Imagine This! You’re driving along a highway in Mexico when you notice this sign What should your speed be in miles per hour?

Slides:

Advertisements

Similar presentations

2.6 Ratios, Rates, and Conversions

Advertisements

Imagine This! You’re driving along a highway in Mexico when you notice this sign What should your speed be in miles per hour?

Dimensional Analysis. The Factor-Label Method In this method, a quantity described in one unit is converted into an equivalent quantity described in one.

Warm Up Multiply. Write answers in simplest form:

Lesson 1.06 Unit Conversion.

Dimensional Analysis DHS Chemistry ferrer.

Convert Unit Rates.

5-3 Dimensional Analysis Warm Up Problem of the Day

A. Real life examples: 1. How many doughnuts are in 2 dozen? 2. How many quarters are in 4 dollars? 3. How many pairs of shoes do you have if you have.

Mullis1 GETTING FROM ONE UNIT TO ANOTHER: Dimensional Analysis aka. Factor Labeling Method.

Dimensional Analysis 1 foot = 12 inches1 mile = 5280 ft 1000 mL = 1 L4 quarts = 1 gal Dimension Analysis makes use of equivalent statements. What are some.

One way of assuring yourself that you are getting the CORRECT answer.

Unit Conversion Using Dimensional Analysis Objective N-Q. 1 Use units as a way to understand problems and to guide the solution of multi-step problems.

Unit 3 Jeopardy Calculations and problem solving..

Conversion Factor Method of Analysis. Conversion Factor Method a.k.a. Dimensional Analysis.

Course Dimensional Analysis Warm Up Find each unit rate. 1. Jump rope 192 times in 6 minutes 2. Four pounds of bananas for $ anchor bolts.

Pre-Algebra 7-3 Analyze Units

m = 1 ___a) mm b) km c) dm g = 1 ___ a) mg b) kg c) dg L = 1 ___a) mL b) cL c) dL m = 1 ___ a) mm b) cm c) dm Learning.

Fractions of Quantities

Dimensional Analysis. Vocabulary Unit conversion factor- a fraction in which the numerator and denominator represent the same quantity in different units.

DIMENSIONAL ANALYSIS NOTES 6.

Dimensional Analysis I A Year-Long (and Hopefully Longer) Tool for Problem Solving.

1 Dimensional Analysis DHS Chemistry. 2 Note: From this point on, unless told otherwise, it is expected that all answers will be reported using the sig.

Dimensional Analysis. Measurement Ratios In order to use dimensional analysis, you have to understand that you need to use ratios that have a value of.

Dimensional Analysis. Imagine This! You’re driving along a highway in Mexico when you notice this sign What should your speed be in miles per hour?

How can we convert units?.  Every measurement needs to have a value (number) and a unit (label).  Without units, we have no way of knowing what the.

Dimensional Analysis 2.6. Dimensional Analysis This is a skill essential to your success in this class!!! Numerous problems can be solved by dimensional.

Mullis1 GETTING FROM ONE UNIT TO ANOTHER: Dimensional Analysis aka. Factor Labeling Method.

5-4 Dimensional Analysis Course 2 Warm Up Warm Up Problem of the Day Problem of the Day Lesson Presentation Lesson Presentation.

5.7 CONVERTING UNITS LO: CONVERT BETWEEN METRIC AND IMPERIAL UNITS OF MEASURE.

CONVERSION & DIMENSIONAL ANALYSIS “FACTOR” OR UNIT “LABEL” METHOD.

Converting with Different Units Metric System Or Standard International (S.I.) English System M.K.S.C.G.S.ENGLISH LENGTH MASS TIME meters seconds kilogramsgramsslugs.

Dimensional Analysis a problem solving process and unit conversion process.

Chapter 1: Dimensional Analysis

 A technique for solving problems of conversions.

Converting in and out of the metric system.  Converting in the metric system is easy because it’s all based on unit of ten- Move the decimal!!

Dimensional Analysis. What is Dimensional Analysis? Have you ever used a map? Since the map is a small-scale representation of a large area, there is.

One way of assuring yourself that you are getting the CORRECT answer

Changing the Units of Measurement

Dimensional Analysis.

5-4 Dimensional Analysis Warm Up Problem of the Day

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

Wake-up Place old Wake-up in the Bin

Dimensional Analysis.

Unit 1 notes… Dimensional Analysis

Dimensional Analysis In which you will learn about: Conversion factors

Imagine This! You’re driving along a highway in Mexico when you notice this sign What should your speed be in miles per hour?

Conversion Factors Dimensional Analysis Lots of Practice

Chapter 4: Problem Solving

2.6 – NOTES Dimensional Analysis

September 13, 2017 Dimensional Analysis.

Unit 4 – Lesson #1 Dimensional analysis

Making a new equivalency for a conversion factor

Conversions between Standard and Metric Systems

Problem Solving in Chemistry

SL#14 How to use Conversion Factors (a.k.a. Dimensional Analysis)

Dimensional Analysis.

Aim: How to use Dimensional Analysis to Convert from One unit to Another DO Now: Answer the following questions in your notebook in the following format.

Single-Factor Dimensional Analysis

Dimensional Analysis I

Equalities State the same measurement in two different units length

Problem-Solving Strategy for Unit Conversions

Direct Conversions Dr. Shildneck.

Ch. 4 Problem Solving in Chemistry

Physical Science, Ch 01 bell work ( )

Unit 1- lecture 5 Dimensional analysis

Unit 1- lecture 5 Dimensional analysis

Unit Conversions.

Exploration 1.4 Dimensional Analysis.

Presentation transcript:

Imagine This! You’re driving along a highway in Mexico when you notice this sign What should your speed be in miles per hour?

Equivalence Statements, & Conversion Factors Dimensional Analysis Equivalence Statements, & Conversion Factors

I) Equivalence Statements An equivalence statement shows two quantities with different units that are equal to each other.

Equivalence Statements A) equivalence statements can be counted numbers: Examples: 1 dozen eggs = 12 eggs 1 pair of shoes = 2 shoes

Equivalence Statements B) equivalence statements can be numbers with in the same measurement system: Examples: 1 km = 1000m 5280 feet = 1 mile

Equivalence Statements C) equivalence statements can be numbers in different measurement systems: Examples: 1 lb = 2.21 kg 1 in = 2.540 cm

Equivalence Statements D) equivalence statements can be numbers that are specific to a situation: Examples: 1 in = 50 km such as on a map 1m = 3.45cm such as in a photograph 3 students = 1 lab group such as during a particular lab

Practice: Design four equivalence statements and write them on your paper:

II) Conversion Factors A) Conversion factors are a set of fractions that ALWAYS equal one. The numerator and the denominator have equal value.

II) Conversion Factors B) Every equivalence statement can be used to construct 2 conversion factors.

Practice: Write the two conversion factors for the equivalent statement below: equivalence statements 13 steps = 1 flight of stairs

II) Conversion Factors Use background information sheet (equivalent statements) to write base conversion factors.

III) Using Conversion Factors for Dimensional Analysis A) What happens to the value of a number when you multiply it by one?

III) Using Conversion Factors for Dimensional Analysis B) Because a conversion factor is a fraction that equals one, when it is used in a calculation it does not effect the value of the number, however, it does change the units.

III) Using Conversion Factors for Dimensional Analysis C) Dimensional analysis is the process by which a conversion factor is used to convert a value from one unit to another.

III) Using Conversion Factors for Dimensional Analysis D) To decide which of the two conversion factors to use make sure the units from the known value will cancel leaving units for the unknown value.

DO IT!! Convert 3.5 hours to minutes: Write down the given information and put it over 1.

DO IT!! Get up a conversion factor such that the information in the numerator and denominator equal each other. 3.5 hrs 1

DO IT!! Cancel the units 3.5 hrs X 60 min 1 1 hrs

DO IT!! Multiply the numerators. 3.5 hrs X 60 min = 210 min 1 1hr

DO IT!! Multiply the denominators 3.5 hrs X 60 min = 210 min 1 1hr 1

DO IT!! Divide your final answer and include the new units. 3.5 hrs X 60 min = 210 min = 210min 1 1hr 1

Practice: convert 27.5 L to mL

Convert 67.9dam to m

Convert 950g to kg