Introduction to i and Imaginary Numbers
-
Not SyncedIn this video, I want to introduce you to the number i,
-
Not Syncedwhich is sometimes called the imaginary, imaginary unit
-
Not SyncedWhat you're gonna see here, and it might be a little bit difficult,
-
Not Syncedto fully appreciate, is that its a more bizzare number than
-
Not Syncedsome of the other wacky numbers we learn in mathematics,
-
Not Syncedlike pi, or e. And its more bizzare because it doesnt have a tangible value
-
Not Syncedin the sense that we normally, or are used to defining numbers.
-
Not Synced"i" is defined as the number whose square is equal to negative 1.
-
Not SyncedThis is the definition of "i", and it leads to all sorts of interesting things.
-
Not SyncedNow some places you will see "i" defined this way;
-
Not Synced"i" as being equal to the principle square root of negative one.
-
Not SyncedI want to just point out to you that this is not wrong, it might make sense to you,
-
Not Syncedyou know something squared is negative one, then maybe
-
Not Syncedits the principle square root of negative one.
-
Not SyncedAnd so these seem to be almost the same statement,
-
Not Syncedbut I just want to make you a little bit careful, when you do this
-
Not Syncedsome people will even go so far as to say this is wrong,
-
Not Syncedand it actually turns out that they are wrong to say that this is wrong.
-
Not SyncedBut, when you do this you have to be a little bit careful about what it means
-
Not Syncedto take a principle square root of a negative number, and it being defined
-
Not Syncedfor imaginary, and we'll learn in the future, complex numbers.
-
Not SyncedBut for your understanding right now, you dont have to differentiate them,
-
Not Syncedyou don't have to split hairs between any of these definitions.
-
Not SyncedNow with this definition, let us think about what these different powers of "i" are.
-
Not Syncedbecause you can imagine, if something squared is negative one,
-
Not Syncedif I take it to all sorts of powers, maybe that will give us weird things.
-
Not SyncedAnd what we'll see is that the powers of "i" are kind of neat,
-
Not Syncedbecause they kind of cycle, where they do cycle, through a whole set of values.
-
Not SyncedSo I could start with, lets start with "i" to the zeroth power.
-
Not SyncedAnd so you might say, anything to the zeroth power is one,
-
Not Syncedso "i" to the zeroth power is one, and that is true.
-
Not SyncedAnd you could actually derive that even from this definition,
-
Not Syncedbut this is pretty straight forward; anything to the zeroth power, including "i" is one.
-
Not SyncedThen you say, ok, what is "i" to the first power,
-
Not Syncedwell anything to the first power is just that number times itself once.
-
Not SyncedSo that's justgoing to be "i".
-
Not SyncedReally by the definition of what it means to take an exponent,
-
Not Syncedso that completely makes sense.
-
Not SyncedAnd then you have "i" to the second power.
-
Not Synced"i" to the second power, well by definition,
-
Not Synced"i" to the second power is equal to negative one.
-
Not SyncedLets try "i" to the third power ill do this in a color i haven't used.
-
Not Synced"i" to the third power, well that's going to be "i" to the second power times "i"
-
Not SyncedAnd we know that "i" to the second power is negative one,
-
Not Syncedso its negative one times "i" let me make that clear.
-
Not SyncedThis is the same thing as this, which is the same thing as that,
-
Not Synced"i" squared is negative one.
-
Not SyncedSo you multiply it out, negative one times "i" equals negative "i".
-
Not SyncedNow what happens when you take "i" to the fourth power,
- Title:
- Introduction to i and Imaginary Numbers
- Description:
-
more » « less
Introduction to i and imaginary numbers
- Video Language:
- English
- Team:
Khan Academy
- Duration:
- 05:20
|
qwertyuiopghb edited English subtitles for Introduction to i and Imaginary Numbers | |
|
|
qwertyuiopghb added a translation |