Example

Convert 1 centimeter to kilometers.

Answer: Identify locations of kilometers and centimeters.

km	hm	dam	m	dm	cm	mm
^					^

Kilometers (km) are larger than centimeters (cm), so you expect there to be less than one km in a cm. Cm is 10 times smaller than a dm; a dm is 10 times smaller than a m, etc. Since you are going from a smaller unit to a larger unit, divide.

[latex]\div10[/latex]	[latex]\div10[/latex]	[latex]\div10[/latex]	[latex]\div10[/latex]	[latex]\div10[/latex]
km	hm	dam	m	dm	cm	mm
^	[latex]\leftarrow[/latex]	[latex]\leftarrow[/latex]	[latex]\leftarrow[/latex]	[latex]\leftarrow[/latex]	^

Divide: [latex]1\div10\div10\div10\div10\div10[/latex], to find the number of kilometers in one centimeter. 

[latex]1\text{ cm}\div10\div10\div10\div10\div10=0.00001\text{ km}[/latex]

1 centimeter (cm) = 0.00001 kilometers (km).

Example

Convert 7,225 centimeters to meters.

Answer: Meters is larger than centimeters, so you expect your answer to be less than 7,225.

[latex]7,225\text{ cm}=\text{___ m}[/latex]

Using the factor label method, write 7,225 cm as a fraction and use unit fractions to convert it to m.

[latex] \displaystyle \frac{7,225\ cm}{1}\cdot \frac{1\ m}{100\ cm}=\_\_\_ m[/latex]

Cancel similar units, multiply, and simplify.

[latex] \displaystyle \frac{7,225\ \cancel{cm}}{1}\cdot \frac{1\text{ m}}{100\ \cancel{\text{cm}}}=\_\_\_m[/latex]

[latex] \displaystyle \frac{7,225}{1}\cdot \frac{1\text{ m}}{100}=\frac{7,225}{100}\text{m}[/latex]

[latex] \displaystyle \frac{7,225\text{ m}}{100}=72.25\text{ m}[/latex]

[latex]7,225\text{ centimeters}=72.25\text{ meters}[/latex]

Example

Water freezes at 32°F. On the Celsius scale, what temperature is this?

Answer: A Fahrenheit temperature is given. To convert it to the Celsius scale, use the formula at the left.

[latex] C=\frac{5}{9}(F-32)[/latex]

Substitute 32 for F and subtract.

[latex] C=\frac{5}{9}(32-32)[/latex]

Any number multiplied by 0 is 0.

[latex] C=\frac{5}{9}(0)[/latex]

[latex] C=0[/latex]

The freezing point of water is [latex]0^{\circ}\text{C}[/latex].

Example

Two scientists are doing an experiment designed to identify the boiling point of an unknown liquid. One scientist gets a result of 120°C; the other gets a result of 250°F. Which temperature is higher and by how much?

Answer: One temperature is given in °C, and the other is given in °F. To find the difference between them, we need to measure them on the same scale. What is the difference between 120°C and 250°F? Use the conversion formula to convert 120°C to °F. (You could convert 250°F to °C instead; this is explained in the text after this example.)

[latex] F=\frac{9}{5}C+32[/latex]

Substitute 120 for C.

[latex] F=\frac{9}{5}(120)+32[/latex]

Multiply.

[latex] F=\frac{1080}{5}+32[/latex]

Simplify [latex] \frac{1080}{5}[/latex] by dividing numerator and denominator by 5.

[latex] F=\frac{1080\div 5}{5\div 5}+32[/latex]

Add [latex]216+32[/latex].

[latex] F=\frac{216}{1}+32[/latex]

You have found that [latex]120^{\circ}\text{C}=248^{\circ}\text{F}[/latex].

[latex] F=248[/latex]

To find the difference between 248°F and 250°F, subtract.

[latex]250^{\circ}\text{F}-248^{\circ}\text{F}=2^{\circ}\text{F}[/latex]

250°F is the higher temperature by 2°F.