The probability that an event will happen is P(E) 13/ 19. Find the probability that the...

1.) The probability that an event will happen is P(E)= 24/37. Find the probability that the...

1.) The probability that an event will happen is P(E)= 24/37. Find the probability that the event will not happen. The probability that the event will not happen is__ 2.) Identify the sample space of the probability experiment and determine the number of outcomes in the sample space. Randomly choosing an even number between 10 and 20 comma inclusive The sample space is__ ​(Use a comma to separate answers as needed. Use ascending​ order.) There are __ outcome(s) in the...

p = 13 q = 37 Totient = 432 n = 481 e = 19 d...

p = 13 q = 37 Totient = 432 n = 481 e = 19 d = 91 public key: n = 481, e = 19 private key: n= 481, d = 91 Except 1, explain any other prime number less than e which cannot be used to generate d? What are those number and why they cannot be used?

1) A die is rolled. Find the probability of the given event. (a) The number showing...

1) A die is rolled. Find the probability of the given event. (a) The number showing is a 2; The probability is :   (b) The number showing is an even number; The probability is : (c) The number showing is greater than 5; The probability is : 2) If ?(?∩?)=0.015 P(E∩F)=0.015, ?(?|?)=0.05 P(E|F)=0.05, and ? (?|?)=0.1P (F|E)=0.1, then (a)    ?(?)=P(E)= (b)    ?(?)=P(F)= (c) P(E∪F)= 3) The natural remedy echinacea is reputed to boost the immune system, which will reduce flu...

Which of the following are true statements? The probability of an event is always at least...

Which of the following are true statements? The probability of an event is always at least 0 and at most 1. The probability that an event will happen is always 1 minus the probability that it won't happen. If two events cannot occur simultaneously, the probability that at least one event will occur is the sum of the respective probabilities of the two events a. II only b. I only c. Only I and III are true statements d. I,...

. Suppose that the probability of event A is 0.4 and the probability of event B...

. Suppose that the probability of event A is 0.4 and the probability of event B is 0.5. What is P A B ( ) ? if A and B are mutually exclusive? What is P A B ( ) ? if A and B are independent?

1. The probability that a student has a Visa card (event V) is 0.30. The probability...

1. The probability that a student has a Visa card (event V) is 0.30. The probability that a student has a MasterCard (event M) is 0.40. The probability that a student has both cards is 0.12. (1) Find the probability that a student has either a Visa card or a MasterCard. (2) In this problem, are V and M independent? Why? 2. This is a contingency table describes 100 business students. Gender Major Female(F) Male(M) Accounting (A) 22 28 Economics(E)...

Using the following information to find the probability (p) of a-e Universal set = {1,2,3,4,5,6,7,8,9,12,13,14,16,20,22,44,48,50,52,56} Subset...

Using the following information to find the probability (p) of a-e Universal set = {1,2,3,4,5,6,7,8,9,12,13,14,16,20,22,44,48,50,52,56} Subset A = {9,12,13,20,22,44,50,56} Subset H = {4,5,8,9,16,22,44,48,52} Subset C = {1,4,20,22,44,48,52,56} Find: a.) P(AnH)UC' b.) P(HnC)' c.) P(H)' d.) P[H\C]-P(H given C) e.) P[H\A]-P(H given A)

Event A occurs with probability 0.6. Event B occurs with probability 0.4. If A and B...

Event A occurs with probability 0.6. Event B occurs with probability 0.4. If A and B are disjoint (mutually exclusive), then: A. P(A and B) = 0.24 B. P(A or B) = 1.0 C. P(A and B) = 1.0 D. P(A or B) = 0.24

Let P be a probability distribution on sample space Ω and A ⊂ Ω an event...

Let P be a probability distribution on sample space Ω and A ⊂ Ω an event such that P(A) > 0. Show that the conditional probability given A is a proper probability distribution on Ω using the axioms of probability and definition of conditional probability.

Q1. 4 Events: Event C. Event E1. Event E2. Event E3 P(C) = 0.15 P(E1)=P(E3)=P(E2)=0.3 p(K/E1)=0.08...

Q1. 4 Events: Event C. Event E1. Event E2. Event E3 P(C) = 0.15 P(E1)=P(E3)=P(E2)=0.3 p(K/E1)=0.08 P(K/E2)=0.04 P(K/E3)=0.01 P(k/C)=0.15 Ask: What is probability that given not K (K'=1-P(k)), and it would be one of the event in E3? P(E3/K')?