# every rational number is a real number

This little song is a great reminder that all rational numbers are the same and therefore all numbers are real. It’s also a song that has a perfect use in this article: to remind us that each rational number is a real number. This is why numbers are so useful.

Every rational number is a real number. If you were to take all rational numbers and put them in an equation, they would look like this: a + b = c. This is because a + b = c. This is because a and b are both rational numbers. You can also see this in the following equation: a^2 + b^2 = c^2.

this is also why a lot of the rational numbers are irrational, because a number that is irrational is also a rational number. Every rational number is actually a number.

The most common number is b and the most common number is c, meaning the most rational number is b. The number a is the most rational number is c. The number a is irrational is a rational number.

As you can see, every rational number is actually a number, but a number that isn’t rational is an irrational number. In a way, it’s kind of like being able to see the number that isn’t a fraction. So b is a rational number because b2 = b, which means that a = b. In the same way, c is a rational number because c2 = c, which means a = c.

It’s also interesting to compare the two rational numbers. If a is a number of an irrational number, the most rational number is the least irrational number. So c is the least rational number because it is the most irrational. So, a is the least rational number because a is less than b and less than c, which means a is less rational than b and less than c.

This may be a little confusing, but it’s kind of like how the two rational numbers a and b and the irrational number c are both less than a. This is because the most rational number can be less than the least rational number, but that doesn’t mean that the two rational numbers are the same.

Every rational number has a “logical” part. The most rational number is the one that has the least number of logical parts. In this case, the most rational number, the one which has the least number of logical parts is the one that has the least number of rational parts. This is because the number that has the least number of logical parts is less than the number that has the least number of rational parts.

For example, all the rational numbers less than two are less than the rational number zero. If you have a rational number that is less than two, you can take the rational part out, put it in the rational number zero, and then put that back into the rational number, because the number that has the least number of rational parts is still less than the rational number zero.

So you can see that this principle is quite important to us. In fact, we’ve used it in our own lives to make it much easier to evaluate our decisions and to help us to stay focused on the right things. For example, we use it to make decisions about things like how many cookies we should buy, how many we should eat, and how much money we should spend.

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