British Petroleum is a corporation, so no one person owns it. It does have a president, a chairman and a board of directors who make the critical decisions for the company. The corporation issues stock, and the owners of the stock have some control as they must approve the nominated leaders of the corporation.
Carnival Corporation is a global cruise company and one of the worlds largest travel and leisure companies. The nature of the business of Carnival Corporation is to provide vacation experiences for its guests on cruise ships and other vacation experiences. The company operates a portfolio of nine cruise line brands, which include Carnival Cruise Line, Princess Cruises, Holland America Line, Seabourn, AIDA Cruises, Costa Cruises, Cunard, P&O Cruises, and P&O Cruises Australia. Carnival Corporation also owns tour and leisure companies, such as Holland America Tours, Windstar Cruises, and Fathom. In addition to providing vacation experiences, the company also provides a variety of related services, such as shore excursions, cruise-related retail and concession operations, port and destination services, and other travel-related services.The companys activities include: Planning and operating cruises, cruises-to-nowhere, and other leisure experiences Developing and marketing cruise and cruise-related products Providing shore excursions Providing cruise-related retail and concession operations Providing port and destination services Providing other cruise-related servicesCarnival Corporation also owns and operates hotels, resorts, and entertainment complexes, as well as provides a variety of other services, such as vacation ownership programs, loyalty programs, and marketing services.
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the 4 p's
Place Price Promotion Product
Plundering
No, BP is an energy company.
Sean (Puffy) Combs
if P(A)>0 then P(B'|A)=1-P(B|A) so P(A intersect B')=P(A)P(B'|A)=P(A)[1-P(B|A)] =P(A)[1-P(B)] =P(A)P(B') the definition of independent events is if P(A intersect B')=P(A)P(B') that is the proof
Dr. Unrealized loss on investment in Company B (P&L) Cr. Investment in Company B (B/S)
Sum Rule: P(A) = \sum_{B} P(A,B) Product Rule: P(A , B) = P(A) P(B|A) or P(A, B)=P(B) P(A|B) [P(A|B) means probability of A given that B has occurred] P(A, B) = P(A) P(B) , if A and B are independent events.
P(A|B)= P(A n B) / P(B) P(A n B) = probability of both A and B happening to check for independence you see if P(A|B) = P(B)
If they're disjoint events: P(A and B) = P(A) + P(B) Generally: P(A and B) = P(A) + P(B) - P(A|B)
As of 2021, the Pacific Dawn is owned by Ocean Builders, a company specializing in building floating homes and communities. The ship was previously owned by P&O Cruises Australia before being sold due to the impact of the pandemic on the cruise industry.
Let's try this example (best conceived of as a squared 2x2 table with sums to the side). The comma here is an AND logical operator. P(A, B) = 0.1 P(A, non-B) = 0.4 P(non-A, B) = 0.3 P(non-A, non-B) = 0.2 then P(A) and P(B) are obtained by summing on the different sides of the table: P(A) = P(A, B) + P(A, non-B) = 0.1 + 0.4 = 0.5 P(B) = P(A,B) + P(non-A, B) = 0.1 + 0.3 = 0.4 so P(A given B) = P (A, B) / P (B) = 0.1 / 0.4 = 0.25 also written P(A|B) P(B given A) = P (A,B) / P (A) = 0.1 / 0.5 = 0.2 The difference comes from the different negated events added to form the whole P(A) and P(B). If P(A, non-B) = P (B, non-A) then P(A) = P(B) and also P(A|B) = P(B|A).
P(a or b)= p(a)+p(b) - p(a and b)
This has to do with the union of events. If events A and B are in the set S, then the union of A and B is the set of outcomes in A or B. This means that either event A or event B, or both, can occur. P(A or B) = P(A) + P(B) - P(A and B) **P(A and B) is subtracted, since by taking P(A) + P(B), their intersection, P(A and B), has already been included. In other words, if you did not subtract it, you would be including their intersection twice. Draw a Venn Diagram to visualize. If A and B can only happen separately, i.e., they are independent events and thus P(A and B) = 0, then, P(A or B) = P(A) + P(B) - P(A and B) = P(A) + P(B) - 0 = P(A) + P(B)
P=B×RB=P÷RR=P÷B