Dimensional Analysis In which you will learn about: Conversion factors

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Dimensional Analysis In which you will learn about: Conversion factors Standard dimensional analysis Dimensional analysis with exponential units

Dimensional Analysis Imagine math class (don’t panic) Imagine multiplying two fractions Imagine the numerator of one fraction matches the denominator of the second (3/7 x 2/3) The numerator and denominator cancel! In dimensional analysis, we use this idea to cancel UNITS of measurements.

Equalities length 10.0 in. 25.4 cm State the same measurement in two different units length 10.0 in. 25.4 cm

Conversion Factors Example: 1 in. = 2.54 cm Factors: 1 in. and 2.54 cm Fractions in which the numerator and denominator are EQUAL quantities expressed in different units Example: 1 in. = 2.54 cm Factors: 1 in. and 2.54 cm 2.54 cm 1 in.

How many minutes are in 2.5 hours? Conversion factor 2.5 hr x 60 min = 150 min 1 hr cancel By using dimensional analysis / factor-label method, the UNITS ensure that you have the conversion right side up, and the UNITS are calculated as well as the numbers!

Sample Problem You have $7.25 in your pocket in quarters. How many quarters do you have? 7.25 dollars 4 quarters 1 dollar = 29 quarters X

Learning Check A rattlesnake is 2.44 m long. How long is the snake in cm? a) 2440 cm b) 244 cm c) 24.4 cm

Solution A rattlesnake is 2.44 m long. How long is the snake in cm? b) 244 cm 2.44 m x 100 cm = 244 cm 1 m

How many seconds are in 1.4 days? Unit plan: days hr min seconds Learning Check How many seconds are in 1.4 days? Unit plan: days hr min seconds 1.4 days x 24 hr x 1 day 60 min 1 hr x 60 s 1 min = 1.2 x 105 s

Wait a minute! What is wrong with the following setup? 1.4 day x 1 day x 60 min x 60 sec 24 hr 1 hr 1 min

English and Metric Conversions If you know ONE conversion for each type of measurement, you can convert anything! I will provide these equalities, but you must be able to use them: Mass: 454 grams = 1 pound Length: 2.54 cm = 1 inch Volume: 0.946 L = 1 quart

Steps to Problem Solving Read problem Identify data Make a unit plan from the initial unit to the desired unit (good practice at beginning, not necessary as you get comfortable with this) Select conversion factors Change initial unit to desired unit Cancel units and check Do math on calculator Give an answer using significant figures

Dealing with Two Units If your pace on a treadmill is 65 meters per minute, how many seconds will it take for you to walk a distance of 8450 feet? HINT: Always start with the simplest label. You’re looking for seconds, so you can’t start there. 65 m/min has two labels so that’s not very simple. Best STARTING place is 8450 feet!

What about Square and Cubic units? Use the conversion factors you already know, but when you square or cube the unit, don’t forget to cube the number also! Best way: Square or cube the ENTIRE conversion factor Example: Convert 4.3 cm3 to mm3 ( ) 4.3 cm3 10 mm 3 1 cm 4.3 cm3 103 mm3 13 cm3 = = 4300 mm3

Learning Check A Nalgene water bottle holds 1000 cm3 of dihydrogen monoxide (DHMO). How many cubic decimeters is that?

Solution 1000 cm3 1 dm 3 10 cm ( ) = 1 dm3 So, a dm3 is the same as a Liter ! A cm3 is the same as a milliliter.

How do I round multiple step problems with the correct sig figs? If the problem has only one “type” of math (adding/subtracting OR multiplying/dividing), round at the end of the problem Dimensional analysis is all M/D! Round at the end. If the problem has more than one type, you must follow the order of operations, round after each type is complete. A good example is percent error. Round using adding rules after 0-E, then finish the calculation and round again using multiplying rules.

Speaking of Sig Figs… Exact conversion factors, such as 100 cm in 1 m, do NOT count toward the number of sig figs! Numbers that are part of a mathematical formula, such as x100 in percent error, do NOT count toward the number of sig figs!