![]() And so these seem to be almost the same statement, but I just want to make you a little bit careful, when you do this some people will even go so far as to say this is wrong, and it actually turns out that they are wrong to say that this is wrong. I want to just point out to you that this is not wrong, it might make sense to you, you know something squared is negative one, then maybe its the principle square root of negative one. Now some places you will see "i" defined this way "i" as being equal to the principle square root of negative one. This is the definition of "i", and it leads to all sorts of interesting things. ![]() "i" is defined as the number whose square is equal to negative 1. ![]() And its more bizzare because it doesnt have a tangible value in the sense that we normally, or are used to defining numbers. In this video, I want to introduce you to the number i, which is sometimes called the imaginary, imaginary unit What you're gonna see here, and it might be a little bit difficult, to fully appreciate, is that its a more bizzare number than some of the other wacky numbers we learn in mathematics, like pi, or e.
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |