1.10 Systems of measurement

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By the end of this section, you will be able to:

Make unit conversions in the US system
Use mixed units of measurement in the US system
Make unit conversions in the metric system
Use mixed units of measurement in the metric system
Convert between the US and the metric systems of measurement
Convert between Fahrenheit and Celsius temperatures

A more thorough introduction to the topics covered in this section can be found in the Prealgebra chapter, The Properties of Real Numbers .

Make unit conversions in the u.s. system

There are two systems of measurement commonly used around the world. Most countries use the metric system. The U.S. uses a different system of measurement, usually called the U.S. system . We will look at the U.S. system first.

The U.S. system of measurement uses units of inch, foot, yard, and mile to measure length and pound and ton to measure weight. For capacity, the units used are cup, pint, quart, and gallons. Both the U.S. system and the metric system measure time in seconds, minutes, and hours.

The equivalencies of measurements are shown in [link] . The table also shows, in parentheses, the common abbreviations for each measurement.

U.S. System of Measurement
$\begin{matrix} Length & \begin{matrix} 1 foot (ft.) & = & 12 inches (in.) \\ 1 yard (yd.) & = & 3 feet (ft.) \\ 1 mile (mi.) & = & 5,280 feet (ft.) \end{matrix} \end{matrix}$	$\begin{matrix} Volume & \begin{matrix} 3 teaspoons (t) & = & 1 tablespoon (T) \\ 16 tablespoons (T) & = & 1 cup (C) \\ 1 cup (C) & = & 8 fluid ounces (fl. oz.) \\ 1 pint (pt.) & = & 2 cups (C) \\ 1 quart (qt.) & = & 2 pints (pt.) \\ 1 gallon (gal) & = & 4 quarts (qt.) \end{matrix} \end{matrix}$
$\begin{matrix} Weight & \begin{matrix} 1 pound (lb.) & = & 16 ounces (oz.) \\ 1 ton & = & 2000 pounds (lb.) \end{matrix} \end{matrix}$	$\begin{matrix} Time & \begin{matrix} 1 minute (min) & = & 60 seconds (sec) \\ 1 hour (hr) & = & 60 minutes (min) \\ 1 day & = & 24 hours (hr) \\ 1 week (wk) & = & 7 days \\ 1 year (yr) & = & 365 days \end{matrix} \end{matrix}$

In many real-life applications, we need to convert between units of measurement, such as feet and yards, minutes and seconds, quarts and gallons, etc. We will use the identity property of multiplication to do these conversions. We’ll restate the identity property of multiplication here for easy reference.

Identity property of multiplication

$\begin{matrix} For any real number a : & a \cdot 1 = a 1 \cdot a = a \\ 1 is the multiplicative identity \end{matrix}$

To use the identity property of multiplication, we write 1 in a form that will help us convert the units. For example, suppose we want to change inches to feet. We know that 1 foot is equal to 12 inches, so we will write 1 as the fraction $\frac{1 foot}{12 inches} .$ When we multiply by this fraction we do not change the value, but just change the units.

But $\frac{12 inches}{1 foot}$ also equals 1. How do we decide whether to multiply by $\frac{1 foot}{12 inches}$ or $\frac{12 inches}{1 foot} ?$ We choose the fraction that will make the units we want to convert from divide out. Treat the unit words like factors and “divide out” common units like we do common factors. If we want to convert $66$ inches to feet, which multiplication will eliminate the inches?

$Two expressions are given: 66 inches times the fraction (1 foot) over (12 inches), and 66 inches times the fraction (12 inches) over (1 foot). This second expression is crossed out. Below this, it is stated that “The first form works since 66 inches times the fraction (1 foot) over (12 inches), with inches crossed off in both instances.$

The inches divide out and leave only feet. The second form does not have any units that will divide out and so will not help us.

How to make unit conversions

MaryAnne is 66 inches tall. Convert her height into feet.

Solution

$A table is given with three columns. In the first column are directions. The second column has exposition, and the third column has the mathematical steps. In the first row, the direction is “Step 1. Multiply the measurement to be converted by; write as a fraction relating the units given and the units needed.” The exposition is “Multiply inches by, writing as a fraction relating inches and feet. We need inches in the denominator so that the inches will divide out!” The mathematical step is 66 inches times the fraction (1 foot) over (12 inches).$ $In the following row, we have “Step 2. Multiply.” The hint is “Think of 66 inches as the quantity 66 inches divided by 1.” The math portion is the fraction (66 inches times 1 foot) over 12 inches.$ $In the following row, we have “Step 3. Simplify the fraction.” The hint is that “Notice: inches divide out.” We obtain 66 feet divided by 12.$ Then the last step is “Step 4. Simplify.” The hint is “Divide 66 by 12.” Hence, our final mathematical statement is 5.5 feet.

Then the last step is “Step 4. Simplify.” The hint is “Divide 66 by 12.” Hence, our final mathematical statement is 5.5 feet.

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Lexie is 30 inches tall. Convert her height to feet.

2.5 feet

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Rene bought a hose that is 18 yards long. Convert the length to feet.

54 feet

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Questions & Answers

A golfer on a fairway is 70 m away from the green, which sits below the level of the fairway by 20 m. If the golfer hits the ball at an angle of 40° with an initial speed of 20 m/s, how close to the green does she come?

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2. A sled plus passenger with total mass 50 kg is pulled 20 m across the snow (0.20) at constant velocity by a force directed 25° above the horizontal. Calculate (a) the work of the applied force, (b) the work of friction, and (c) the total work.

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Source: OpenStax, Elementary algebra. OpenStax CNX. Jan 18, 2017 Download for free at http://cnx.org/content/col12116/1.2

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