Multiplication can Increase or Decrease a Number
Multiplication can Increase or Decrease a Number
Question: Does multiplication always increase a
number?
Misconception
Yes it does; take the number 8, for example:
2 × 8 = 16
3 × 8 = 24
4 × 8 = 32
In each it is getting larger, so, yes, multiplication
clearly increases a number.
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Correct
No – it increases a number only under certain
conditions.
Multiplying any positive number by a whole number
greater than 1 will always increase its value – see
the example opposite; but consider
; here the number 8 is reduced.
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Further Explanation
So, multiplying can have a reducing effect when multiplying a
positive number by a fraction which is less than one. But this
can still be confusing. While we accept the above, the concept of
' a number times 8' continues to be perceived as an increase. How
then can we attach a meaning to 1 2 8 ´ so that this will be
perceived as decreasing? When multiplying by a whole positive
number, e.g. 6 times 5, we understand this as being 5 added over
and over again, how ever many times – six times in this
example. But this interpretation of times does not quite work
with fractions. If we ask how many times , the answer is
"not quite once" . Again we need to put the term
multiplying into a context with which we can identify, and which
will then make the situation meaningful. We want to buy 30 roses
which are sold in bunches of 5, so we ask for "6 of the
5-rose bunches". In this way, the word times also often
means of. If we try using the word of when times appears to have
an unclear meaning, we get 1 2 of 8 rather than 1 2 times 8.
Indeed we know what 1 2 of 8 means – namely 4.} }
So, by using of instead of times we are able to understand the
concept of multiplying by a fraction and how this can have a
reducing effect when the fraction is smaller than 1. This also
helps us to understand how we multiply by a fraction, and why the
method works: the 4 which results from 1 2 8 ´ (or 1 2 of 8) can
be reached by dividing 8 by 2; similarly, the 5 which results
from 1 3 15 ´ (or 1 3 of 15), (or a third of fifteen) can be
reached by dividing 15 by 3. Generalising this result gives:} }
Negative numbers
When your bank balance is +4 pounds you have £4. When your
bank balance is –4 pounds you owe £4. Owing is the opposite
of having , so we find that we can associate the concept of
'minus' with '(the) opposite (of) '. This also works in reverse.
Thus, ( ) - ´ 4 8 means " owing £4, eight times over"
or "owing £32" which is - £32 . Now - 32 is smaller
than 8, so we have illustrated another case where multiplying has
a reducing effect, i.e. when multiplying by a negative number.
Note that, using the method shown above, it follows that - ´ =-
1 8 8 , and vice versa.} }
Exercise
Are the following statements:
- sometimes false
- always true and always false
- sometimes true
- Multiplication of a positive number by a number greater
than 1 always increases the number.
- Multiplication of a positive number by a positive number
between 0 and 1 always increases the number.
- Multiplication of a negative number by a positive number
always increases the first number.} }
Solution
- Always true
- Always false, as multiplication of a positive number by a
number between 0 and 1 will always reduce the number.
(e.g. }{\f1\fs22 1 2 12 6 ´ = , }{\f1\fs22 1 3 12 4 ´ =
, etc.)
- Sometimes false and sometimes true; e.g. for the number
– 8, }{\f1\fs22 2 8 16 ´ - }{\f2\fs29 ( ) = -
}{\f1\fs22 , so the number is decreased, whereas the
number increases in the example below:} }
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