If you were to describe the inverse unit circle, you would probably say it was a circle with a radius of one. The inverse unit circle is, in fact, a circle with a radius of pi.

For those of you who’ve been thinking about this for a while, you might be wondering what the inverse unit circle is. It’s a circle made by squaring pi.

The inverse unit circle is, however, much more in-depth than the unit circle. It is the circle made by squaring pi squared and dividing by pi.

Pi is a number greater than one, and the inverse unit circle is the circle of radius one. If you’ve ever wondered what pi is, you can find it on Wikipedia. It’s the smallest number that can be factored into primes. In other words, the number pi is the smallest number that can be factored into prime numbers.

In this video, the inventor of the inverse unit circle explains the concept and what it is.

In a nutshell, the inverse unit circle is the circle made by squaring pi squared and dividing by pi. Pi is a number greater than one, and the inverse unit circle is the circle of radius one. When we square pi (pi squared) and then divide it by pi, the result is the circle of radius one—and that means this circle is what we’re trying to find.

In the video the inventor of the inverse unit circle explains what the circle of radius one is, and also how it came to be. He’s doing this by squaring pi (pi squared) and then dividing it by pi. Pi squared is a number greater than 1, and the circle of radius one is the circle that you make when you square pi (pi squared) and then divide it by pi.

The inverse of a unit is a unit, so when we square pi pi squared and then divide it by pi, we get a circle of radius one. Now that is a very special circle, though, because it’s the inverse of a unit circle. That gives us the inverse of the unit circle, or better, the inverse of the unit circle.

Imagine you are the person who makes a unit circle of radius one and you want to take it apart. It’s easy in the sense that you need to find the center point of the unit circle, find the radius of that circle, then you can take the square root of that number, which is the inverse of the radius of the unit circle. But this is a very, very special circle, because it’s the inverse of a unit circle.