example

Nick ran a $10$-kilometer race. How many meters did he run? (credit: William Warby, Flickr) Solution We will convert kilometers to meters using the Identity Property of Multiplication and the equivalencies in the reference table from earlier.

	$10$ kilometers
Multiply the measurement to be converted by $1$.	$10 \color{red}{km}\cdot 1$
Write $1$ as a fraction relating kilometers and meters.	$10 \color{red}{km}\cdot\dfrac{1000 m}{1\color{red}{km}}$
Simplify.	$\dfrac{10\color{red}{km}\cdot 1000 m}{1\color{red}{km}}$
Multiply.	$10,000$ m
	Nick ran $10,000$ meters.

example

Eleanor’s newborn baby weighed $3200$ grams. How many kilograms did the baby weigh?

Answer: Solution We will convert grams to kilograms.

	$3200 \color{red}{grams}$
Multiply the measurement to be converted by $1$.	$3200 \color{red}{g}\cdot 1$
Write $1$ as a fraction relating kilograms and grams.	$3200 \color{red}{g}\cdot\dfrac{1 kg}{1000 \color{red}{g}}$
Simplify.	$3200 \color{red}{g}\cdot\dfrac{1 kg}{1000 \color{red}{g}}$
Multiply.	$\dfrac{3200 kilograms}{1000}$
Divide.	$3.2$ kilograms
	The baby weighed $3.2$ kilograms.

example

1. Convert $350$ liters to kiloliters 2. Convert $4.1$ liters to milliliters.

Answer: Solution 1. We will convert liters to kiloliters. In the reference table, we see that $1\text{ kiloliter}=1000\text{ liters}$.

	$350 L$
Multiply by $1$, writing $1$ as a fraction relating liters to kiloliters.	$350 L \cdot\dfrac{1 kl}{1000 L}$
Simplify.	$350 \color{blue}{L} \cdot\dfrac{1 kl}{1000 \color{blue}{L}}$
Move the decimal $3$ units to the left.
	$0.35$ kL

2. We will convert liters to milliliters. In the reference table, we see that $\text{1 liter}=1000\text{milliliters.}$

	$4.1 L$
Multiply by $1$, writing $1$ as a fraction relating milliliters to liters.	$4.1 L \cdot\dfrac{1000 ml}{1 L}$
Simplify.	$4.1 \color{blue}{L} \cdot\dfrac{1000 ml}{1 \color{blue}{L}}$
Move the decimal $3$ units to the right.
	$4100 mL$

example

Ryland is $1.6$ meters tall. His younger brother is $85$ centimeters tall. How much taller is Ryland than his younger brother?

Answer: Solution We will subtract the lengths in meters. Convert $85$ centimeters to meters by moving the decimal $2$ places to the left; $85$ cm is the same as $0.85$ m. Now that both measurements are in meters, subtract to find out how much taller Ryland is than his brother. \begin{array}{}\\ \\ \hfill \text{1.60 m}\\ \hfill \underset{\text{_______}}{\text{-0.85 m}}\\ \hfill \text{0.75 m}\end{array} Ryland is $0.75$ meters taller than his brother.

example

Dena’s recipe for lentil soup calls for $150$ milliliters of olive oil. Dena wants to triple the recipe. How many liters of olive oil will she need?

Answer: Solution We will find the amount of olive oil in milliliters then convert to liters.

	Triple $150\text{mL}$
Translate to algebra.	$3\cdot 150\text{mL}$
Multiply.	$450\text{mL}$
Convert to liters.	$450\text{mL}\cdot\dfrac{0.001\text{L}}{1\text{mL}}$
Simplify.	$0.45\text{L}$
	Dena needs $0.45$ liter of olive oil.