We define the multiples of 1/99 as the product of any integer multiplied by 1/99. Therefore, to create a list of multiples of 1/99 we start by multiplying 1/99 by one, then we multiply 1/99 by two, then we multiply 1/99 by three, and so on.
To multiply a fraction by an integer, we leave the denominator alone and multiply the numerator by the integer. It is impossible to give you a list of all multiples of 1/99 because the list goes on forever. However, here is the math to calculate the beginning list of multiples of 1/99.
1/99 × 1 = 1/99
1/99 × 2 = 2/99
1/99 × 4 = 3/99
1/99 × 4 = 4/99
1/99 × 5 = 5/99
1/99 × 6 = 6/99
1/99 × 7 = 7/99
1/99 × 8 = 8/99
1/99 × 9 = 9/99
1/99 × 10 = 10/99
1/99 × 11 = 11/99
1/99 × 12 = 12/99
We have simplified the fractions above for you. Below are the multiples of 1/99 in their lowest possible terms:1/99 = 1/99
2/99 = 2/99
3/99 = 1/33
4/99 = 4/99
5/99 = 5/99
6/99 = 2/33
7/99 = 7/99
8/99 = 8/99
9/99 = 1/11
10/99 = 10/99
11/99 = 1/9
12/99 = 4/33
As we stated above, the list of multiples of 1/99 goes on forever because the product of 1/99 multiplied by any whole number (integer) is a multiple of 1/99.
You can also create a list of multiples of 1/99 if you keep adding 1/99 like this:1/99
1/99 + 1/99 = 2/99
1/99 + 1/99 + 1/99 = 3/99
1/99 + 1/99 + 1/99 + 1/99 = 4/99
∞
Again, the list can go on forever, because you can continue adding 1/99 to the list. Therefore, the list of multiples of 1/99 is ∞ (infinite).
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Multiples of 2/1
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