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 Grade 6 Math Activities
Excursion into Base 4
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Did you know that there are people in the world who count on their bodies? They don’t
say, “One, two, three,...” They say, “Thumb, forefinger, middle finger,...”
Did you know that some cultures at other times and in other places have based their number
systems on numbers other than 10?
Today, we use a number system based on 10, probably because we have ten fingers. A number
system based on ten is called a base-10 system. The Mayans used a base
of 20 (fingers and toes?), and the Babylonians used a base of 60 (not 60 fingers!?) in their
number systems. This activity allows your child to explore the fascinating world of a different
number system and to appreciate the extraordinary human accomplishment of representing number.
Here's what you need:
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| Paper and pencil |
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| Counters, such as dried beans |
Here's what you do:
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In this activity, your child first explores a different number system from the one he is
familiar with and then tries others. Base-4 is a good place to start. Our familiar base-10
number system uses 10 different symbols: 0, 1, 2, 3, 4, 5, 6, 7, 8, and 9; however, base-4
uses only 4 symbols: 0, 1, 2, and 3. Have your child count in base 4 and write the numbers
in order.
Base 4 counting begins just like familiar counting: 1, 2, 3. But then, how do you write
“four”? Unlike in familiar counting, there is no single symbol for it. The trick
is, you have to use two symbols together: 1 followed by 0, or in other words, “10.”
Five is then written as “11,” six as “12,” and seven as “13.”
What is happening is that the usual tens place has become the fours place, even though the ones place has stayed as the ones place. This
is why seven is written as 13: 1 four and 3 ones. What has the hundreds place become? To find
out, keep counting!
After seven comes eight. Seven used up the highest digit in the ones place, so the fours
place needs to change. After 13 comes 20. This makes sense because it means there are 2 fours
and 0 ones, and 2 fours make 8. Have your child continue counting in this way until using
at least four places (to “1,000” or more). It may help for him to imagine an
odometer with only the symbols 0, 1, 2, and 3. Can he give the value for each place? Can he
predict the value of the fifth place and the sixth place?
Keep going...
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After your child has explored counting in base 4, have him do some basic arithmetic in
base 4. Here are some problems to try:
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| 2 + 2 = 10 |
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| 2 + 3 = |
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| 13 + 20 = 33 |
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| 22 + 2 = |
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| 33 + 11 = 110 |
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| 10 + 12 = |
It can help to use counters (dried beans are good) to represent each number and then regroup
them to figure out how to record the total in base-4. Can your child find any ways to add
quickly and without counting? Ask him to explore other operations as well, such as subtraction
and multiplication. How is arithmetic in base-4 similar to or different from arithmetic in
base-10?
After exploring base-4, your child might want to try another base, such as base-3, base-8,
or base-12 (which would require inventing two new symbols for ten and eleven). He may also
become interested in learning about the history of numbers and other mathematical ideas. This
is a fascinating field, and many resources are available at libraries and on the Internet.
Your child’s experiences with different number systems may open the door to new perspectives
on mathematics!
Grade 6 Math Activities
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