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Revision: Probability Maths HSC Commerce (English Medium) 11th Standard Maharashtra State Board

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Definitions [3]

Definition: Probablity

Probability measures the degree of certainty of the occurrence of an event.

Definition: Conditional Probability

The conditional probability of both events A and B over the sample space S is

\[P(A | B) = \frac{P(A \cap B)}{P(B)}, P(B) \neq 0\]
 
\[P(B | A) = \frac{P(A \cap B)}{P(A)}, P(A) \neq 0\]
Definition: Independent Events

Two events are said to be independent if the occurrence of one does not depend on the other.

For two events E and F:

  • E and F are independent if P(F | E) = P(F), when \[P(E) \neq 0\].

  • Similarly, E and F are independent if P(E | F) = P(E), when \[P(F) \neq 0\].

  • An equivalent and most commonly used test is:

\[P(E \cap F) = P(E) \cdot P(F)\]

Formulae [1]

\[P(A | B) = \frac{P(A \cap B)}{P(B)}\], where \[P(B) \neq 0\].

\[P(B | A) = \frac{P(A \cap B)}{P(A)}\], where \[P(A) \neq 0\].

Multiplication rule: \[P(A \cap B) = P(B) \cdot P(A | B) = P(A) \cdot P(B | A)\].

Complement form: \[P(A' | B) = 1 - P(A | B)\].

Theorems and Laws [1]

Theorem: Multiplication Theorem

For two events:

  • \[P(E \cap F) = P(F) \cdot P(E | F)\]

  • \[P(E \cap F) = P(E) \cdot P(F | E)\]

For three events:

  • \[P(E \cap F \cap G) = P(E) \cdot P(F | E) \cdot P(G | E \cap F)\]

Key Points

Key Points: Concept of Probability
No. Term Definition
1 Probability A measure of the chance of occurrence of an event.
2 Random Experiment An experiment in which all possible outcomes are known, but the exact outcome cannot be predicted with certainty.
3 Outcome The result of a random experiment.
4 Sample Space (S) The set of all possible outcomes of a random experiment.
5 Sample Point Each element of the sample space.
6 Number of Sample Points The number of elements in the sample space is denoted by n(S).
7 Equally Likely Outcomes Outcomes which have the same chance of occurring.
Key Points : Standard Sample Space
No. Term Definition
1 Probability A measure of the chance of occurrence of an event.
2 Random Experiment An experiment in which all possible outcomes are known, but the exact outcome cannot be predicted with certainty.
3 Outcome The result of a random experiment.
4 Sample Space (S) The set of all possible outcomes of a random experiment.
5 Sample Point Each element of the sample space.
6 Number of Sample Points The number of elements in the sample space is denoted by n(S).
7 Equally Likely Outcomes Outcomes which have the same chance of occurring.

Playing Cards – Key Facts

  • Total cards = 52

  • Red cards = 26 (Hearts, Diamonds)

  • Black cards = 26 (Clubs, Spades)

  • Each suit has 13 cards

  • Face cards = King, Queen, Jack (Total = 12)

Key Points: Types of Events in Probability
Type of Event Meaning Probability
Sure (Certain) Event An event that is certain to occur P(E) = 1
Impossible Event An event that cannot occur P(E) = 0
Simple (Elementary) Event An event having only one outcome P(E) = 1 / n(S)
Complementary Event (E̅) An event that occurs when E does not occur P(not E) = 1 − P(E)
Mutually Exclusive Events Two events that cannot occur together P(A ∩ B) = 0
Exhaustive Events Events which together cover all outcomes of S P(A₁) + P(A₂) + … = 1
Equally Likely Events All outcomes have the same chance of occurring P(E) = n(E) / n(S)
General Rule Probability of any event 0 ≤ P(E) ≤ 1

Properties:

  • Complement Rule
    P(A′) = 1 − P(A)
    ⇒ P(A) + P(A′) = 1
  • Range of Probability
    0 ≤ P(A) ≤ 1
  • Impossible Event
    P(ϕ) = 0
  • Certain Event
    P(S) = 1
  • Subset Rule
    If A ⊆ B, then P(A) ≤ P(B)
  • Difference of Events
    P(A ∩ B′) = P(A) − P(A ∩ B)
    P(A′ ∩ B) = P(B) − P(A ∩ B)
  • Union of Two Events
    P(A ∪ B) = P(A) + P(B) − P(A ∩ B)
  • Union of Three Events
    P(A ∪ B ∪ C) = P(A) + P(B) + P(C)
    − P(A ∩ B) − P(B ∩ C) − P(C ∩ A) + P(A ∩ B ∩ C)
  • Mutually Exclusive Events (2 events)
    If A ∩ B = 0, then
    P(A ∪ B) = P(A) + P(B)
  • Mutually Exclusive Events (multiple)
    P(A₁ ∪ A₂ ∪ ... ∪ Aₙ) = P(A₁) + P(A₂) + ... + P(Aₙ)
  • Upper Bound of Union
    P(A ∪ B) ≤ P(A) + P(B)
Key Points: Conditional Probability
  • Conditional probability means probability under a given condition.

  • The formula is \[P(A | B) = \frac{P(A \cap B)}{P(B)}\], where \[P(B) \neq 0\].

  • Always reduce the sample space according to the condition first.

  • The numerator represents outcomes common to both events.

  • Do not confuse P(A | B) with P(B | A).

  • For independent events, P(A | B) = P(A).

Key Points: Multiplication Theorem on Probability
  • Multiplication theorem is used to find the probability of simultaneous occurrence of events.

  • For two events: \[P(E \cap F) = P(E) \cdot P(F | E)\]

  • Another equivalent form is \[P(E \cap F) = P(F) \cdot P(E | F)\].

  • For three events: \[P(E \cap F \cap G) = P(E) \cdot P(F | E) \cdot P(G | E \cap F)\].

  • Most “without replacement” questions are solved using this theorem.

  • Always define events before solving a probability problem.

Key Points: Independent Events
  • Independent events do not influence each other.

  • The standard test is \[P(E \cap F) = P(E)P(F)\].

  • Conditional form: \[P(F | E) = P(F)\] and \[P(E | F) = P(E)\], when defined.

  • If two events are independent, related complement pairs are also independent.

  • Mutually exclusive events and independent events are different.

  • For independent events A and B, \[P(A \cup B) = 1 - P(A')P(B')\].

  • For three events, mutual independence requires pairwise conditions and the condition involving all three together.

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