In the first two parts,
representing, adding, and subtracting numbers using base ten blocks were
explained. The use of base ten blocks gives students an effective tool
that they can touch and manipulate to solve math questions. Not only are
base ten blocks effective at solving math questions, they teach
students important steps and skills that translate directly into paper
and pencil methods of solving math questions. Students who first use
base ten blocks develop a stronger conceptual understanding of place
value, addition, subtraction, and other math skills. Because of their
benefit to the math development of young people, educators have looked
for other applications involving base ten blocks. In this article, a
variety of other applications will be explained.
Multiplying One- and Two-Digit Numbers
One common way of teaching
multiplication is to create a rectangle where the two factors become the
two dimensions of a rectangle. This is easily accomplished using graph
paper. Imagine the question 7 x 6. Students colour or shade a rectangle
seven squares wide and six squares long; then they count the number of
squares in their rectangle to find the product of 7 x 6. With base ten
blocks, the process is essentially the same except students are able to
touch and manipulate real objects which many educators say has a greater
effect on a student's ability to understand the concept. In the
example, 5 x 8, students create a rectangle 5 cubes wide by 8 cubes
long, and they count the number of cubes in the rectangle to find the
product.
Multiplying two-digit numbers is
slightly more complicated, but it can be learned fairly quickly. If both
factors in the multiplication question are two-digit numbers, the
flats, the rods, and the cubes might all be used. In the case of
two-digit multiplication, the flats and the rods just quicken the
procedure; the multiplication could be accomplished with just cubes. The
procedure is the same as for one-digit multiplication - the student
creates a rectangle using the two factors as the dimensions of the
rectangle. Once they have built the rectangle, they count the number of
units in the rectangle to find the product. Consider the multiplication,
54 x 25. The student needs to create a rectangle 54 cubes wide by 25
cubes long. Since that might take a while, the student can use a
shortcut. A flat is simply 100 cubes, and a rod is simply 10 cubes, so
the student builds the rectangle filling in the large areas with flats
and rods. In its most efficient form, the rectangle for 54 x 25 is 5
flats and four rods in width (the rods are arranged vertically), and 2
flats and five rods in length (with the rods arranged horizontally). The
rectangle is filled in with flats, rods, and cubes. In the whole
rectangle, there are 10 flats, 33 rods, and 20 cubes. Using the values
for each base ten block, there is a total of (10 x 100) + (33 x 10) +
(20 x 1) = 1350 cubes in the rectangle. Students can count each type of
base ten block separately and add them up.
Division
Base ten blocks are so flexible,
they can even be used to divide! There are three methods for division
that I will describe: grouping, distributing, and modified multiplying.
To divide by grouping, first
represent the dividend (the number you are dividing) with base ten
blocks. Arrange the base ten blocks into groups the size of the divisor.
Count the number of groups to find the quotient. For example, 348
divided by 58 is represented by 3 flats, 4 rods, and 8 cubes. To arrange
348 into groups of 58, trade the flats for rods, and some of the rods
for cubes. The result is six piles of 58, so the quotient is six.
Dividing by distributing is the
old "one for you and one for me" trick. Distribute the dividend into the
same number of piles as the divisor. At the end, count how many piles
are left. Students will probably pick up the analogy of sharing quite
easily - i.e. We need to give everyone an equal number of base ten
blocks. To illustrate, consider 192 divided by 8. Students represent 192
with one flat, 9 rods and 2 cubes. They can distribute the rods into
eight groups easily, but the flat has to be traded for rods, and some
rods for cubes to accomplish the distribution. In the end, they should
find that there are 24 units in each pile, so the quotient is 24.
To multiply, students create a
rectangle using the two factors as the length and width. In division,
the size of the rectangle and one of the factors is known. Students
begin by building one dimension of the rectangle using the divisor. They
continue to build the rectangle until they reach the desired dividend.
The resulting length (the other dimension) is the quotient. If a student
is asked to solve 1369 divided by 37, they begin by laying down three
rods and seven cubes to create one dimension of the rectangle. Next,
they lay down another 37, continuing the rectangle, and check to see if
they have the required 1369 yet. Students who have experience with
estimating might begin by laying down three flats and seven rods in a
row (rods vertically arranged) since they know that the quotient is
going to be larger than ten. As students continue, they may recognize
that they can replace groups of ten rods with a flat to make counting
easier. They continue until the desired dividend is reached. In this
example, students find the quotient is 37.
Changing the Values of Base Ten Blocks
Up until now, the value of the
cube has been one unit. For older students, there is no reason why the
cube couldn't represent one tenth, one hundredth, or one million. If the
value of the cube is redefined, the other base ten blocks, of course,
have to follow. For example, redefining the cube as one tenth means the
rod represents one, the flat represents ten, and the block represents
one hundred. This redefinition is useful for a decimal question such as
54.2 + 27.6. A common way to redefine base ten blocks is to make the
cube one thousandth. This makes the rod one hundredth, the flat one
tenth, and the block one whole. Besides the traditional definition, this
one makes the most sense, since a block can be divided into 1000 cubes,
so it follows logically that one cube is one thousandth of the cube.
Representing and Working With Large Numbers
Numbers don't stop at 9,999 which
is the maximum you can represent with a traditional set of base ten
blocks. Fortunately, base ten blocks come in a variety of colors. In
math, the ones, tens, and hundreds are called a period. The thousands,
ten thousands, and hundred thousands are another period. The millions,
ten millions and hundred millions are the third period. This continues
where every three place values is called a period. You may have figured
out by now that each period can be represented by a different colour of
place value block. If you do this, you eliminate the large blocks and
just use the cubes, rods, and flats. Let us say that we have three sets
of base ten blocks in yellow, green, and blue. We'll call the yellow
base ten blocks the first period (ones, tens, hundreds), the green
blocks the second period, and the blue blocks the third period. To
represent the number, 56,784,325, use 5 blue rods, 6 blue cubes, 7 green
flats, 8 green rods, 4 green cubes, 3 yellow flats, 2 yellow rods, and 5
yellow cubes. When adding and subtracting, trading is accomplished by
recognizing that 10 yellow flats can be traded for one green cube, 10
green flats can be traded for one blue cube, and vice-versa.
Integers
Base ten blocks can be used to add
and subtract integers. To accomplish this, two colours of base ten
blocks are required - one colour for negative numbers and one colour for
positive numbers. The zero principle states that an equal number of
negatives and an equal number of positives add up to zero. To add using
base ten blocks, represent both numbers using base ten blocks, apply the
zero principle and read the result. For example (-51) + (+42) could be
represented with 5 red rods, 1 red cube, 4 blue rods, and 2 blue cubes.
Immediately, the student applies the zero principle to four red and four
blue rods and one red and one blue cube. To finish the problem, they
trade the remaining red rod for 10 red cubes and apply the zero
principle to the remaining blue cube and one of the red cubes. The end
result is (-9).
Subtracting means taking away. For
instance, (-5) - (-2) is represented by taking two red cubes from a
pile of five red cubes. If you can't take away, the zero principle can
be applied in reverse. You can't take away six blue cubes in (-7) - (+6)
because there aren't six blue cubes. Since a blue cube and a red cube
is just zero, and adding zero to a number doesn't change it, simply
include six blue cubes and six red cubes with the pile of seven red
cubes. When six blue cubes are taken from the pile, 13 red cubes remain,
so the answer to (-7) - (+6) is (-13). This procedure can, of course,
be applied to larger numbers, and the process might involve trading.
Other Uses
By no means have I explained all
of the uses of base ten blocks, but I have covered most of the major
uses. The rest is up to your imagination. Can you think of a use for
base ten blocks when teaching powers of ten? How about using base ten
blocks for fractions? So many math skills can be learned using base ten
blocks simply because they represent our numbering system - the base ten
system. Base ten blocks are just one of many excellent manipulatives
available to teachers and parents that give students a strong conceptual
background in math.
The base ten blocks skills described above can be applied using worksheets from http://www.math-drills.com. The worksheets come with answer keys, so students can get feedback on their ability to correctly use base ten blocks.
Deepa Singh
Business Developer
Web Site:-http://www.gyapti.com
Blog:- http://gyapti.blogspot.com/
Email Id:-deepa.singh@soarlogic.com
Business Developer
Web Site:-http://www.gyapti.com
Blog:- http://gyapti.blogspot.com/
Email Id:-deepa.singh@soarlogic.com
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