Chapter 3 DeCiMalS 67SOLUTIONS- 1.71 = 1 171
100
10071 = - 34.598 = 34 34 598
1000
1000598 = , - 0.6 =^6
10 - 0.289421 = 289 421
1 000 000
,
,,There are two types of decimal numbers—terminating and nonterminating.
The numbers in the above problems are terminating decimal numbers. A
nonterminating decimal number has infinitely many nonzero digits following
the decimal point. For example, 0.333333333... is a nonterminating decimal
number. Some nonterminating decimal numbers represent fractions, such as
0.333333333... =^13. But some nonterminating decimals, such as π =
3.1415926654... and 2 = 1.414213562..., do not represent fractions. We
will be concerned mostly with terminating decimal numbers in this book.
We can add as many zeros at the end of a terminating decimal number as
we want because the extra zeros can be divided out.07 7
10070 70
100710
10 107
100 700^700
10007===⋅
⋅===⋅^1100
10 1007
⋅ 10=Adding and Subtracting Decimal Numbers
In order to add or subtract decimal numbers, each number needs to have the same
number of digits behind the decimal point. Writing the problem vertically helps
us avoid the common problem of adding the numbers incorrectly. For instance,
1.2 + 3.41 is not 4.43. The “2” needs to be added to the “4,” not to the “1.”1.20 (Add as many zeros at the end as needed.)
- 4.43
5.63
SOLUTIONS- 1.71
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