FINDING THE SLOPE FROM 2 POINTS Day 91. Learning Target: Students can find the slope of a line from 2 given points.

Slides:

Advertisements

Similar presentations

Lines, Lines, Lines!!! ~ Horizontal Lines Vertical Lines.

Advertisements

3.7 Equations of Lines in the Coordinate Plane

Slope of a Line 11-2 Warm Up Problem of the Day Lesson Presentation

Slope and Rate of Change Equations of Lines

M. Pickens 2006 Slope. M. Pickens 2006 Objectives To learn what slope is To learn what a line looks like when it has positive, negative, zero or undefined.

EXAMPLE 2 Find a negative slope Find the slope of the line shown. m = y 2 – y 1 x 2 – x 1 Let (x 1, y 1 ) = (3, 5) and (x 2, y 2 ) = (6, –1). –1 – 5 6.

NOTE: To change the image on this slide, select the picture and delete it. Then click the Pictures icon in the placeholder to insert your own image. FINDING.

Slope of a Line Topic

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

Bellringer WE WILL LEARN USE TABLES ALWAYS!!! XY INDEPENDENT DOMAIN INPUT.

3.3 Slopes of Lines.

Slope describes the slant and direction of a line.

Graphing Linear Equations

What is the slope of a line parallel to the line seen below? m= -1/3

Evaluate each equation for x = –1, 0, and y = 3x 2. y = x – 7 3. y = 2x y = 6x – 2 –3, 0, 3 –8, –7, –6 3, 5, 7 –8, –2, 4 Pre-Class Warm Up.

Unit B: Linear Equations B.1 Introduction to Linear Equations and Slope.

Slope Have you ever been skiing or seen it on television? What is the difference between the beginner’s trail (bunny slope) and the expert’s trail (black.

Writing linear equations given two points /5/13.

M. Pickens 2006 Slope Lesson Three Slope from Tables.

January 21,  Slope: the ratio of the difference of the vertical distance (rise) to the difference of the horizontal distance (run)  Vertical Change:

3-7 Equations of Lines in the Coordinate Plane

Slope of a Line Chapter 7.3. Slope of a Line m = y 2 – y 1 x 2 – x 1 m = rise run m = change in y change in x Given two points (x 1, y 1 ) and (x 2, y.

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

Introduction To Slope. Slope is a measure of Steepness.

1 Warm UP Graph each equation and tell whether it is linear. (create the table & graph) 1. y = 3x – 1 2. y = x 3. y = x 2 – 3 yes Insert Lesson.

FINDING SLOPE By Ms. Morgan. Students will be able to: Find the slope of a line on a coordinate plane.

M. Pickens 2006 Slope. M. Pickens 2006 What is Slope? Slope is the rate of change of a line (change in y) (change in x)

Drill #57 Write an equation in function notation for the following relations: {(-1, 6), (0, 3), (1,0)} XY XY

These lines look pretty different, don't they?

Chapter 6 Linear Equations and Their Graphs

The Slope of a Line. Finding Slope of a Line The method for finding the steepness of stairs suggests a way to find the steepness of a line. A line drawn.

2.2 Slope and Rate of Change, p. 75 x y (x1, y1)(x1, y1) (x2, y2)(x2, y2) run (x2 − x1)(x2 − x1) rise (y2 − y1)(y2 − y1) The Slope of a Line m = y 2 −

Holt McDougal Algebra Rate of Change and Slope 4-3 Rate of Change and Slope Holt Algebra 1 Lesson Quiz Lesson Quiz Lesson Presentation Lesson Presentation.

4.4 Slope Formula.

Rate of Change and Slope Objectives: Use the rate of change to solve problems. Find the slope of a line.

Objective The student will be able to: find the slope of a line given 2 points and a graph.

Do Now If f(x) = 2x + 3 and g(x) = x 2 – 2x, find: 1)f(3)2)g(-2) *3) g(4) – f(1)

EXAMPLE 1 Find a positive slope Let (x 1, y 1 ) = (–4, 2) = (x 2, y 2 ) = (2, 6). m = y 2 – y 1 x 2 – x 1 6 – 2 2 – (–4) = = = Simplify. Substitute.

Example 2 Positive and Negative Slope Find the slope of the line. a. = run rise m = x1x1 x2x2 y1y1 y2y2 – – – – = 4 5 =

Rate of Change SLOP E AKA. Types of Slopes Negative Slope Lines that have negative slopes “slant downhill” as viewed from left to right.

Slope of a Line 12-2 Learn to find the slope of a line and use slope to understand and draw graphs.

A4.a How Do I Interpret Slope of a Line As A Rate Of Change? Course 3 Warm Up Warm Up Lesson Presentation Lesson Presentation.

The Slope of a Line 4.4 Objective 1 – Find the slope of a line using two of its points Objective 2 – Interpret slope as a rate of change in real-life situations.

Warm-Up. Slope Slope Objectives: Define slope as the ratio of vertical rise to horizontal run. Determine the slope of a line given a graph. Determine.

WRITING LINEAR EQUATIONS FINDING THE SLOPE OF A LINE.

First, Let’s Warm Up Evaluate each equation for x = –1, 0, and y = 3x 2. y = x – 7 3. y = 2x y = 6x – 2 –3, 0, 3 –8, –7, –6 3, 5, 7 –8, –2,

Finding The Slope of a Line. What is the meaning of this sign? 1.Icy Road Ahead 2.Steep Road Ahead 3.Curvy Road Ahead 4.Trucks Entering Highway Ahead.

Pre-Algebra 11-2 Slope of a Line 11-2 Slope of a Line Pre-Algebra Homework & Learning Goal Homework & Learning Goal Lesson Presentation Lesson Presentation.

Introduction To Slope. Slope is a measure of Steepness.

Intro U4D9 Warmup Evaluate each equation for x = –1, 0, and y = 3x 2. y = x – 7 3. y = 2x y = 6x – 2 –3, 0, 3 –8, –7, –6 3, 5, 7 –8, –2, 4.

Pre-Algebra 11-2 Slope of a Line Warm-up Purple workbook – pg. 85 # 1 Need to be finished within the next 5 minutes Pictures or progress report.

Holt CA Course 1 7-6Rate of Change and Slope SLOPE.

0-6 Writing Equations in Point- Slope Form. Slope Formula y 1 – y 2 x 1 – x 2 Forms of lines Point-slope form: y – y 1 = m (x - x 1 )

Slope of a Line 11-2 Warm Up Problem of the Day Lesson Presentation

Lesson 3.5 Essential Question: How can you describe the graph of the equation y=mx+b? `Objectives: Finding the slope of a line Finding the slope of a line.

1.2 Slopes and Intercepts equation for a given line in the coordinate

Ex 2: Graph the line with slope 5/2 that passes through (-1, -3)

4.4 Slope Formula.

Graphing Linear Equations in Slope-Intercept Form

WARM UP Determine the constant rate of change and determine if it linear or not?

Equations of Lines in the Coordinate Plane

Slope and Graphing.

Objective The student will be able to:

Slope How did we define slope yesterday?

Slope = m = rate of change

Rate of Change and Slope

Section 3.3 The Slope of a Line.

Graph lines given their equation. Write equations of lines.

Rate of change and slope

Presentation transcript:

FINDING THE SLOPE FROM 2 POINTS Day 91

Learning Target: Students can find the slope of a line from 2 given points.

Linear equations Linear equations have constant slope (or constant rate of change). For a line on the coordinate plane, slope is the following ratio: vertical change horizontal change change in y change in x = This ratio is often referred to as, or “rise over run,” where rise indicates the number of units moved up or down and run indicates the number of units moved to the left or right. Slope can be positive, negative, zero, or undefined. A line with positive slope goes up from left to right. A line with negative slope goes down from left to right. rise run

Zero Slope Undefined Slope Positive Slope Negative Slope

If you know any two points on a line, you can find the slope of the line without graphing. The slope of a line through the points (x 1, y 1 ) and (x 2, y 2 ) is as follows: y2 – y1y2 – y1x2 – x1x2 – x1y2 – y1y2 – y1x2 – x1x2 – x1

Slope from 2 points Steps: LABEL, WRITE, PLUG AND CHUG!! 1.Label 1.Label points 2.Write 2.Write the slope formula 3.Plug 3.Plug the numbers in the formula 4.Chug 4.Chug out the answers

Find the slope of the line that passes through (–2, –3) and (4, 6). Let (x 1, y 1 ) be (–2, –3) and (x 2, y 2 ) be (4, 6). 6 – (–3) 4 – (–2) Substitute 6 for y 2, –3 for y 1, 4 for x 2, and –2 for x = The slope of the line that passes through (–2, –3) and (4, 6) is. 3 2 = y 2 – y 1 x 2 – x =

Find the slope of the line that passes through (–4, –6) and (2, -3). Let (x 1, y 1 ) be (–4, –6) and (x 2, y 2 ) be (2, 3). 3 – (–6) 2 – (–4) Substitute 3 for y 2, –6 for y 1, 2 for x 2, and –4 for x = The slope of the line that passes through (–4, –6) and (2, 3) is. 3 2 = y 2 – y 1 x 2 – x =

Nonlinear equations have variable rates of change. This means that the rate of change is different between values. This is shown in a graph by a curved line.

(LINEAR) (NONLINEAR)

(LINEAR)

Find the slope of the line passing through each pair of points. 1. (4, 3) and (–1, 1) 2. (–1, 5) and (4, 2) –

Ticket Out The Door Draw and label the different types of slope What is the slope formula? Find the slope from the points (1,7) and (11,12)