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Chapter 10 – Measurements and Units

Chapter 10 – Measurements and Units. 10.1 – U.S. Customary Units. What Measurement and Units Are and Why They Are Important. When taking measurement, we express quantities in standardized units such as pounds and yards, which enable us to compare characteristics of physical objects. .

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Chapter 10 – Measurements and Units

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  1. Chapter 10 – Measurements and Units

  2. 10.1 – U.S. Customary Units

  3. What Measurement and Units Are and Why They Are Important When taking measurement, we express quantities in standardized units such as pounds and yards, which enable us to compare characteristics of physical objects.

  4. U.S. Customary Units of Length, Weight, Capacity and Time Length Weight Capacity Time

  5. Conversion Examples • 6 qt = ____ pt • Express 45 min in hours. • How many cups are equivalent to 4 gal?

  6. Adding and Subtracting Mixed Units Some measurements involve more than a single unit. When a measurement is expressed in mixed units, we write the larger unit with the largest possible whole number. For example, 3 hr 5 min should not be written as 2 hr 65 min Only quantities with the same units can be added or subtracted.

  7. Conversion Examples • Convert 3 lb 8 oz to ounces. • Change 328 min to hour and minutes. • Find the sum of 8 ft 4 in and 4 ft 10 in. • Subtract 4 yds 2 feet from 7 yds 1 foot. • Add 3 yds 2 in to 2 feet 3 inches. • The length of a sidewalk is 12 ft 2 inches. The width of the sidewalk is 3 ft 4 inches. What is the difference between the length and width?

  8. 10.2 – Metric Units and Metric/U.S. Customary Unit Conversion

  9. The Metric System Developed about 200 years ago by a French scientist, but is now the standard in most countries for medicine, science, and many other fields. Length/Distance: Meter Weight/Mass: Gram Capacity/Volume: Liter

  10. The Metric System Other units are formed by multiplying or dividing the base units by 10. Base Units Length/Distance: Meter Weight/Mass: Gram Capacity/Volume: Liter

  11. Length: Meter The millimeteris about the thickness of a dime. The centimeter is approximately the width of your little finger. The meteris a little longer than a yard.

  12. Weight: Gram The milligramis the smallest unit, about the weight of a hair. The gramis approximately the weight of a raisin. The kilogramis a about 2 pounds or the weight of the textbook.

  13. Capacity: Liter The milliliteris the smallest unit, about as much as an eyedropper contains. The literis slightly more than a quart.

  14. Conversions You can use the same process we used for converting U.S. units or use the following conversions.

  15. Examples • 2.4 g = ____ mg • 700 m = ____ km • 7 L = ____ ml • Express 5 km in millimeters. • Which is the most appropriate for the length of a pencil? (a) 20 mm, (b) 20 cm, (c) 20 m. • Vitamin C commonly comes in pills with a strength of 500 mg. How many of the pills will an adult need to take if she wants a dosage of half a gram?

  16. Metric/U.S. Customary Unit Conversions

  17. Examples • Express 4 oz in grams. • Express 12 cm in inches • 6 qt = ____ L • A prehistoric bird had a wingspan of 8 m. Express this wingspan in feet.

  18. 10.2b – Basic Geometry Conversions • Length is an expression of a distance along a line, such as the perimeter around your house. • What is the perimeter of these figures? 3 ft 3 ft 2 ft 3 ft 1 ft

  19. 10.2b – Basic Geometry Conversions • Area is the number of square units a two-dimensional figure contains, such as the floor of your house. • Determine the area of the figures below and then convert them to in2. One ft2 = 144 in2. Why is this? 4 ft 2 ft 3 ft 5 ft

  20. 10.2b – Basic Geometry Conversions • Volume is the number of cubic units required to fill a three-dimensional figure, such as the amount of space inside your refrigerator. • Determine the volume of the figure below and convert it to in3. One ft3 = 1728 in3. Why is this? r = 2 ft 5 ft h = 4 ft 2 ft r is the radius of the circular top. 3 ft

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