Matching quadratics equations with pictures!
Students will submit equations in vertex form that will match the roller coaster using activity center. They will also find the intersection point of two roller coasters.https://education.ti.com/en/activity/detail/matching-quadratics-equations-with-pictures
Linear Inequalities
Students are provided a handful of ordered pairs, and determine which are solutions to a given linear inequality. As a class, students plots their points, and work to develop ideas for graphing.https://education.ti.com/en/activity/detail/linear-inequalities_1
Function Notation
This StudyCards™ stack teaches the meaning of the notation f(x). Cards also address finding, for example, f(2) given f(x), and the connection to the point on the graph of f(x). Use with Foundations for College Mathematics, Ch. 3.1.https://education.ti.com/en/activity/detail/function-notation
What's in a Name? Explorations in the Coordinate Plane from Manipulative to Graphing Calculator
Students will plot points in a coordinate plane and reflect those points across the axes using a MIRA and then using the graphing calculator STAT, STAT PLOT, and GRAPH menus graph the image on the graphing calculator screen.https://education.ti.com/en/activity/detail/whats-in-a-name--explorations-in-the-coordinate-plane-from-manipulative-to-graphing-calculator
Where’s the Point?
This activity can be used to introduce students to the Cartesian plane. They should have some familiarity with how points are located in the plane using two coordinates, but the emphasis in this activity is solidifying students' understanding of just how that is done. As configured, the activity ...https://education.ti.com/en/activity/detail/wheres-the-point
Inequality Graphing App
Students explore inequalities by entering inequalities using symbols, plot their graphs (including union and intersection shades), store (x, y) coordinate pairs as lists, enter inequalities with vertical lines in an X= editor, and trace points of interest (such as intersections) between functions.https://education.ti.com/en/activity/detail/inequality-graphing-app
Introducing the Absolute Value Function
Students will examine data by comparing individual data points to the mean by finding the difference (positive or negative) and the distance from the mean.https://education.ti.com/en/activity/detail/introducing-the-absolute-value-function
Solve Log Equation
This StudyCards™ set begins with "what is an equation?" and continues by developing the connection between points on the graph of the related function and a solution to an equation. Use with Foundations for College Mathematics, ch. 13-3.https://education.ti.com/en/activity/detail/solve-log-equation
Solve Rational Equation
This StudyCards™ set begins with "what is an equation?" and continues with developing the connection between points on the graph of the related function and a solution to an equation. Use with Foundations for College Mathematics, ch. 7-5.https://education.ti.com/en/activity/detail/solve-rational-equation
Helping Students Understand Line of Best Fit
This activity is based on a lesson out of the Key Curriculum Press textbook "Discovering Algebra with Technology." Students use five number summaries to find specific points on the graph which can be used to find the equation for a line of best fit. Teachers can then use the TI-Navigator System...https://education.ti.com/en/activity/detail/helping-students-understand-line-of-best-fit
Design Curves
Students plot points then use regression lines to design a vehicle.https://education.ti.com/en/activity/detail/design-curves
Determine Equation of Absolute Value Function Given 3 Noncollinear Points
Given 3-noncollinear points, find the absolute value that contains all 3 points.https://education.ti.com/en/activity/detail/determine-equation-of-absolute-value-function-given-3-noncollinear-points
Exploring the Parabola and its Equation Part 1 and @
Starting with y=x^2 going all the way to (in part 2)y=ax^2+bx+c, how do changes in the quadratic equation/function change the appearance of the parabola.https://education.ti.com/en/activity/detail/exploring-the-parabola-and-its-equation-part-1-and
Using Symmetry to Find the Vertex of a Parabola
Students graph a quadratic function and investigate its symmetry by choosing pairs of points with the same y-value.https://education.ti.com/en/activity/detail/using-symmetry-to-find-the-vertex-of-a-parabola
Constructing Lines from Individual Points in the Activity Center
Students will understand that a line is made up of many points that all follow the same rule.https://education.ti.com/en/activity/detail/constructing-lines-from-individual-points-in-the-activity-center
Walk My Walk
A two-part activity that uses a CBR to develop the notion of slope and y-intercept through various walking activities. Part A develops a general notion of how changes in walking are reflected in various graphical representations. Part B formalizes the ideas of (1) slope and its relationship to sp...https://education.ti.com/en/activity/detail/walk-my-walk
Linear Equations
In this lesson students will learn how to determine the equation of a line using two points. Students will be finding there answer and then graphing the equation in Activity Center to see if it they are correct.https://education.ti.com/en/activity/detail/linear-equations
Linear Equations for Which the Difference between the Coordinates is Constant
This activity allows students to explore situations in which points with a constant difference between coordinates are graphed. With TI-Navigator?s display, students can determine that an oblique line is formed from such points. This oblique line always has intercepts equal to the constant diff...https://education.ti.com/en/activity/detail/linear-equations-for-which-the-difference-between-the-coordinates-is-constant
Linear Equations for Which the Product of the Coordinates is Constant
This activity allows students to explore situations in which points with a constant product of x-coordinate and y-coordinate are graphed. With TI-Navigator?s display, students can determine that a curve is formed from such points. This curve is in quadrants 1 and 3 if the product is positive or...https://education.ti.com/en/activity/detail/linear-equations-for-which-the-product-of-the-coordinates-is-constant
Linear Equations for Which the Quotient of the Coordinates is Constant
This activity allows students to explore situations in which points with a constant quotient of coordinates are graphed. With TI-Navigator?s display, students can determine that an oblique line is formed from such points. This oblique line always passes through the origin with a slope equal to ...https://education.ti.com/en/activity/detail/linear-equations-for-which-the-quotient-of-the-coordinates-is-constant
The Quest for Roots of Higher Order Equations
Students learn how to approximate the roots of any polynomial equation of any order by first using tables, and then by tracing along the graph to the point where the curve intersectshttps://education.ti.com/en/activity/detail/the-quest-for-roots-of-higher-order-equations
Using TRNSFRM APP
This activity introduces the use of TRNSFRM APP and the effect of A and B in AX + B as well as discovering Amplitude, Period and Vertical shift of sinusoids with the aid of a slinky!https://education.ti.com/en/activity/detail/using-trnsfrm-app
Investigating the Sine and Cosine Functions
Students use Cabri? Jr. to draw a circle and investigate the relationship between the coordinates of a point on the circle and sine and cosine of the angle whose terminal side passes through that point. NY State Algebra 2 & Trigonometry Standards covered: PS.3, PS.4, RP.2, CN.1, CN.2, A.55, A.5...https://education.ti.com/en/activity/detail/investigating-the-sine-and-cosine-functions
Manual Fit
Students manipulate parabolas so that the curve matches a set of data points.https://education.ti.com/en/activity/detail/manual-fit
Defining the Parabola
The teacher will graph a horizontal line and plot a point using TI-Navigator™, and the class will provide the points that create a parabola.https://education.ti.com/en/activity/detail/defining-the-parabola