Graphing and Writing Equations of Lines Worksheet

Slides:

Advertisements

Similar presentations

Objective - To graph linear equations using the slope and y-intercept.

Advertisements

7.7 Choosing the Best Model for Two-Variable Data p. 279.

EXAMPLE 1 Use a linear model Tuition The table shows the average tuition y (in dollars) for a private four-year college in the United States from 1995.

Application From Section 1.2 Linear Word Problems

Standards: 7.RP.1, 7.NS.2d, 7.NS.3, 7.EE.4a, 7.G.1 Resource: Connected Math Program 2 Comparing and Scaling: Investigation 3.1.

Scatterplots Thinking Skill: Explicitly assess information and draw conclusions.

Curve Fitting Learning Objective: to fit data to non-linear functions and make predictions Warm-up (IN) 1.Find all the critical points for 2.Solve by factoring.

Applied Calculus, 3/E by Deborah Hughes-Hallet Copyright 2006 by John Wiley & Sons. All rights reserved. Section 5.4 Interpretations of The Definite Integral.

9-7 Linear, Quadratic, and Exponential Models

EXAMPLE 4 Solve a multi-step problem CYCLING

EXAMPLE 3 Use a quadratic model Fuel Efficiency

MAT 150 – Algebra Class #11 Topics: Find the exact quadratic function that fits three points on a parabola Model data approximately using quadratic functions.

2.4 Using Linear Models. The Trick: Converting Word Problems into Equations Warm Up: –How many ways can a $50 bill be changed into $5 and $20 bills. Work.

Slope Is a Rate of Change

Section 7-2 Solve Systems by Substitution SPI 23D: select the system of equations that could be used to solve a given real-world problem Objective: Solve.

2.4 Using Linear Models. Slope is “rate of change” Examples: Look for KEY words! 23 miles per gallon 20 gallons/second 3 inches each year $3 a ticket.

2.4 – Using Linear Models. Example 1  A car enters the interstate 5 miles east of Lincoln. The car travels at an average speed of 70 mph. Write an equation.

2.8Exploring Data: Quadratic Models Students will classify scatter plots. Students will use scatter plots and a graphing utility to find quadratic models.

Section 2.5 Notes: Scatter Plots and Lines of Regression.

Algebra 1 Mini-Lessons T = 20 − M T = M + 4 T + M = 4 T + 16 = 20M

Graphing Linear equations

L INEAR /Q UADRATIC REGRESSION Objective: To write linear and quadratic equations that model real-world data. To make predictions from those equations.

Scatter plots and Regression Algebra II. Linear Regression  Linear regression is the relationship between two variables when the equation is linear.

1.5 Cont. Warm-up (IN) Learning Objective: to create a scatter plot and use the calculator to find the line of best fit and make predictions. (same as.

1 What you will learn today 1. New vocabulary 2. How to determine if data points are related 3. How to develop a linear regression equation 4. How to graph.

A package of tennis balls contains 3 tennis balls. The number of tennis balls and the number of packages are in a proportional linear relationship. This.

Scatter Plots By Irma Crespo 2010.

Finding a Linear Model Section 2.4. Lehmann, Intermediate Algebra, 4ed Section 2.4 A company’s profit was $10 million in 2005 and has increased by $3.

FRIDAY: Everyone Needs a Graphing Calculator TODAY.

Correlation and Regression. Section 9.1  Correlation is a relationship between 2 variables.  Data is often represented by ordered pairs (x, y) and.

INTERPRET LINEAR GRAPHS & WRITE LINEAR EQUATIONS SECTION 5.4B.

Chapter 2 Linear Equations and Functions. Problem Solving A water park slide drops 8 feet over a horizontal distance of 24 feet. Find its positive slope.

Relationship between time, displacement, velocity, acceleration. Kinematic.

A. Write an equation in slope-intercept form that passes through (2,3) and is parallel to.

 You can use weighted averages to solve uniform motion problems when the objects you are considering are moving at constant rates or speeds.

Algebra l – Chapter 3 Linear Equations. Warm-up Find the next 5 values in the list and explain the pattern. -2, 1, 4, 7, …

Bellwork December Solve for y: 4x – 2y = 10

Section 1.3 Modeling with Linear Equations I can write and use math models to solve real-life problems. 1.3 day 1 HW: 1.3 worksheet Friday: 1.3 additional.

Algebra 3 Lesson 1.6 Objective: SSBAT write equations that model real life data. Standards: M11.A.2.2.1, M11.D and M11.D

MAT 150 – Algebra Class #11 Topics:

Wednesday Today you need: Whiteboard, Marker, Eraser Calculator 1 page handout.

Algebra 2 Notes March 3,  An engineer collects the following data showing the speed in miles per hour (x) of a Ford Taurus and its average miles.

4.7 PROPORTIONAL RELATIONSHIPS I CAN IDENTIFY PROPORTIONAL RELATIONSHIPS AND FIND CONSTANTS OF PROPORTIONALITY BY USING PROPORTIONS.

Algebra 3 Lesson 1.6 Objective: SSBAT write equations that model real life data. Standards: M11.A.2.2.1, M11.D and M11.D

1. Please pick up your Weekly Homework and Skill Builder. 2. Turn in SKILL BUILDER #30 and STRIKE A MATCH to the box. 3. Please be working on the first.

9-7 Linear, Quadratic, and Exponential Models. Linear, Quadratic, & Exponential Review.

Wednesday: Need a graphing calculator today. Need a graphing calculator today.

Notes Over 3.2 Solve the equation. Notes Over 3.2 Solve the equation.

Proportional Relationships and Graphs

Math 2: Unit 6 Day 3 How do we use curve fitting?

Proportional Relationships

Chapter 5 Linear Functions

Starter Questions Convert the following to minutes :-

Lesson 2.4 Using Linear Models.

Real-Life Scenarios 1. A rental car company charges a $35.00 fee plus an additional $0.15 per mile driven. A. Write a linear equation to model the cost.

Basic Algebra 2 Teacher – Mrs. Volynskaya

Lesson 2.8 Quadratic Models

30 miles in 1 hour 30 mph 30 miles per hour

Problem of the Day This equation shows how the total cost of a members-only speaker series is related to the number of events attended. c = a + 18 The.

Interpreting the Unit Rate as Slope

Speed, Distance and Time

Jeopardy Final Jeopardy Solving Systems Solving Equations Other $100

Starter Questions Convert the following to minutes :-

Proportional and Non-proportional Relationships

Jeopardy A C Q $100 Q $100 Q $100 Q $200 Q $200 Q $200 Q $300 Q $300

2.6 Draw Scatter plots & Best Fitting Lines

2.5 Correlation and Best-Fitting Lines

Linear Kinematics - Speed

Presentation transcript:

Graphing and Writing Equations of Lines Worksheet

Graphing and Writing Equations of Lines Worksheet

Linear Models Section 2.4

Suppose an airplane descends at a rate of 300 ft/min from an elevation of 8,000 feet. Write an equation to model the plane’s elevation as a function of the time it has been descending.

Suppose that tuition at a state college was $3,500 per year in 1995 and has been increasing at a rate of $225 per year. Write an equation to model the cost of tuition as a function of time. Use that equation to predict the cost of tuition in the year 2007.

A storage facility changes $60 for 200 square feet of storage and $160 for 325 square feet of storage. Find a linear equation to model the data.

Tony’s company manufactures iPods Tony’s company manufactures iPods. The company will make $150,000 profit if it manufactures 100,000 iPods and $1,750,000 profit if it manufactures 500,000 iPods. The relationship between the number of iPods manufactured and profit is linear. Write an equation to model the relationship.

The table below shows the average fuel efficiency in miles per gallon of new cars manufactured during the years listed.

The table below shows the number of women serving in the United States Congress during the years 1987 – 1999.

The table below shows the years of experience for eight technicians at Lewis Techomatic and the hourly rate of pay each technician earns.

Anna’s running speed after 5 minutes was 10 mph; at 10 minutes, 8 mph; at 15 minutes, 5 mph and at 20 minutes, 4 mph. Write the data in the table and graph the data. Write the equation of your trend line and predict her running speed at 30 minutes.

Hooray! We can use the calculator! Using your calculator, find the line of best fit for the set of data. The table represents US Crime Rate (per 100,000 inhabitants). Predict the number of crimes for the year 2008. Year # of Crimes 1995 5275.9 1996 5086.9 1997 4930.0 1998 4619.3 1999 4266.8