Let’s use decimals to describe increases and decreases.
A calculator gives the following decimal expansions for some unit fractions:
$\frac12 = 0.5$
$\frac13 =0.3333333$
$\frac14 = 0.25$
$\frac15 = 0.2$
$\frac16 = 0.1666667$
$\frac17 = 0.142857143$
$\frac18 = 0.125$
$\frac19 = 0.1111111$
$\frac{1}{10} = 0.1 $
$ \frac{1}{11}=0.0909091$
What do you notice? What do you wonder?
Use long division to express each fraction as a decimal.
$\frac{9}{25}$
$\frac{11}{30}$
$\frac{4}{11}$
Match each diagram with a description and an equation.
Diagrams:
Descriptions:
An increase by $\frac14$
An increase by $\frac13$
An increase by $\frac23$
A decrease by $\frac15$
A decrease by $\frac14$
Equations:
$y=1.\overline{6}x$
$y=1.\overline{3}x$
$y=0.75x$
$y=0.4x$
$y=1.25x$
Your teacher will give you a set of cards that have proportional relationships represented 2 different ways: as descriptions and equations. Mix up the cards and place them all face-up.
Take turns with a partner to match a description with an equation.
Long division gives us a way of finding decimal expansions for fractions.
For example, to find a decimal expansion for $\frac{9}{8}$, we can divide 9 by 8.
So $\frac{9}{8} = 1.125$.
\(\require{enclose} \begin{array}{r} 1.125 \\[-3pt] 8 \enclose{longdiv}{9.000}\kern-.2ex \\[-3pt] \underline{8{\phantom{.0}}} \phantom{00} \\[-3pt] 1\phantom{.}0\phantom{00} \\[-3pt] \underline{8\phantom{0}}\phantom{0} \\[-3pt] 20\phantom{0} \\[-3pt] \underline{16\phantom{0}} \\[-3pt] \phantom{0} 40 \\[-3pt] \underline{40} \\[-3pt] 0 \\ \end{array}\)
Sometimes it is easier to work with the decimal expansion of a number, and sometimes it is easier to work with its fraction representation. It is important to be able to work with both. For example, consider the following pair of problems:
Since $\frac{6}{5}=1.2$, these are both exactly the same problem, and the answer is $\frac{6}{5}x$ or $1.2x$.
When we work with percentages in later lessons, the decimal representation will come in especially handy.
A repeating decimal is an infinite decimal expansion that eventually repeats the same sequence of digits over and over again. The repeated sequence is indicated by a line above it.
