WEBVTT 00:00:00.930 --> 00:00:04.050 Welcome to the first lecture of this class. 00:00:04.050 --> 00:00:06.860 You may be used to having a first lecture devoted to 00:00:06.860 --> 00:00:09.670 general comments and motivating examples. 00:00:09.670 --> 00:00:11.020 This one will be different. 00:00:11.020 --> 00:00:14.500 We will dive into the heart of the subject right away. 00:00:14.500 --> 00:00:16.920 In fact, today we will accomplish a lot. 00:00:16.920 --> 00:00:20.030 By the end of this lecture, you will know about all of the 00:00:20.030 --> 00:00:23.120 elements of a probabilistic model. 00:00:23.120 --> 00:00:26.060 A probabilistic model is a quantitative description of a 00:00:26.060 --> 00:00:29.080 situation, a phenomenon, or an experiment 00:00:29.080 --> 00:00:31.320 whose outcome is uncertain. 00:00:31.320 --> 00:00:34.850 Putting together such a model involves two key steps. 00:00:34.850 --> 00:00:38.140 First, we need to describe the possible outcomes of the 00:00:38.140 --> 00:00:39.320 experiment. 00:00:39.320 --> 00:00:42.910 This is done by specifying a so-called sample space. 00:00:42.910 --> 00:00:46.170 And then, we specify a probability law, which assigns 00:00:46.170 --> 00:00:50.060 probabilities to outcomes or to collections of outcomes. 00:00:50.060 --> 00:00:53.360 The probability law tells us, for example, whether one 00:00:53.360 --> 00:00:57.110 outcome is much more likely than some other outcome. 00:00:57.110 --> 00:01:00.640 Probabilities have to satisfy certain basic properties in 00:01:00.640 --> 00:01:02.070 order to be meaningful. 00:01:02.070 --> 00:01:05.069 These are the axioms of probability theory. 00:01:05.069 --> 00:01:08.370 For example probabilities cannot be negative. 00:01:08.370 --> 00:01:11.940 Interestingly, there will be very few axioms, but they are 00:01:11.940 --> 00:01:14.890 powerful, and we will see that they have lots of 00:01:14.890 --> 00:01:16.220 consequences. 00:01:16.220 --> 00:01:19.400 We will see that they imply many other properties that 00:01:19.400 --> 00:01:22.480 were not part of the axioms. 00:01:22.480 --> 00:01:25.510 We will then go through a couple of very simple examples 00:01:25.510 --> 00:01:27.789 involving models with either discrete 00:01:27.789 --> 00:01:29.730 or continuous outcomes. 00:01:29.730 --> 00:01:32.690 As you will be seeing many times in this class, discrete 00:01:32.690 --> 00:01:35.070 models are conceptually much easier. 00:01:35.070 --> 00:01:39.160 Continuous models involve some more sophisticated concepts, 00:01:39.160 --> 00:01:43.270 and we will point out some of the subtle issues that arise. 00:01:43.270 --> 00:01:45.880 And finally, we will talk a little bit about the big 00:01:45.880 --> 00:01:49.560 picture, about the role of probability theory, and its 00:01:49.560 --> 00:01:51.220 relation with the real world.