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In the last few videos we learned that
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the configuration of electrons in an atom
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aren't in a simple, classical,
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Newtonian orbit configuration.
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And that's the Bohr model of the electron.
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And I'll keep reviewing it,
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just because I think it's an important point.
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If that's the nucleus, remember,
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it's just a tiny, tiny, tiny dot
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if you think about the entire volume of the actual atom.
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And instead of the electron being in orbits around it,
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which would be how a planet orbits the sun.
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Instead of being in orbits around it,
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it's described by orbitals,
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which are these probability density functions.
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So an orbital-- let's say that's the nucleus
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it would describe,
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if you took any point in space around the nucleus,
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the probability of finding the electron.
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So actually, in any volume of space around the nucleus,
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it would tell you the probability
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of finding the electron within that volume.
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And so if you were to just take
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a bunch of snapshots of electrons
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-- let's say in the 1s orbital.
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And that's what the 1s orbital looks like.
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You can barely see it there,
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but it's a sphere around the nucleus,
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and that's the lowest energy state that an electron can be in.
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If you were to just take a number of snapshots of electrons.
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Let's say you were to take a number of snapshots of helium,
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which has two electrons.
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Both of them are in the 1s orbital.
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It would look like this.
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If you took one snapshot, maybe it'll be there,
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the next snapshot, maybe the electron is there.
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Then the electron is there.
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Then the electron is there. Then it's there.
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And if you kept doing the snapshots,
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you would have a bunch of them really close.
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And then it gets a little bit sparser as you get out,
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as you get further and further out away from the electron.
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But as you see, you're much more likely
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to find the electron close to
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the center of the atom than further out.
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Although you might have had an observation with the electron
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sitting all the way out there, or sitting over here.
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So it really could have been anywhere,
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but if you take multiple observations,
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you'll see what that probability function is describing.
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It's saying look, there's a much lower probability of
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finding the electron out in this little cube of volume space
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than it is in this little cube of volume space.
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And when you see these diagrams
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that draw this orbital like this.
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Let's say they draw it like a shell, like a sphere.
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And I'll try to make it look three-dimensional.
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So let's say this is the outside of it,
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and the nucleus is sitting some place on the inside.
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They're just saying -- they just draw a cut-off
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-- where can I find the electron 90% of the time?
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So they're saying, OK, I can find the electron
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90% of the time within this circle,
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if I were to do the cross-section.
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But every now and then the electron
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can show up outside of that, right?
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Because it's all probabilistic.
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So this can still happen.
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You can still find the electron
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if this is the orbital we're talking about out here.
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Right?
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And then we, in the last video, we said,
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OK, the electrons fill up the orbitals
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from lowest energy state to high energy state.
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You could imagine it. If I'm playing Tetris--
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well I don't know if Tetris is the thing--
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but if I'm stacking cubes, I lay out cubes from low energy,
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if this is the floor,
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I put the first cube at the lowest energy state.
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And let's say I could put the second cube
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at a low energy state here.
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But I only have this much space to work with.
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So I have to put the third cube
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at the next highest energy state.
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In this case our energy would
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be described as potential energy, right?
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This is just a classical, Newtonian physics example.
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But that's the same idea with electrons.
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Once I have two electrons in this 1s orbital
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-- so let's say the electron configuration of helium is 1s2
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-- the third electron I can't put there anymore,
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because there's only room for two electrons.
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The way I think about it is these two electrons are now
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going to repel the third one I want to add.
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So then I have to go to the 2s orbital.
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And now if I were to plot the 2s orbital on top of this one,
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it would look something like this,
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where I have a high probability
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of finding the electrons in this shell
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that's essentially around the 1s orbital, right?
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So right now, if maybe I'm dealing with lithium right now.
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So I only have one extra electron.
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So this one extra electron,
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that might be where I observed that extra electron.
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But every now and then it could show up there,
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it could show up there, it could show up there,
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but the high probability is there.
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So when you say where is it going to be 90% of the time?
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It'll be like this shell that's around the center.
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Remember, when it's three-dimensional
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you would kind of cover it up.
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So it would be this shell.
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So that's what they drew here.
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They do the 1s.
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It's just a red shell.
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And then the 2s.
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The second energy shell is just this blue shell over it.
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And you can see it a little bit better in, actually,
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the higher energy orbits, the higher energy shells,
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where the seventh s energy shell is this red area.
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Then you have the blue area, then the red, and the blue.
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And so I think you get the idea
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that each of those are energy shells.
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So you kind of keep overlaying
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the s energy orbitals around each other.
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But you probably see this other stuff here.
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And the general principle, remember,
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is that the electrons fill up the orbital
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from lowest energy orbital to higher energy orbital.
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So the first one that's filled up is the 1s.
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This is the 1.
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This is the s.
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So this is the 1s.
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It can fit two electrons.
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Then the next one that's filled up is 2s.
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It can fill two more electrons.
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And then the next one, and this is where it gets interesting,
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you fill up the 2p orbital.
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2p orbital.
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That's this, right here.
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2p orbitals.
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And notice the p orbitals have something,
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p sub z, p sub x, p sub y.
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What does that mean?
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Well, if you look at the p-orbitals,
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they have these dumbbell shapes.
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They look a little unnatural, but I think in future videos
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we'll show you how they're analogous to standing waves.
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But if you look at these, there's three ways
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that you can configure these dumbbells.
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One in the z direction, up and down.
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One in the x direction, left or right.
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And then one in the y direction,
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this way, forward and backwards, right?
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And so if you were to draw--
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let's say you wanted to draw the p-orbitals.
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So this is what you fill next.
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And actually, you fill one electron here,
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another electron here, then another electron there.
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Then you fill another electron,
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and we'll talk about spin and things like that in the future.
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But, there, there, and there.
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And that's actually called Hund's rule.
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Maybe I'll do a whole video on Hund's rule,
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but that's not relevant to a first-year chemistry lecture.
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But it fills in that order, and once again,
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I want you to have the intuition of what this would look like.
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Look.
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I should put look in quotation marks,
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because it's very abstract.
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But if you wanted to visualize the p orbitals--
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let's say we're looking at
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the electron configuration for, let's say, carbon.
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So the electron configuration for carbon,
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the first two electrons go into, so, 1s1, 1s2.
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So then it fills-- sorry, you can't see everything.
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So it fills the 1s2, so carbon's configuration.
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It fills 1s1 then 1s2.
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And this is just the configuration for helium.
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And then it goes to the second shell,
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which is the second period, right?
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That's why it's called the periodic table.
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We'll talk about periods and groups in the future.
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And then you go here.
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So this is filling the 2s.
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We're in the second period right here.
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That's the second period.
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One, two.
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Have to go off, so you can see everything.
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So it fills these two.
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So 2s2.
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And then it starts filling up the p orbitals.
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So then it starts filling 1p and then 2p.
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And we're still on the second shell, so 2s2, 2p2.
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So the question is what would this look like
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if we just wanted to visualize this orbital
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right here, the p orbitals?
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So we have two electrons.
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So one electron is going to be in a-- Let's say if this is,
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I'll try to draw some axes.
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That's too thin.
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So if I draw a three-dimensional volume kind of axes.
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If I were to make a bunch of observations of, say,
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one of the electrons in the p orbitals,
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let's say in the pz dimension,
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sometimes it might be here, sometimes it might be there,
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sometimes it might be there.
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And then if you keep taking a bunch of observations,
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you're going to have something that looks like this bell shape,
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this barbell shape right there.
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And then for the other electron
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that's maybe in the x direction,
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you make a bunch of observations.
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Let me do it in a different,
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in a noticeably different, color.
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It will look like this.
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You take a bunch of observations, and you say,
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wow, it's a lot more likely to find that
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electron in kind of the dumbell, in that dumbbell shape.
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But you could find it out there.
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You could find it there.
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You could find it there.
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This is just a much higher probability of
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finding it in here than out here.
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And that's the best way I can think of to visualize it.
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Now what we were doing here,
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this is called an electron configuration.
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And the way to do it-- and there's multiple ways that are
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taught in chemistry class, but the way I like to do it
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-- is you take the periodic table and you say, these groups,
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and when I say groups I mean the columns,
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these are going to fill the s subshell or the s orbitals.
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You can just write s up here, just right there.
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These over here are going to fill the p orbitals.
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Actually, let me take helium out of the picture.
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The p orbitals.
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Let me just do that.
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Let me take helium out of the picture.
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These take the p orbitals.
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And actually, for the sake of figuring out these,
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you should take helium and throw it right over there.
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Right?
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The periodic table is just a way
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to organize things so it makes sense,
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but in terms of trying to figure out orbitals,
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you could take helium.
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Let me do that.
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The magic of computers.
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Cut it out, and then let me paste it right over there.
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Right?
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And now you see that helium, you get 1s and then you get 2s,
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so helium's configuration is
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-- Sorry, you get 1s1, then 1s2.
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We're in the first energy shell.
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Right?
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So the configuration of hydrogen is 1s1.
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You only have one electron
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in the s subshell of the first energy shell.
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The configuration of helium is 1s2.
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And then you start filling the second energy shell.
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The configuration of lithium is 1s2.
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That's where the first two electrons go.
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And then the third one goes into 2s1, right?
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And then I think you start to see the pattern.
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And then when you go to nitrogen you say,
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OK, it has three in the p sub-orbital.
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So you can almost start backwards, right?
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So we're in period two, right?
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So this is 2p3.
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Let me write that down.
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So I could write that down first. 2p3.
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So that's where the last three electrons
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go into the p orbital.
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Then it'll have these two that go into the 2s2 orbital.
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And then the first two, or the electrons
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in the lowest energy state, will be 1s2.
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So this is the electron configuration,
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right here, of nitrogen.
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And just to make sure you did your configuration right,
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what you do is you count the number of electrons.
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So 2 plus 2 is 4 plus 3 is 7.
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And we're talking about neutral atoms,
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so the electrons should equal the number of protons.
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The atomic number is the number of protons.
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So we're good.
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Seven protons. So this is, so far,
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when we're dealing just with the s's and the p's,
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this is pretty straightforward.
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And if I wanted to figure out the configuration of silicon,
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right there, what is it?
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Well, we're in the third period.
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One, two, three.
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That's just the third row.
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And this is the p-block right here.
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So this is the second row in the p-block, right?
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One, two, three, four, five, six.
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Right.
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We're in the second row of the p-block,
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so we start off with 3p2.
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And then we have 3s2.
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And then it filled up all of this p-block over here.
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So it's 2p6.
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And then here, 2s2.
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And then, of course, it filled up at the first shell
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before it could fill up these other shells.
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So, 1s2.
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So this is the electron configuration for silicon.
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And we can confirm that we should have 14 electrons.
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2 plus 2 is 4, plus 6 is 10.
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10 plus 2 is 12 plus 2 more is 14.
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So we're good with silicon.
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I think I'm running low on time right now,
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so in the next video we'll start addressing what happens
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when you go to these elements, or the d-block.
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And you can kind of already guess what happens.
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We're going to start filling up these d orbitals here
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that have even more bizarre shapes.
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And the way I think about this, not to waste too much time,
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is that as you go further and further out from the nucleus,
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there's more space in between the lower energy orbitals
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to fill in more of these bizarro-shaped orbitals.
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But these are kind of the balance --
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I will talk about standing waves in the future
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-- but these are kind of a balance between trying to
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get close to the nucleus
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and the proton and those positive charges,
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because the electron charges are attracted to them,
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while at the same time avoiding the other electron charges,
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or at least their mass distribution functions.
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Anyway, see you in the next video.
