployment statistics and compare the U3 and U6 stats. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 59--The Butterfly Migration |
Math in the News: Issue 59--The Butterfly Migration
September 2012. In this issue of Math in the News we look at the great Monarch butterfly migration. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 60--Unemployment |
Math in the News: Issue 60--Unemployment
September 2012. In this issue we look at August 2012 unemployment statistics. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 61--The Butterfly Migration Update |
Math in the News: Issue 61--The Butterfly Migration Update
September 2012. In this issue of Math in the News we look at the Monarch Butterfly Migration with new data since our last investigation of it. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 62--The Washington Nationals |
Math in the News: Issue 62--The Washington Nationals
September 2012. In this issue of Math in the News we look at the remarkable success of the Washington Nationals baseball team. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 63--Columbus's Voyages |
Math in the News: Issue 63--Columbus's Voyages
October 2012. In this issue of Math in the News we look at Columbus' voyages. We make some calculations based on map data. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 65--Tracking Hurricane Sandy |
Math in the News: Issue 65--Tracking Hurricane Sandy
October 2012. In this issue of Math in the News, we look at probability maps that predict landfall and storm surge for Hurricane Sandy. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 66--Data Analysis, Halloween Style |
Math in the News: Issue 66--Data Analysis, Halloween Style
October 2012. In this issue of Math in the News, we look at Halloween-related data. In particular, we look at statistics related to pumpkins. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 67--Election Results |
Math in the News: Issue 67--Election Results
November 2012. In this issue of Math in the News, we look at statistics for the recent Presidential election. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 68--Flu Season |
Math in the News: Issue 68--Flu Season
February 2013. In this issue of Math in the News, we look at statistics for the flu season. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 69--The Russian Meteorite |
Math in the News: Issue 69--The Russian Meteorite
February 2013. In this issue of Math in the News we look at statistics related to Russian meteor that recently crash-landed. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 74--Are You Driving Less? |
Math in the News: Issue 74--Are You Driving Less?
August 2013. In this issue we look at the University of Michigan Study on American driving habts. The results show that Americans are driving less. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 75--A Swim for the Ages |
Math in the News: Issue 75--A Swim for the Ages
August 2013. In this issue we look at Diana Nyad's remarkable swim from Cuba to Florida. It becomes an opportunity to explore Average Speed. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 79--The End of an Era? |
Math in the News: Issue 79--The End of an Era?
September 2013. In this issue we take a second look at Blackberry's financial woes. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 80--A Season for the Ages |
Math in the News: Issue 80--A Season for the Ages
October 2013. In this issue we follow Peyton Manning's extraordinary season with the Denver Broncos. This is a follow-up from Issue 51. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 81--The Growth of America |
Math in the News: Issue 81--The Growth of America
October 2013. In this issue we look at how America has grown from its formation as a country. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 82--Halloween Stats |
Math in the News: Issue 82--Halloween Stats
October 2013. In this issue we look at statistics related to Halloween 2013. We explore how the economy is affecting holiday spending. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 83--Super Typhoon Haiyan |
Math in the News: Issue 83--Super Typhoon Haiyan
November 2013. In this issue of Math in the News we look at Typhoon Haiyan to learn to distinguish between typhoons and hurricanes. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 85--2013 Movies: A Year in Review |
Math in the News: Issue 85--2013 Movies: A Year in Review
January 2014. In this issue of Math in the News we look at box office data from 2013. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 86--The Rise of the Chinese Yuan |
Math in the News: Issue 86--The Rise of the Chinese Yuan
January 2014. In this issue of Math in the News we look at the foreign exchange market and the rise of the Chinese Yuan. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 89--Who Will Win Super Bowl XLVIII? |
Math in the News: Issue 89--Who Will Win Super Bowl XLVIII?
January 2014. In this issue of Math in the News we look at football statistics to examine who stands the best chance of winning Super Bowl XLVIII. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 90--America's Candy Crush |
Math in the News: Issue 90--America's Candy Crush
February 2014. In this issue of Math in the News we look at economic data around Valentine's Day purchases. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 93--Saving for College |
Math in the News: Issue 93--Saving for College
February 2014. In this issue of Math in the News we look at the investment strategy known as Dollar Cost Averaging. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 94--Florida's Orange Crop |
Math in the News: Issue 94--Winter's Impact on Florida's Orange Crop
March 2014. In this issue of Math in the News we look at the impact of a harsh winter on Florida's orange crop. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 95--The Iditarod Race |
Math in the News: Issue 95--The Iditarod Race
March 2014. In this issue of Math in the News we look at the Iditarod Race in Alaska. This gives us an opportunity to analyze data on average speed. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 100--Late Night TV Ratings |
Math in the News: Issue 100--Late Night TV Ratings
July 2014. In this issue of Math in the News we look at the mathematics of the Nielsen Ratings. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 103--Gas Prices |
Math in the News: Issue 103--Gas Prices: Why Are They Decreasing?
December 2014. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 104--The Decline of Radio Shack |
Math in the News: Issue 104--The Decline of Radio Shack
December 2014. In this issue of Math in the News we analyze the reasons why Radio Shack has struggled as a business. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 105--Movie Statistics: 2014 |
Math in the News: Issue 105--Movie Statistics: 2014
January 2015. In this issue of Math in the News we review box office statistics for the previous year. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 106--A Box Office Monster! |
Math in the News: Issue 106--A Box Office Monster!
July 2015. In this issue of Math in the News we analyze the amazing box office success of the recently released Jurassic World. |
Applications of Linear Functions, Standard Form and Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 109--Was Ali the Greatest? |
Math in the News: Issue 109--Was Ali the Greatest?
July 2016. In this issue of Math in the News we look at Muhammad Ali's boxing record and compare his record to other boxers. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 110--Summer Travel |
Math in the News: Issue 110--Summer Travel
August 2016. In this issue of Math in the News calculate average speed to various vacation destinations when traveling by car. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 111--Summer Blockbusters |
Math in the News: Issue 111--Summer Blockbusters
August 2016. In this issue of Math in the News, look at real world box office data to analyze what makes a movie a blockbuster. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 112--Back-to-School Purchases |
Math in the News: Issue 112--Back-to-School Purchases
September 2016. In this issue of Math in the News, we look at back-to-school purchases and the impact that different tax rates have on the total cost. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 113--Olympic Power |
Math in the News: Issue 113--Olympic Power
November 2016. In this issue of Math in the News, we look at the history of the Olympics. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 114--Thanksgiving Dinner |
Math in the News: Issue 114--Thanksgiving Dinner Grocery Shopping
November 2016. |
Data Analysis | |
NC.M3.S-IC.6 | Video Transcript: Algebra Applications: Data Analysis |
Video Transcript: Algebra Applications: Data Analysis
This is the transcript for the video of same title. |
Data Analysis | |
NC.M3.S-IC.6 | Video Transcript: Algebra Applications: Data Analysis, Segment 1: Introduction |
Video Transcript: Algebra Applications: Data Analysis, Segment 1: Introduction
This is the transcript for the video of same title. |
Data Analysis | |
NC.M3.S-IC.6 | Video Transcript: Algebra Applications: Data Analysis, Segment 2: What Is a Mortgage? |
Video Transcript: Algebra Applications: Data Analysis, Segment 2: What Is a Mortgage?
This is the transcript for the video of same title. Video contents: The time value of money is at the basis of all loans. |
Data Analysis | |
NC.M3.S-IC.6 | Video Transcript: Algebra Applications: Data Analysis, Segment 3: What is a Subprime Mortgage? |
Video Transcript: Algebra Applications: Data Analysis, Segment 3: What is a Subprime Mortgage?
This is the transcript for the video of same title. |
Data Analysis | |
NC.M3.S-IC.6 | Video Transcript: Algebra Applications: Data Analysis, Segment 4: What is an Adjustable Rate Mortgage? |
Video Transcript: Algebra Applications: Data Analysis, Segment 4: What is an Adjustable Rate Mortgage?
This is the transcript for the video of same title. |
Data Analysis | |
NC.M3.S-IC.6 | Video Transcript: Algebra Nspirations: Data Analysis and Probability |
Video Transcript: Algebra Nspirations: Data Analysis and Probability
This is the transcript for the video of same title. Video contents: What are the two meanings of statistics? |
Data Analysis | |
NC.M3.S-IC.6 | Video Transcript: Algebra Nspirations: Data Analysis and Probability, 1 |
Video Transcript: Algebra Nspirations: Data Analysis and Probability, Part 1
This is the transcript for the video of same title. |
Data Analysis | |
NC.M3.S-IC.6 | Video Transcript: Algebra Nspirations: Data Analysis and Probability, 2 |
Video Transcript: Algebra Nspirations: Data Analysis and Probability, Part 2
This is the transcript for the video of same title. |
Data Analysis | |
NC.M3.S-IC.6 | Math Simulation: Probability: Card Shuffle |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Card Shuffle 2 |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Card Shuffle 3 |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Card Shuffle 3 (Mobile) |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.6 | Math in the News: Issue 116: The 2021 Olympics |
Math in the News: Issue 116: The 2021 Olympics
August 2021. In this issue of Math in the News we look at various charts and statistics about the Tokyo Olympics. |
Data Analysis | |
NC.M3.S-IC.6 | Math Simulation: Probability: Tossing Two Coins |
Math Simulation: Probability: Tossing Two Coins
Use this Math Simulation to have students conduct probability experiments. In this Simulation two coins are tossed. |
Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Tossing One Coin |
Math Simulation: Probability: Tossing One Coin
Use this Math Simulation to have students conduct probability experiments. In this Simulation one coin is tossed. |
Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Tossing Three Coins |
Math Simulation: Probability: Tossing Three Coins
Use this Math Simulation to have students conduct probability experiments. In this Simulation three coins are tossed. |
Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Rolling One Die |
Math Simulation: Probability: Rolling One Die
Use this Math Simulation to have students conduct probability experiments. In this Simulation one die is rolled. |
Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Rolling Two Dice |
Math Simulation: Probability: Rolling Two Dice
Use this Math Simulation to have students conduct probability experiments. In this Simulation two dice are rolled. |
Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Rolling One Number Cube |
Math Simulation: Probability: Rolling One Number Cube
Use this Math Simulation to have students conduct probability experiments. In this Simulation one number cube is rolled. |
Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Rolling Two Number Cubes |
Math Simulation: Probability: Rolling Two Number Cubes
Use this Math Simulation to have students conduct probability experiments. In this Simulation two number cubes are rolled. |
Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Spinners--Halves |
Math Simulation: Probability: Spinners--Halves
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 2-section Spinner is used. |
Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Spinners--Thirds |
Math Simulation: Probability: Spinners--Thirds
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 3-section Spinner is used. |
Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Spinners--Fourths |
Math Simulation: Probability: Spinners--Fourths
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 4-section Spinner is used. |
Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Spinners--Fifths |
Math Simulation: Probability: Spinners--Fifths
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 5-section Spinner is used. |
Probability | |
NC.M3.S-IC.6 | Math Simulation: Probability: Spinners--Sixths |
Math Simulation: Probability: Spinners--Sixths
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 6-section Spinner is used. |
Probability | |
NC.M3.S-IC.6 | Closed Captioned Video: Algebra Applications: Data Analysis, 4 |
Closed Captioned Video: Algebra Applications: Data Analysis, Segment 4: What is an Adjustable Rate Mortgage?
Another factor in the mortgage crisis was the use of adjustable rate mortgages. |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | Closed Captioned Video: Algebra Applications: Data Analysis, 3 |
Closed Captioned Video: Algebra Applications: Data Analysis, Segment 3: What Is a What is a Subprime Mortgage?
Having learned the general features of a mortgage, students learn the specifics of a subprime mor |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | Closed Captioned Video: Algebra Applications: Data Analysis, 2 |
Closed Captioned Video: Algebra Applications: Data Analysis, Segment 2: What Is a Mortgage?
The time value of money is at the basis of all loans. |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | Closed Captioned Video: Algebra Applications: Data Analysis, 1 |
Closed Captioned Video: Algebra Applications: Data Analysis, Segment 1: Introduction
In this introductory segment students learn about the mortage crisis of 2008. |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | Closed Captioned Video: Algebra Applications: Data Analysis |
Closed Captioned Video: Algebra Applications: Data Analysis
In this episode of Algebra Applications, students explore the dramatic events of 2008 related to the mortgage crisis. |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | Closed Captioned Video: Algebra Nspirations: Data Analysis and Probability, 3 |
Closed Captioned Video: Algebra Nspirations: Data Analysis and Probability, Segment 3
In this Investigation we look at real-world data involving endangered wolf populations. |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | Closed Captioned Video: Algebra Nspirations: Data Analysis and Probability, 1 |
Closed Captioned Video: Algebra Nspirations: Data Analysis and Probability, Segment 1
In this Investigation we explore uncertainty and randomness. |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | Closed Captioned Video: Algebra Nspirations: Data Analysis and Probability |
Closed Captioned Video: Algebra Nspirations: Data Analysis and Probability
What are the two meanings of statistics? What does it really mean that an event has a 50% probability of occurring? |
Data Analysis and Data Gathering | |
NC.M3.S-IC.6 | Math in the News: Issue 117--Box Office Hits and Misses |
Math in the News: Issue 117 | Box Office Hits and Misses
December 2022. In this issue of Math in the News we look at box office hits and misses from Disney. |
Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 120--Will Avatar Repeat? |
Math in the News: Issue 120 | Will Avatar Repeat?
December 2022. In this issue of Math in the News we look at box office data for he new Avatar sequel. Will it have the same success? |
Data Gathering and Data Analysis | |
NC.M3.S-IC.6 | Math in the News: Issue 121--NFL Concussion Statistics |
Math in the News: Issue 121 | NFL Concussion Statistics
February 2023. In this issue of Math in the News we look at NFL statistics for the number of concussions. |
Applications of Ratios, Proportions, and Percents | |
NC.M3.S-IC.5 | Math Games Collection: Simulations |
This is a collection of all our math simulations. There are a total of 9 games. | Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Card Shuffle |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Card Shuffle 2 |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Card Shuffle 3 |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Card Shuffle 3 (Mobile) |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Tossing Two Coins |
Math Simulation: Probability: Tossing Two Coins
Use this Math Simulation to have students conduct probability experiments. In this Simulation two coins are tossed. |
Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Tossing One Coin |
Math Simulation: Probability: Tossing One Coin
Use this Math Simulation to have students conduct probability experiments. In this Simulation one coin is tossed. |
Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Tossing Three Coins |
Math Simulation: Probability: Tossing Three Coins
Use this Math Simulation to have students conduct probability experiments. In this Simulation three coins are tossed. |
Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Rolling One Die |
Math Simulation: Probability: Rolling One Die
Use this Math Simulation to have students conduct probability experiments. In this Simulation one die is rolled. |
Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Rolling Two Dice |
Math Simulation: Probability: Rolling Two Dice
Use this Math Simulation to have students conduct probability experiments. In this Simulation two dice are rolled. |
Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Rolling One Number Cube |
Math Simulation: Probability: Rolling One Number Cube
Use this Math Simulation to have students conduct probability experiments. In this Simulation one number cube is rolled. |
Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Rolling Two Number Cubes |
Math Simulation: Probability: Rolling Two Number Cubes
Use this Math Simulation to have students conduct probability experiments. In this Simulation two number cubes are rolled. |
Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Spinners--Halves |
Math Simulation: Probability: Spinners--Halves
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 2-section Spinner is used. |
Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Spinners--Thirds |
Math Simulation: Probability: Spinners--Thirds
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 3-section Spinner is used. |
Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Spinners--Fourths |
Math Simulation: Probability: Spinners--Fourths
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 4-section Spinner is used. |
Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Spinners--Fifths |
Math Simulation: Probability: Spinners--Fifths
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 5-section Spinner is used. |
Probability | |
NC.M3.S-IC.5 | Math Simulation: Probability: Spinners--Sixths |
Math Simulation: Probability: Spinners--Sixths
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 6-section Spinner is used. |
Probability | |
NC.M3.S-IC.4 | Math Games Collection: Simulations |
This is a collection of all our math simulations. There are a total of 9 games. | Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Tossing Two Coins |
Math Simulation: Probability: Tossing Two Coins
Use this Math Simulation to have students conduct probability experiments. In this Simulation two coins are tossed. |
Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Tossing One Coin |
Math Simulation: Probability: Tossing One Coin
Use this Math Simulation to have students conduct probability experiments. In this Simulation one coin is tossed. |
Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Tossing Three Coins |
Math Simulation: Probability: Tossing Three Coins
Use this Math Simulation to have students conduct probability experiments. In this Simulation three coins are tossed. |
Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Rolling One Die |
Math Simulation: Probability: Rolling One Die
Use this Math Simulation to have students conduct probability experiments. In this Simulation one die is rolled. |
Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Rolling Two Dice |
Math Simulation: Probability: Rolling Two Dice
Use this Math Simulation to have students conduct probability experiments. In this Simulation two dice are rolled. |
Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Rolling One Number Cube |
Math Simulation: Probability: Rolling One Number Cube
Use this Math Simulation to have students conduct probability experiments. In this Simulation one number cube is rolled. |
Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Rolling Two Number Cubes |
Math Simulation: Probability: Rolling Two Number Cubes
Use this Math Simulation to have students conduct probability experiments. In this Simulation two number cubes are rolled. |
Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Spinners--Halves |
Math Simulation: Probability: Spinners--Halves
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 2-section Spinner is used. |
Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Spinners--Thirds |
Math Simulation: Probability: Spinners--Thirds
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 3-section Spinner is used. |
Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Spinners--Fourths |
Math Simulation: Probability: Spinners--Fourths
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 4-section Spinner is used. |
Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Spinners--Fifths |
Math Simulation: Probability: Spinners--Fifths
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 5-section Spinner is used. |
Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Spinners--Sixths |
Math Simulation: Probability: Spinners--Sixths
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 6-section Spinner is used. |
Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Card Shuffle |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Card Shuffle 2 |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Card Shuffle 3 |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.4 | Math Simulation: Probability: Card Shuffle 3 (Mobile) |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.3 | Math Games Collection: Simulations |
This is a collection of all our math simulations. There are a total of 9 games. | Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Card Shuffle |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Card Shuffle 2 |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Card Shuffle 3 |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Card Shuffle 3 (Mobile) |
Math Simulation: Probability: Card Shuffle | Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Tossing Two Coins |
Math Simulation: Probability: Tossing Two Coins
Use this Math Simulation to have students conduct probability experiments. In this Simulation two coins are tossed. |
Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Tossing One Coin |
Math Simulation: Probability: Tossing One Coin
Use this Math Simulation to have students conduct probability experiments. In this Simulation one coin is tossed. |
Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Tossing Three Coins |
Math Simulation: Probability: Tossing Three Coins
Use this Math Simulation to have students conduct probability experiments. In this Simulation three coins are tossed. |
Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Rolling One Die |
Math Simulation: Probability: Rolling One Die
Use this Math Simulation to have students conduct probability experiments. In this Simulation one die is rolled. |
Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Rolling Two Dice |
Math Simulation: Probability: Rolling Two Dice
Use this Math Simulation to have students conduct probability experiments. In this Simulation two dice are rolled. |
Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Rolling One Number Cube |
Math Simulation: Probability: Rolling One Number Cube
Use this Math Simulation to have students conduct probability experiments. In this Simulation one number cube is rolled. |
Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Rolling Two Number Cubes |
Math Simulation: Probability: Rolling Two Number Cubes
Use this Math Simulation to have students conduct probability experiments. In this Simulation two number cubes are rolled. |
Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Spinners--Halves |
Math Simulation: Probability: Spinners--Halves
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 2-section Spinner is used. |
Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Spinners--Thirds |
Math Simulation: Probability: Spinners--Thirds
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 3-section Spinner is used. |
Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Spinners--Fourths |
Math Simulation: Probability: Spinners--Fourths
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 4-section Spinner is used. |
Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Spinners--Fifths |
Math Simulation: Probability: Spinners--Fifths
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 5-section Spinner is used. |
Probability | |
NC.M3.S-IC.3 | Math Simulation: Probability: Spinners--Sixths |
Math Simulation: Probability: Spinners--Sixths
Use this Math Simulation to have students conduct probability experiments. In this Simulation a 6-section Spinner is used. |
Probability | |
NC.M3.S-IC1 | Math Worksheet Collection: Data Analysis |
This collection aggregates all the math worksheets around the topic of Data Analysis. There are a total of 9 worksheets. | Data Analysis | |
NC.M3.S-IC1 | Math Clip Art Collection: Statistics |
This collection aggregates all the math clip art around the topic of Statistics. There are a total of 55 images. | Data Analysis, Probability, Data Gathering and Counting | |
NC.M3.S-IC1 | Math Clip Art--Statistics and Probability-- Inferences and Sample Size--9 |
Math Clip Art--Statistics and Probability-- Inferences and Sample Size--9
This is part of a collection of math clip art images that show different statistical graphs and concepts, along with some probability |
Data Gathering | |
NC.M3.S-IC1 | Math Clip Art--Statistics and Probability-- Inferences and Sample Size--10 |
Math Clip Art--Statistics and Probability-- Inferences and Sample Size--10
This is part of a collection of math clip art images that show different statistical graphs and concepts, along with some probability |
Data Gathering | |
NC.M3.S-IC1 | Math Clip Art--Statistics and Probability-- Inferences and Sample Size--11 |
Math Clip Art--Statistics and Probability-- Inferences and Sample Size--11
This is part of a collection of math clip art images that show different statistical graphs and concepts, along with some probability |
Data Gathering | |
NC.M3.S-IC1 | Math Clip Art--Statistics and Probability-- Inferences and Sample Size--12 |
Math Clip Art--Statistics and Probability-- Inferences and Sample Size--12
This is part of a collection of math clip art images that show different statistical graphs and concepts, along with some probability |
Data Gathering | |
NC.M3.S-IC1 | Worksheet: Probability Experiment, Worksheet 1 |
Worksheet: Probability Experiment, Worksheet 1
This is part of a collection of math worksheets on the topic of probability simulations. |
Data Analysis | |
NC.M3.S-IC1 | Worksheet: Probability Experiment, Worksheet 2 |
Worksheet: Probability Experiment, Worksheet 2
This is part of a collection of math worksheets on the topic of probability simulations. |
Data Analysis | |
NC.M3.S-IC1 | Worksheet: Probability Experiment, Worksheet 3 |
Worksheet: Probability Experiment, Worksheet 3
This is part of a collection of math worksheets on the topic of probability simulations. |
Data Analysis | |
NC.M3.S-IC1 | Worksheet: Probability Experiment, Worksheet 4 |
Worksheet: Probability Experiment, Worksheet 4
This is part of a collection of math worksheets on the topic of probability simulations. |
Data Analysis |