Lets say we have one ray over here that starts at point A and then goes through point B, and so we could call this ray (we could call, let me draw that a little bit straighter) we could call this ray AB. Ray AB starts at A or has a vertex at A and lets say that there is also a ray AC. So lets say that C is sitting right over there and then i can draw another ray that goes through C, so this is ray AC. and what's interesting about these two rays is that they have the exact same vertex. (they have the exact same vertex at A) and in general what we have when we have two rays with the exact same vertex, you have an angle. and you've probably, you're probably already reasonably familiar with the concept of an angle which i believe comes from the latin for corner, which makes sense this looks a little bit like a corner right over here that we see at point A and, but the geometric definition, or the one you are more likely to see is when two rays share a common vertex. and that common vertex is actually called the vertex of the angle. so A is vertex. Not only is it the vertex of each of these rays, ray AB and ray AC, it is also the vertex of, of the angle. so the next thing i want to think about is how do we label, how do we label an angle you might be tempted to just label it angle A, but i'll show you in a second why that's not going to be so clear to someone based on where, where our angle is actually sitting. so the way that you specify an angle, and hopefully this will make sense in a second, is that you say ANGLE, (this is the symbol for angle) and it actually looks strangely similar to this angle right over here, but this little pointy thing almost looks like a less than sign, but it's not quite. its flat on the bottom right over here. this is the symbol for angle, you would say angle BAC, BAC, or you could say angle CAB, or angle CAB. and either case there kind of specifying this corner, or sometimes you could view it as this opening right over here. and the important thing to realize is that you have the vertex in the middle of the letters. and you might be saying why go through the trouble of listing all three of these letters, why can't i just call this angle A. and to see that, let me show you another diagram. and although the geometric definition involves, two rays that have the same vertex in practice, you are going to see many angles made of line and line segments Lets say I have one line segment like that, let me label it DE, and lets also have line segment, FG and lets say the point where the two line segments interact is H, how could we specify this angle right over here can we call it as angle H, if we say it as angle H, it could be this angle, that angle or this angle over here it could be this angle over here. The only way to specify which can we are talking about is to give 3 letters if you want to talk about this angle, you will call it angle EHG, or could call it angle GHE, if you wanted this angle over here, you could call it angle DHG, or angle GHD. i think you get the point. this angle is angle FHE or EHF and this is angle FHD or DHF. now are are clear which angle you are referring to. So now we have a general idea what an angle is and how we denote it with symbols, it does not look like all angles look the same. Some are more open than others So for example, let us take two angles here, angle BAC, and let's say over here, I have angle XYZ when you look at these angle XYZ is more open while this angle is more closed, compared to the other angle when we measure angles, we must measure it on how open or closed they are. The measure of angle XYZ, is greater than the measure of the angle ABC. Any measure of angles, is based on how open, or closed they are which we will see in the next vidoes