Graphing in Calculator

Slides:

Advertisements

Similar presentations

Advertisements

VOCABULARY Coefficient – (Equation) Value multiplied by a variable

Graph: x + y = 5 1. Solve for y. 2. Make an X|Y chart. 3. Graph.

Y – Intercept of a Line The y – intercept of a line is the point where the line intersects or “cuts through” the y – axis.

Solving Equations = 4x – 5(6x – 10) -132 = 4x – 30x = -26x = -26x 7 = x.

7.1Graphing Ordered Pairs Objectives: Plot points using the coordinate system Identify the quadrant associated with a point Identify the coordinates of.

X y 1 st Quadrant2 nd Quadrant 3 rd Quadrant4 th Quadrant 13.1 – The Rectangular Coordinate System origin x-axis y-axis.

Rectangular Coordinate System

1.1 Coordinate Systems and Graphs Cartesian Coordinate System Line – One dimension – Plotting Points Just put a dot! Plane – Two dimensions – Important.

10.2 Polar Equations and Graphs

Hot Air Balloon Investigation PPT Introduction Two students, Ginger and Paul, were going on a hot air balloon trip to see what it was like. Their.

Solve a radical equation

1 § Quadratic Functions The student will learn about: Quadratic function equations, quadratic graphs, and applications.

Copyright © 2013 Pearson Education, Inc. All rights reserved Section 1.1 The Distance and Midpoint Formulas; Graphing Utilities; Introduction to Graphing.

Copyright © 2013 Pearson Education, Inc. All rights reserved Section 1.1 The Distance and Midpoint Formulas; Graphing Utilities; Introduction to Graphing.

Warm-Up 12/05 165° + 360k° 525°; – 195°. Rigor: You will learn how graph points and simple graphs with polar coordinates. Relevance: You will be able.

Substitute 0 for y. Write original equation. To find the x- intercept, substitute 0 for y and solve for x. SOLUTION Find the x- intercept and the y- intercept.

Substitute 0 for y. Write original equation. To find the x- intercept, substitute 0 for y and solve for x. SOLUTION Find the x- intercept and the y- intercept.

Section 1.1 Rectangular Coordinates; Graphing Utilities; Introduction to Graphing Equations.

5.2 – Solving Inequalities by Multiplication & Division.

Unit #4 Graphing and Equation of the Line Lesson #1 Graphing Ordered Pairs.

Quadratic Equation (Standard Form) Quadratic Term Linear Term Constant Term 5.1 Graphing Quadratic Function, p. 249 Objective: To Graph Quadratic Functions.

Finding x-intercepts, Solving Equations and Solving Inequalities by Graphing.

Section – Solving Systems of Equations Calculator Required.

1.1) RECTANGULAR COORDINATES Pg 9 # 1- Do Now!. Coordinate Plane  Label: x, y-axis, origin, quadrants  Plot points.

S p. 702: 1-19 odd, odd, odd. Rectangular (Cartesian) coordinates plot a point by moving left/right and up/down (making a rectangle)  Polar.

Solve Systems Graphically (With Calculator) Sketch the 3 possible solution scenarios of a system of linear equations. Reg Algebra 2 – Unit 2.

Algebra 1 Section 6.4 Solve absolute Value Equations and Inequalities

8.2 - Graphing Polar Equations

Graphs and Applications of Linear Equations

Solving Graphically Ex 1: View using the following windows.

2.2 Graphs of Equations.

Graphing Linear Equations

Polar Coordinates r Pole Polar axis.

Quadratic Equations Chapter 5.

Section 1.1 The Distance and Midpoint Formulas; Graphing Utilities; Introduction to Graphing Equations.

Graphing Linear Equations Using Intercepts

Objective The student will be able to:

Intercepts, Symmetry, Even/Odd and intersections

Graphing in the Coordinate Plane

Quadratic Inequalities

Rectangular Coordinates;

Objective The student will be able to:

Y – Intercept of a Line The y – intercept of a line is the point where the line intersects or “cuts through” the y – axis.

2.1 Graphs of equations.

Warmup NO CALCULATORS Convert into radians or degrees.

Polar Coordinates Lesson 10.5.

3-4 Linear Programming.

Chapter 1: Lesson 1.1 Rectangular Coordinates

9.3 – Graphing Linear Equations

Graphing Linear Equations

Equations with Variables on Both Sides Day 2

Objective The student will be able to:

A graphing calculator is required for some problems or parts of problems 2000.

Graphing Solutions of Trig Functions

Hot Air Balloon Investigation

Homework Questions.

ABSOLUTE VALUE September 7, 2016.

2.3 Graph Equations of Lines

Finding the x- and y-intercepts of linear equations.

Objective The student will be able to:

Objective The student will be able to:

Obj: graph parabolas in two forms

Absolute Value in Open Sentences

Example 5A: Solving Simple Rational Equations

Rectangular Coordinates; Introduction to Graphing Equations

5-3 slope-intercept form

Graphing linear equations

13.3 Polar Coordinates Rita Korsunsky.

Presentation transcript:

Graphing in Calculator Unit 2 Day 1 Graphing in Calculator

Rectangular or Cartesian Coordinate System x axis y axis origin

Graphing with the calculator

Example 1 X-Min: Y-Min: X-Max: Y-Max: X-Scl: Y-Scl: Point: -3 -4 4 3 1 2 (-2, 2)

X min: X max: X scl: Y min: Y max: Y scl: Point: Example 2 Name the following: X min: X max: X scl: Y min: Y max: Y scl: Point:

Example 3 X min: X max: X scl: Y min: Y max: Y scl: Using the coordinates (40, 20), (-20, -80) and (10, 40) Name the following: X min: X max: X scl: Y min: Y max: Y scl:

Example 4 X min: X max: X scl: Y min: Y max: Y scl: Using the coordinates (15, 5), (-10, -20) and (10, -10) Name the following: X min: X max: X scl: Y min: Y max: Y scl:

How to graph in Calculator: Step 1: Solve the equation for y. Step 2: Press and type in equation Step 3: Press to see graph. Press to see a list of points Press to see the graph from -10 to 10 on each axis Press to adjust the window of the screen

Example 5 Using the graphing calculator, X Y

Example 6 Using the graphing calculator, X Y

Assignment (on the back of notes)