PROBABILITY

[Audio] Presentation on probability Presented by K.N.Jeya.

[Audio] Definition Probability is a measure of how likely something will occur. It is ratio of desired outcomes to total outcomes. (desired by total) Probabilities of all outcomes sums to 1..

[Audio] Example If I roll number cube, there are six total possibilities.( 1,2, 3, 4, 5,6) Each possibility has only one outcome, so each has a PROBABILITY of 1 by 6. For instance, the probability I roll a 2 is 1 by 6, since there is only a single 2 on the number cube..

[Audio] Two or more events If there are two or more events, you need to consider if it is happening at the same time or one after the other..

[Audio] AND If the two events are happening at the same time, you need to multiply the two probabilities together. Usually, the questions use the word "AND" when describing the outcomes..

[Audio] OR If the two events are happening one after the other, you need to add the two probabilities. Usually, the questions use the word " OR" when describing the outcomes..

[Audio] EXPERIMENTAL PROBABILITY An experimental probability is one that happens as the result of an experiment. (number of outcomes) by ( number of trials) The probabilities we have done so far are "theoretical probabilities", because there was no experiments..

[Audio] SURE OR CERTAIN EVENT A sure event is an event, which always happens. An event which is sure to occur at every performance of an experiment is called a certain event connected with the experiment. Certain Events also known as Sure Event..

[Audio] Example For example ,it's a sure event to obtain a number between 1 and 6 when rolling an ordinary die. The probability of a sure event has the value of 1. The probability of an impossible event has the value of 0..

[Audio] Impossible event An event which cannot occur at any performance of the experiment is called an possible event. In other words, An event E is called an impossible event if P of E = 0. This happens when no outcome of the experiment is a favorable outcome..

[Audio] Example In throwing a die, the event of getting a natural number greater than 6 is an impossible event..

[Audio] MUTUALLY EXCLUSIVE EVENTS If there be no element common between two or more events, i.e., between two or more subsets of the sample space, then these events are called mutually exclusive events. If E1 and E2 are two mutually exclusive events, then E1 ∩ E2 = ∅.

[Audio] Example In connection with throw a die "even face" and "odd face" are mutually exclusive. But" odd-face" and "multiple of 3" are not mutually exclusive, because when "face-3" occurs both the events "odd face" and "multiply of 3" are said to be occurred simultaneously. We see that two simple-events are always mutually exclusive while two compound events may or may not mutually exclusive..

[Audio] COMPLIMENTARY EVENT An event which consists in the negation of another event is called complementary event of the er event. In case of throwing a die, even face and odd face are complementary to each other. Multiple of 3 and Not multiple of 3 are complementary events of each other..

[Audio] COMPLIMENTARY EVENT If E and F are two events for an experiment such that every favorable outcome for the event E is not a favorable outcome for the event F and every unfavorable outcome for the event E is a favorable outcome for F then F is called the complementary event of the event E, and F..

[Audio] Example In the throw of a die if, E = event of getting an odd number then, E bar = event of not getting an odd number, that is, event of getting an even number..

[Audio] Classical approach An approach to the understanding of probability based on the assumptions that any random process has a given set of possible outcomes and that each possible outcome is equally likely to occur..

[Audio] Example An example often used is rolling a die, in which there are six possible outcomes and each outcome is assumed to be equally likely..

[Audio] Formula Classical approach== P of a = f by N. P of A means " probability of event A" that is event A is whatever event you are looking for, like winning the lottery."f" is the frequency, or number of possible times the event could happen. N is the number of times the event could happen..

[Audio] Empirical approach Empirical probability, also known as experimental probability, refers to a probability that is based on historical data. In other words, empirical probability illustrates the likelihood of an event occurring based on historical data..

[Audio] Formula Empirical probability equals to number of times occurred by total number of times experiment performed.

[Audio] Example A dice thrown three times and the corresponding result.what is the empirical probability of rolling a 4? Experiment 1 result 2 Experiment 2 result 5 Experiment 3 result 1 Empirical probability equals to 0 by 3 = 0[break]% The empirical probability of rolling a 4 is 0[break]%.

[Audio] PROBABILITY OF CORONA VIRUS BETWEEN 2020- 2022 IN INDIA.

[Audio] GLOBAL RATE OF CORONA VIRUS. GLOBAL RATE OF CORONA VIRUS.

[Audio] AGE WISE PROBABILITY. AGE WISE PROBABILITY.

[Audio] PRACTICE SESSION. PRACTICE SESSION.

[Audio] Practice for simple probability If I flip a coin, what is the probability I get heads? What is the probability I get tails? Remember, to think of how many possibilities are there!.

[Audio] Answers Probability of heads = one by two Probability of tails =one by two If you add these two up, you will get 1, which means the answers are probably right..

[Audio] Practice for two or more events If I roll a number cube and flip a coin: What is the probability I will get a heads and a 6? What is the probability I will get a tails or a 3?.

[Audio] Answer Probability of heads and 6 = 1 by 2 into 1 by 6 equals to 1 by 12 Probability of tails or a 5 = 1 by 2 plus 1 by 6 equals to 8 by 12 equals to 2 by 3.

[Audio] Example problem for sure event The probability of a sure event is Answer: The value of the probability of an impossible event = 0 The value of the probability of a sure event = 1 An event is a sure event that always happens. Example: it's a sure event to obtain a number between 1 n 6 when rolling an ordinary die..

[Audio] Example problem for mutually exclusive event What is the probability of a die showing a number 3 or number 5? Solution: Let, Probability of 3 is the probability of getting a number 3 Probability of 5 is the probability of getting a number 5 Probability of 3 = 1 by 6 and Probability of 5 = 1 by 6 So, Probability of (3 or 5) = Probability of (3) + Probability of (5) Probability of (3 or 5) = (1 by 6) + (1 by 6) = 2 by 6 Probability of (3 or 5) = 1 by 3 Therefore, the probability of a die showing 3 or 5 is 1 by 3..

[Audio] Example problem for complimentary event If we flip a coin two times, what are the odds for it landing heads at least once?Favorable outcomes: 3 which are HH, HT, TH.Unfavorable outcomes: 1 which are TT.Thus, the odds for it landing heads at least once are 3 to 1, or 3 is to 1..

[Audio] Hope you all learned more about probability Thank you..