{"id":3908,"date":"2021-08-10T02:12:01","date_gmt":"2021-08-10T02:12:01","guid":{"rendered":"https:\/\/mathemerize.com\/?p=3908"},"modified":"2021-10-11T02:19:35","modified_gmt":"2021-10-10T20:49:35","slug":"probability-basic-concepts","status":"publish","type":"post","link":"https:\/\/mathemerize.com\/probability-basic-concepts\/","title":{"rendered":"Probability Basic Concepts"},"content":{"rendered":"
Here, you will learn probability basic concepts and definitions of probability.<\/p>\n
Let’s begin –<\/p>\n
Probability gives us a measure of likelihood that something will happen. However probability can never predict the number of times that an occurrence actually happens.<\/p>\n
An action or operation resulting in two or more well defined outcomes.<\/p>\n
Example<\/span> : tossing a coin, throwing a die, drawing a card from a pack of well shuffled playing cards.<\/p>\n A set S consist of all possible outcomes of an random experiment is called a sample space.<\/p>\n Example<\/span> : in an experiment of “throwing a die” , following sample spaces are possible:<\/p>\n (i) {even number, odd number}<\/p>\n (ii) {1,2,3,4,5,6}<\/p>\n An event is defined as an occurrence or situation.<\/p>\n Example : in a toss of a coin, it shows a head.<\/p>\n If an event has more than one sample points it is called Compound Event.<\/p>\n The set of all outcomes which are in S but not in A is called complement of the event A. It is denoted by \\(A^c\\), \\(A^`\\).<\/p>\n Two events A and B are said to be Mutually Exclusive if probability of A intersection B is zero i.e \\(P(A \\cap B)\\)=0.<\/p>\n\n\n Example : <\/span> choosing numbers at random from the set {3,4,5,6,7,8,9,10,11,12}. If, Events are said to be Equally Likely when each event is as likely occur as any other event. Note that the term ‘at random’ or ‘randomly’ means that all possibilities are equally likely.<\/p>\n Events A,B,C…..N are said to be Exhaustive Events if no events outside this set can result as an outcome of an experiment.<\/p>\n Note :<\/strong><\/p>\n (i) 0<=P(A)<=1<\/p>\n (ii) P(A)+P(\\(A^c\\))=1<\/p>\n (iii) If x cases are favourable to A & y cases are favourable to \\(A^c\\) then P(A)=\\(x\\over(x+y)\\) and \\(P(A \\cap B)\\)=\\(y\\over(x+y)\\). We say that Odds in Favour of A are x:y & Odds Against A are y:x.<\/p>\n\n\n Example : <\/span> If the letters of INTERMEDIATE<\/b> are arranged, then odds in favour of the event that no two ‘E’s occur together, are-<\/p>\n Solution : <\/span>Let 3’E’s, Rest 9 letters,(b) Sample Space<\/strong> :<\/h4>\n
(c) Event<\/strong> :<\/strong><\/h4>\n
(d) Compound Event<\/strong> :<\/h4>\n
(e) Complement of an Event<\/strong> :<\/h4>\n
(f) Mutually Exclusive Event<\/strong> :<\/h4>\n
\n\t\t Event A is the selection of a prime number.
\n\t\t and Event B is the selection of an odd number.
\n\t\t Event C is the selection of an even number.
\n\t\t Then A and C are mutually exclusive as none of the numbers in this set is both prime and even and B and C are also mutually exclusive.
<\/p>\n\n\n(g) Equally Likely Events<\/strong> :<\/h4>\n
(h) Exhaustive Events<\/strong> :<\/h4>\n
First arrange rest of the letters = \\(9!\\over {2! 2!}\\)
\n\t\t Now 3’E’s can be placed by \\(^{10}C_3\\) ways, so favourable cases = \\({9!\\over {2! 2!}}\\times\\)\\(^{10}C_3\\) = 3 \\(\\times\\) 10!
\n\t\t Total cases = \\(12!\\over {2! 2! 3!}\\) = \\({11\\over 2} \\times\\)10!
\n\t\t Non-favourable cases = (\\(11\\over 2\\) – 3)\\(\\times\\)10! = \\({5\\over 2}\\times\\)10!
\n\t\t Odds in favour of the event = \\(3\\over {5\/2}\\) = \\(6\\over 5\\) Ans.
<\/p>\n\n\n\n