 So, this is one of the other questions that we did using polynomial long division. We know that this isn't a factor of this, right? So if it's not a factor, you know, we're going to have to either use, you know, if they asked us to do this, we're going to have to either use polynomial long division, which we've already done, right? But synthetic long division is a lot easier, so we're going to end up using synthetic long division. So you have two videos where you're going to have polynomial long division, synthetic division, and you can compare them, and it's your choice which one you want to do, but synthetic division is a lot easier. So hopefully you choose that one. Okay, so let's lay this out in the synthetic division form and just go ahead and do it, okay? So what we have is, you know, X is equal to negative two, which basically means X plus two, right? And we took our numbers, our coefficients, and we put them up top here. So what we're going to do is take the negative three, bring it down. Your negative three times negative two is going to come up here. Negative three times negative two is going to be six, right? And then five plus six is going to be 11. So we're going to take the 11, take the negative two, negative two times 11 is just going to come up there and that's going to be negative 22. And negative 22 plus two is just going to be negative 20, which is exactly the same result we got when we did the polynomial long division, right? So at the bottom here, we're just going to have whatever's left over, right? So what we end up having is negative three comes down, you know, go through the whole routine and you end up with negative three down here, 11 down here, and negative 20 down here, which is exactly what we ended up having when we did the polynomial long division. If you're going to write this out in this factored form, it's not a factor really. If you're going to write this out and it's, you know, one, one X term taking, taking out of the numerator because you took an X to the power of two divided it by an X, which means X squared is going to be kicked down to an X term, right? So this means that it's negative X plus 11, which is what we got here, and a remainder of negative 20. So if you substitute in X is equal to negative two in the top polynomial here, if you substitute in X is equal to negative two in the top polynomial here, what you end up with is negative 20, which is your Y coordinate. So if X is equal to negative two in this function, Y is equal to negative 20, which is just a coordinate. And if X is equal to, again, this one you can rewrite as negative 11 comes over, divide by negative three. So it becomes 11 over three. So if you sub in 11 over three into this polynomial as well, what you end up is your Y coordinate is negative 20. So that's another coordinate where Y is negative 20, right? So again, synthetic long division, you go through the whole thing, kick it down. And, you know, this is what you end up with. What we're going to end up doing is doing a few more examples where, you know, we have, you know, higher orders, higher powers than X to the power of two. And we're going to have missing terms in there. So we're going to start off, you know, just kick it up a notch and take X to the power of three with, you know, missing terms and do that one. And then from there, we're going to do, you know, a higher order. And hopefully by the time we get to the large one, this process makes sense to you. And you realize how, you know, you appreciate the simplicity of it as compared to long division. There's another skater here. I'm going to find out if I need to get out of here. We'll find out. Be back. How you doing? Good, good, good. You going to use this one or that one? Yeah, here. Here? Okay. Awesome. I'll kick it over to the other one. Are you okay with me taping you as well? Sure. Okay, sweet. I'll be here in 10 minutes.