Chapter 2: Lesson 1: Direct Variation Mrs. Parziale.

Slides:

Advertisements

Similar presentations

Lesson 5-5 Direct Variation

Advertisements

3.8 Direct, Inverse and Joint Variation

5-Minute Check on Activity 4-7 Click the mouse button or press the Space Bar to display the answers. Using your calculator, determine the quadratic regression.

Modeling Using Variation

Chapter 5 Section 1 variation.

5-Minute Check on Activity 4-8 Click the mouse button or press the Space Bar to display the answers. 1.What point does a direct variation graph always.

Direct Variation Chapter 5.2.

Introduction Variables change, but constants remain the same. We need to understand how each term of an expression works in order to understand how changing.

Inverse Variation:2-2.

6.8 Solving (Rearranging) Formulas & Types of Variation  Rearranging formulas containing rational expressions  Variation Variation Inverse Joint Combined.

 Lesson Objective: NCSCOS 4.01 – Students will know how to solve problems using direct variation.

Direct Variation: y varies directly as x (y is directly proportional to x), if there is a nonzero constant k such th at 3.7 – Variation The number k is.

To write and graph an equation of a direct variation

 In the isosceles triangle below, AB = CB. What is the measure of the vertex angle if the measure of angle A is 40 degrees?  What is the sum of a and.

Standard Form for the Equation of the Circle

Direct Variation What is it and how do I know when I see it?

2.6 Scatter Diagrams. Scatter Diagrams A relation is a correspondence between two sets X is the independent variable Y is the dependent variable The purpose.

College Algebra Sixth Edition James Stewart Lothar Redlin Saleem Watson.

Direct Variation Math II Unit 7 Functions.

Warm Up Solve each equation. 2.4 = x x = 1.8(24.8)

Direct and Inverse Variations Direct Variation When we talk about a direct variation, we are talking about a relationship where as x increases, y increases.

Copyright © Cengage Learning. All rights reserved. Graphs; Equations of Lines; Functions; Variation 3.

§ 6.8 Modeling Using Variation. Blitzer, Intermediate Algebra, 5e – Slide #2 Section 6.8 Variation Certain situations occur so frequently in applied situations.

5.5: Direct Variation. A function in the form y = kx, where k ≠ 0, is a direct variation. The constant of variation k is the coefficient of x. The variables.

Outline Sec. 2-1 Direct Variation Algebra II CP Mrs. Sweet.

Prepared by: David Crockett Math Department Lesson 113 Direct Variation ~ Inverse Variation Example 113.2Example LESSON PRESENTATION Direct Variation.

DIRECT, INVERSE, AND JOINT VARIATION Unit 3 English Casbarro.

1 © 2010 Pearson Education, Inc. All rights reserved © 2010 Pearson Education, Inc. All rights reserved Chapter 3 Polynomial and Rational Functions.

Lesson 2.8, page 357 Modeling using Variation Objectives: To find equations of direct, inverse, and joint variation, and to solve applied problems involving.

2.8 Modeling Using Variation Pg. 364 #2-10 (evens), (evens) Objectives –Solve direct variation problems. –Solve inverse variation problems. –Solve.

Warm Up Exercise  Solve each equation for the given variable: (1) V = LWH solve for W (2) A = ½ BH solve for H (3) ax + by = 0 solve for y.

Direct and Inverse Variations Direct Variation When we talk about a direct variation, we are talking about a relationship where as x increases, y increases.

Lesson 70: Solving Direct Variation Problems. Bell Work: Graph the points (-2, -4) and (6, 0) and draw a line through the points. Then write the equation.

5-2 Direct Variation A direct variation is a relationship that can be represented by a function in the form y = kx, where k ≠ 0. The constant of variation.

Precalculus Mathematics for Calculus Fifth Edition

Certain situations exist where:  If one quantity increases, the other quantity also increases.  If one quantity increases, the other quantity decreases.

Section – Ratio, Proportion, Variation Using the Vocabulary.

Direct Variation Algebra I Mastery Cate Condon. The store you go into in the mall sells t-shirts. You are looking around and you see that 3 t-shirts cost.

5-5 Direct Variation. Ex. 1 Is Direct Variation?

Variables and Expressions By The Freshman Math Teachers.

Chapter 2: Variation and Graphs Vogler Algebra II.

Section 3.5 – Mathematical Modeling

Direct and Inverse.

1.11 Making Models Using Variation. 2 Objectives ► Direct Variation ► Inverse Variation ► Joint Variation.

RATE OF CHANGE AND DIRECT VARIATION

Math 10 Lesson #2 Inverse Variation Mrs. Goodman.

Section Direct and Inverse Variation. Lesson Objective: Students will: Formally define and apply inverse and direct variation.

X = 3y = 4z = 8 2x Step 1X = 3 Step 22(3) 2 – 6 2 Step 4 2(9) – 6 2Step 3 18 – 12 =6.

k is called the constant of variation or constant of proportionality.

LESSON 12-1 INVERSE VARIATION Algebra I Ms. Turk Algebra I Ms. Turk.

Dear Power point User, This power point will be best viewed as a slideshow. At the top of the page click on slideshow, then click from the beginning.

3.7: Modeling Using Variation. Direct Variation Let x and y denote two quantities. y varies directly with x, or y is directly proportional to x, if there.

Section 3.5 Mathematical Modeling Objective(s): To learn direct, inverse and joint variations. To learn how to apply the variation equations to find the.

EXPONENTS JEOPARDY. Simplifying Powers Evaluating Expressions Problem Solving EXPONENTS.

PAP Algebra 2 NOTES 9.4 OBJECTIVE TLW…

Variation Objectives: Construct a Model using Direct Variation

Ratios and Rates Chapter 7.

Joint Variation.

Lesson 5-5 Direct Variation

Rational Expressions and Functions

Rational Expressions and Functions

Solving Equations Containing

3-8 Direct, Inverse, Joint Variation

Warm Up 1. Points (7, y) and (1, 3) are on a line that have a slope of 2/5 . Find the value of y. 2. Which of the following equations represent a direct.

Lesson 5-2 Direct Variation

Copyright © Cengage Learning. All rights reserved.

Lesson 2-3 Direct Variation

Direct Variation Two types of mathematical models occur so often that they are given special names. The first is called direct variation and occurs when.

Chapter 1: Solving Linear Equations Sections

Forces and braking Q1. a. road surface affects the braking distance

Presentation transcript:

Chapter 2: Lesson 1: Direct Variation Mrs. Parziale

In New York, you can receive a refund for returning aluminum cans. For each can returned, you receive a 5¢ refund. If r represents the refund and c represents the number of cans returned, write an equation to show this relationship. ___________________________________

What happens to your refund if you double the number of cans returned? ________________________________ What happens to your refund if you triple the number of cans returned? ________________________________ What happens to your refund if you only collect half of the number of cans? ________________________________

The aluminum can problem is an example of direct variation. refund r varies ________________ as c the number of cans ( Direct Variation means that two variables, such as r and c are so related that when one is multiplied by a constant value, so is the other.) When the number of cans ____________,When the number of cans ____________, the refund ___________________. When the number of cans ____________,When the number of cans ____________, the refund ________________________.

More Examples: The cost of gas for a car varies directly as the amount of gas purchased. The price of breakfast cereal varies directly as the number of boxes of cereal purchased. The volume of a sphere varies directly as the cube of its radius. The deer population varies directly with the amount of available vegetation.

Direct Variation Function – Independent variable is ____________. Dependent variable is______________. “k” is the ____________________________. Example 2: The area of a circle varies directly with the square of the radius. As the size of the radius increases, the total area ______________. As the size of the radius decreases, the total area ______________. If the radius is 5, If the radius is 10, This means that two variables, such as radius and Area are so related that when one is multiplied by a constant value, so is the other.

Another way to express direct variation: y varies directly as x n also means: y is directly ____________________ to x n In, area of a circle is directly proportional to the square of the radius. In the earlier equation for the refund of the cans our equation was -- r = 5c

Example 3: Write an direct variation equation that describes the following (let k=constant of variation): 1.The cost c of gas varies directly as the amount of gas g purchased. ________________________________ 2.The price P of breakfast cereal varies directly as the number of boxes b of cereal purchased. ________________________________ 3.The volume V of a sphere is directly proportional to the cube of its radius r. ________________________________

Solving Direct Variations Problems Suppose that lightning strikes a known point 4 miles away, and that you hear the thunder 20 seconds later. Then, how far away has lightning struck if 30 seconds pass between the time you see the flash and hear its thunder? Here, the distance varies directly as the time it takes for us to hear the thunder. How do we solve this?

Solving Direct Variation Problems: Follow the following four steps: 1.Write an ___________________ that describes the function. 2.Solve for the __________________________. 3.__________________ the variation function using the constant of variation found in step 2. 4.__________________ the function for the desired value of the independent variable.

Solving Direct Variations Problems Suppose that lightning strikes a known point 4 miles away, and that you hear the thunder 20 seconds later. Then, how far away has lightning struck if 30 seconds pass between the time you see the flash and hear its thunder? Here, the distance varies directly as the time it takes for us to hear the thunder. How do we solve this?

Example 4: Suppose W varies directly as the third power of z and W = 96 when z=2. Find W when z = 10. Step 1: Step 2 Step 3: Step 4:

Example 5: A certain car needs 25 feet to come to a stop after the brakes are applied at 20 mph. Braking distance d (in feet) is directly proportional to the square of the speed s (in mph). Use the 4 steps to find the distance needed to stop the car after the brakes are applied at 60 mph. (Hint: find the constant of variation for the initial distance and braking speed and then use it with the 60 mph speed to find the distance.)

5-Minute Check Translate into a direct variation equation. Let k be the constant of variation. 1. The distance d a star is from the earth is directly proportional to the length of time t it takes for its light to get here. 2. m varies directly as the fourth power of n. 3. y varies directly as x. If y = 8 when x = -4, find y when x = 16 True or False: 4. The outdoor temperature varies directly as the time of day.